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|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
292
|
B
|
Network Topology
|
PROGRAMMING
| 1,200
|
[
"graphs",
"implementation"
] | null | null |
This problem uses a simplified network topology model, please read the problem statement carefully and use it as a formal document as you develop the solution.
Polycarpus continues working as a system administrator in a large corporation. The computer network of this corporation consists of *n* computers, some of them are connected by a cable. The computers are indexed by integers from 1 to *n*. It's known that any two computers connected by cable directly or through other computers
Polycarpus decided to find out the network's topology. A network topology is the way of describing the network configuration, the scheme that shows the location and the connections of network devices.
Polycarpus knows three main network topologies: bus, ring and star. A bus is the topology that represents a shared cable with all computers connected with it. In the ring topology the cable connects each computer only with two other ones. A star is the topology where all computers of a network are connected to the single central node.
Let's represent each of these network topologies as a connected non-directed graph. A bus is a connected graph that is the only path, that is, the graph where all nodes are connected with two other ones except for some two nodes that are the beginning and the end of the path. A ring is a connected graph, where all nodes are connected with two other ones. A star is a connected graph, where a single central node is singled out and connected with all other nodes. For clarifications, see the picture.
You've got a connected non-directed graph that characterizes the computer network in Polycarpus' corporation. Help him find out, which topology type the given network is. If that is impossible to do, say that the network's topology is unknown.
|
The first line contains two space-separated integers *n* and *m* (4<=≤<=*n*<=≤<=105; 3<=≤<=*m*<=≤<=105) — the number of nodes and edges in the graph, correspondingly. Next *m* lines contain the description of the graph's edges. The *i*-th line contains a space-separated pair of integers *x**i*, *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=*n*) — the numbers of nodes that are connected by the *i*-the edge.
It is guaranteed that the given graph is connected. There is at most one edge between any two nodes. No edge connects a node with itself.
|
In a single line print the network topology name of the given graph. If the answer is the bus, print "bus topology" (without the quotes), if the answer is the ring, print "ring topology" (without the quotes), if the answer is the star, print "star topology" (without the quotes). If no answer fits, print "unknown topology" (without the quotes).
|
[
"4 3\n1 2\n2 3\n3 4\n",
"4 4\n1 2\n2 3\n3 4\n4 1\n",
"4 3\n1 2\n1 3\n1 4\n",
"4 4\n1 2\n2 3\n3 1\n1 4\n"
] |
[
"bus topology\n",
"ring topology\n",
"star topology\n",
"unknown topology\n"
] |
none
| 1,000
|
[
{
"input": "4 3\n1 2\n2 3\n3 4",
"output": "bus topology"
},
{
"input": "4 4\n1 2\n2 3\n3 4\n4 1",
"output": "ring topology"
},
{
"input": "4 3\n1 2\n1 3\n1 4",
"output": "star topology"
},
{
"input": "4 4\n1 2\n2 3\n3 1\n1 4",
"output": "unknown topology"
},
{
"input": "5 4\n1 2\n3 5\n1 4\n5 4",
"output": "bus topology"
},
{
"input": "5 5\n3 4\n5 2\n2 1\n5 4\n3 1",
"output": "ring topology"
},
{
"input": "5 4\n4 2\n5 2\n1 2\n2 3",
"output": "star topology"
},
{
"input": "5 9\n5 3\n4 5\n3 1\n3 2\n2 1\n2 5\n1 5\n1 4\n4 2",
"output": "unknown topology"
},
{
"input": "4 3\n2 4\n1 3\n4 1",
"output": "bus topology"
},
{
"input": "4 4\n2 4\n4 1\n1 3\n2 3",
"output": "ring topology"
},
{
"input": "4 3\n1 2\n2 4\n3 2",
"output": "star topology"
},
{
"input": "4 4\n3 2\n2 4\n4 1\n1 2",
"output": "unknown topology"
},
{
"input": "10 9\n10 6\n3 4\n8 9\n8 4\n6 1\n2 9\n5 1\n7 5\n10 3",
"output": "bus topology"
},
{
"input": "10 10\n1 4\n3 6\n10 7\n5 8\n2 10\n3 4\n7 5\n9 6\n8 1\n2 9",
"output": "ring topology"
},
{
"input": "10 9\n1 4\n4 10\n4 9\n8 4\n4 7\n4 5\n4 2\n4 6\n4 3",
"output": "star topology"
},
{
"input": "10 14\n3 2\n7 2\n6 4\n8 1\n3 9\n5 6\n6 3\n4 1\n2 5\n7 10\n9 5\n7 1\n8 10\n3 4",
"output": "unknown topology"
},
{
"input": "4 4\n1 2\n2 3\n2 4\n3 4",
"output": "unknown topology"
},
{
"input": "5 4\n1 2\n1 3\n1 4\n4 5",
"output": "unknown topology"
},
{
"input": "10 9\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9",
"output": "star topology"
},
{
"input": "6 6\n1 2\n2 3\n3 1\n4 5\n5 6\n6 1",
"output": "unknown topology"
},
{
"input": "6 5\n1 2\n1 3\n1 4\n4 5\n4 6",
"output": "unknown topology"
},
{
"input": "4 4\n1 2\n2 3\n3 4\n4 2",
"output": "unknown topology"
},
{
"input": "4 6\n1 2\n1 3\n1 4\n2 3\n2 4\n3 4",
"output": "unknown topology"
}
] | 1,559,202,066
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 5
| 186
| 307,200
|
n, m = [int(i) for i in input().split()]
neigh = [[] for i in range(n)]
for i in range(m):
a, b = [int(i) for i in input().split()]
neigh[a - 1].append(b - 1)
neigh[b - 1].append(a - 1)
def search(a, b):
for i in a:
if a[i] == b:
return True
return False
def isRing(neighList):
indexesPassed = []
index = 0
for j in range(len(neighList)):
indexesPassed.append(index)
if len(neighList[index]) != 2:
return False
if j == 0:
index = neighList[index][0]
else:
if neighList[index][0] == index:
if search(indexesPassed, neighList[index][1]) == True:
return False
else:
index = neighList[index][1]
else:
if search(indexesPassed, neighList[index][1]) == True:
return False
else:
index = neighList[index][0]
return True
def isBus(neighList):
ends = []
newList = neighList
for i in range(len(neighList)):
if len(neighList[i]) == 1:
ends.append(i)
if len(ends) == 2:
newList[ends[0]].append(ends[1])
newList[ends[1]].append(ends[0])
if isRing(newList) == True:
return True
else:
return False
else:
return False
def isStar(neighList):
center = []
for i in range(len(neighList)):
if len(neighList[i]) == len(neighList) - 1:
center.append(i)
if len(center) == True:
for i in range(len(neighList)):
if i != center[0] and len(neighList[i]) != 1:
return False
if i == center[0] and len(neighList[i]) != len(neighList) - 1:
return False
return True
else:
return False
if isBus(neigh) == True:
print('bus topology')
elif isRing(neigh) == True:
print('ring topology')
elif isStar(neigh) == True:
print('star topology')
else:
print('unknown topology')
|
Title: Network Topology
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
This problem uses a simplified network topology model, please read the problem statement carefully and use it as a formal document as you develop the solution.
Polycarpus continues working as a system administrator in a large corporation. The computer network of this corporation consists of *n* computers, some of them are connected by a cable. The computers are indexed by integers from 1 to *n*. It's known that any two computers connected by cable directly or through other computers
Polycarpus decided to find out the network's topology. A network topology is the way of describing the network configuration, the scheme that shows the location and the connections of network devices.
Polycarpus knows three main network topologies: bus, ring and star. A bus is the topology that represents a shared cable with all computers connected with it. In the ring topology the cable connects each computer only with two other ones. A star is the topology where all computers of a network are connected to the single central node.
Let's represent each of these network topologies as a connected non-directed graph. A bus is a connected graph that is the only path, that is, the graph where all nodes are connected with two other ones except for some two nodes that are the beginning and the end of the path. A ring is a connected graph, where all nodes are connected with two other ones. A star is a connected graph, where a single central node is singled out and connected with all other nodes. For clarifications, see the picture.
You've got a connected non-directed graph that characterizes the computer network in Polycarpus' corporation. Help him find out, which topology type the given network is. If that is impossible to do, say that the network's topology is unknown.
Input Specification:
The first line contains two space-separated integers *n* and *m* (4<=≤<=*n*<=≤<=105; 3<=≤<=*m*<=≤<=105) — the number of nodes and edges in the graph, correspondingly. Next *m* lines contain the description of the graph's edges. The *i*-th line contains a space-separated pair of integers *x**i*, *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=*n*) — the numbers of nodes that are connected by the *i*-the edge.
It is guaranteed that the given graph is connected. There is at most one edge between any two nodes. No edge connects a node with itself.
Output Specification:
In a single line print the network topology name of the given graph. If the answer is the bus, print "bus topology" (without the quotes), if the answer is the ring, print "ring topology" (without the quotes), if the answer is the star, print "star topology" (without the quotes). If no answer fits, print "unknown topology" (without the quotes).
Demo Input:
['4 3\n1 2\n2 3\n3 4\n', '4 4\n1 2\n2 3\n3 4\n4 1\n', '4 3\n1 2\n1 3\n1 4\n', '4 4\n1 2\n2 3\n3 1\n1 4\n']
Demo Output:
['bus topology\n', 'ring topology\n', 'star topology\n', 'unknown topology\n']
Note:
none
|
```python
n, m = [int(i) for i in input().split()]
neigh = [[] for i in range(n)]
for i in range(m):
a, b = [int(i) for i in input().split()]
neigh[a - 1].append(b - 1)
neigh[b - 1].append(a - 1)
def search(a, b):
for i in a:
if a[i] == b:
return True
return False
def isRing(neighList):
indexesPassed = []
index = 0
for j in range(len(neighList)):
indexesPassed.append(index)
if len(neighList[index]) != 2:
return False
if j == 0:
index = neighList[index][0]
else:
if neighList[index][0] == index:
if search(indexesPassed, neighList[index][1]) == True:
return False
else:
index = neighList[index][1]
else:
if search(indexesPassed, neighList[index][1]) == True:
return False
else:
index = neighList[index][0]
return True
def isBus(neighList):
ends = []
newList = neighList
for i in range(len(neighList)):
if len(neighList[i]) == 1:
ends.append(i)
if len(ends) == 2:
newList[ends[0]].append(ends[1])
newList[ends[1]].append(ends[0])
if isRing(newList) == True:
return True
else:
return False
else:
return False
def isStar(neighList):
center = []
for i in range(len(neighList)):
if len(neighList[i]) == len(neighList) - 1:
center.append(i)
if len(center) == True:
for i in range(len(neighList)):
if i != center[0] and len(neighList[i]) != 1:
return False
if i == center[0] and len(neighList[i]) != len(neighList) - 1:
return False
return True
else:
return False
if isBus(neigh) == True:
print('bus topology')
elif isRing(neigh) == True:
print('ring topology')
elif isStar(neigh) == True:
print('star topology')
else:
print('unknown topology')
```
| 0
|
|
426
|
A
|
Sereja and Mugs
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
Sereja showed an interesting game to his friends. The game goes like that. Initially, there is a table with an empty cup and *n* water mugs on it. Then all players take turns to move. During a move, a player takes a non-empty mug of water and pours all water from it into the cup. If the cup overfills, then we assume that this player lost.
As soon as Sereja's friends heard of the game, they wanted to play it. Sereja, on the other hand, wanted to find out whether his friends can play the game in such a way that there are no losers. You are given the volumes of all mugs and the cup. Also, you know that Sereja has (*n*<=-<=1) friends. Determine if Sereja's friends can play the game so that nobody loses.
|
The first line contains integers *n* and *s* (2<=≤<=*n*<=≤<=100; 1<=≤<=*s*<=≤<=1000) — the number of mugs and the volume of the cup. The next line contains *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=10). Number *a**i* means the volume of the *i*-th mug.
|
In a single line, print "YES" (without the quotes) if his friends can play in the described manner, and "NO" (without the quotes) otherwise.
|
[
"3 4\n1 1 1\n",
"3 4\n3 1 3\n",
"3 4\n4 4 4\n"
] |
[
"YES\n",
"YES\n",
"NO\n"
] |
none
| 500
|
[
{
"input": "3 4\n1 1 1",
"output": "YES"
},
{
"input": "3 4\n3 1 3",
"output": "YES"
},
{
"input": "3 4\n4 4 4",
"output": "NO"
},
{
"input": "2 1\n1 10",
"output": "YES"
},
{
"input": "3 12\n5 6 6",
"output": "YES"
},
{
"input": "4 10\n6 3 8 7",
"output": "NO"
},
{
"input": "5 16\n3 3 2 7 9",
"output": "YES"
},
{
"input": "6 38\n9 10 3 8 10 6",
"output": "YES"
},
{
"input": "7 12\n4 4 5 2 2 4 9",
"output": "NO"
},
{
"input": "8 15\n8 10 4 2 10 9 7 6",
"output": "NO"
},
{
"input": "9 22\n1 3 5 9 7 6 1 10 1",
"output": "NO"
},
{
"input": "10 30\n9 10 4 5 5 7 1 7 7 2",
"output": "NO"
},
{
"input": "38 83\n9 9 3 10 2 4 6 10 9 5 1 8 7 4 7 2 6 5 3 1 10 8 4 8 3 7 1 2 7 6 8 6 5 2 3 1 1 2",
"output": "NO"
},
{
"input": "84 212\n6 2 3 1 2 7 5 1 7 2 9 10 9 5 2 5 4 10 9 9 1 9 8 8 9 4 9 4 8 2 1 8 4 5 10 7 6 2 1 10 10 7 9 4 5 9 5 10 10 3 6 6 4 4 4 8 5 4 9 1 9 9 1 7 9 2 10 9 10 8 3 3 9 3 9 10 1 8 9 2 6 9 7 2",
"output": "NO"
},
{
"input": "8 50\n8 8 8 4 4 6 10 10",
"output": "YES"
},
{
"input": "7 24\n1 4 9 1 2 3 6",
"output": "YES"
},
{
"input": "47 262\n3 7 6 4 10 3 5 7 2 9 3 2 2 10 8 7 3 10 6 3 1 1 4 10 2 9 2 10 6 4 3 6 3 6 9 7 8 8 3 3 10 5 2 10 7 10 9",
"output": "YES"
},
{
"input": "42 227\n3 6 1 9 4 10 4 10 7 8 10 10 8 7 10 4 6 8 7 7 6 9 3 6 5 5 2 7 2 7 4 4 6 6 4 3 9 3 6 4 7 2",
"output": "NO"
},
{
"input": "97 65\n3 10 2 6 1 4 7 5 10 3 10 4 5 5 1 6 10 7 4 5 3 9 9 8 6 9 2 3 6 8 5 5 5 5 5 3 10 4 1 8 8 9 8 4 1 4 9 3 6 3 1 4 8 3 10 8 6 4 5 4 3 2 2 4 3 6 4 6 2 3 3 3 7 5 1 8 1 4 5 1 1 6 4 2 1 7 8 6 1 1 5 6 5 10 6 7 5",
"output": "NO"
},
{
"input": "94 279\n2 5 9 5 10 3 1 8 1 7 1 8 1 6 7 8 4 9 5 10 3 7 6 8 8 5 6 8 10 9 4 1 3 3 4 7 8 2 6 6 5 1 3 7 1 7 2 2 2 8 4 1 1 5 9 4 1 2 3 10 1 4 9 9 6 8 8 1 9 10 4 1 8 5 8 9 4 8 2 1 1 9 4 5 6 1 2 5 6 7 3 1 4 6",
"output": "NO"
},
{
"input": "58 70\n8 2 10 2 7 3 8 3 8 7 6 2 4 10 10 6 10 3 7 6 4 3 5 5 5 3 8 10 3 4 8 4 2 6 8 9 6 9 4 3 5 2 2 6 10 6 2 1 7 5 6 4 1 9 10 2 4 5",
"output": "NO"
},
{
"input": "6 14\n3 9 2 1 4 2",
"output": "YES"
},
{
"input": "78 400\n5 9 3 4 7 4 1 4 6 3 9 1 8 3 3 6 10 2 1 9 6 1 8 10 1 6 4 5 2 1 5 9 6 10 3 6 5 2 4 10 6 9 3 8 10 7 2 8 8 2 10 1 4 5 2 8 6 4 4 3 5 2 3 10 1 9 8 5 6 7 9 1 8 8 5 4 2 4",
"output": "YES"
},
{
"input": "41 181\n5 3 10 4 2 5 9 3 1 6 6 10 4 3 9 8 5 9 2 5 4 6 6 3 7 9 10 3 10 6 10 5 6 1 6 9 9 1 2 4 3",
"output": "NO"
},
{
"input": "2 4\n4 4",
"output": "YES"
},
{
"input": "29 71\n4 8 9 4 8 10 4 10 2 9 3 9 1 2 9 5 9 7 1 10 4 1 1 9 8 7 4 6 7",
"output": "NO"
},
{
"input": "49 272\n4 10 8 7 5 6 9 7 2 6 6 2 10 7 5 6 5 3 6 4 3 7 9 3 7 7 4 10 5 6 7 3 6 4 6 7 7 2 5 5 7 3 7 9 3 6 6 2 1",
"output": "YES"
},
{
"input": "91 486\n1 3 5 4 4 7 3 9 3 4 5 4 5 4 7 9 5 8 4 10 9 1 1 9 9 1 6 2 5 4 7 4 10 3 2 10 9 3 4 5 1 3 4 2 10 9 10 9 10 2 4 6 2 5 3 6 4 9 10 3 9 8 1 2 5 9 2 10 4 6 10 8 10 9 1 2 5 8 6 6 6 1 10 3 9 3 5 6 1 5 5",
"output": "YES"
},
{
"input": "80 78\n1 9 4 9 8 3 7 10 4 9 2 1 4 4 9 5 9 1 2 6 5 2 4 8 4 6 9 6 7 10 1 9 10 4 7 1 7 10 8 9 10 5 2 6 7 7 7 7 7 8 2 5 1 7 2 3 2 5 10 6 3 4 5 2 6 3 4 2 7 9 9 3 8 8 2 3 7 1 5 10",
"output": "NO"
},
{
"input": "53 245\n5 6 9 9 2 3 2 5 10 9 3 5 6 3 10 10 9 4 9 7 10 9 7 7 3 4 9 3 7 3 8 6 8 9 3 8 9 1 3 1 9 10 3 9 3 1 6 6 3 8 7 8 9",
"output": "NO"
},
{
"input": "50 271\n6 9 10 1 1 1 8 3 6 6 3 2 5 9 7 5 7 9 10 9 4 6 6 2 6 6 9 5 1 6 5 8 3 2 5 10 10 1 4 1 4 6 1 8 7 8 9 4 7 5",
"output": "YES"
},
{
"input": "38 214\n5 8 4 5 1 9 9 2 6 3 4 3 5 7 7 7 3 10 1 5 10 4 2 2 10 10 6 6 6 7 1 6 10 5 7 4 5 10",
"output": "YES"
},
{
"input": "100 1\n10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10",
"output": "NO"
},
{
"input": "100 100\n10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10",
"output": "NO"
},
{
"input": "100 989\n10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10",
"output": "NO"
},
{
"input": "100 990\n10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10",
"output": "YES"
},
{
"input": "100 1000\n10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10 10",
"output": "YES"
},
{
"input": "2 1\n1 1",
"output": "YES"
},
{
"input": "2 1\n2 2",
"output": "NO"
},
{
"input": "2 1000\n1 1",
"output": "YES"
},
{
"input": "10 89\n10 10 10 10 10 10 10 10 10 10",
"output": "NO"
},
{
"input": "10 44\n1 10 2 3 4 5 6 7 8 9",
"output": "NO"
}
] | 1,576,942,517
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 42
| 124
| 0
|
n,s=[int(x) for x in input().split()]
l=[int(x) for x in input().split()]
l.sort()
print("YES" if sum(l[:-1])<=s else "NO")
|
Title: Sereja and Mugs
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Sereja showed an interesting game to his friends. The game goes like that. Initially, there is a table with an empty cup and *n* water mugs on it. Then all players take turns to move. During a move, a player takes a non-empty mug of water and pours all water from it into the cup. If the cup overfills, then we assume that this player lost.
As soon as Sereja's friends heard of the game, they wanted to play it. Sereja, on the other hand, wanted to find out whether his friends can play the game in such a way that there are no losers. You are given the volumes of all mugs and the cup. Also, you know that Sereja has (*n*<=-<=1) friends. Determine if Sereja's friends can play the game so that nobody loses.
Input Specification:
The first line contains integers *n* and *s* (2<=≤<=*n*<=≤<=100; 1<=≤<=*s*<=≤<=1000) — the number of mugs and the volume of the cup. The next line contains *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=10). Number *a**i* means the volume of the *i*-th mug.
Output Specification:
In a single line, print "YES" (without the quotes) if his friends can play in the described manner, and "NO" (without the quotes) otherwise.
Demo Input:
['3 4\n1 1 1\n', '3 4\n3 1 3\n', '3 4\n4 4 4\n']
Demo Output:
['YES\n', 'YES\n', 'NO\n']
Note:
none
|
```python
n,s=[int(x) for x in input().split()]
l=[int(x) for x in input().split()]
l.sort()
print("YES" if sum(l[:-1])<=s else "NO")
```
| 3
|
|
409
|
A
|
The Great Game
|
PROGRAMMING
| 1,700
|
[
"*special"
] | null | null |
Two teams meet in The Game World Championship. Some scientists consider this game to be the most intellectually challenging game in the world. You are given two strings describing the teams' actions in the final battle. Figure out who became the champion.
|
The input contains two strings of equal length (between 2 and 20 characters, inclusive). Each line describes the actions of one team.
|
Output "TEAM 1 WINS" if the first team won, "TEAM 2 WINS" if the second team won, and "TIE" if there was a tie.
|
[
"[]()[]8<\n8<[]()8<\n",
"8<8<()\n[]8<[]\n"
] |
[
"TEAM 2 WINS\n",
"TIE\n"
] |
none
| 0
|
[
{
"input": "[]()[]8<\n8<[]()8<",
"output": "TEAM 2 WINS"
},
{
"input": "8<8<()\n[]8<[]",
"output": "TIE"
},
{
"input": "()\n[]",
"output": "TEAM 2 WINS"
},
{
"input": "()\n8<",
"output": "TEAM 1 WINS"
},
{
"input": "8<\n[]",
"output": "TEAM 1 WINS"
},
{
"input": "[]8<()()()()8<8<8<[]\n()()[][][]8<[]()8<8<",
"output": "TEAM 2 WINS"
},
{
"input": "()[]()()()\n[]()[][]8<",
"output": "TEAM 2 WINS"
},
{
"input": "()\n8<",
"output": "TEAM 1 WINS"
},
{
"input": "()[][]()()[][]()8<8<\n8<[]()()()8<[][]()()",
"output": "TEAM 2 WINS"
},
{
"input": "()[][]8<\n8<()8<()",
"output": "TIE"
},
{
"input": "8<()8<8<8<8<()8<\n[]()()8<()[][][]",
"output": "TIE"
},
{
"input": "[][]8<8<8<8<\n8<[][]()8<()",
"output": "TEAM 2 WINS"
},
{
"input": "[]\n()",
"output": "TEAM 1 WINS"
},
{
"input": "8<8<8<[]\n[][][][]",
"output": "TEAM 1 WINS"
},
{
"input": "[][]8<[][]8<[]()()()\n()()[][]8<[]()8<[][]",
"output": "TEAM 1 WINS"
},
{
"input": "[]8<8<[]\n[]8<()[]",
"output": "TEAM 2 WINS"
},
{
"input": "[]\n[]",
"output": "TIE"
},
{
"input": "[]8<[]()()()[]\n8<[]8<()8<()8<",
"output": "TEAM 2 WINS"
},
{
"input": "[]()()()8<[]8<[]\n[][]8<[]()[][][]",
"output": "TEAM 2 WINS"
},
{
"input": "8<()8<[]\n()[][]()",
"output": "TIE"
},
{
"input": "()[]()()8<[]8<[]\n()()()8<8<()8<[]",
"output": "TEAM 1 WINS"
},
{
"input": "8<()()()8<8<\n[]8<()()[][]",
"output": "TEAM 1 WINS"
},
{
"input": "()[]()()\n()()[]()",
"output": "TIE"
},
{
"input": "[]8<[]8<[]()\n8<[]8<8<[]8<",
"output": "TIE"
},
{
"input": "8<()()[]()[]\n8<8<8<8<[][]",
"output": "TIE"
},
{
"input": "[][]()[]\n[]8<8<[]",
"output": "TIE"
},
{
"input": "[]()\n()()",
"output": "TEAM 1 WINS"
},
{
"input": "()()()()8<()()()8<\n()[][][]8<()[][][]",
"output": "TEAM 2 WINS"
},
{
"input": "[]8<\n8<()",
"output": "TEAM 2 WINS"
},
{
"input": "8<8<8<\n[]()8<",
"output": "TIE"
},
{
"input": "[]\n[]",
"output": "TIE"
},
{
"input": "()\n()",
"output": "TIE"
},
{
"input": "8<\n8<",
"output": "TIE"
},
{
"input": "()\n[]",
"output": "TEAM 2 WINS"
},
{
"input": "8<\n[]",
"output": "TEAM 1 WINS"
}
] | 1,624,998,642
| 2,147,483,647
|
PyPy 3
|
WRONG_ANSWER
|
TESTS
| 1
| 139
| 409,600
|
from collections import defaultdict, Counter
from math import sqrt, log10, log2, log, gcd, floor, factorial
from bisect import bisect_left, bisect_right
from itertools import combinations, combinations_with_replacement
import sys, io, os
input=sys.stdin.readline
input=io.BytesIO(os.read(0,os.fstat(0).st_size)).readline
# print=sys.stdout.write
# sys.setrecursionlimit(10000)
mod = 10 ** 9 + 7;inf = float('inf')
def get_list(): return [int(i) for i in input().split()]
yn = lambda a: print("YES" if a else "NO")
ceil = lambda a, b: (a + b - 1) // b
t=1
for i in range(t):
strings=["TEAM 1 WINS","TEAM 2 WINS","TIE"]
print(strings[1])
|
Title: The Great Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Two teams meet in The Game World Championship. Some scientists consider this game to be the most intellectually challenging game in the world. You are given two strings describing the teams' actions in the final battle. Figure out who became the champion.
Input Specification:
The input contains two strings of equal length (between 2 and 20 characters, inclusive). Each line describes the actions of one team.
Output Specification:
Output "TEAM 1 WINS" if the first team won, "TEAM 2 WINS" if the second team won, and "TIE" if there was a tie.
Demo Input:
['[]()[]8<\n8<[]()8<\n', '8<8<()\n[]8<[]\n']
Demo Output:
['TEAM 2 WINS\n', 'TIE\n']
Note:
none
|
```python
from collections import defaultdict, Counter
from math import sqrt, log10, log2, log, gcd, floor, factorial
from bisect import bisect_left, bisect_right
from itertools import combinations, combinations_with_replacement
import sys, io, os
input=sys.stdin.readline
input=io.BytesIO(os.read(0,os.fstat(0).st_size)).readline
# print=sys.stdout.write
# sys.setrecursionlimit(10000)
mod = 10 ** 9 + 7;inf = float('inf')
def get_list(): return [int(i) for i in input().split()]
yn = lambda a: print("YES" if a else "NO")
ceil = lambda a, b: (a + b - 1) // b
t=1
for i in range(t):
strings=["TEAM 1 WINS","TEAM 2 WINS","TIE"]
print(strings[1])
```
| 0
|
|
342
|
A
|
Xenia and Divisors
|
PROGRAMMING
| 1,200
|
[
"greedy",
"implementation"
] | null | null |
Xenia the mathematician has a sequence consisting of *n* (*n* is divisible by 3) positive integers, each of them is at most 7. She wants to split the sequence into groups of three so that for each group of three *a*,<=*b*,<=*c* the following conditions held:
- *a*<=<<=*b*<=<<=*c*; - *a* divides *b*, *b* divides *c*.
Naturally, Xenia wants each element of the sequence to belong to exactly one group of three. Thus, if the required partition exists, then it has groups of three.
Help Xenia, find the required partition or else say that it doesn't exist.
|
The first line contains integer *n* (3<=≤<=*n*<=≤<=99999) — the number of elements in the sequence. The next line contains *n* positive integers, each of them is at most 7.
It is guaranteed that *n* is divisible by 3.
|
If the required partition exists, print groups of three. Print each group as values of the elements it contains. You should print values in increasing order. Separate the groups and integers in groups by whitespaces. If there are multiple solutions, you can print any of them.
If there is no solution, print -1.
|
[
"6\n1 1 1 2 2 2\n",
"6\n2 2 1 1 4 6\n"
] |
[
"-1\n",
"1 2 4\n1 2 6\n"
] |
none
| 500
|
[
{
"input": "6\n1 1 1 2 2 2",
"output": "-1"
},
{
"input": "6\n2 2 1 1 4 6",
"output": "1 2 4\n1 2 6"
},
{
"input": "3\n1 2 3",
"output": "-1"
},
{
"input": "3\n7 5 7",
"output": "-1"
},
{
"input": "3\n1 3 4",
"output": "-1"
},
{
"input": "3\n1 1 1",
"output": "-1"
},
{
"input": "9\n1 3 6 6 3 1 3 1 6",
"output": "1 3 6\n1 3 6\n1 3 6"
},
{
"input": "6\n1 2 4 1 3 5",
"output": "-1"
},
{
"input": "3\n1 3 7",
"output": "-1"
},
{
"input": "3\n1 1 1",
"output": "-1"
},
{
"input": "9\n1 2 4 1 2 4 1 3 6",
"output": "1 2 4\n1 2 4\n1 3 6"
},
{
"input": "12\n3 6 1 1 3 6 1 1 2 6 2 6",
"output": "1 3 6\n1 3 6\n1 2 6\n1 2 6"
},
{
"input": "9\n1 1 1 4 4 4 6 2 2",
"output": "-1"
},
{
"input": "9\n1 2 4 6 3 1 3 1 5",
"output": "-1"
},
{
"input": "15\n2 1 2 1 3 6 1 2 1 6 1 3 4 6 4",
"output": "1 2 4\n1 2 4\n1 3 6\n1 3 6\n1 2 6"
},
{
"input": "3\n2 3 6",
"output": "-1"
},
{
"input": "3\n2 4 6",
"output": "-1"
},
{
"input": "3\n2 5 6",
"output": "-1"
},
{
"input": "3\n2 4 7",
"output": "-1"
},
{
"input": "6\n1 2 3 4 5 6",
"output": "-1"
},
{
"input": "3\n7 7 7",
"output": "-1"
},
{
"input": "6\n1 2 4 7 7 7",
"output": "-1"
},
{
"input": "6\n1 1 2 6 6 6",
"output": "-1"
},
{
"input": "9\n1 1 1 3 3 2 4 4 6",
"output": "-1"
},
{
"input": "6\n1 2 4 5 5 5",
"output": "-1"
},
{
"input": "15\n1 1 1 1 1 2 2 2 2 4 4 6 6 6 6",
"output": "-1"
},
{
"input": "6\n1 1 5 5 7 7",
"output": "-1"
},
{
"input": "9\n1 1 1 2 3 4 5 6 7",
"output": "-1"
},
{
"input": "6\n1 1 4 4 7 7",
"output": "-1"
},
{
"input": "24\n1 1 1 1 1 1 1 1 1 2 2 2 3 3 3 3 3 3 4 4 4 6 6 6",
"output": "-1"
},
{
"input": "3\n1 7 6",
"output": "-1"
},
{
"input": "6\n1 1 2 4 7 7",
"output": "-1"
},
{
"input": "9\n1 1 1 7 7 7 7 7 7",
"output": "-1"
},
{
"input": "9\n1 1 1 2 3 4 6 5 5",
"output": "-1"
}
] | 1,683,980,001
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 4
| 46
| 0
|
n = int(input())
l = [int(x) for x in input().split()]
one = l.count(1)
two = l.count(2)
thr = l.count(3)
fou = l.count(4)
six = l.count(6)
if two+thr != int(n/3) or one != int(n/3) or fou+six != int(n/3) : print(-1)
else:
for i in range(0,fou):
print("1 2 4")
for i in range(0,two-fou):
print('1 2 6')
for i in range(0,thr):
print("1 3 6")
|
Title: Xenia and Divisors
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Xenia the mathematician has a sequence consisting of *n* (*n* is divisible by 3) positive integers, each of them is at most 7. She wants to split the sequence into groups of three so that for each group of three *a*,<=*b*,<=*c* the following conditions held:
- *a*<=<<=*b*<=<<=*c*; - *a* divides *b*, *b* divides *c*.
Naturally, Xenia wants each element of the sequence to belong to exactly one group of three. Thus, if the required partition exists, then it has groups of three.
Help Xenia, find the required partition or else say that it doesn't exist.
Input Specification:
The first line contains integer *n* (3<=≤<=*n*<=≤<=99999) — the number of elements in the sequence. The next line contains *n* positive integers, each of them is at most 7.
It is guaranteed that *n* is divisible by 3.
Output Specification:
If the required partition exists, print groups of three. Print each group as values of the elements it contains. You should print values in increasing order. Separate the groups and integers in groups by whitespaces. If there are multiple solutions, you can print any of them.
If there is no solution, print -1.
Demo Input:
['6\n1 1 1 2 2 2\n', '6\n2 2 1 1 4 6\n']
Demo Output:
['-1\n', '1 2 4\n1 2 6\n']
Note:
none
|
```python
n = int(input())
l = [int(x) for x in input().split()]
one = l.count(1)
two = l.count(2)
thr = l.count(3)
fou = l.count(4)
six = l.count(6)
if two+thr != int(n/3) or one != int(n/3) or fou+six != int(n/3) : print(-1)
else:
for i in range(0,fou):
print("1 2 4")
for i in range(0,two-fou):
print('1 2 6')
for i in range(0,thr):
print("1 3 6")
```
| 0
|
|
817
|
B
|
Makes And The Product
|
PROGRAMMING
| 1,500
|
[
"combinatorics",
"implementation",
"math",
"sortings"
] | null | null |
After returning from the army Makes received a gift — an array *a* consisting of *n* positive integer numbers. He hadn't been solving problems for a long time, so he became interested to answer a particular question: how many triples of indices (*i*,<= *j*,<= *k*) (*i*<=<<=*j*<=<<=*k*), such that *a**i*·*a**j*·*a**k* is minimum possible, are there in the array? Help him with it!
|
The first line of input contains a positive integer number *n* (3<=≤<=*n*<=≤<=105) — the number of elements in array *a*. The second line contains *n* positive integer numbers *a**i* (1<=≤<=*a**i*<=≤<=109) — the elements of a given array.
|
Print one number — the quantity of triples (*i*,<= *j*,<= *k*) such that *i*,<= *j* and *k* are pairwise distinct and *a**i*·*a**j*·*a**k* is minimum possible.
|
[
"4\n1 1 1 1\n",
"5\n1 3 2 3 4\n",
"6\n1 3 3 1 3 2\n"
] |
[
"4\n",
"2\n",
"1\n"
] |
In the first example Makes always chooses three ones out of four, and the number of ways to choose them is 4.
In the second example a triple of numbers (1, 2, 3) is chosen (numbers, not indices). Since there are two ways to choose an element 3, then the answer is 2.
In the third example a triple of numbers (1, 1, 2) is chosen, and there's only one way to choose indices.
| 0
|
[
{
"input": "4\n1 1 1 1",
"output": "4"
},
{
"input": "5\n1 3 2 3 4",
"output": "2"
},
{
"input": "6\n1 3 3 1 3 2",
"output": "1"
},
{
"input": "3\n1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "4\n1 1 2 2",
"output": "2"
},
{
"input": "3\n1 3 1",
"output": "1"
},
{
"input": "11\n1 2 2 2 2 2 2 2 2 2 2",
"output": "45"
},
{
"input": "5\n1 2 2 2 2",
"output": "6"
},
{
"input": "6\n1 2 2 3 3 4",
"output": "1"
},
{
"input": "8\n1 1 2 2 2 3 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 2 3",
"output": "6"
},
{
"input": "3\n1 2 2",
"output": "1"
},
{
"input": "6\n1 2 2 2 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 2 2",
"output": "10"
},
{
"input": "4\n1 2 2 2",
"output": "3"
},
{
"input": "5\n1 2 3 2 3",
"output": "1"
},
{
"input": "6\n2 2 3 3 3 3",
"output": "4"
},
{
"input": "6\n1 2 2 2 5 6",
"output": "3"
},
{
"input": "10\n1 2 2 2 2 2 2 2 2 2",
"output": "36"
},
{
"input": "3\n2 1 2",
"output": "1"
},
{
"input": "5\n1 2 3 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 4 5",
"output": "3"
},
{
"input": "4\n1 2 2 3",
"output": "1"
},
{
"input": "10\n2 2 2 2 2 1 2 2 2 2",
"output": "36"
},
{
"input": "7\n2 2 2 3 3 3 1",
"output": "3"
},
{
"input": "3\n1 1 2",
"output": "1"
},
{
"input": "5\n1 1 2 2 2",
"output": "3"
},
{
"input": "3\n1 2 3",
"output": "1"
},
{
"input": "9\n2 2 3 3 3 3 3 3 3",
"output": "7"
},
{
"input": "5\n1 1 2 2 3",
"output": "2"
},
{
"input": "4\n1 1 3 3",
"output": "2"
},
{
"input": "4\n33554432 33554432 67108864 33554432",
"output": "1"
},
{
"input": "6\n2 2 2 1 2 2",
"output": "10"
},
{
"input": "10\n1 2 1 2 3 2 3 2 2 2",
"output": "6"
},
{
"input": "10\n9 6 4 7 1 8 9 5 9 4",
"output": "1"
},
{
"input": "4\n5 7 2 7",
"output": "2"
},
{
"input": "3\n7 6 7",
"output": "1"
},
{
"input": "6\n3 2 8 2 5 3",
"output": "2"
},
{
"input": "3\n5 9 5",
"output": "1"
},
{
"input": "5\n6 3 7 6 3",
"output": "2"
},
{
"input": "9\n10 10 4 10 7 9 6 7 3",
"output": "1"
},
{
"input": "5\n9 10 10 3 8",
"output": "1"
},
{
"input": "5\n2 9 5 10 5",
"output": "1"
},
{
"input": "9\n7 1 9 6 6 8 3 1 3",
"output": "2"
},
{
"input": "5\n3 4 4 4 5",
"output": "3"
},
{
"input": "3\n3 1 3",
"output": "1"
},
{
"input": "8\n3 2 2 5 2 2 1 2",
"output": "10"
}
] | 1,519,612,585
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 80
| 233
| 14,438,400
|
##n = int(input())
##a = list(map(int, input().split()))
##print(' '.join(map(str, res)))
def list_input():
return list(map(int, input().split()))
n = int(input())
a = list_input()
a.sort()
s = list()
p = 0
while p < n:
q = p
while q < n and a[p] == a[q]:
q += 1
s.append(q-p)
p = q
res = 0
if s[0] >= 3:
res = s[0]*(s[0]-1)*(s[0]-2)//6
elif s[0] == 2:
res = s[1]
elif s[0] == 1:
if s[1] >= 2:
res = s[1]*(s[1]-1)//2
elif s[1] == 1:
res = s[2]
print(res)
|
Title: Makes And The Product
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
After returning from the army Makes received a gift — an array *a* consisting of *n* positive integer numbers. He hadn't been solving problems for a long time, so he became interested to answer a particular question: how many triples of indices (*i*,<= *j*,<= *k*) (*i*<=<<=*j*<=<<=*k*), such that *a**i*·*a**j*·*a**k* is minimum possible, are there in the array? Help him with it!
Input Specification:
The first line of input contains a positive integer number *n* (3<=≤<=*n*<=≤<=105) — the number of elements in array *a*. The second line contains *n* positive integer numbers *a**i* (1<=≤<=*a**i*<=≤<=109) — the elements of a given array.
Output Specification:
Print one number — the quantity of triples (*i*,<= *j*,<= *k*) such that *i*,<= *j* and *k* are pairwise distinct and *a**i*·*a**j*·*a**k* is minimum possible.
Demo Input:
['4\n1 1 1 1\n', '5\n1 3 2 3 4\n', '6\n1 3 3 1 3 2\n']
Demo Output:
['4\n', '2\n', '1\n']
Note:
In the first example Makes always chooses three ones out of four, and the number of ways to choose them is 4.
In the second example a triple of numbers (1, 2, 3) is chosen (numbers, not indices). Since there are two ways to choose an element 3, then the answer is 2.
In the third example a triple of numbers (1, 1, 2) is chosen, and there's only one way to choose indices.
|
```python
##n = int(input())
##a = list(map(int, input().split()))
##print(' '.join(map(str, res)))
def list_input():
return list(map(int, input().split()))
n = int(input())
a = list_input()
a.sort()
s = list()
p = 0
while p < n:
q = p
while q < n and a[p] == a[q]:
q += 1
s.append(q-p)
p = q
res = 0
if s[0] >= 3:
res = s[0]*(s[0]-1)*(s[0]-2)//6
elif s[0] == 2:
res = s[1]
elif s[0] == 1:
if s[1] >= 2:
res = s[1]*(s[1]-1)//2
elif s[1] == 1:
res = s[2]
print(res)
```
| 3
|
|
733
|
D
|
Kostya the Sculptor
|
PROGRAMMING
| 1,600
|
[
"data structures",
"hashing"
] | null | null |
Kostya is a genial sculptor, he has an idea: to carve a marble sculpture in the shape of a sphere. Kostya has a friend Zahar who works at a career. Zahar knows about Kostya's idea and wants to present him a rectangular parallelepiped of marble from which he can carve the sphere.
Zahar has *n* stones which are rectangular parallelepipeds. The edges sizes of the *i*-th of them are *a**i*, *b**i* and *c**i*. He can take no more than two stones and present them to Kostya.
If Zahar takes two stones, he should glue them together on one of the faces in order to get a new piece of rectangular parallelepiped of marble. Thus, it is possible to glue a pair of stones together if and only if two faces on which they are glued together match as rectangles. In such gluing it is allowed to rotate and flip the stones in any way.
Help Zahar choose such a present so that Kostya can carve a sphere of the maximum possible volume and present it to Zahar.
|
The first line contains the integer *n* (1<=≤<=*n*<=≤<=105).
*n* lines follow, in the *i*-th of which there are three integers *a**i*,<=*b**i* and *c**i* (1<=≤<=*a**i*,<=*b**i*,<=*c**i*<=≤<=109) — the lengths of edges of the *i*-th stone. Note, that two stones may have exactly the same sizes, but they still will be considered two different stones.
|
In the first line print *k* (1<=≤<=*k*<=≤<=2) the number of stones which Zahar has chosen. In the second line print *k* distinct integers from 1 to *n* — the numbers of stones which Zahar needs to choose. Consider that stones are numbered from 1 to *n* in the order as they are given in the input data.
You can print the stones in arbitrary order. If there are several answers print any of them.
|
[
"6\n5 5 5\n3 2 4\n1 4 1\n2 1 3\n3 2 4\n3 3 4\n",
"7\n10 7 8\n5 10 3\n4 2 6\n5 5 5\n10 2 8\n4 2 1\n7 7 7\n"
] |
[
"1\n1\n",
"2\n1 5\n"
] |
In the first example we can connect the pairs of stones:
- 2 and 4, the size of the parallelepiped: 3 × 2 × 5, the radius of the inscribed sphere 1 - 2 and 5, the size of the parallelepiped: 3 × 2 × 8 or 6 × 2 × 4 or 3 × 4 × 4, the radius of the inscribed sphere 1, or 1, or 1.5 respectively. - 2 and 6, the size of the parallelepiped: 3 × 5 × 4, the radius of the inscribed sphere 1.5 - 4 and 5, the size of the parallelepiped: 3 × 2 × 5, the radius of the inscribed sphere 1 - 5 and 6, the size of the parallelepiped: 3 × 4 × 5, the radius of the inscribed sphere 1.5
Or take only one stone:
- 1 the size of the parallelepiped: 5 × 5 × 5, the radius of the inscribed sphere 2.5 - 2 the size of the parallelepiped: 3 × 2 × 4, the radius of the inscribed sphere 1 - 3 the size of the parallelepiped: 1 × 4 × 1, the radius of the inscribed sphere 0.5 - 4 the size of the parallelepiped: 2 × 1 × 3, the radius of the inscribed sphere 0.5 - 5 the size of the parallelepiped: 3 × 2 × 4, the radius of the inscribed sphere 1 - 6 the size of the parallelepiped: 3 × 3 × 4, the radius of the inscribed sphere 1.5
It is most profitable to take only the first stone.
| 2,000
|
[
{
"input": "6\n5 5 5\n3 2 4\n1 4 1\n2 1 3\n3 2 4\n3 3 4",
"output": "1\n1"
},
{
"input": "7\n10 7 8\n5 10 3\n4 2 6\n5 5 5\n10 2 8\n4 2 1\n7 7 7",
"output": "2\n1 5"
},
{
"input": "1\n1 1 1",
"output": "1\n1"
},
{
"input": "2\n2 3 1\n2 2 3",
"output": "2\n2 1"
},
{
"input": "1\n1000000000 1000000000 1000000000",
"output": "1\n1"
},
{
"input": "3\n100 100 100\n25 63 11\n63 15 11",
"output": "1\n1"
},
{
"input": "2\n999999999 1000000000 1000000000\n1000000000 1000000000 1000000000",
"output": "2\n2 1"
},
{
"input": "3\n1 1 2\n1 2 2\n1 1 1",
"output": "1\n1"
},
{
"input": "3\n500 1000 1000\n1000 499 1000\n999 999 999",
"output": "2\n1 2"
},
{
"input": "3\n500 1000 1000\n1000 499 1000\n1000 1001 1001",
"output": "1\n3"
},
{
"input": "9\n1 3 2\n3 3 1\n3 1 2\n3 3 2\n2 2 2\n3 2 1\n3 3 1\n3 3 1\n2 1 2",
"output": "2\n4 8"
},
{
"input": "3\n20 30 5\n20 30 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n6 20 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n20 6 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 30 5\n30 20 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 30 5\n6 20 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 30 5\n6 30 20\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 30 5\n20 6 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 30 5\n30 6 20\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n20 30 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n30 20 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n6 20 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n6 30 20\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n20 5 30\n30 6 20\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n20 30 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n30 20 6\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n6 30 20\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n20 6 30\n10 10 10",
"output": "2\n2 1"
},
{
"input": "3\n5 20 30\n30 6 20\n10 10 10",
"output": "2\n2 1"
}
] | 1,615,008,642
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 104
| 1,356
| 14,028,800
|
n = int(input())
INF = 10**10
ind = 0
ans = 0
temp = 0
a = []
d = dict()
S = sorted([sorted(list(map(int, input().split())) , reverse = True) + [i + 1] for i in range(n)], reverse = True)
ans = S[0][2]
a = [S[0][-1]]
for i in range(1, n):
if S[i][0] == S[i-1][0] and S[i][1] == S[i-1][1]:
temp = min(S[i][0], S[i][1], S[i][2] + S[i-1][2])
if temp > ans:
ans = temp
a = [S[i][-1],S[i-1][-1]]
elif S[i][2] > ans:
ans =S[i][2]
a = [S[i][-1]]
a.sort()
print(len(a))
print(*a)
|
Title: Kostya the Sculptor
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Kostya is a genial sculptor, he has an idea: to carve a marble sculpture in the shape of a sphere. Kostya has a friend Zahar who works at a career. Zahar knows about Kostya's idea and wants to present him a rectangular parallelepiped of marble from which he can carve the sphere.
Zahar has *n* stones which are rectangular parallelepipeds. The edges sizes of the *i*-th of them are *a**i*, *b**i* and *c**i*. He can take no more than two stones and present them to Kostya.
If Zahar takes two stones, he should glue them together on one of the faces in order to get a new piece of rectangular parallelepiped of marble. Thus, it is possible to glue a pair of stones together if and only if two faces on which they are glued together match as rectangles. In such gluing it is allowed to rotate and flip the stones in any way.
Help Zahar choose such a present so that Kostya can carve a sphere of the maximum possible volume and present it to Zahar.
Input Specification:
The first line contains the integer *n* (1<=≤<=*n*<=≤<=105).
*n* lines follow, in the *i*-th of which there are three integers *a**i*,<=*b**i* and *c**i* (1<=≤<=*a**i*,<=*b**i*,<=*c**i*<=≤<=109) — the lengths of edges of the *i*-th stone. Note, that two stones may have exactly the same sizes, but they still will be considered two different stones.
Output Specification:
In the first line print *k* (1<=≤<=*k*<=≤<=2) the number of stones which Zahar has chosen. In the second line print *k* distinct integers from 1 to *n* — the numbers of stones which Zahar needs to choose. Consider that stones are numbered from 1 to *n* in the order as they are given in the input data.
You can print the stones in arbitrary order. If there are several answers print any of them.
Demo Input:
['6\n5 5 5\n3 2 4\n1 4 1\n2 1 3\n3 2 4\n3 3 4\n', '7\n10 7 8\n5 10 3\n4 2 6\n5 5 5\n10 2 8\n4 2 1\n7 7 7\n']
Demo Output:
['1\n1\n', '2\n1 5\n']
Note:
In the first example we can connect the pairs of stones:
- 2 and 4, the size of the parallelepiped: 3 × 2 × 5, the radius of the inscribed sphere 1 - 2 and 5, the size of the parallelepiped: 3 × 2 × 8 or 6 × 2 × 4 or 3 × 4 × 4, the radius of the inscribed sphere 1, or 1, or 1.5 respectively. - 2 and 6, the size of the parallelepiped: 3 × 5 × 4, the radius of the inscribed sphere 1.5 - 4 and 5, the size of the parallelepiped: 3 × 2 × 5, the radius of the inscribed sphere 1 - 5 and 6, the size of the parallelepiped: 3 × 4 × 5, the radius of the inscribed sphere 1.5
Or take only one stone:
- 1 the size of the parallelepiped: 5 × 5 × 5, the radius of the inscribed sphere 2.5 - 2 the size of the parallelepiped: 3 × 2 × 4, the radius of the inscribed sphere 1 - 3 the size of the parallelepiped: 1 × 4 × 1, the radius of the inscribed sphere 0.5 - 4 the size of the parallelepiped: 2 × 1 × 3, the radius of the inscribed sphere 0.5 - 5 the size of the parallelepiped: 3 × 2 × 4, the radius of the inscribed sphere 1 - 6 the size of the parallelepiped: 3 × 3 × 4, the radius of the inscribed sphere 1.5
It is most profitable to take only the first stone.
|
```python
n = int(input())
INF = 10**10
ind = 0
ans = 0
temp = 0
a = []
d = dict()
S = sorted([sorted(list(map(int, input().split())) , reverse = True) + [i + 1] for i in range(n)], reverse = True)
ans = S[0][2]
a = [S[0][-1]]
for i in range(1, n):
if S[i][0] == S[i-1][0] and S[i][1] == S[i-1][1]:
temp = min(S[i][0], S[i][1], S[i][2] + S[i-1][2])
if temp > ans:
ans = temp
a = [S[i][-1],S[i-1][-1]]
elif S[i][2] > ans:
ans =S[i][2]
a = [S[i][-1]]
a.sort()
print(len(a))
print(*a)
```
| 3
|
|
628
|
B
|
New Skateboard
|
PROGRAMMING
| 1,300
|
[
"dp"
] | null | null |
Max wants to buy a new skateboard. He has calculated the amount of money that is needed to buy a new skateboard. He left a calculator on the floor and went to ask some money from his parents. Meanwhile his little brother Yusuf came and started to press the keys randomly. Unfortunately Max has forgotten the number which he had calculated. The only thing he knows is that the number is divisible by 4.
You are given a string *s* consisting of digits (the number on the display of the calculator after Yusuf randomly pressed the keys). Your task is to find the number of substrings which are divisible by 4. A substring can start with a zero.
A substring of a string is a nonempty sequence of consecutive characters.
For example if string *s* is 124 then we have four substrings that are divisible by 4: 12, 4, 24 and 124. For the string 04 the answer is three: 0, 4, 04.
As input/output can reach huge size it is recommended to use fast input/output methods: for example, prefer to use gets/scanf/printf instead of getline/cin/cout in C++, prefer to use BufferedReader/PrintWriter instead of Scanner/System.out in Java.
|
The only line contains string *s* (1<=≤<=|*s*|<=≤<=3·105). The string *s* contains only digits from 0 to 9.
|
Print integer *a* — the number of substrings of the string *s* that are divisible by 4.
Note that the answer can be huge, so you should use 64-bit integer type to store it. In C++ you can use the long long integer type and in Java you can use long integer type.
|
[
"124\n",
"04\n",
"5810438174\n"
] |
[
"4\n",
"3\n",
"9\n"
] |
none
| 0
|
[
{
"input": "124",
"output": "4"
},
{
"input": "04",
"output": "3"
},
{
"input": "5810438174",
"output": "9"
},
{
"input": "1",
"output": "0"
},
{
"input": "039",
"output": "1"
},
{
"input": "97247",
"output": "6"
},
{
"input": "5810438174",
"output": "9"
},
{
"input": "12883340691714056185860211260984431382156326935244",
"output": "424"
},
{
"input": "2144315253572020279108092911160072328496568665545836825277616363478721946398140227406814602154768031",
"output": "1528"
},
{
"input": "80124649014054971081213608137817466046254652492627741860478258558206397113198232823859870363821007188476405951611069347299689170240023979048198711745011542774268179055311013054073075176122755643483380248999657649211459997766221072399103579977409770898200358240970169892326442892826731631357561876251276209119521202062222947560634301788787748428236988789594458520867663257476744168528121470923031438015546006185059454402637036376247785881323277542968298682307854655591317046086531554595892680980142608",
"output": "30826"
},
{
"input": "123456",
"output": "7"
},
{
"input": "4",
"output": "1"
},
{
"input": "123",
"output": "1"
}
] | 1,553,853,048
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 22
| 483
| 1,024,000
|
import sys
from math import *
def minp():
return sys.stdin.readline().strip()
def mint():
return int(minp())
def mints():
return map(int, minp().split())
j = None
r = 0
p = 0
for i in minp():
r += (int(i)%4 == 0)
if j != None:
if int(j+i) % 4 == 0:
r += p
p += 1
j = i
print(r)
|
Title: New Skateboard
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Max wants to buy a new skateboard. He has calculated the amount of money that is needed to buy a new skateboard. He left a calculator on the floor and went to ask some money from his parents. Meanwhile his little brother Yusuf came and started to press the keys randomly. Unfortunately Max has forgotten the number which he had calculated. The only thing he knows is that the number is divisible by 4.
You are given a string *s* consisting of digits (the number on the display of the calculator after Yusuf randomly pressed the keys). Your task is to find the number of substrings which are divisible by 4. A substring can start with a zero.
A substring of a string is a nonempty sequence of consecutive characters.
For example if string *s* is 124 then we have four substrings that are divisible by 4: 12, 4, 24 and 124. For the string 04 the answer is three: 0, 4, 04.
As input/output can reach huge size it is recommended to use fast input/output methods: for example, prefer to use gets/scanf/printf instead of getline/cin/cout in C++, prefer to use BufferedReader/PrintWriter instead of Scanner/System.out in Java.
Input Specification:
The only line contains string *s* (1<=≤<=|*s*|<=≤<=3·105). The string *s* contains only digits from 0 to 9.
Output Specification:
Print integer *a* — the number of substrings of the string *s* that are divisible by 4.
Note that the answer can be huge, so you should use 64-bit integer type to store it. In C++ you can use the long long integer type and in Java you can use long integer type.
Demo Input:
['124\n', '04\n', '5810438174\n']
Demo Output:
['4\n', '3\n', '9\n']
Note:
none
|
```python
import sys
from math import *
def minp():
return sys.stdin.readline().strip()
def mint():
return int(minp())
def mints():
return map(int, minp().split())
j = None
r = 0
p = 0
for i in minp():
r += (int(i)%4 == 0)
if j != None:
if int(j+i) % 4 == 0:
r += p
p += 1
j = i
print(r)
```
| 3
|
|
25
|
E
|
Test
|
PROGRAMMING
| 2,200
|
[
"hashing",
"strings"
] |
E. Test
|
2
|
256
|
Sometimes it is hard to prepare tests for programming problems. Now Bob is preparing tests to new problem about strings — input data to his problem is one string. Bob has 3 wrong solutions to this problem. The first gives the wrong answer if the input data contains the substring *s*1, the second enters an infinite loop if the input data contains the substring *s*2, and the third requires too much memory if the input data contains the substring *s*3. Bob wants these solutions to fail single test. What is the minimal length of test, which couldn't be passed by all three Bob's solutions?
|
There are exactly 3 lines in the input data. The *i*-th line contains string *s**i*. All the strings are non-empty, consists of lowercase Latin letters, the length of each string doesn't exceed 105.
|
Output one number — what is minimal length of the string, containing *s*1, *s*2 and *s*3 as substrings.
|
[
"ab\nbc\ncd\n",
"abacaba\nabaaba\nx\n"
] |
[
"4\n",
"11\n"
] |
none
| 0
|
[
{
"input": "ab\nbc\ncd",
"output": "4"
},
{
"input": "abacaba\nabaaba\nx",
"output": "11"
},
{
"input": "syvncqmfhautvxudqdhggz\nhrpxzeghsocjpicuixskfuzupytsgjsdiyb\nybcmnmnbpndbxlxbzhbfnqvwcffvrdhtickyqhupmcehls",
"output": "100"
},
{
"input": "jwdezvgfm\nmdoqvylpuvyk\nqylldbziva",
"output": "30"
},
{
"input": "ujgquqxdlowuwnqkmbd\nwdwkhkdgsujgqu\njlxqvcuivagmw",
"output": "40"
},
{
"input": "rdtevvmiqmfgvafkdypxjthzhfsbavmhgkavkfonscaokdxoscenpxrc\nijbvueenzsmgkmkrskjspvfchwkqdglkxnrdtevvmiqmfgvafkdypxjthz\nkqdglkxnrdtevvmiqmfgvafkdypxjthzhfsbavmhgkavkfonscaokdxoscenpxrcivydtkrxjy",
"output": "100"
},
{
"input": "xufuzdlsjxmevrtessfbwlnzzclcqwevnnucxyvhngnxhcbdfwq\nwlwobhnmmgtfolfaeckbrnnglylydxtgtvrlmeeszoiuatzzzxufuzdlsjxmevrt\nbrnnglylydxtgtvrlmeeszoiuatzzzx",
"output": "100"
},
{
"input": "iefouqzxoyuieqdzalfktehtvdbvjmeubju\nocotspetkkhvwfgaqynhovjwjhciefouqzxoyuieqdzalfktehtvdbvjmeubjubcmnvpwgdpnchqhzjrchyrfpvigubp\nycnhjwgbocotspetkkhvwfgaqynhovjwjhcief",
"output": "100"
}
] | 1,627,243,243
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 11
| 2,000
| 15,564,800
|
def fun(a,b):
x=0
for t in range(min(len(a),len(b))):
if b[0:t]+b[t] == a[-(t+1):-1] + a[-1]:
x = t+1
return x
s_1 = input()
s_2 = input()
s_3 = input()
def ful(a,b):
for t in range(len(b)):
if b[t:t+len(a)] == a:
return True
if ful(s_2,s_1) and ful(s_3,s_1):
print(len(s_1))
elif ful(s_1,s_2) and ful(s_3,s_2):
print(len(s_2))
elif ful(s_1,s_3) and ful(s_2,s_3):
print(len(s_3))
elif ful(s_2,s_1):
x_1 = fun(s_1,s_3)
x_2 = fun(s_3,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_3) - y)
elif ful(s_3,s_1):
x_1 = fun(s_1,s_2)
x_2 = fun(s_2,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_2) - y)
elif ful(s_1,s_2):
x_1 = fun(s_2,s_3)
x_2 = fun(s_3,s_2)
y = max(x_1,x_2)
print(len(s_3) + len(s_2) - y)
elif ful(s_3,s_2):
x_1 = fun(s_2,s_1)
x_2 = fun(s_1,s_2)
y = max(x_1,x_2)
print(len(s_1) + len(s_2) - y)
elif ful(s_1,s_3):
x_1 = fun(s_2,s_3)
x_2 = fun(s_3,s_2)
y = max(x_1,x_2)
print(len(s_2) + len(s_3) - y)
elif ful(s_2,s_3):
x_1 = fun(s_1,s_3)
x_2 = fun(s_3,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_3) - y)
else:
x_123 = fun(s_1,s_2)+fun(s_2,s_3)
x_132 = fun(s_1,s_3)+fun(s_3,s_2)
x_213 = fun(s_2,s_1)+fun(s_1,s_3)
x_231 = fun(s_2,s_3)+fun(s_3,s_1)
x_312 = fun(s_3,s_1)+fun(s_1,s_2)
x_321 = fun(s_3,s_2)+fun(s_2,s_1)
y = max(x_123,x_132,x_213,x_231,x_312,x_321)
print(len(s_1)+len(s_2)+len(s_3)-y)
|
Title: Test
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Sometimes it is hard to prepare tests for programming problems. Now Bob is preparing tests to new problem about strings — input data to his problem is one string. Bob has 3 wrong solutions to this problem. The first gives the wrong answer if the input data contains the substring *s*1, the second enters an infinite loop if the input data contains the substring *s*2, and the third requires too much memory if the input data contains the substring *s*3. Bob wants these solutions to fail single test. What is the minimal length of test, which couldn't be passed by all three Bob's solutions?
Input Specification:
There are exactly 3 lines in the input data. The *i*-th line contains string *s**i*. All the strings are non-empty, consists of lowercase Latin letters, the length of each string doesn't exceed 105.
Output Specification:
Output one number — what is minimal length of the string, containing *s*1, *s*2 and *s*3 as substrings.
Demo Input:
['ab\nbc\ncd\n', 'abacaba\nabaaba\nx\n']
Demo Output:
['4\n', '11\n']
Note:
none
|
```python
def fun(a,b):
x=0
for t in range(min(len(a),len(b))):
if b[0:t]+b[t] == a[-(t+1):-1] + a[-1]:
x = t+1
return x
s_1 = input()
s_2 = input()
s_3 = input()
def ful(a,b):
for t in range(len(b)):
if b[t:t+len(a)] == a:
return True
if ful(s_2,s_1) and ful(s_3,s_1):
print(len(s_1))
elif ful(s_1,s_2) and ful(s_3,s_2):
print(len(s_2))
elif ful(s_1,s_3) and ful(s_2,s_3):
print(len(s_3))
elif ful(s_2,s_1):
x_1 = fun(s_1,s_3)
x_2 = fun(s_3,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_3) - y)
elif ful(s_3,s_1):
x_1 = fun(s_1,s_2)
x_2 = fun(s_2,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_2) - y)
elif ful(s_1,s_2):
x_1 = fun(s_2,s_3)
x_2 = fun(s_3,s_2)
y = max(x_1,x_2)
print(len(s_3) + len(s_2) - y)
elif ful(s_3,s_2):
x_1 = fun(s_2,s_1)
x_2 = fun(s_1,s_2)
y = max(x_1,x_2)
print(len(s_1) + len(s_2) - y)
elif ful(s_1,s_3):
x_1 = fun(s_2,s_3)
x_2 = fun(s_3,s_2)
y = max(x_1,x_2)
print(len(s_2) + len(s_3) - y)
elif ful(s_2,s_3):
x_1 = fun(s_1,s_3)
x_2 = fun(s_3,s_1)
y = max(x_1,x_2)
print(len(s_1) + len(s_3) - y)
else:
x_123 = fun(s_1,s_2)+fun(s_2,s_3)
x_132 = fun(s_1,s_3)+fun(s_3,s_2)
x_213 = fun(s_2,s_1)+fun(s_1,s_3)
x_231 = fun(s_2,s_3)+fun(s_3,s_1)
x_312 = fun(s_3,s_1)+fun(s_1,s_2)
x_321 = fun(s_3,s_2)+fun(s_2,s_1)
y = max(x_123,x_132,x_213,x_231,x_312,x_321)
print(len(s_1)+len(s_2)+len(s_3)-y)
```
| 0
|
337
|
A
|
Puzzles
|
PROGRAMMING
| 900
|
[
"greedy"
] | null | null |
The end of the school year is near and Ms. Manana, the teacher, will soon have to say goodbye to a yet another class. She decided to prepare a goodbye present for her *n* students and give each of them a jigsaw puzzle (which, as wikipedia states, is a tiling puzzle that requires the assembly of numerous small, often oddly shaped, interlocking and tessellating pieces).
The shop assistant told the teacher that there are *m* puzzles in the shop, but they might differ in difficulty and size. Specifically, the first jigsaw puzzle consists of *f*1 pieces, the second one consists of *f*2 pieces and so on.
Ms. Manana doesn't want to upset the children, so she decided that the difference between the numbers of pieces in her presents must be as small as possible. Let *A* be the number of pieces in the largest puzzle that the teacher buys and *B* be the number of pieces in the smallest such puzzle. She wants to choose such *n* puzzles that *A*<=-<=*B* is minimum possible. Help the teacher and find the least possible value of *A*<=-<=*B*.
|
The first line contains space-separated integers *n* and *m* (2<=≤<=*n*<=≤<=*m*<=≤<=50). The second line contains *m* space-separated integers *f*1,<=*f*2,<=...,<=*f**m* (4<=≤<=*f**i*<=≤<=1000) — the quantities of pieces in the puzzles sold in the shop.
|
Print a single integer — the least possible difference the teacher can obtain.
|
[
"4 6\n10 12 10 7 5 22\n"
] |
[
"5\n"
] |
Sample 1. The class has 4 students. The shop sells 6 puzzles. If Ms. Manana buys the first four puzzles consisting of 10, 12, 10 and 7 pieces correspondingly, then the difference between the sizes of the largest and the smallest puzzle will be equal to 5. It is impossible to obtain a smaller difference. Note that the teacher can also buy puzzles 1, 3, 4 and 5 to obtain the difference 5.
| 500
|
[
{
"input": "4 6\n10 12 10 7 5 22",
"output": "5"
},
{
"input": "2 2\n4 4",
"output": "0"
},
{
"input": "2 10\n4 5 6 7 8 9 10 11 12 12",
"output": "0"
},
{
"input": "4 5\n818 136 713 59 946",
"output": "759"
},
{
"input": "3 20\n446 852 783 313 549 965 40 88 86 617 479 118 768 34 47 826 366 957 463 903",
"output": "13"
},
{
"input": "2 25\n782 633 152 416 432 825 115 97 386 357 836 310 530 413 354 373 847 882 913 682 729 582 671 674 94",
"output": "3"
},
{
"input": "4 25\n226 790 628 528 114 64 239 279 619 39 894 763 763 847 525 93 882 697 999 643 650 244 159 884 190",
"output": "31"
},
{
"input": "2 50\n971 889 628 39 253 157 925 694 129 516 660 272 738 319 611 816 142 717 514 392 41 105 132 676 958 118 306 768 600 685 103 857 704 346 857 309 23 718 618 161 176 379 846 834 640 468 952 878 164 997",
"output": "0"
},
{
"input": "25 50\n582 146 750 905 313 509 402 21 488 512 32 898 282 64 579 869 37 996 377 929 975 697 666 837 311 205 116 992 533 298 648 268 54 479 792 595 152 69 267 417 184 433 894 603 988 712 24 414 301 176",
"output": "412"
},
{
"input": "49 50\n58 820 826 960 271 294 473 102 925 318 729 672 244 914 796 646 868 6 893 882 726 203 528 498 271 195 355 459 721 680 547 147 631 116 169 804 145 996 133 559 110 257 771 476 576 251 607 314 427 886",
"output": "938"
},
{
"input": "50 50\n374 573 323 744 190 806 485 247 628 336 491 606 702 321 991 678 337 579 86 240 993 208 668 686 855 205 363 177 719 249 896 919 782 434 59 647 787 996 286 216 636 212 546 903 958 559 544 126 608 993",
"output": "937"
},
{
"input": "6 50\n6 8 7 8 5 4 4 5 7 8 6 5 7 4 7 7 7 8 6 4 6 6 8 8 7 7 8 7 5 8 5 4 4 7 8 4 4 6 6 6 8 7 4 7 6 6 5 8 4 7",
"output": "0"
},
{
"input": "37 50\n14 5 11 17 8 20 19 16 20 11 17 20 16 9 14 14 13 18 11 20 8 8 8 5 19 17 6 18 10 20 9 7 12 6 14 17 4 4 10 13 7 4 11 6 20 19 12 12 15 19",
"output": "12"
},
{
"input": "40 50\n4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4 4",
"output": "0"
},
{
"input": "40 50\n17 20 43 26 41 37 14 8 30 35 30 24 43 8 42 9 41 50 41 35 27 32 35 43 28 36 31 16 5 7 23 16 14 29 8 39 12 16 36 18 49 39 33 37 38 6 6 27 23 17",
"output": "31"
},
{
"input": "2 2\n1000 4",
"output": "996"
},
{
"input": "2 3\n4 502 1000",
"output": "498"
},
{
"input": "3 3\n4 1000 4",
"output": "996"
}
] | 1,677,426,640
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 18
| 124
| 0
|
n,m=map(int,input().split())
f=list(map(int,input().split()))
g=sorted(f)
x=g[0:n]
y=m-len(x)+1
z=[]
for i in range(y):
y=g[i:i+n]
z.append(y[-1]-y[0])
print(min(z))
|
Title: Puzzles
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The end of the school year is near and Ms. Manana, the teacher, will soon have to say goodbye to a yet another class. She decided to prepare a goodbye present for her *n* students and give each of them a jigsaw puzzle (which, as wikipedia states, is a tiling puzzle that requires the assembly of numerous small, often oddly shaped, interlocking and tessellating pieces).
The shop assistant told the teacher that there are *m* puzzles in the shop, but they might differ in difficulty and size. Specifically, the first jigsaw puzzle consists of *f*1 pieces, the second one consists of *f*2 pieces and so on.
Ms. Manana doesn't want to upset the children, so she decided that the difference between the numbers of pieces in her presents must be as small as possible. Let *A* be the number of pieces in the largest puzzle that the teacher buys and *B* be the number of pieces in the smallest such puzzle. She wants to choose such *n* puzzles that *A*<=-<=*B* is minimum possible. Help the teacher and find the least possible value of *A*<=-<=*B*.
Input Specification:
The first line contains space-separated integers *n* and *m* (2<=≤<=*n*<=≤<=*m*<=≤<=50). The second line contains *m* space-separated integers *f*1,<=*f*2,<=...,<=*f**m* (4<=≤<=*f**i*<=≤<=1000) — the quantities of pieces in the puzzles sold in the shop.
Output Specification:
Print a single integer — the least possible difference the teacher can obtain.
Demo Input:
['4 6\n10 12 10 7 5 22\n']
Demo Output:
['5\n']
Note:
Sample 1. The class has 4 students. The shop sells 6 puzzles. If Ms. Manana buys the first four puzzles consisting of 10, 12, 10 and 7 pieces correspondingly, then the difference between the sizes of the largest and the smallest puzzle will be equal to 5. It is impossible to obtain a smaller difference. Note that the teacher can also buy puzzles 1, 3, 4 and 5 to obtain the difference 5.
|
```python
n,m=map(int,input().split())
f=list(map(int,input().split()))
g=sorted(f)
x=g[0:n]
y=m-len(x)+1
z=[]
for i in range(y):
y=g[i:i+n]
z.append(y[-1]-y[0])
print(min(z))
```
| 3
|
|
957
|
A
|
Tritonic Iridescence
|
PROGRAMMING
| 1,300
|
[
"implementation"
] | null | null |
Overlooking the captivating blend of myriads of vernal hues, Arkady the painter lays out a long, long canvas.
Arkady has a sufficiently large amount of paint of three colours: cyan, magenta, and yellow. On the one-dimensional canvas split into *n* consecutive segments, each segment needs to be painted in one of the colours.
Arkady has already painted some (possibly none or all) segments and passes the paintbrush to you. You are to determine whether there are at least two ways of colouring all the unpainted segments so that no two adjacent segments are of the same colour. Two ways are considered different if and only if a segment is painted in different colours in them.
|
The first line contains a single positive integer *n* (1<=≤<=*n*<=≤<=100) — the length of the canvas.
The second line contains a string *s* of *n* characters, the *i*-th of which is either 'C' (denoting a segment painted in cyan), 'M' (denoting one painted in magenta), 'Y' (one painted in yellow), or '?' (an unpainted one).
|
If there are at least two different ways of painting, output "Yes"; otherwise output "No" (both without quotes).
You can print each character in any case (upper or lower).
|
[
"5\nCY??Y\n",
"5\nC?C?Y\n",
"5\n?CYC?\n",
"5\nC??MM\n",
"3\nMMY\n"
] |
[
"Yes\n",
"Yes\n",
"Yes\n",
"No\n",
"No\n"
] |
For the first example, there are exactly two different ways of colouring: CYCMY and CYMCY.
For the second example, there are also exactly two different ways of colouring: CMCMY and CYCMY.
For the third example, there are four ways of colouring: MCYCM, MCYCY, YCYCM, and YCYCY.
For the fourth example, no matter how the unpainted segments are coloured, the existing magenta segments will prevent the painting from satisfying the requirements. The similar is true for the fifth example.
| 500
|
[
{
"input": "5\nCY??Y",
"output": "Yes"
},
{
"input": "5\nC?C?Y",
"output": "Yes"
},
{
"input": "5\n?CYC?",
"output": "Yes"
},
{
"input": "5\nC??MM",
"output": "No"
},
{
"input": "3\nMMY",
"output": "No"
},
{
"input": "15\n??YYYYYY??YYYY?",
"output": "No"
},
{
"input": "100\nYCY?CMCMCYMYMYC?YMYMYMY?CMC?MCMYCMYMYCM?CMCM?CMYMYCYCMCMCMCMCMYM?CYCYCMCM?CY?MYCYCMYM?CYCYCYMY?CYCYC",
"output": "No"
},
{
"input": "1\nC",
"output": "No"
},
{
"input": "1\n?",
"output": "Yes"
},
{
"input": "2\nMY",
"output": "No"
},
{
"input": "2\n?M",
"output": "Yes"
},
{
"input": "2\nY?",
"output": "Yes"
},
{
"input": "2\n??",
"output": "Yes"
},
{
"input": "3\n??C",
"output": "Yes"
},
{
"input": "3\nM??",
"output": "Yes"
},
{
"input": "3\nYCM",
"output": "No"
},
{
"input": "3\n?C?",
"output": "Yes"
},
{
"input": "3\nMC?",
"output": "Yes"
},
{
"input": "4\nCYCM",
"output": "No"
},
{
"input": "4\nM?CM",
"output": "No"
},
{
"input": "4\n??YM",
"output": "Yes"
},
{
"input": "4\nC???",
"output": "Yes"
},
{
"input": "10\nMCYM?MYM?C",
"output": "Yes"
},
{
"input": "50\nCMCMCYM?MY?C?MC??YM?CY?YM??M?MCMCYCYMCYCMCM?MCM?MC",
"output": "Yes"
},
{
"input": "97\nMCM?YCMYM?YMY?MY?MYCY?CMCMCYC?YMY?MYCMC?M?YCMC?YM?C?MCMCMYMCMY?MCM?YC?YMYMY?MYCYCM?YC?YCY?MYMYMYC",
"output": "No"
},
{
"input": "100\nC?M?M?M?YM??YMYC?MCYMYM??Y??YC?CYC???YM?YM??MYMY?CYCYMYC?YC?C?CYCMY??CMC?YMCMYCYCYMYM?CYM?M?MCMCMY?Y",
"output": "Yes"
},
{
"input": "100\n?YYYYYYYYYYYYYYYYYYYYYYYYYYYYY??YYY?YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY?",
"output": "No"
},
{
"input": "100\n????????????????????????????????????????????????????????????????????????????????????????????????????",
"output": "Yes"
},
{
"input": "100\nY?CYMYMYMYCYMY?CMCYMYMC?MYCY?CMCYCYMCM?YCMCYMYCYCY?MYMYCYCYCM?CYMYMY?CY?MYCYCY?M?YMYCY?CMCMCY?CY?M?C",
"output": "No"
},
{
"input": "4\nM??C",
"output": "Yes"
},
{
"input": "6\nY?C??C",
"output": "Yes"
},
{
"input": "5\nC???Y",
"output": "Yes"
},
{
"input": "5\nC??MY",
"output": "Yes"
},
{
"input": "5\nCY??M",
"output": "Yes"
},
{
"input": "4\nC??Y",
"output": "Yes"
},
{
"input": "52\n??????????????????????????????????????????????????YY",
"output": "No"
},
{
"input": "3\nYY?",
"output": "No"
},
{
"input": "5\nCC??Y",
"output": "No"
},
{
"input": "8\nCMC??MCM",
"output": "Yes"
},
{
"input": "7\nM?YCM??",
"output": "Yes"
},
{
"input": "6\n?CC???",
"output": "No"
},
{
"input": "100\n??????????????????????????????????????????????????????????????????????????????????????????????????MM",
"output": "No"
},
{
"input": "4\nC??M",
"output": "Yes"
},
{
"input": "4\n?C?M",
"output": "Yes"
},
{
"input": "6\nMC??MC",
"output": "Yes"
}
] | 1,521,907,367
| 1,667
|
Python 3
|
WRONG_ANSWER
|
PRETESTS
| 6
| 77
| 7,065,600
|
n = int(input())
s = input()
flag1 = True
num = 0
pre = s[0]
for i in range(1, n):
if s[i] == pre:
if s[i] != "?" and pre != "?":
flag1 = False
break
if s[i] == "?":
num += 1
pre = s[i]
if flag1 and num >= 2:
print("Yes")
elif flag1 and num == 1:
i = s.index("?")
if i == 0 or i == n:
print("Yes")
else:
if s[i - 1] == s[i + 1]:
print("Yes")
else:
print("No")
elif flag1:
print("Yes")
else:
print("No")
|
Title: Tritonic Iridescence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Overlooking the captivating blend of myriads of vernal hues, Arkady the painter lays out a long, long canvas.
Arkady has a sufficiently large amount of paint of three colours: cyan, magenta, and yellow. On the one-dimensional canvas split into *n* consecutive segments, each segment needs to be painted in one of the colours.
Arkady has already painted some (possibly none or all) segments and passes the paintbrush to you. You are to determine whether there are at least two ways of colouring all the unpainted segments so that no two adjacent segments are of the same colour. Two ways are considered different if and only if a segment is painted in different colours in them.
Input Specification:
The first line contains a single positive integer *n* (1<=≤<=*n*<=≤<=100) — the length of the canvas.
The second line contains a string *s* of *n* characters, the *i*-th of which is either 'C' (denoting a segment painted in cyan), 'M' (denoting one painted in magenta), 'Y' (one painted in yellow), or '?' (an unpainted one).
Output Specification:
If there are at least two different ways of painting, output "Yes"; otherwise output "No" (both without quotes).
You can print each character in any case (upper or lower).
Demo Input:
['5\nCY??Y\n', '5\nC?C?Y\n', '5\n?CYC?\n', '5\nC??MM\n', '3\nMMY\n']
Demo Output:
['Yes\n', 'Yes\n', 'Yes\n', 'No\n', 'No\n']
Note:
For the first example, there are exactly two different ways of colouring: CYCMY and CYMCY.
For the second example, there are also exactly two different ways of colouring: CMCMY and CYCMY.
For the third example, there are four ways of colouring: MCYCM, MCYCY, YCYCM, and YCYCY.
For the fourth example, no matter how the unpainted segments are coloured, the existing magenta segments will prevent the painting from satisfying the requirements. The similar is true for the fifth example.
|
```python
n = int(input())
s = input()
flag1 = True
num = 0
pre = s[0]
for i in range(1, n):
if s[i] == pre:
if s[i] != "?" and pre != "?":
flag1 = False
break
if s[i] == "?":
num += 1
pre = s[i]
if flag1 and num >= 2:
print("Yes")
elif flag1 and num == 1:
i = s.index("?")
if i == 0 or i == n:
print("Yes")
else:
if s[i - 1] == s[i + 1]:
print("Yes")
else:
print("No")
elif flag1:
print("Yes")
else:
print("No")
```
| 0
|
|
276
|
D
|
Little Girl and Maximum XOR
|
PROGRAMMING
| 1,700
|
[
"bitmasks",
"dp",
"greedy",
"implementation",
"math"
] | null | null |
A little girl loves problems on bitwise operations very much. Here's one of them.
You are given two integers *l* and *r*. Let's consider the values of for all pairs of integers *a* and *b* (*l*<=≤<=*a*<=≤<=*b*<=≤<=*r*). Your task is to find the maximum value among all considered ones.
Expression means applying bitwise excluding or operation to integers *x* and *y*. The given operation exists in all modern programming languages, for example, in languages *C*++ and *Java* it is represented as "^", in *Pascal* — as "xor".
|
The single line contains space-separated integers *l* and *r* (1<=≤<=*l*<=≤<=*r*<=≤<=1018).
Please, do not use the %lld specifier to read or write 64-bit integers in C++. It is preferred to use the cin, cout streams or the %I64d specifier.
|
In a single line print a single integer — the maximum value of for all pairs of integers *a*, *b* (*l*<=≤<=*a*<=≤<=*b*<=≤<=*r*).
|
[
"1 2\n",
"8 16\n",
"1 1\n"
] |
[
"3\n",
"31\n",
"0\n"
] |
none
| 2,000
|
[
{
"input": "1 2",
"output": "3"
},
{
"input": "8 16",
"output": "31"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "506 677",
"output": "1023"
},
{
"input": "33 910",
"output": "1023"
},
{
"input": "36 94",
"output": "127"
},
{
"input": "10000000000 20000000000",
"output": "34359738367"
},
{
"input": "79242383109441603 533369389165030783",
"output": "576460752303423487"
},
{
"input": "797162752288318119 908416915938410706",
"output": "576460752303423487"
},
{
"input": "230148668013473494 573330407369354716",
"output": "576460752303423487"
},
{
"input": "668869743157683834 805679503731305624",
"output": "288230376151711743"
},
{
"input": "32473107276976561 588384394540535099",
"output": "1152921504606846975"
},
{
"input": "632668612680440378 864824360766754908",
"output": "576460752303423487"
},
{
"input": "658472316271074503 728242833853270665",
"output": "288230376151711743"
},
{
"input": "289218059048863941 314351197831808685",
"output": "36028797018963967"
},
{
"input": "54248140375568203 718189790306910368",
"output": "1152921504606846975"
},
{
"input": "330134158459714054 457118108955760856",
"output": "288230376151711743"
},
{
"input": "190442232278841373 980738846929096255",
"output": "1152921504606846975"
},
{
"input": "203359308073091683 455893840817516371",
"output": "576460752303423487"
},
{
"input": "200851182089362664 449305852839820160",
"output": "576460752303423487"
},
{
"input": "731792654005832175 789527173439457653",
"output": "72057594037927935"
},
{
"input": "231465750142682282 276038074124518614",
"output": "72057594037927935"
},
{
"input": "462451489958473150 957447393463701191",
"output": "1152921504606846975"
},
{
"input": "68666076639301243 247574109010873331",
"output": "288230376151711743"
},
{
"input": "491113582000560303 858928223424873439",
"output": "1152921504606846975"
},
{
"input": "454452550141901489 843034681327343036",
"output": "1152921504606846975"
},
{
"input": "43543567767276698 769776048133345296",
"output": "1152921504606846975"
},
{
"input": "214985598536531449 956713939905291713",
"output": "1152921504606846975"
},
{
"input": "56445001476501414 706930175458589379",
"output": "1152921504606846975"
},
{
"input": "666033930784103123 883523065811761270",
"output": "576460752303423487"
},
{
"input": "501827377176522663 590153819613032662",
"output": "1152921504606846975"
},
{
"input": "140216419613864821 362678730465999561",
"output": "576460752303423487"
},
{
"input": "23811264031960242 520940113721281721",
"output": "576460752303423487"
},
{
"input": "43249439481689805 431488136320817289",
"output": "576460752303423487"
},
{
"input": "198909890748296613 528950282310167050",
"output": "576460752303423487"
},
{
"input": "190620774979376809 899159649449168622",
"output": "1152921504606846975"
},
{
"input": "18565852953382418 697862904569985066",
"output": "1152921504606846975"
},
{
"input": "277046860122752192 828379515775613732",
"output": "1152921504606846975"
},
{
"input": "25785331761502790 119852560236585580",
"output": "144115188075855871"
},
{
"input": "363313173638414449 500957528623228245",
"output": "288230376151711743"
},
{
"input": "549330032897152846 715374717344043295",
"output": "1152921504606846975"
},
{
"input": "47456305370335136 388462406071482688",
"output": "576460752303423487"
},
{
"input": "125051194948742221 235911208585118006",
"output": "288230376151711743"
},
{
"input": "780993382943360354 889872865454335075",
"output": "576460752303423487"
},
{
"input": "815449097320007662 942453891178865528",
"output": "576460752303423487"
},
{
"input": "765369978472937483 796958953973862258",
"output": "144115188075855871"
},
{
"input": "259703440079833303 857510033561081530",
"output": "1152921504606846975"
},
{
"input": "181513087965617551 301910258955864271",
"output": "576460752303423487"
},
{
"input": "28591024119784617 732203343197854927",
"output": "1152921504606846975"
},
{
"input": "215365547805299155 861595308221385098",
"output": "1152921504606846975"
},
{
"input": "1 1000000000000000000",
"output": "1152921504606846975"
},
{
"input": "1000000000000 999999999999999999",
"output": "1152921504606846975"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "9999999999998 9999999999999",
"output": "1"
},
{
"input": "9999999999900 9999999999901",
"output": "1"
},
{
"input": "9999999999900 9999999999902",
"output": "3"
},
{
"input": "9999999999900 9999999999903",
"output": "3"
},
{
"input": "1 3",
"output": "3"
},
{
"input": "5000000 5900000",
"output": "2097151"
},
{
"input": "8589934592 8989934592",
"output": "536870911"
},
{
"input": "1 288230376151711743",
"output": "288230376151711743"
}
] | 1,676,388,554
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 61
| 46
| 0
|
a,b=map(int,input().split())
a=a^b
def setb(a):
for i in range(63,-1,-1):
if(a&(1<<i)):
return i+1
return 0
z=setb(a)
print((2**z)-1)
|
Title: Little Girl and Maximum XOR
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
A little girl loves problems on bitwise operations very much. Here's one of them.
You are given two integers *l* and *r*. Let's consider the values of for all pairs of integers *a* and *b* (*l*<=≤<=*a*<=≤<=*b*<=≤<=*r*). Your task is to find the maximum value among all considered ones.
Expression means applying bitwise excluding or operation to integers *x* and *y*. The given operation exists in all modern programming languages, for example, in languages *C*++ and *Java* it is represented as "^", in *Pascal* — as "xor".
Input Specification:
The single line contains space-separated integers *l* and *r* (1<=≤<=*l*<=≤<=*r*<=≤<=1018).
Please, do not use the %lld specifier to read or write 64-bit integers in C++. It is preferred to use the cin, cout streams or the %I64d specifier.
Output Specification:
In a single line print a single integer — the maximum value of for all pairs of integers *a*, *b* (*l*<=≤<=*a*<=≤<=*b*<=≤<=*r*).
Demo Input:
['1 2\n', '8 16\n', '1 1\n']
Demo Output:
['3\n', '31\n', '0\n']
Note:
none
|
```python
a,b=map(int,input().split())
a=a^b
def setb(a):
for i in range(63,-1,-1):
if(a&(1<<i)):
return i+1
return 0
z=setb(a)
print((2**z)-1)
```
| 3
|
|
145
|
A
|
Lucky Conversion
|
PROGRAMMING
| 1,200
|
[
"greedy",
"implementation"
] | null | null |
Petya loves lucky numbers very much. Everybody knows that lucky numbers are positive integers whose decimal record contains only the lucky digits 4 and 7. For example, numbers 47, 744, 4 are lucky and 5, 17, 467 are not.
Petya has two strings *a* and *b* of the same length *n*. The strings consist only of lucky digits. Petya can perform operations of two types:
- replace any one digit from string *a* by its opposite (i.e., replace 4 by 7 and 7 by 4); - swap any pair of digits in string *a*.
Petya is interested in the minimum number of operations that are needed to make string *a* equal to string *b*. Help him with the task.
|
The first and the second line contains strings *a* and *b*, correspondingly. Strings *a* and *b* have equal lengths and contain only lucky digits. The strings are not empty, their length does not exceed 105.
|
Print on the single line the single number — the minimum number of operations needed to convert string *a* into string *b*.
|
[
"47\n74\n",
"774\n744\n",
"777\n444\n"
] |
[
"1\n",
"1\n",
"3\n"
] |
In the first sample it is enough simply to swap the first and the second digit.
In the second sample we should replace the second digit with its opposite.
In the third number we should replace all three digits with their opposites.
| 500
|
[
{
"input": "47\n74",
"output": "1"
},
{
"input": "774\n744",
"output": "1"
},
{
"input": "777\n444",
"output": "3"
},
{
"input": "74747474\n77777777",
"output": "4"
},
{
"input": "444444444444\n777777777777",
"output": "12"
},
{
"input": "4744744447774474447474774\n4477774777444444444777447",
"output": "8"
},
{
"input": "7\n4",
"output": "1"
},
{
"input": "4\n7",
"output": "1"
},
{
"input": "7777777777\n7777777774",
"output": "1"
},
{
"input": "47777777777\n77777777774",
"output": "1"
},
{
"input": "47747477747744447774774444444777444747474747777774\n44777444774477447777444774477777477774444477447777",
"output": "14"
},
{
"input": "44447777447744444777777747477444777444447744444\n47444747774774744474747744447744477747777777447",
"output": "13"
},
{
"input": "4447744774744774744747744774474474444447477477444747477444\n7477477444744774744744774774744474744447744774744477744477",
"output": "14"
},
{
"input": "44747744777777444\n47774747747744777",
"output": "6"
},
{
"input": "44447774444474477747774774477777474774744744477444447777477477744747477774744444744777777777747777477447744774744444747477744744\n77777474477477747774777777474474477444474777477747747777477747747744474474747774747747444777474444744744444477477777747744747477",
"output": "37"
},
{
"input": "774774747744474477447477777447477747477474777477744744747444774474477477747474477447774444774744777\n744477444747477447477777774477447444447747477747477747774477474447474477477474444777444444447474747",
"output": "27"
},
{
"input": "4747447477\n4747444744",
"output": "3"
},
{
"input": "47744447444\n74477447744",
"output": "4"
},
{
"input": "447444777744\n777747744477",
"output": "6"
},
{
"input": "474777477774444\n774747777774477",
"output": "4"
},
{
"input": "47744474447747744777777447\n44744747477474777744777477",
"output": "7"
},
{
"input": "77447447444777777744744747744747774747477774777774447447777474477477774774777\n74777777444744447447474474477747747444444447447774444444747777444747474777447",
"output": "28"
},
{
"input": "7\n7",
"output": "0"
},
{
"input": "444\n444",
"output": "0"
},
{
"input": "77747\n47474",
"output": "3"
}
] | 1,585,853,999
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 51
| 342
| 7,372,800
|
a = list(input())
b = list(input())
ans = 0
c4 = abs(a.count('4') - b.count('4'))
c7 = abs(a.count('7') - b.count('7'))
ans += c4
n =len(a)
count = 0
for i in range(n):
if a[i] != b[i]:
count += 1
ans += ((count - c4)//2)
print(ans)
|
Title: Lucky Conversion
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya loves lucky numbers very much. Everybody knows that lucky numbers are positive integers whose decimal record contains only the lucky digits 4 and 7. For example, numbers 47, 744, 4 are lucky and 5, 17, 467 are not.
Petya has two strings *a* and *b* of the same length *n*. The strings consist only of lucky digits. Petya can perform operations of two types:
- replace any one digit from string *a* by its opposite (i.e., replace 4 by 7 and 7 by 4); - swap any pair of digits in string *a*.
Petya is interested in the minimum number of operations that are needed to make string *a* equal to string *b*. Help him with the task.
Input Specification:
The first and the second line contains strings *a* and *b*, correspondingly. Strings *a* and *b* have equal lengths and contain only lucky digits. The strings are not empty, their length does not exceed 105.
Output Specification:
Print on the single line the single number — the minimum number of operations needed to convert string *a* into string *b*.
Demo Input:
['47\n74\n', '774\n744\n', '777\n444\n']
Demo Output:
['1\n', '1\n', '3\n']
Note:
In the first sample it is enough simply to swap the first and the second digit.
In the second sample we should replace the second digit with its opposite.
In the third number we should replace all three digits with their opposites.
|
```python
a = list(input())
b = list(input())
ans = 0
c4 = abs(a.count('4') - b.count('4'))
c7 = abs(a.count('7') - b.count('7'))
ans += c4
n =len(a)
count = 0
for i in range(n):
if a[i] != b[i]:
count += 1
ans += ((count - c4)//2)
print(ans)
```
| 3
|
|
987
|
C
|
Three displays
|
PROGRAMMING
| 1,400
|
[
"brute force",
"dp",
"implementation"
] | null | null |
It is the middle of 2018 and Maria Stepanovna, who lives outside Krasnokamensk (a town in Zabaikalsky region), wants to rent three displays to highlight an important problem.
There are $n$ displays placed along a road, and the $i$-th of them can display a text with font size $s_i$ only. Maria Stepanovna wants to rent such three displays with indices $i < j < k$ that the font size increases if you move along the road in a particular direction. Namely, the condition $s_i < s_j < s_k$ should be held.
The rent cost is for the $i$-th display is $c_i$. Please determine the smallest cost Maria Stepanovna should pay.
|
The first line contains a single integer $n$ ($3 \le n \le 3\,000$) — the number of displays.
The second line contains $n$ integers $s_1, s_2, \ldots, s_n$ ($1 \le s_i \le 10^9$) — the font sizes on the displays in the order they stand along the road.
The third line contains $n$ integers $c_1, c_2, \ldots, c_n$ ($1 \le c_i \le 10^8$) — the rent costs for each display.
|
If there are no three displays that satisfy the criteria, print -1. Otherwise print a single integer — the minimum total rent cost of three displays with indices $i < j < k$ such that $s_i < s_j < s_k$.
|
[
"5\n2 4 5 4 10\n40 30 20 10 40\n",
"3\n100 101 100\n2 4 5\n",
"10\n1 2 3 4 5 6 7 8 9 10\n10 13 11 14 15 12 13 13 18 13\n"
] |
[
"90\n",
"-1\n",
"33\n"
] |
In the first example you can, for example, choose displays $1$, $4$ and $5$, because $s_1 < s_4 < s_5$ ($2 < 4 < 10$), and the rent cost is $40 + 10 + 40 = 90$.
In the second example you can't select a valid triple of indices, so the answer is -1.
| 1,250
|
[
{
"input": "5\n2 4 5 4 10\n40 30 20 10 40",
"output": "90"
},
{
"input": "3\n100 101 100\n2 4 5",
"output": "-1"
},
{
"input": "10\n1 2 3 4 5 6 7 8 9 10\n10 13 11 14 15 12 13 13 18 13",
"output": "33"
},
{
"input": "3\n1 2 3\n100000000 100000000 100000000",
"output": "300000000"
},
{
"input": "3\n999999998 999999999 1000000000\n100000000 100000000 99999999",
"output": "299999999"
},
{
"input": "10\n802030518 598196518 640274071 983359971 71550121 96204862 799843967 446173607 796619138 402690754\n23219513 68171337 12183499 5549873 73542337 66661387 79397647 34495917 31413076 50918417",
"output": "85904709"
},
{
"input": "20\n452405440 586588704 509061481 552472140 16115810 148658854 66743034 628305150 677780684 519361360 208050516 401554301 954478790 346543678 387546138 832279893 641889899 80960260 717802881 588066499\n61699500 83254572 59454419 27833657 55743179 99661234 94729965 75591136 62937826 3626886 73906880 3664913 39990362 94385934 33153747 23840219 64514676 14746017 13062847 65187713",
"output": "72432912"
},
{
"input": "3\n1 2 3\n1 1 1",
"output": "3"
}
] | 1,569,436,275
| 2,147,483,647
|
PyPy 3
|
WRONG_ANSWER
|
TESTS
| 6
| 124
| 1,228,800
|
n, fonts, rents = int(input()), list(map(int, input().split(' '))), list(map(int, input().split(' ')))
cache = [[[-1 for _ in range(n+1)] for i in range(n+1)] for j in range(4)]
def go(current, last, chosen, cost):
global cache
if(chosen == 3):
return cost
if(current == n):
return float('inf')
if(cache[chosen][current][last+1] != -1):
return cache[chosen][current][last+1]
p = q = float('inf')
if(last == -1 or fonts[last] < fonts[current]):
p = go(current+1, current, chosen+1, cost+rents[current])
#when we choose
q = go(current+1, last, chosen, cost)
ans = min(p, q)
cache[chosen][current][last+1] = ans
return ans
result = go(0, -1, 0, 0)
if(result == float('inf')):
result = -1
print(result)
|
Title: Three displays
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
It is the middle of 2018 and Maria Stepanovna, who lives outside Krasnokamensk (a town in Zabaikalsky region), wants to rent three displays to highlight an important problem.
There are $n$ displays placed along a road, and the $i$-th of them can display a text with font size $s_i$ only. Maria Stepanovna wants to rent such three displays with indices $i < j < k$ that the font size increases if you move along the road in a particular direction. Namely, the condition $s_i < s_j < s_k$ should be held.
The rent cost is for the $i$-th display is $c_i$. Please determine the smallest cost Maria Stepanovna should pay.
Input Specification:
The first line contains a single integer $n$ ($3 \le n \le 3\,000$) — the number of displays.
The second line contains $n$ integers $s_1, s_2, \ldots, s_n$ ($1 \le s_i \le 10^9$) — the font sizes on the displays in the order they stand along the road.
The third line contains $n$ integers $c_1, c_2, \ldots, c_n$ ($1 \le c_i \le 10^8$) — the rent costs for each display.
Output Specification:
If there are no three displays that satisfy the criteria, print -1. Otherwise print a single integer — the minimum total rent cost of three displays with indices $i < j < k$ such that $s_i < s_j < s_k$.
Demo Input:
['5\n2 4 5 4 10\n40 30 20 10 40\n', '3\n100 101 100\n2 4 5\n', '10\n1 2 3 4 5 6 7 8 9 10\n10 13 11 14 15 12 13 13 18 13\n']
Demo Output:
['90\n', '-1\n', '33\n']
Note:
In the first example you can, for example, choose displays $1$, $4$ and $5$, because $s_1 < s_4 < s_5$ ($2 < 4 < 10$), and the rent cost is $40 + 10 + 40 = 90$.
In the second example you can't select a valid triple of indices, so the answer is -1.
|
```python
n, fonts, rents = int(input()), list(map(int, input().split(' '))), list(map(int, input().split(' ')))
cache = [[[-1 for _ in range(n+1)] for i in range(n+1)] for j in range(4)]
def go(current, last, chosen, cost):
global cache
if(chosen == 3):
return cost
if(current == n):
return float('inf')
if(cache[chosen][current][last+1] != -1):
return cache[chosen][current][last+1]
p = q = float('inf')
if(last == -1 or fonts[last] < fonts[current]):
p = go(current+1, current, chosen+1, cost+rents[current])
#when we choose
q = go(current+1, last, chosen, cost)
ans = min(p, q)
cache[chosen][current][last+1] = ans
return ans
result = go(0, -1, 0, 0)
if(result == float('inf')):
result = -1
print(result)
```
| 0
|
|
365
|
A
|
Good Number
|
PROGRAMMING
| 1,100
|
[
"implementation"
] | null | null |
Let's call a number *k*-good if it contains all digits not exceeding *k* (0,<=...,<=*k*). You've got a number *k* and an array *a* containing *n* numbers. Find out how many *k*-good numbers are in *a* (count each number every time it occurs in array *a*).
|
The first line contains integers *n* and *k* (1<=≤<=*n*<=≤<=100, 0<=≤<=*k*<=≤<=9). The *i*-th of the following *n* lines contains integer *a**i* without leading zeroes (1<=≤<=*a**i*<=≤<=109).
|
Print a single integer — the number of *k*-good numbers in *a*.
|
[
"10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n",
"2 1\n1\n10\n"
] |
[
"10\n",
"1\n"
] |
none
| 500
|
[
{
"input": "10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560",
"output": "10"
},
{
"input": "2 1\n1\n10",
"output": "1"
},
{
"input": "1 0\n1000000000",
"output": "1"
},
{
"input": "1 1\n1000000000",
"output": "1"
},
{
"input": "6 0\n10\n102\n120\n1032\n1212103\n1999999",
"output": "5"
},
{
"input": "1 3\n1000000000",
"output": "0"
},
{
"input": "1 9\n1000000000",
"output": "0"
},
{
"input": "1 0\n1",
"output": "0"
},
{
"input": "1 1\n1",
"output": "0"
},
{
"input": "1 3\n1",
"output": "0"
},
{
"input": "1 9\n1",
"output": "0"
},
{
"input": "2 8\n123456780\n123",
"output": "1"
},
{
"input": "2 8\n12345678\n1230",
"output": "0"
},
{
"input": "6 1\n10\n102\n120\n1032\n1212103\n1999999",
"output": "5"
},
{
"input": "6 2\n10\n102\n120\n1032\n1212103\n1999999",
"output": "4"
},
{
"input": "6 3\n10\n102\n120\n1032\n1212103\n1999999",
"output": "2"
},
{
"input": "6 9\n10\n102\n120\n1032\n1212103\n1999999",
"output": "0"
},
{
"input": "1 2\n2220",
"output": "0"
}
] | 1,642,483,977
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 37
| 62
| 0
|
n, k = map(int,input().split())
r = 0
for i in range(n):
a = input()
for j in range(k+1):
if str(j) in a:
b = 1
else:
b = 0
break
if b == 1:
r +=1
print(r)
|
Title: Good Number
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Let's call a number *k*-good if it contains all digits not exceeding *k* (0,<=...,<=*k*). You've got a number *k* and an array *a* containing *n* numbers. Find out how many *k*-good numbers are in *a* (count each number every time it occurs in array *a*).
Input Specification:
The first line contains integers *n* and *k* (1<=≤<=*n*<=≤<=100, 0<=≤<=*k*<=≤<=9). The *i*-th of the following *n* lines contains integer *a**i* without leading zeroes (1<=≤<=*a**i*<=≤<=109).
Output Specification:
Print a single integer — the number of *k*-good numbers in *a*.
Demo Input:
['10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n', '2 1\n1\n10\n']
Demo Output:
['10\n', '1\n']
Note:
none
|
```python
n, k = map(int,input().split())
r = 0
for i in range(n):
a = input()
for j in range(k+1):
if str(j) in a:
b = 1
else:
b = 0
break
if b == 1:
r +=1
print(r)
```
| 3
|
|
381
|
A
|
Sereja and Dima
|
PROGRAMMING
| 800
|
[
"greedy",
"implementation",
"two pointers"
] | null | null |
Sereja and Dima play a game. The rules of the game are very simple. The players have *n* cards in a row. Each card contains a number, all numbers on the cards are distinct. The players take turns, Sereja moves first. During his turn a player can take one card: either the leftmost card in a row, or the rightmost one. The game ends when there is no more cards. The player who has the maximum sum of numbers on his cards by the end of the game, wins.
Sereja and Dima are being greedy. Each of them chooses the card with the larger number during his move.
Inna is a friend of Sereja and Dima. She knows which strategy the guys are using, so she wants to determine the final score, given the initial state of the game. Help her.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=1000) — the number of cards on the table. The second line contains space-separated numbers on the cards from left to right. The numbers on the cards are distinct integers from 1 to 1000.
|
On a single line, print two integers. The first number is the number of Sereja's points at the end of the game, the second number is the number of Dima's points at the end of the game.
|
[
"4\n4 1 2 10\n",
"7\n1 2 3 4 5 6 7\n"
] |
[
"12 5\n",
"16 12\n"
] |
In the first sample Sereja will take cards with numbers 10 and 2, so Sereja's sum is 12. Dima will take cards with numbers 4 and 1, so Dima's sum is 5.
| 500
|
[
{
"input": "4\n4 1 2 10",
"output": "12 5"
},
{
"input": "7\n1 2 3 4 5 6 7",
"output": "16 12"
},
{
"input": "42\n15 29 37 22 16 5 26 31 6 32 19 3 45 36 33 14 25 20 48 7 42 11 24 28 9 18 8 21 47 17 38 40 44 4 35 1 43 39 41 27 12 13",
"output": "613 418"
},
{
"input": "43\n32 1 15 48 38 26 25 14 20 44 11 30 3 42 49 19 18 46 5 45 10 23 34 9 29 41 2 52 6 17 35 4 50 22 33 51 7 28 47 13 39 37 24",
"output": "644 500"
},
{
"input": "1\n3",
"output": "3 0"
},
{
"input": "45\n553 40 94 225 415 471 126 190 647 394 515 303 189 159 308 6 139 132 326 78 455 75 85 295 135 613 360 614 351 228 578 259 258 591 444 29 33 463 561 174 368 183 140 168 646",
"output": "6848 6568"
},
{
"input": "44\n849 373 112 307 479 608 856 769 526 82 168 143 573 762 115 501 688 36 214 450 396 496 236 309 287 786 397 43 811 141 745 846 350 270 276 677 420 459 403 722 267 54 394 727",
"output": "9562 9561"
},
{
"input": "35\n10 15 18 1 28 16 2 33 6 22 23 4 9 25 35 8 7 26 3 20 30 14 31 19 27 32 11 5 29 24 21 34 13 17 12",
"output": "315 315"
},
{
"input": "17\n580 376 191 496 73 44 520 357 483 149 81 178 514 300 216 598 304",
"output": "3238 2222"
},
{
"input": "30\n334 443 223 424 168 549 189 303 429 559 516 220 459 134 344 346 316 446 209 148 487 526 69 286 102 366 518 280 392 325",
"output": "5246 4864"
},
{
"input": "95\n122 29 188 265 292 287 183 225 222 187 155 256 64 148 173 278 218 136 290 17 31 130 2 87 57 283 255 280 68 166 174 142 102 39 116 206 288 154 26 78 296 172 184 232 77 91 277 8 249 186 94 93 207 251 257 195 101 299 193 124 293 65 58 35 24 302 220 189 252 125 27 284 247 182 141 103 198 97 234 83 281 216 85 180 267 236 109 143 149 239 79 300 191 244 71",
"output": "8147 7807"
},
{
"input": "1\n1",
"output": "1 0"
}
] | 1,670,091,234
| 2,147,483,647
|
PyPy 3-64
|
OK
|
TESTS
| 34
| 62
| 0
|
left, right = 0, int(input())-1
l = list(map(int, input().split()))
sree = 0
dima = 0
times = 1
while left<=right:
if times%2==0:
if l[left]<l[right]:
dima+=l[right]
right-=1
else:
dima+=l[left]
left+=1
else:
if l[left]<l[right]:
sree+=l[right]
right-=1
else:
sree+=l[left]
left+=1
times+=1
print(sree, dima)
|
Title: Sereja and Dima
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Sereja and Dima play a game. The rules of the game are very simple. The players have *n* cards in a row. Each card contains a number, all numbers on the cards are distinct. The players take turns, Sereja moves first. During his turn a player can take one card: either the leftmost card in a row, or the rightmost one. The game ends when there is no more cards. The player who has the maximum sum of numbers on his cards by the end of the game, wins.
Sereja and Dima are being greedy. Each of them chooses the card with the larger number during his move.
Inna is a friend of Sereja and Dima. She knows which strategy the guys are using, so she wants to determine the final score, given the initial state of the game. Help her.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=1000) — the number of cards on the table. The second line contains space-separated numbers on the cards from left to right. The numbers on the cards are distinct integers from 1 to 1000.
Output Specification:
On a single line, print two integers. The first number is the number of Sereja's points at the end of the game, the second number is the number of Dima's points at the end of the game.
Demo Input:
['4\n4 1 2 10\n', '7\n1 2 3 4 5 6 7\n']
Demo Output:
['12 5\n', '16 12\n']
Note:
In the first sample Sereja will take cards with numbers 10 and 2, so Sereja's sum is 12. Dima will take cards with numbers 4 and 1, so Dima's sum is 5.
|
```python
left, right = 0, int(input())-1
l = list(map(int, input().split()))
sree = 0
dima = 0
times = 1
while left<=right:
if times%2==0:
if l[left]<l[right]:
dima+=l[right]
right-=1
else:
dima+=l[left]
left+=1
else:
if l[left]<l[right]:
sree+=l[right]
right-=1
else:
sree+=l[left]
left+=1
times+=1
print(sree, dima)
```
| 3
|
|
289
|
B
|
Polo the Penguin and Matrix
|
PROGRAMMING
| 1,400
|
[
"brute force",
"dp",
"implementation",
"sortings",
"ternary search"
] | null | null |
Little penguin Polo has an *n*<=×<=*m* matrix, consisting of integers. Let's index the matrix rows from 1 to *n* from top to bottom and let's index the columns from 1 to *m* from left to right. Let's represent the matrix element on the intersection of row *i* and column *j* as *a**ij*.
In one move the penguin can add or subtract number *d* from some matrix element. Find the minimum number of moves needed to make all matrix elements equal. If the described plan is impossible to carry out, say so.
|
The first line contains three integers *n*, *m* and *d* (1<=≤<=*n*,<=*m*<=≤<=100,<=1<=≤<=*d*<=≤<=104) — the matrix sizes and the *d* parameter. Next *n* lines contain the matrix: the *j*-th integer in the *i*-th row is the matrix element *a**ij* (1<=≤<=*a**ij*<=≤<=104).
|
In a single line print a single integer — the minimum number of moves the penguin needs to make all matrix elements equal. If that is impossible, print "-1" (without the quotes).
|
[
"2 2 2\n2 4\n6 8\n",
"1 2 7\n6 7\n"
] |
[
"4\n",
"-1\n"
] |
none
| 1,000
|
[
{
"input": "2 2 2\n2 4\n6 8",
"output": "4"
},
{
"input": "1 2 7\n6 7",
"output": "-1"
},
{
"input": "3 2 1\n5 7\n1 2\n5 100",
"output": "104"
},
{
"input": "3 3 3\n5 8 5\n11 11 17\n14 5 2",
"output": "12"
},
{
"input": "3 3 3\n5 8 5\n11 11 17\n14 5 3",
"output": "-1"
},
{
"input": "2 2 4\n5 5\n5 5",
"output": "0"
},
{
"input": "7 4 5\n7 7 7 12\n7 12 12 7\n7 7 7 7\n7 7 12 7\n7 7 12 12\n12 12 7 12\n7 7 7 7",
"output": "9"
},
{
"input": "7 7 47\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91",
"output": "0"
},
{
"input": "7 7 47\n47 47 47 47 47 47 47\n47 47 47 47 77 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 127 47",
"output": "-1"
},
{
"input": "7 5 47\n9583 1734 4601 5353 2110\n3802 5165 7985 6293 324\n7045 653 9160 7891 4930\n1781 3520 4178 2298 3943\n1405 2956 5447 5494 6528\n3097 1640 7750 4883 8032\n4225 8455 1875 4789 4366",
"output": "1508"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "1 1 8\n12",
"output": "0"
}
] | 1,635,660,358
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 18
| 92
| 5,017,600
|
import sys
import os.path
if(os.path.exists('input.txt')) :
sys.stdin = open("input.txt", "r")
sys.stdout = open("output.txt", "w")
sys.stderr = open("error.txt", "w")
depth = 1000000
mod = 1000000007
lim = mod * mod
sys.setrecursionlimit(depth)
linp = lambda: list(minp())
minp = lambda: map(int, input().split())
from math import inf, ceil, sqrt, log2, gcd
from collections import defaultdict, deque
dxy = [(1, 0),(-1, 0),(0, 1),(0, -1)]
n, m, d = minp()
g = list()
for _ in range(n) :
g += linp()
p = [e%d for e in g]
if len(set(p)) > 1 :
print(-1)
else :
g.sort()
x = g[len(g)//2]
y = g[(len(g)+1) // 2]
ans = inf
c = 0
for e in g :
c += abs(e-x) // d
ans = min(c, ans)
c = 0
for e in g :
c += abs(e-y) // d
ans = min(c, ans)
print(ans)
|
Title: Polo the Penguin and Matrix
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Little penguin Polo has an *n*<=×<=*m* matrix, consisting of integers. Let's index the matrix rows from 1 to *n* from top to bottom and let's index the columns from 1 to *m* from left to right. Let's represent the matrix element on the intersection of row *i* and column *j* as *a**ij*.
In one move the penguin can add or subtract number *d* from some matrix element. Find the minimum number of moves needed to make all matrix elements equal. If the described plan is impossible to carry out, say so.
Input Specification:
The first line contains three integers *n*, *m* and *d* (1<=≤<=*n*,<=*m*<=≤<=100,<=1<=≤<=*d*<=≤<=104) — the matrix sizes and the *d* parameter. Next *n* lines contain the matrix: the *j*-th integer in the *i*-th row is the matrix element *a**ij* (1<=≤<=*a**ij*<=≤<=104).
Output Specification:
In a single line print a single integer — the minimum number of moves the penguin needs to make all matrix elements equal. If that is impossible, print "-1" (without the quotes).
Demo Input:
['2 2 2\n2 4\n6 8\n', '1 2 7\n6 7\n']
Demo Output:
['4\n', '-1\n']
Note:
none
|
```python
import sys
import os.path
if(os.path.exists('input.txt')) :
sys.stdin = open("input.txt", "r")
sys.stdout = open("output.txt", "w")
sys.stderr = open("error.txt", "w")
depth = 1000000
mod = 1000000007
lim = mod * mod
sys.setrecursionlimit(depth)
linp = lambda: list(minp())
minp = lambda: map(int, input().split())
from math import inf, ceil, sqrt, log2, gcd
from collections import defaultdict, deque
dxy = [(1, 0),(-1, 0),(0, 1),(0, -1)]
n, m, d = minp()
g = list()
for _ in range(n) :
g += linp()
p = [e%d for e in g]
if len(set(p)) > 1 :
print(-1)
else :
g.sort()
x = g[len(g)//2]
y = g[(len(g)+1) // 2]
ans = inf
c = 0
for e in g :
c += abs(e-x) // d
ans = min(c, ans)
c = 0
for e in g :
c += abs(e-y) // d
ans = min(c, ans)
print(ans)
```
| -1
|
|
248
|
A
|
Cupboards
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
One foggy Stockholm morning, Karlsson decided to snack on some jam in his friend Lillebror Svantenson's house. Fortunately for Karlsson, there wasn't anybody in his friend's house. Karlsson was not going to be hungry any longer, so he decided to get some food in the house.
Karlsson's gaze immediately fell on *n* wooden cupboards, standing in the kitchen. He immediately realized that these cupboards have hidden jam stocks. Karlsson began to fly greedily around the kitchen, opening and closing the cupboards' doors, grab and empty all the jars of jam that he could find.
And now all jars of jam are empty, Karlsson has had enough and does not want to leave traces of his stay, so as not to let down his friend. Each of the cupboards has two doors: the left one and the right one. Karlsson remembers that when he rushed to the kitchen, all the cupboards' left doors were in the same position (open or closed), similarly, all the cupboards' right doors were in the same position (open or closed). Karlsson wants the doors to meet this condition as well by the time the family returns. Karlsson does not remember the position of all the left doors, also, he cannot remember the position of all the right doors. Therefore, it does not matter to him in what position will be all left or right doors. It is important to leave all the left doors in the same position, and all the right doors in the same position. For example, all the left doors may be closed, and all the right ones may be open.
Karlsson needs one second to open or close a door of a cupboard. He understands that he has very little time before the family returns, so he wants to know the minimum number of seconds *t*, in which he is able to bring all the cupboard doors in the required position.
Your task is to write a program that will determine the required number of seconds *t*.
|
The first input line contains a single integer *n* — the number of cupboards in the kitchen (2<=≤<=*n*<=≤<=104). Then follow *n* lines, each containing two integers *l**i* and *r**i* (0<=≤<=*l**i*,<=*r**i*<=≤<=1). Number *l**i* equals one, if the left door of the *i*-th cupboard is opened, otherwise number *l**i* equals zero. Similarly, number *r**i* equals one, if the right door of the *i*-th cupboard is opened, otherwise number *r**i* equals zero.
The numbers in the lines are separated by single spaces.
|
In the only output line print a single integer *t* — the minimum number of seconds Karlsson needs to change the doors of all cupboards to the position he needs.
|
[
"5\n0 1\n1 0\n0 1\n1 1\n0 1\n"
] |
[
"3\n"
] |
none
| 500
|
[
{
"input": "5\n0 1\n1 0\n0 1\n1 1\n0 1",
"output": "3"
},
{
"input": "2\n0 0\n0 0",
"output": "0"
},
{
"input": "3\n0 1\n1 1\n1 1",
"output": "1"
},
{
"input": "8\n0 1\n1 0\n0 1\n1 1\n0 1\n1 0\n0 1\n1 0",
"output": "7"
},
{
"input": "8\n1 0\n1 0\n1 0\n0 1\n0 1\n1 1\n1 1\n0 1",
"output": "6"
},
{
"input": "15\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "5\n1 0\n1 0\n1 0\n0 1\n0 1",
"output": "4"
}
] | 1,635,431,879
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 57
| 124
| 4,505,600
|
n = int(input())
leftOpen, rightOpen = 0, 0
for i in range(n):
left, right = [int(x) for x in input().split()]
if left == 0:
leftOpen += 1
if right == 0:
rightOpen += 1
res = min(leftOpen, n - leftOpen) + min(rightOpen, n - rightOpen)
print(res)
|
Title: Cupboards
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
One foggy Stockholm morning, Karlsson decided to snack on some jam in his friend Lillebror Svantenson's house. Fortunately for Karlsson, there wasn't anybody in his friend's house. Karlsson was not going to be hungry any longer, so he decided to get some food in the house.
Karlsson's gaze immediately fell on *n* wooden cupboards, standing in the kitchen. He immediately realized that these cupboards have hidden jam stocks. Karlsson began to fly greedily around the kitchen, opening and closing the cupboards' doors, grab and empty all the jars of jam that he could find.
And now all jars of jam are empty, Karlsson has had enough and does not want to leave traces of his stay, so as not to let down his friend. Each of the cupboards has two doors: the left one and the right one. Karlsson remembers that when he rushed to the kitchen, all the cupboards' left doors were in the same position (open or closed), similarly, all the cupboards' right doors were in the same position (open or closed). Karlsson wants the doors to meet this condition as well by the time the family returns. Karlsson does not remember the position of all the left doors, also, he cannot remember the position of all the right doors. Therefore, it does not matter to him in what position will be all left or right doors. It is important to leave all the left doors in the same position, and all the right doors in the same position. For example, all the left doors may be closed, and all the right ones may be open.
Karlsson needs one second to open or close a door of a cupboard. He understands that he has very little time before the family returns, so he wants to know the minimum number of seconds *t*, in which he is able to bring all the cupboard doors in the required position.
Your task is to write a program that will determine the required number of seconds *t*.
Input Specification:
The first input line contains a single integer *n* — the number of cupboards in the kitchen (2<=≤<=*n*<=≤<=104). Then follow *n* lines, each containing two integers *l**i* and *r**i* (0<=≤<=*l**i*,<=*r**i*<=≤<=1). Number *l**i* equals one, if the left door of the *i*-th cupboard is opened, otherwise number *l**i* equals zero. Similarly, number *r**i* equals one, if the right door of the *i*-th cupboard is opened, otherwise number *r**i* equals zero.
The numbers in the lines are separated by single spaces.
Output Specification:
In the only output line print a single integer *t* — the minimum number of seconds Karlsson needs to change the doors of all cupboards to the position he needs.
Demo Input:
['5\n0 1\n1 0\n0 1\n1 1\n0 1\n']
Demo Output:
['3\n']
Note:
none
|
```python
n = int(input())
leftOpen, rightOpen = 0, 0
for i in range(n):
left, right = [int(x) for x in input().split()]
if left == 0:
leftOpen += 1
if right == 0:
rightOpen += 1
res = min(leftOpen, n - leftOpen) + min(rightOpen, n - rightOpen)
print(res)
```
| 3
|
|
58
|
A
|
Chat room
|
PROGRAMMING
| 1,000
|
[
"greedy",
"strings"
] |
A. Chat room
|
1
|
256
|
Vasya has recently learned to type and log on to the Internet. He immediately entered a chat room and decided to say hello to everybody. Vasya typed the word *s*. It is considered that Vasya managed to say hello if several letters can be deleted from the typed word so that it resulted in the word "hello". For example, if Vasya types the word "ahhellllloou", it will be considered that he said hello, and if he types "hlelo", it will be considered that Vasya got misunderstood and he didn't manage to say hello. Determine whether Vasya managed to say hello by the given word *s*.
|
The first and only line contains the word *s*, which Vasya typed. This word consisits of small Latin letters, its length is no less that 1 and no more than 100 letters.
|
If Vasya managed to say hello, print "YES", otherwise print "NO".
|
[
"ahhellllloou\n",
"hlelo\n"
] |
[
"YES\n",
"NO\n"
] |
none
| 500
|
[
{
"input": "ahhellllloou",
"output": "YES"
},
{
"input": "hlelo",
"output": "NO"
},
{
"input": "helhcludoo",
"output": "YES"
},
{
"input": "hehwelloho",
"output": "YES"
},
{
"input": "pnnepelqomhhheollvlo",
"output": "YES"
},
{
"input": "tymbzjyqhymedasloqbq",
"output": "NO"
},
{
"input": "yehluhlkwo",
"output": "NO"
},
{
"input": "hatlevhhalrohairnolsvocafgueelrqmlqlleello",
"output": "YES"
},
{
"input": "hhhtehdbllnhwmbyhvelqqyoulretpbfokflhlhreeflxeftelziclrwllrpflflbdtotvlqgoaoqldlroovbfsq",
"output": "YES"
},
{
"input": "rzlvihhghnelqtwlexmvdjjrliqllolhyewgozkuovaiezgcilelqapuoeglnwmnlftxxiigzczlouooi",
"output": "YES"
},
{
"input": "pfhhwctyqdlkrwhebfqfelhyebwllhemtrmeblgrynmvyhioesqklclocxmlffuormljszllpoo",
"output": "YES"
},
{
"input": "lqllcolohwflhfhlnaow",
"output": "NO"
},
{
"input": "heheeellollvoo",
"output": "YES"
},
{
"input": "hellooo",
"output": "YES"
},
{
"input": "o",
"output": "NO"
},
{
"input": "hhqhzeclohlehljlhtesllylrolmomvuhcxsobtsckogdv",
"output": "YES"
},
{
"input": "yoegfuzhqsihygnhpnukluutocvvwuldiighpogsifealtgkfzqbwtmgghmythcxflebrkctlldlkzlagovwlstsghbouk",
"output": "YES"
},
{
"input": "uatqtgbvrnywfacwursctpagasnhydvmlinrcnqrry",
"output": "NO"
},
{
"input": "tndtbldbllnrwmbyhvqaqqyoudrstpbfokfoclnraefuxtftmgzicorwisrpfnfpbdtatvwqgyalqtdtrjqvbfsq",
"output": "NO"
},
{
"input": "rzlvirhgemelnzdawzpaoqtxmqucnahvqnwldklrmjiiyageraijfivigvozgwngiulttxxgzczptusoi",
"output": "YES"
},
{
"input": "kgyelmchocojsnaqdsyeqgnllytbqietpdlgknwwumqkxrexgdcnwoldicwzwofpmuesjuxzrasscvyuqwspm",
"output": "YES"
},
{
"input": "pnyvrcotjvgynbeldnxieghfltmexttuxzyac",
"output": "NO"
},
{
"input": "dtwhbqoumejligbenxvzhjlhosqojetcqsynlzyhfaevbdpekgbtjrbhlltbceobcok",
"output": "YES"
},
{
"input": "crrfpfftjwhhikwzeedrlwzblckkteseofjuxjrktcjfsylmlsvogvrcxbxtffujqshslemnixoeezivksouefeqlhhokwbqjz",
"output": "YES"
},
{
"input": "jhfbndhyzdvhbvhmhmefqllujdflwdpjbehedlsqfdsqlyelwjtyloxwsvasrbqosblzbowlqjmyeilcvotdlaouxhdpoeloaovb",
"output": "YES"
},
{
"input": "hwlghueoemiqtjhhpashjsouyegdlvoyzeunlroypoprnhlyiwiuxrghekaylndhrhllllwhbebezoglydcvykllotrlaqtvmlla",
"output": "YES"
},
{
"input": "wshiaunnqnqxodholbipwhhjmyeblhgpeleblklpzwhdunmpqkbuzloetmwwxmeltkrcomulxauzlwmlklldjodozxryghsnwgcz",
"output": "YES"
},
{
"input": "shvksednttggehroewuiptvvxtrzgidravtnjwuqrlnnkxbplctzkckinpkgjopjfoxdbojtcvsuvablcbkrzajrlhgobkcxeqti",
"output": "YES"
},
{
"input": "hyyhddqhxhekehkwfhlnlsihzefwchzerevcjtokefplholrbvxlltdlafjxrfhleglrvlolojoqaolagtbeyogxlbgfolllslli",
"output": "YES"
},
{
"input": "iaagrdhhelxpdegueiulflquvlzidoprzkehthkldaytrjwhyhprwjxlltinxvuilxohqgjqcvkkdcuoliekcnlilwgqlnlzouoo",
"output": "YES"
},
{
"input": "wfluaeseldgxyvxpwuhkptdmlflnlhktwxiabsvkolsquymrmhzczzoybvlilhmvsuunggvgxzgyyffk",
"output": "NO"
},
{
"input": "loee",
"output": "NO"
},
{
"input": "izdipwylefqmjbuoznfglgcfvedeouflkeehxbasaqmiooppfsqlhprospqgxvzrcpwlfdddngoqvpwvggsnvvxhmjoslwjudjlo",
"output": "NO"
},
{
"input": "pplynflbjlseflaegzqpdxswgunhnlglqhycrbcwdfhclmcrwekkzsoosmfblljeenwfjyifcvxihhhbyhmhlkvtskeglaovjnsi",
"output": "YES"
},
{
"input": "xqjqmenkodmlhzyzmmvofdngktygbbxbzpluzcohohmalkoeuwfikblltaaigv",
"output": "NO"
},
{
"input": "hello",
"output": "YES"
},
{
"input": "oohell",
"output": "NO"
},
{
"input": "hell",
"output": "NO"
},
{
"input": "eloellohoelo",
"output": "NO"
},
{
"input": "helllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllo",
"output": "YES"
}
] | 1,674,363,030
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 6
| 46
| 0
|
s=input()
f={}
d=0
for i in s:
if i in f:
f[i]+=1
else:
f[i]=1
for i in f:
if (f[i]>=2 and i!='l'):
d=1
break
if(d==1):
if(f['h']>0 and f['e']>0 and f['l']>1 and f['o']>0):
print('YES')
else:
print('NO')
else:
print('NO')
|
Title: Chat room
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Vasya has recently learned to type and log on to the Internet. He immediately entered a chat room and decided to say hello to everybody. Vasya typed the word *s*. It is considered that Vasya managed to say hello if several letters can be deleted from the typed word so that it resulted in the word "hello". For example, if Vasya types the word "ahhellllloou", it will be considered that he said hello, and if he types "hlelo", it will be considered that Vasya got misunderstood and he didn't manage to say hello. Determine whether Vasya managed to say hello by the given word *s*.
Input Specification:
The first and only line contains the word *s*, which Vasya typed. This word consisits of small Latin letters, its length is no less that 1 and no more than 100 letters.
Output Specification:
If Vasya managed to say hello, print "YES", otherwise print "NO".
Demo Input:
['ahhellllloou\n', 'hlelo\n']
Demo Output:
['YES\n', 'NO\n']
Note:
none
|
```python
s=input()
f={}
d=0
for i in s:
if i in f:
f[i]+=1
else:
f[i]=1
for i in f:
if (f[i]>=2 and i!='l'):
d=1
break
if(d==1):
if(f['h']>0 and f['e']>0 and f['l']>1 and f['o']>0):
print('YES')
else:
print('NO')
else:
print('NO')
```
| 0
|
550
|
C
|
Divisibility by Eight
|
PROGRAMMING
| 1,500
|
[
"brute force",
"dp",
"math"
] | null | null |
You are given a non-negative integer *n*, its decimal representation consists of at most 100 digits and doesn't contain leading zeroes.
Your task is to determine if it is possible in this case to remove some of the digits (possibly not remove any digit at all) so that the result contains at least one digit, forms a non-negative integer, doesn't have leading zeroes and is divisible by 8. After the removing, it is forbidden to rearrange the digits.
If a solution exists, you should print it.
|
The single line of the input contains a non-negative integer *n*. The representation of number *n* doesn't contain any leading zeroes and its length doesn't exceed 100 digits.
|
Print "NO" (without quotes), if there is no such way to remove some digits from number *n*.
Otherwise, print "YES" in the first line and the resulting number after removing digits from number *n* in the second line. The printed number must be divisible by 8.
If there are multiple possible answers, you may print any of them.
|
[
"3454\n",
"10\n",
"111111\n"
] |
[
"YES\n344\n",
"YES\n0\n",
"NO\n"
] |
none
| 1,000
|
[
{
"input": "3454",
"output": "YES\n344"
},
{
"input": "10",
"output": "YES\n0"
},
{
"input": "111111",
"output": "NO"
},
{
"input": "8996988892",
"output": "YES\n8"
},
{
"input": "5555555555",
"output": "NO"
},
{
"input": "1",
"output": "NO"
},
{
"input": "8147522776919916277306861346922924221557534659480258977017038624458370459299847590937757625791239188",
"output": "YES\n8"
},
{
"input": "8",
"output": "YES\n8"
},
{
"input": "14",
"output": "NO"
},
{
"input": "2363",
"output": "NO"
},
{
"input": "3554",
"output": "NO"
},
{
"input": "312",
"output": "YES\n32"
},
{
"input": "7674",
"output": "YES\n64"
},
{
"input": "126",
"output": "YES\n16"
},
{
"input": "344",
"output": "YES\n344"
},
{
"input": "976",
"output": "YES\n96"
},
{
"input": "3144",
"output": "YES\n344"
},
{
"input": "1492",
"output": "YES\n192"
},
{
"input": "1000",
"output": "YES\n0"
},
{
"input": "303",
"output": "YES\n0"
},
{
"input": "111111111111111111111171111111111111111111111111111112",
"output": "YES\n72"
},
{
"input": "3111111111111111111111411111111111111111111141111111441",
"output": "YES\n344"
},
{
"input": "7486897358699809313898215064443112428113331907121460549315254356705507612143346801724124391167293733",
"output": "YES\n8"
},
{
"input": "1787075866",
"output": "YES\n8"
},
{
"input": "836501278190105055089734832290981",
"output": "YES\n8"
},
{
"input": "1111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111",
"output": "NO"
},
{
"input": "2222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222",
"output": "NO"
},
{
"input": "3333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333",
"output": "NO"
},
{
"input": "1000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "YES\n0"
},
{
"input": "5555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555",
"output": "NO"
},
{
"input": "66666666666666666666666666666666666666666666666666666666666666666666666666666",
"output": "NO"
},
{
"input": "88888888888888888888888888888888888888888888888888888888888888888888888888888888",
"output": "YES\n8"
},
{
"input": "9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999",
"output": "NO"
},
{
"input": "353",
"output": "NO"
},
{
"input": "39",
"output": "NO"
},
{
"input": "3697519",
"output": "NO"
},
{
"input": "6673177113",
"output": "NO"
},
{
"input": "6666351371557713735",
"output": "NO"
},
{
"input": "17943911115335733153157373517",
"output": "NO"
},
{
"input": "619715515939999957957971971757533319177373",
"output": "NO"
},
{
"input": "4655797151375799393395377959959573533195153397997597195199777159133",
"output": "NO"
},
{
"input": "5531399953495399131957773999751571911139197159755793777773799119333593915333593153173775755771193715",
"output": "NO"
},
{
"input": "1319571733331774579193199551977735199771153997797535591739153377377111795579371959933533573517995559",
"output": "NO"
},
{
"input": "3313393139519343957311771319713797711159791515393917539133957799131393735795317131513557337319131993",
"output": "NO"
},
{
"input": "526",
"output": "YES\n56"
},
{
"input": "513",
"output": "NO"
},
{
"input": "674",
"output": "YES\n64"
},
{
"input": "8353",
"output": "YES\n8"
},
{
"input": "3957",
"output": "NO"
},
{
"input": "4426155776626276881222352363321488266188669874572115686737742545442766138617391954346963915982759371",
"output": "YES\n8"
},
{
"input": "9592419524227735697379444145348135927975358347769514686865768941989693174565893724972575152874281772",
"output": "YES\n8"
},
{
"input": "94552498866729239313265973246288189853135485783461",
"output": "YES\n8"
},
{
"input": "647934465937812",
"output": "YES\n8"
},
{
"input": "1327917795375366484539554526312125336",
"output": "YES\n8"
},
{
"input": "295971811535848297878828225646878276486982655866912496735794542",
"output": "YES\n8"
},
{
"input": "7217495392264549817889283233368819844137671271383133997418139697797385729777632527678136",
"output": "YES\n8"
},
{
"input": "11111111111111111111112111111111",
"output": "YES\n112"
},
{
"input": "262626262626262626262626262626262626",
"output": "NO"
},
{
"input": "1000000000000000000000000000000000000",
"output": "YES\n0"
},
{
"input": "9969929446",
"output": "YES\n96"
},
{
"input": "43523522125549722432232256557771715456345544922144",
"output": "YES\n32"
},
{
"input": "9344661521956564755454992376342544254667536539463277572111263273131199437332443253296774957",
"output": "YES\n96"
},
{
"input": "1946374341357914632311595531429723377642197432217137651552992479954116463332543456759911377223599715",
"output": "YES\n16"
},
{
"input": "461259",
"output": "NO"
},
{
"input": "461592",
"output": "YES\n152"
},
{
"input": "46159237",
"output": "YES\n152"
},
{
"input": "42367",
"output": "NO"
},
{
"input": "42376",
"output": "YES\n376"
},
{
"input": "42376159",
"output": "YES\n376"
},
{
"input": "444444444444444444444444444444666666666666666666666666666666222222222222222222222222222222",
"output": "NO"
},
{
"input": "0",
"output": "YES\n0"
},
{
"input": "33332",
"output": "YES\n32"
},
{
"input": "6499999999",
"output": "YES\n64"
}
] | 1,674,154,236
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 2
| 31
| 0
|
from itertools import combinations
def sol(num):
combs = []
for length in range(len(num) - 1, 0, -1):
combs += (list(combinations(num, length)))
for i in range(len(combs) - 1, -1, -1):
num = ""
for j in range(len(combs[i])):
num += combs[i][j]
if int(num) % 8 == 0:
return f"YES\n{num}"
print(sol([x for x in input()]))
|
Title: Divisibility by Eight
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a non-negative integer *n*, its decimal representation consists of at most 100 digits and doesn't contain leading zeroes.
Your task is to determine if it is possible in this case to remove some of the digits (possibly not remove any digit at all) so that the result contains at least one digit, forms a non-negative integer, doesn't have leading zeroes and is divisible by 8. After the removing, it is forbidden to rearrange the digits.
If a solution exists, you should print it.
Input Specification:
The single line of the input contains a non-negative integer *n*. The representation of number *n* doesn't contain any leading zeroes and its length doesn't exceed 100 digits.
Output Specification:
Print "NO" (without quotes), if there is no such way to remove some digits from number *n*.
Otherwise, print "YES" in the first line and the resulting number after removing digits from number *n* in the second line. The printed number must be divisible by 8.
If there are multiple possible answers, you may print any of them.
Demo Input:
['3454\n', '10\n', '111111\n']
Demo Output:
['YES\n344\n', 'YES\n0\n', 'NO\n']
Note:
none
|
```python
from itertools import combinations
def sol(num):
combs = []
for length in range(len(num) - 1, 0, -1):
combs += (list(combinations(num, length)))
for i in range(len(combs) - 1, -1, -1):
num = ""
for j in range(len(combs[i])):
num += combs[i][j]
if int(num) % 8 == 0:
return f"YES\n{num}"
print(sol([x for x in input()]))
```
| 0
|
|
227
|
B
|
Effective Approach
|
PROGRAMMING
| 1,100
|
[
"implementation"
] | null | null |
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
|
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
|
[
"2\n1 2\n1\n1\n",
"2\n2 1\n1\n1\n",
"3\n3 1 2\n3\n1 2 3\n"
] |
[
"1 2\n",
"2 1\n",
"6 6\n"
] |
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element).
| 1,000
|
[
{
"input": "2\n1 2\n1\n1",
"output": "1 2"
},
{
"input": "2\n2 1\n1\n1",
"output": "2 1"
},
{
"input": "3\n3 1 2\n3\n1 2 3",
"output": "6 6"
},
{
"input": "9\n2 9 3 1 6 4 7 8 5\n9\n5 1 5 2 8 4 4 4 5",
"output": "58 32"
},
{
"input": "10\n3 10 9 2 7 6 5 8 4 1\n1\n4",
"output": "9 2"
},
{
"input": "10\n5 2 10 8 3 1 9 7 6 4\n9\n2 5 9 2 3 2 5 9 8",
"output": "31 68"
},
{
"input": "9\n3 8 4 7 1 2 5 6 9\n3\n2 7 1",
"output": "15 15"
},
{
"input": "9\n5 3 8 4 2 6 1 7 9\n4\n6 1 9 2",
"output": "27 13"
},
{
"input": "4\n1 3 2 4\n4\n3 1 2 3",
"output": "8 12"
},
{
"input": "3\n1 2 3\n8\n3 2 1 1 2 3 1 2",
"output": "15 17"
}
] | 1,644,829,531
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 5
| 4,000
| 7,372,800
|
n = int(input())
arr = list(map(int,input().split()))
m = int(input())
targets = list(map(int,input().split()))
count = 0
countb = 0
for i in range(n):
for j in range(m):
if targets[j] == arr[i]:
count = count + (i+1)
newarr = arr[::-1]
for i in range(n):
for j in range(m):
if targets[j] == newarr[i]:
countb = countb + (i+1)
print(count,countb)
|
Title: Effective Approach
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
Output Specification:
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
Demo Input:
['2\n1 2\n1\n1\n', '2\n2 1\n1\n1\n', '3\n3 1 2\n3\n1 2 3\n']
Demo Output:
['1 2\n', '2 1\n', '6 6\n']
Note:
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element).
|
```python
n = int(input())
arr = list(map(int,input().split()))
m = int(input())
targets = list(map(int,input().split()))
count = 0
countb = 0
for i in range(n):
for j in range(m):
if targets[j] == arr[i]:
count = count + (i+1)
newarr = arr[::-1]
for i in range(n):
for j in range(m):
if targets[j] == newarr[i]:
countb = countb + (i+1)
print(count,countb)
```
| 0
|
|
755
|
A
|
PolandBall and Hypothesis
|
PROGRAMMING
| 800
|
[
"brute force",
"graphs",
"math",
"number theory"
] | null | null |
PolandBall is a young, clever Ball. He is interested in prime numbers. He has stated a following hypothesis: "There exists such a positive integer *n* that for each positive integer *m* number *n*·*m*<=+<=1 is a prime number".
Unfortunately, PolandBall is not experienced yet and doesn't know that his hypothesis is incorrect. Could you prove it wrong? Write a program that finds a counterexample for any *n*.
|
The only number in the input is *n* (1<=≤<=*n*<=≤<=1000) — number from the PolandBall's hypothesis.
|
Output such *m* that *n*·*m*<=+<=1 is not a prime number. Your answer will be considered correct if you output any suitable *m* such that 1<=≤<=*m*<=≤<=103. It is guaranteed the the answer exists.
|
[
"3\n",
"4\n"
] |
[
"1",
"2"
] |
A prime number (or a prime) is a natural number greater than 1 that has no positive divisors other than 1 and itself.
For the first sample testcase, 3·1 + 1 = 4. We can output 1.
In the second sample testcase, 4·1 + 1 = 5. We cannot output 1 because 5 is prime. However, *m* = 2 is okay since 4·2 + 1 = 9, which is not a prime number.
| 500
|
[
{
"input": "3",
"output": "1"
},
{
"input": "4",
"output": "2"
},
{
"input": "10",
"output": "2"
},
{
"input": "153",
"output": "1"
},
{
"input": "1000",
"output": "1"
},
{
"input": "1",
"output": "3"
},
{
"input": "2",
"output": "4"
},
{
"input": "5",
"output": "1"
},
{
"input": "6",
"output": "4"
},
{
"input": "7",
"output": "1"
},
{
"input": "8",
"output": "1"
},
{
"input": "9",
"output": "1"
},
{
"input": "11",
"output": "1"
},
{
"input": "998",
"output": "1"
},
{
"input": "996",
"output": "3"
},
{
"input": "36",
"output": "4"
},
{
"input": "210",
"output": "4"
},
{
"input": "270",
"output": "4"
},
{
"input": "306",
"output": "4"
},
{
"input": "330",
"output": "5"
},
{
"input": "336",
"output": "4"
},
{
"input": "600",
"output": "4"
},
{
"input": "726",
"output": "4"
},
{
"input": "988",
"output": "1"
},
{
"input": "12",
"output": "2"
},
{
"input": "987",
"output": "1"
},
{
"input": "13",
"output": "1"
},
{
"input": "986",
"output": "1"
},
{
"input": "14",
"output": "1"
},
{
"input": "985",
"output": "1"
},
{
"input": "15",
"output": "1"
},
{
"input": "984",
"output": "1"
},
{
"input": "16",
"output": "2"
},
{
"input": "983",
"output": "1"
},
{
"input": "17",
"output": "1"
},
{
"input": "982",
"output": "2"
},
{
"input": "18",
"output": "3"
},
{
"input": "981",
"output": "1"
},
{
"input": "19",
"output": "1"
},
{
"input": "980",
"output": "1"
},
{
"input": "20",
"output": "1"
},
{
"input": "979",
"output": "1"
},
{
"input": "21",
"output": "1"
},
{
"input": "978",
"output": "1"
},
{
"input": "22",
"output": "2"
},
{
"input": "977",
"output": "1"
},
{
"input": "23",
"output": "1"
},
{
"input": "976",
"output": "2"
},
{
"input": "24",
"output": "1"
},
{
"input": "975",
"output": "1"
},
{
"input": "25",
"output": "1"
},
{
"input": "2",
"output": "4"
},
{
"input": "6",
"output": "4"
},
{
"input": "996",
"output": "3"
},
{
"input": "8",
"output": "1"
},
{
"input": "998",
"output": "1"
},
{
"input": "330",
"output": "5"
},
{
"input": "18",
"output": "3"
},
{
"input": "12",
"output": "2"
},
{
"input": "24",
"output": "1"
},
{
"input": "999",
"output": "1"
},
{
"input": "726",
"output": "4"
},
{
"input": "876",
"output": "3"
}
] | 1,698,226,288
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 1
| 30
| 0
|
def is_prime(n):
for i in range(2, n * n):
if i * i > n:
break
if n % i == 0:
return False
return True
n = int(input())
for i in range(1, 1001):
if (is_prime(n * i)):
print(i)
break
|
Title: PolandBall and Hypothesis
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
PolandBall is a young, clever Ball. He is interested in prime numbers. He has stated a following hypothesis: "There exists such a positive integer *n* that for each positive integer *m* number *n*·*m*<=+<=1 is a prime number".
Unfortunately, PolandBall is not experienced yet and doesn't know that his hypothesis is incorrect. Could you prove it wrong? Write a program that finds a counterexample for any *n*.
Input Specification:
The only number in the input is *n* (1<=≤<=*n*<=≤<=1000) — number from the PolandBall's hypothesis.
Output Specification:
Output such *m* that *n*·*m*<=+<=1 is not a prime number. Your answer will be considered correct if you output any suitable *m* such that 1<=≤<=*m*<=≤<=103. It is guaranteed the the answer exists.
Demo Input:
['3\n', '4\n']
Demo Output:
['1', '2']
Note:
A prime number (or a prime) is a natural number greater than 1 that has no positive divisors other than 1 and itself.
For the first sample testcase, 3·1 + 1 = 4. We can output 1.
In the second sample testcase, 4·1 + 1 = 5. We cannot output 1 because 5 is prime. However, *m* = 2 is okay since 4·2 + 1 = 9, which is not a prime number.
|
```python
def is_prime(n):
for i in range(2, n * n):
if i * i > n:
break
if n % i == 0:
return False
return True
n = int(input())
for i in range(1, 1001):
if (is_prime(n * i)):
print(i)
break
```
| 0
|
|
982
|
A
|
Row
|
PROGRAMMING
| 1,200
|
[
"brute force",
"constructive algorithms"
] | null | null |
You're given a row with $n$ chairs. We call a seating of people "maximal" if the two following conditions hold:
1. There are no neighbors adjacent to anyone seated. 1. It's impossible to seat one more person without violating the first rule.
The seating is given as a string consisting of zeros and ones ($0$ means that the corresponding seat is empty, $1$ — occupied). The goal is to determine whether this seating is "maximal".
Note that the first and last seats are not adjacent (if $n \ne 2$).
|
The first line contains a single integer $n$ ($1 \leq n \leq 1000$) — the number of chairs.
The next line contains a string of $n$ characters, each of them is either zero or one, describing the seating.
|
Output "Yes" (without quotation marks) if the seating is "maximal". Otherwise print "No".
You are allowed to print letters in whatever case you'd like (uppercase or lowercase).
|
[
"3\n101\n",
"4\n1011\n",
"5\n10001\n"
] |
[
"Yes\n",
"No\n",
"No\n"
] |
In sample case one the given seating is maximal.
In sample case two the person at chair three has a neighbour to the right.
In sample case three it is possible to seat yet another person into chair three.
| 500
|
[
{
"input": "3\n101",
"output": "Yes"
},
{
"input": "4\n1011",
"output": "No"
},
{
"input": "5\n10001",
"output": "No"
},
{
"input": "1\n0",
"output": "No"
},
{
"input": "1\n1",
"output": "Yes"
},
{
"input": "100\n0101001010101001010010010101001010100101001001001010010101010010101001001010101001001001010100101010",
"output": "Yes"
},
{
"input": "4\n0100",
"output": "No"
},
{
"input": "42\n011000100101001001101011011010100010011010",
"output": "No"
},
{
"input": "3\n001",
"output": "No"
},
{
"input": "64\n1001001010010010100101010010010100100101001001001001010100101001",
"output": "Yes"
},
{
"input": "3\n111",
"output": "No"
},
{
"input": "4\n0000",
"output": "No"
},
{
"input": "4\n0001",
"output": "No"
},
{
"input": "4\n0010",
"output": "No"
},
{
"input": "4\n0011",
"output": "No"
},
{
"input": "4\n0101",
"output": "Yes"
},
{
"input": "4\n0110",
"output": "No"
},
{
"input": "4\n0111",
"output": "No"
},
{
"input": "4\n1000",
"output": "No"
},
{
"input": "4\n1001",
"output": "Yes"
},
{
"input": "4\n1010",
"output": "Yes"
},
{
"input": "4\n1100",
"output": "No"
},
{
"input": "4\n1101",
"output": "No"
},
{
"input": "4\n1110",
"output": "No"
},
{
"input": "4\n1111",
"output": "No"
},
{
"input": "2\n00",
"output": "No"
},
{
"input": "2\n01",
"output": "Yes"
},
{
"input": "2\n10",
"output": "Yes"
},
{
"input": "2\n11",
"output": "No"
},
{
"input": "3\n000",
"output": "No"
},
{
"input": "3\n010",
"output": "Yes"
},
{
"input": "3\n011",
"output": "No"
},
{
"input": "3\n100",
"output": "No"
},
{
"input": "3\n110",
"output": "No"
},
{
"input": "100\n0111001010101110001100000010011000100101110010001100111110101110001110101010111000010010011000000110",
"output": "No"
},
{
"input": "357\n100101010010010010010100101001001010101010100100100100101001010101001010010100101001010100101001010010100100101001010101010101001001010100101010010100101001010100100100101010010010010100101010010010101001010010010101001001010010010101010100100101010010100100101001010100101001010100101001010010010010100101001010100100100100100100100101010101010010010100101",
"output": "Yes"
},
{
"input": "459\n000111000101010000100001001010111110011011010001100101111010111011101110111101111101100101100011011001100110001001111001101000111001011100110100011111011111000010000110010011100110011011111110011100001101001111000100111011001000001011111100110100001001001100101011100001110110100101011011110100100111101011000101110000100110100100010000000100001001111111000011101010010011001111010111001100000100111001010111011010000011000011100101101011101000011011000110011",
"output": "No"
},
{
"input": "3\n001",
"output": "No"
},
{
"input": "4\n0010",
"output": "No"
},
{
"input": "3\n111",
"output": "No"
},
{
"input": "4\n0110",
"output": "No"
},
{
"input": "2\n11",
"output": "No"
},
{
"input": "2\n10",
"output": "Yes"
},
{
"input": "2\n01",
"output": "Yes"
},
{
"input": "4\n1101",
"output": "No"
},
{
"input": "2\n00",
"output": "No"
},
{
"input": "4\n1111",
"output": "No"
},
{
"input": "15\n000010101010000",
"output": "No"
},
{
"input": "8\n10010100",
"output": "No"
},
{
"input": "5\n00100",
"output": "No"
},
{
"input": "6\n100100",
"output": "No"
},
{
"input": "7\n1000001",
"output": "No"
},
{
"input": "98\n10101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010",
"output": "Yes"
}
] | 1,540,253,015
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 3
| 109
| 0
|
_, sa = input(), input()
print(
"No" if ("11" in sa or "000" in sa or sa.startswith("00") or sa.endswith("00")) and sa != "0" else "Yes")
|
Title: Row
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You're given a row with $n$ chairs. We call a seating of people "maximal" if the two following conditions hold:
1. There are no neighbors adjacent to anyone seated. 1. It's impossible to seat one more person without violating the first rule.
The seating is given as a string consisting of zeros and ones ($0$ means that the corresponding seat is empty, $1$ — occupied). The goal is to determine whether this seating is "maximal".
Note that the first and last seats are not adjacent (if $n \ne 2$).
Input Specification:
The first line contains a single integer $n$ ($1 \leq n \leq 1000$) — the number of chairs.
The next line contains a string of $n$ characters, each of them is either zero or one, describing the seating.
Output Specification:
Output "Yes" (without quotation marks) if the seating is "maximal". Otherwise print "No".
You are allowed to print letters in whatever case you'd like (uppercase or lowercase).
Demo Input:
['3\n101\n', '4\n1011\n', '5\n10001\n']
Demo Output:
['Yes\n', 'No\n', 'No\n']
Note:
In sample case one the given seating is maximal.
In sample case two the person at chair three has a neighbour to the right.
In sample case three it is possible to seat yet another person into chair three.
|
```python
_, sa = input(), input()
print(
"No" if ("11" in sa or "000" in sa or sa.startswith("00") or sa.endswith("00")) and sa != "0" else "Yes")
```
| 0
|
|
558
|
B
|
Amr and The Large Array
|
PROGRAMMING
| 1,300
|
[
"implementation"
] | null | null |
Amr has got a large array of size *n*. Amr doesn't like large arrays so he intends to make it smaller.
Amr doesn't care about anything in the array except the beauty of it. The beauty of the array is defined to be the maximum number of times that some number occurs in this array. He wants to choose the smallest subsegment of this array such that the beauty of it will be the same as the original array.
Help Amr by choosing the smallest subsegment possible.
|
The first line contains one number *n* (1<=≤<=*n*<=≤<=105), the size of the array.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=106), representing elements of the array.
|
Output two integers *l*,<=*r* (1<=≤<=*l*<=≤<=*r*<=≤<=*n*), the beginning and the end of the subsegment chosen respectively.
If there are several possible answers you may output any of them.
|
[
"5\n1 1 2 2 1\n",
"5\n1 2 2 3 1\n",
"6\n1 2 2 1 1 2\n"
] |
[
"1 5",
"2 3",
"1 5"
] |
A subsegment *B* of an array *A* from *l* to *r* is an array of size *r* - *l* + 1 where *B*<sub class="lower-index">*i*</sub> = *A*<sub class="lower-index">*l* + *i* - 1</sub> for all 1 ≤ *i* ≤ *r* - *l* + 1
| 1,000
|
[
{
"input": "5\n1 1 2 2 1",
"output": "1 5"
},
{
"input": "5\n1 2 2 3 1",
"output": "2 3"
},
{
"input": "6\n1 2 2 1 1 2",
"output": "1 5"
},
{
"input": "10\n1 1000000 2 1000000 3 2 1000000 1 2 1",
"output": "2 7"
},
{
"input": "10\n1 2 3 4 5 5 1 2 3 4",
"output": "5 6"
},
{
"input": "10\n1 1 2 1 1 2 2 1 2 3",
"output": "1 8"
},
{
"input": "10\n5 4 3 2 1 1 2 3 4 5",
"output": "5 6"
},
{
"input": "10\n1 10 100 1000 10000 1 10 100 1000 10000",
"output": "1 6"
},
{
"input": "10\n9 9 9 9 8 9 8 8 8 8",
"output": "1 6"
},
{
"input": "10\n1 11 111 1111 1 11 11 1 1111 1111",
"output": "2 7"
}
] | 1,436,889,016
| 2,416
|
Python 3
|
COMPILATION_ERROR
|
PRETESTS
| 0
| 0
| 0
|
#include <iostream>
#include <iomanip>
#include <set>
#include <vector>
#include <utility>
#include <algorithm>
using namespace std;
const int N = 1000001;
int first[N] = {0};
int last[N] = {10000000};
int coun[N] = {0};
int arr[N];
int main()
{
int n, a;
cin >> n;
for(int i = 0; i < n; i++){
cin >> a;
coun [a] += 1;
if (first[a] == 0){
first[a] = i + 1;
}
last[a] = i + 1;
}
int ans = last[1] - first[1], indmax = 1;
for(int i = 1; i < 1000001; i++){
if ((coun[i] >= coun[indmax]) && (ans > (last[i] - first[i]))){
indmax = i;
ans = (last[indmax] - first[indmax]);
}
}
cout << first[indmax] << " " << last[indmax];
}
|
Title: Amr and The Large Array
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Amr has got a large array of size *n*. Amr doesn't like large arrays so he intends to make it smaller.
Amr doesn't care about anything in the array except the beauty of it. The beauty of the array is defined to be the maximum number of times that some number occurs in this array. He wants to choose the smallest subsegment of this array such that the beauty of it will be the same as the original array.
Help Amr by choosing the smallest subsegment possible.
Input Specification:
The first line contains one number *n* (1<=≤<=*n*<=≤<=105), the size of the array.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=106), representing elements of the array.
Output Specification:
Output two integers *l*,<=*r* (1<=≤<=*l*<=≤<=*r*<=≤<=*n*), the beginning and the end of the subsegment chosen respectively.
If there are several possible answers you may output any of them.
Demo Input:
['5\n1 1 2 2 1\n', '5\n1 2 2 3 1\n', '6\n1 2 2 1 1 2\n']
Demo Output:
['1 5', '2 3', '1 5']
Note:
A subsegment *B* of an array *A* from *l* to *r* is an array of size *r* - *l* + 1 where *B*<sub class="lower-index">*i*</sub> = *A*<sub class="lower-index">*l* + *i* - 1</sub> for all 1 ≤ *i* ≤ *r* - *l* + 1
|
```python
#include <iostream>
#include <iomanip>
#include <set>
#include <vector>
#include <utility>
#include <algorithm>
using namespace std;
const int N = 1000001;
int first[N] = {0};
int last[N] = {10000000};
int coun[N] = {0};
int arr[N];
int main()
{
int n, a;
cin >> n;
for(int i = 0; i < n; i++){
cin >> a;
coun [a] += 1;
if (first[a] == 0){
first[a] = i + 1;
}
last[a] = i + 1;
}
int ans = last[1] - first[1], indmax = 1;
for(int i = 1; i < 1000001; i++){
if ((coun[i] >= coun[indmax]) && (ans > (last[i] - first[i]))){
indmax = i;
ans = (last[indmax] - first[indmax]);
}
}
cout << first[indmax] << " " << last[indmax];
}
```
| -1
|
|
365
|
A
|
Good Number
|
PROGRAMMING
| 1,100
|
[
"implementation"
] | null | null |
Let's call a number *k*-good if it contains all digits not exceeding *k* (0,<=...,<=*k*). You've got a number *k* and an array *a* containing *n* numbers. Find out how many *k*-good numbers are in *a* (count each number every time it occurs in array *a*).
|
The first line contains integers *n* and *k* (1<=≤<=*n*<=≤<=100, 0<=≤<=*k*<=≤<=9). The *i*-th of the following *n* lines contains integer *a**i* without leading zeroes (1<=≤<=*a**i*<=≤<=109).
|
Print a single integer — the number of *k*-good numbers in *a*.
|
[
"10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n",
"2 1\n1\n10\n"
] |
[
"10\n",
"1\n"
] |
none
| 500
|
[
{
"input": "10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560",
"output": "10"
},
{
"input": "2 1\n1\n10",
"output": "1"
},
{
"input": "1 0\n1000000000",
"output": "1"
},
{
"input": "1 1\n1000000000",
"output": "1"
},
{
"input": "6 0\n10\n102\n120\n1032\n1212103\n1999999",
"output": "5"
},
{
"input": "1 3\n1000000000",
"output": "0"
},
{
"input": "1 9\n1000000000",
"output": "0"
},
{
"input": "1 0\n1",
"output": "0"
},
{
"input": "1 1\n1",
"output": "0"
},
{
"input": "1 3\n1",
"output": "0"
},
{
"input": "1 9\n1",
"output": "0"
},
{
"input": "2 8\n123456780\n123",
"output": "1"
},
{
"input": "2 8\n12345678\n1230",
"output": "0"
},
{
"input": "6 1\n10\n102\n120\n1032\n1212103\n1999999",
"output": "5"
},
{
"input": "6 2\n10\n102\n120\n1032\n1212103\n1999999",
"output": "4"
},
{
"input": "6 3\n10\n102\n120\n1032\n1212103\n1999999",
"output": "2"
},
{
"input": "6 9\n10\n102\n120\n1032\n1212103\n1999999",
"output": "0"
},
{
"input": "1 2\n2220",
"output": "0"
}
] | 1,689,794,780
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 2
| 31
| 0
|
n,k=map(int,input().split())
c=0
for i in range(n):
a=list(map(int,input()))
b=set(a)
if len(a)==len(b)==k+1 and all(0 <= x <= k for x in a):
c+=1
print(c)
|
Title: Good Number
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Let's call a number *k*-good if it contains all digits not exceeding *k* (0,<=...,<=*k*). You've got a number *k* and an array *a* containing *n* numbers. Find out how many *k*-good numbers are in *a* (count each number every time it occurs in array *a*).
Input Specification:
The first line contains integers *n* and *k* (1<=≤<=*n*<=≤<=100, 0<=≤<=*k*<=≤<=9). The *i*-th of the following *n* lines contains integer *a**i* without leading zeroes (1<=≤<=*a**i*<=≤<=109).
Output Specification:
Print a single integer — the number of *k*-good numbers in *a*.
Demo Input:
['10 6\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n1234560\n', '2 1\n1\n10\n']
Demo Output:
['10\n', '1\n']
Note:
none
|
```python
n,k=map(int,input().split())
c=0
for i in range(n):
a=list(map(int,input()))
b=set(a)
if len(a)==len(b)==k+1 and all(0 <= x <= k for x in a):
c+=1
print(c)
```
| 0
|
|
227
|
B
|
Effective Approach
|
PROGRAMMING
| 1,100
|
[
"implementation"
] | null | null |
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
|
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
|
[
"2\n1 2\n1\n1\n",
"2\n2 1\n1\n1\n",
"3\n3 1 2\n3\n1 2 3\n"
] |
[
"1 2\n",
"2 1\n",
"6 6\n"
] |
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element).
| 1,000
|
[
{
"input": "2\n1 2\n1\n1",
"output": "1 2"
},
{
"input": "2\n2 1\n1\n1",
"output": "2 1"
},
{
"input": "3\n3 1 2\n3\n1 2 3",
"output": "6 6"
},
{
"input": "9\n2 9 3 1 6 4 7 8 5\n9\n5 1 5 2 8 4 4 4 5",
"output": "58 32"
},
{
"input": "10\n3 10 9 2 7 6 5 8 4 1\n1\n4",
"output": "9 2"
},
{
"input": "10\n5 2 10 8 3 1 9 7 6 4\n9\n2 5 9 2 3 2 5 9 8",
"output": "31 68"
},
{
"input": "9\n3 8 4 7 1 2 5 6 9\n3\n2 7 1",
"output": "15 15"
},
{
"input": "9\n5 3 8 4 2 6 1 7 9\n4\n6 1 9 2",
"output": "27 13"
},
{
"input": "4\n1 3 2 4\n4\n3 1 2 3",
"output": "8 12"
},
{
"input": "3\n1 2 3\n8\n3 2 1 1 2 3 1 2",
"output": "15 17"
}
] | 1,625,799,426
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 5
| 2,000
| 6,963,200
|
n = int(input())
arr = list(map(int,input().rstrip().split()))
q = int(input())
find = list(map(int, input().rstrip().split()))
f = 0
e = 0
for i in range(q):
for j in range(n):
if find[i]==arr[j]:
f+=1
break
else:
f+=1
for i in range(q):
for j in range(n):
if find[i] == arr[-(j+1)]:
e += 1
break
else:
e += 1
print(f, e)
|
Title: Effective Approach
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
Output Specification:
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
Demo Input:
['2\n1 2\n1\n1\n', '2\n2 1\n1\n1\n', '3\n3 1 2\n3\n1 2 3\n']
Demo Output:
['1 2\n', '2 1\n', '6 6\n']
Note:
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element).
|
```python
n = int(input())
arr = list(map(int,input().rstrip().split()))
q = int(input())
find = list(map(int, input().rstrip().split()))
f = 0
e = 0
for i in range(q):
for j in range(n):
if find[i]==arr[j]:
f+=1
break
else:
f+=1
for i in range(q):
for j in range(n):
if find[i] == arr[-(j+1)]:
e += 1
break
else:
e += 1
print(f, e)
```
| 0
|
|
61
|
A
|
Ultra-Fast Mathematician
|
PROGRAMMING
| 800
|
[
"implementation"
] |
A. Ultra-Fast Mathematician
|
2
|
256
|
Shapur was an extremely gifted student. He was great at everything including Combinatorics, Algebra, Number Theory, Geometry, Calculus, etc. He was not only smart but extraordinarily fast! He could manage to sum 1018 numbers in a single second.
One day in 230 AD Shapur was trying to find out if any one can possibly do calculations faster than him. As a result he made a very great contest and asked every one to come and take part.
In his contest he gave the contestants many different pairs of numbers. Each number is made from digits 0 or 1. The contestants should write a new number corresponding to the given pair of numbers. The rule is simple: The *i*-th digit of the answer is 1 if and only if the *i*-th digit of the two given numbers differ. In the other case the *i*-th digit of the answer is 0.
Shapur made many numbers and first tried his own speed. He saw that he can perform these operations on numbers of length ∞ (length of a number is number of digits in it) in a glance! He always gives correct answers so he expects the contestants to give correct answers, too. He is a good fellow so he won't give anyone very big numbers and he always gives one person numbers of same length.
Now you are going to take part in Shapur's contest. See if you are faster and more accurate.
|
There are two lines in each input. Each of them contains a single number. It is guaranteed that the numbers are made from 0 and 1 only and that their length is same. The numbers may start with 0. The length of each number doesn't exceed 100.
|
Write one line — the corresponding answer. Do not omit the leading 0s.
|
[
"1010100\n0100101\n",
"000\n111\n",
"1110\n1010\n",
"01110\n01100\n"
] |
[
"1110001\n",
"111\n",
"0100\n",
"00010\n"
] |
none
| 500
|
[
{
"input": "1010100\n0100101",
"output": "1110001"
},
{
"input": "000\n111",
"output": "111"
},
{
"input": "1110\n1010",
"output": "0100"
},
{
"input": "01110\n01100",
"output": "00010"
},
{
"input": "011101\n000001",
"output": "011100"
},
{
"input": "10\n01",
"output": "11"
},
{
"input": "00111111\n11011101",
"output": "11100010"
},
{
"input": "011001100\n101001010",
"output": "110000110"
},
{
"input": "1100100001\n0110101100",
"output": "1010001101"
},
{
"input": "00011101010\n10010100101",
"output": "10001001111"
},
{
"input": "100000101101\n111010100011",
"output": "011010001110"
},
{
"input": "1000001111010\n1101100110001",
"output": "0101101001011"
},
{
"input": "01011111010111\n10001110111010",
"output": "11010001101101"
},
{
"input": "110010000111100\n001100101011010",
"output": "111110101100110"
},
{
"input": "0010010111110000\n0000000011010110",
"output": "0010010100100110"
},
{
"input": "00111110111110000\n01111100001100000",
"output": "01000010110010000"
},
{
"input": "101010101111010001\n001001111101111101",
"output": "100011010010101100"
},
{
"input": "0110010101111100000\n0011000101000000110",
"output": "0101010000111100110"
},
{
"input": "11110100011101010111\n00001000011011000000",
"output": "11111100000110010111"
},
{
"input": "101010101111101101001\n111010010010000011111",
"output": "010000111101101110110"
},
{
"input": "0000111111100011000010\n1110110110110000001010",
"output": "1110001001010011001000"
},
{
"input": "10010010101000110111000\n00101110100110111000111",
"output": "10111100001110001111111"
},
{
"input": "010010010010111100000111\n100100111111100011001110",
"output": "110110101101011111001001"
},
{
"input": "0101110100100111011010010\n0101100011010111001010001",
"output": "0000010111110000010000011"
},
{
"input": "10010010100011110111111011\n10000110101100000001000100",
"output": "00010100001111110110111111"
},
{
"input": "000001111000000100001000000\n011100111101111001110110001",
"output": "011101000101111101111110001"
},
{
"input": "0011110010001001011001011100\n0000101101000011101011001010",
"output": "0011011111001010110010010110"
},
{
"input": "11111000000000010011001101111\n11101110011001010100010000000",
"output": "00010110011001000111011101111"
},
{
"input": "011001110000110100001100101100\n001010000011110000001000101001",
"output": "010011110011000100000100000101"
},
{
"input": "1011111010001100011010110101111\n1011001110010000000101100010101",
"output": "0000110100011100011111010111010"
},
{
"input": "10111000100001000001010110000001\n10111000001100101011011001011000",
"output": "00000000101101101010001111011001"
},
{
"input": "000001010000100001000000011011100\n111111111001010100100001100000111",
"output": "111110101001110101100001111011011"
},
{
"input": "1101000000000010011011101100000110\n1110000001100010011010000011011110",
"output": "0011000001100000000001101111011000"
},
{
"input": "01011011000010100001100100011110001\n01011010111000001010010100001110000",
"output": "00000001111010101011110000010000001"
},
{
"input": "000011111000011001000110111100000100\n011011000110000111101011100111000111",
"output": "011000111110011110101101011011000011"
},
{
"input": "1001000010101110001000000011111110010\n0010001011010111000011101001010110000",
"output": "1011001001111001001011101010101000010"
},
{
"input": "00011101011001100101111111000000010101\n10010011011011001011111000000011101011",
"output": "10001110000010101110000111000011111110"
},
{
"input": "111011100110001001101111110010111001010\n111111101101111001110010000101101000100",
"output": "000100001011110000011101110111010001110"
},
{
"input": "1111001001101000001000000010010101001010\n0010111100111110001011000010111110111001",
"output": "1101110101010110000011000000101011110011"
},
{
"input": "00100101111000000101011111110010100011010\n11101110001010010101001000111110101010100",
"output": "11001011110010010000010111001100001001110"
},
{
"input": "101011001110110100101001000111010101101111\n100111100110101011010100111100111111010110",
"output": "001100101000011111111101111011101010111001"
},
{
"input": "1111100001100101000111101001001010011100001\n1000110011000011110010001011001110001000001",
"output": "0111010010100110110101100010000100010100000"
},
{
"input": "01100111011111010101000001101110000001110101\n10011001011111110000000101011001001101101100",
"output": "11111110000000100101000100110111001100011001"
},
{
"input": "110010100111000100100101100000011100000011001\n011001111011100110000110111001110110100111011",
"output": "101011011100100010100011011001101010100100010"
},
{
"input": "0001100111111011010110100100111000000111000110\n1100101011000000000001010010010111001100110001",
"output": "1101001100111011010111110110101111001011110111"
},
{
"input": "00000101110110110001110010100001110100000100000\n10010000110011110001101000111111101010011010001",
"output": "10010101000101000000011010011110011110011110001"
},
{
"input": "110000100101011100100011001111110011111110010001\n101011111001011100110110111101110011010110101100",
"output": "011011011100000000010101110010000000101000111101"
},
{
"input": "0101111101011111010101011101000011101100000000111\n0000101010110110001110101011011110111001010100100",
"output": "0101010111101001011011110110011101010101010100011"
},
{
"input": "11000100010101110011101000011111001010110111111100\n00001111000111001011111110000010101110111001000011",
"output": "11001011010010111000010110011101100100001110111111"
},
{
"input": "101000001101111101101111111000001110110010101101010\n010011100111100001100000010001100101000000111011011",
"output": "111011101010011100001111101001101011110010010110001"
},
{
"input": "0011111110010001010100010110111000110011001101010100\n0111000000100010101010000100101000000100101000111001",
"output": "0100111110110011111110010010010000110111100101101101"
},
{
"input": "11101010000110000011011010000001111101000111011111100\n10110011110001010100010110010010101001010111100100100",
"output": "01011001110111010111001100010011010100010000111011000"
},
{
"input": "011000100001000001101000010110100110011110100111111011\n111011001000001001110011001111011110111110110011011111",
"output": "100011101001001000011011011001111000100000010100100100"
},
{
"input": "0111010110010100000110111011010110100000000111110110000\n1011100100010001101100000100111111101001110010000100110",
"output": "1100110010000101101010111111101001001001110101110010110"
},
{
"input": "10101000100111000111010001011011011011110100110101100011\n11101111000000001100100011111000100100000110011001101110",
"output": "01000111100111001011110010100011111111110010101100001101"
},
{
"input": "000000111001010001000000110001001011100010011101010011011\n110001101000010010000101000100001111101001100100001010010",
"output": "110001010001000011000101110101000100001011111001011001001"
},
{
"input": "0101011100111010000111110010101101111111000000111100011100\n1011111110000010101110111001000011100000100111111111000111",
"output": "1110100010111000101001001011101110011111100111000011011011"
},
{
"input": "11001000001100100111100111100100101011000101001111001001101\n10111110100010000011010100110100100011101001100000001110110",
"output": "01110110101110100100110011010000001000101100101111000111011"
},
{
"input": "010111011011101000000110000110100110001110100001110110111011\n101011110011101011101101011111010100100001100111100100111011",
"output": "111100101000000011101011011001110010101111000110010010000000"
},
{
"input": "1001011110110110000100011001010110000100011010010111010101110\n1101111100001000010111110011010101111010010100000001000010111",
"output": "0100100010111110010011101010000011111110001110010110010111001"
},
{
"input": "10000010101111100111110101111000010100110111101101111111111010\n10110110101100101010011001011010100110111011101100011001100111",
"output": "00110100000011001101101100100010110010001100000001100110011101"
},
{
"input": "011111010011111000001010101001101001000010100010111110010100001\n011111001011000011111001000001111001010110001010111101000010011",
"output": "000000011000111011110011101000010000010100101000000011010110010"
},
{
"input": "1111000000110001011101000100100100001111011100001111001100011111\n1101100110000101100001100000001001011011111011010101000101001010",
"output": "0010100110110100111100100100101101010100100111011010001001010101"
},
{
"input": "01100000101010010011001110100110110010000110010011011001100100011\n10110110010110111100100111000111000110010000000101101110000010111",
"output": "11010110111100101111101001100001110100010110010110110111100110100"
},
{
"input": "001111111010000100001100001010011001111110011110010111110001100111\n110000101001011000100010101100100110000111100000001101001110010111",
"output": "111111010011011100101110100110111111111001111110011010111111110000"
},
{
"input": "1011101011101101011110101101011101011000010011100101010101000100110\n0001000001001111010111100100111101100000000001110001000110000000110",
"output": "1010101010100010001001001001100000111000010010010100010011000100000"
},
{
"input": "01000001011001010011011100010000100100110101111011011011110000001110\n01011110000110011011000000000011000111100001010000000011111001110000",
"output": "00011111011111001000011100010011100011010100101011011000001001111110"
},
{
"input": "110101010100110101000001111110110100010010000100111110010100110011100\n111010010111111011100110101011001011001110110111110100000110110100111",
"output": "001111000011001110100111010101111111011100110011001010010010000111011"
},
{
"input": "1001101011000001011111100110010010000011010001001111011100010100110001\n1111100111110101001111010001010000011001001001010110001111000000100101",
"output": "0110001100110100010000110111000010011010011000011001010011010100010100"
},
{
"input": "00000111110010110001110110001010010101000111011001111111100110011110010\n00010111110100000100110101000010010001100001100011100000001100010100010",
"output": "00010000000110110101000011001000000100100110111010011111101010001010000"
},
{
"input": "100101011100101101000011010001011001101110101110001100010001010111001110\n100001111100101011011111110000001111000111001011111110000010101110111001",
"output": "000100100000000110011100100001010110101001100101110010010011111001110111"
},
{
"input": "1101100001000111001101001011101000111000011110000001001101101001111011010\n0101011101010100011011010110101000010010110010011110101100000110110001000",
"output": "1000111100010011010110011101000000101010101100011111100001101111001010010"
},
{
"input": "01101101010011110101100001110101111011100010000010001101111000011110111111\n00101111001101001100111010000101110000100101101111100111101110010100011011",
"output": "01000010011110111001011011110000001011000111101101101010010110001010100100"
},
{
"input": "101100101100011001101111110110110010100110110010100001110010110011001101011\n000001011010101011110011111101001110000111000010001101000010010000010001101",
"output": "101101110110110010011100001011111100100001110000101100110000100011011100110"
},
{
"input": "0010001011001010001100000010010011110110011000100000000100110000101111001110\n1100110100111000110100001110111001011101001100001010100001010011100110110001",
"output": "1110111111110010111000001100101010101011010100101010100101100011001001111111"
},
{
"input": "00101101010000000101011001101011001100010001100000101011101110000001111001000\n10010110010111000000101101000011101011001010000011011101101011010000000011111",
"output": "10111011000111000101110100101000100111011011100011110110000101010001111010111"
},
{
"input": "111100000100100000101001100001001111001010001000001000000111010000010101101011\n001000100010100101111011111011010110101100001111011000010011011011100010010110",
"output": "110100100110000101010010011010011001100110000111010000010100001011110111111101"
},
{
"input": "0110001101100100001111110101101000100101010010101010011001101001001101110000000\n0111011000000010010111011110010000000001000110001000011001101000000001110100111",
"output": "0001010101100110011000101011111000100100010100100010000000000001001100000100111"
},
{
"input": "10001111111001000101001011110101111010100001011010101100111001010001010010001000\n10000111010010011110111000111010101100000011110001101111001000111010100000000001",
"output": "00001000101011011011110011001111010110100010101011000011110001101011110010001001"
},
{
"input": "100110001110110000100101001110000011110110000110000000100011110100110110011001101\n110001110101110000000100101001101011111100100100001001000110000001111100011110110",
"output": "010111111011000000100001100111101000001010100010001001100101110101001010000111011"
},
{
"input": "0000010100100000010110111100011111111010011101000000100000011001001101101100111010\n0100111110011101010110101011110110010111001111000110101100101110111100101000111111",
"output": "0100101010111101000000010111101001101101010010000110001100110111110001000100000101"
},
{
"input": "11000111001010100001110000001001011010010010110000001110100101000001010101100110111\n11001100100100100001101010110100000111100011101110011010110100001001000011011011010",
"output": "00001011101110000000011010111101011101110001011110010100010001001000010110111101101"
},
{
"input": "010110100010001000100010101001101010011010111110100001000100101000111011100010100001\n110000011111101101010011111000101010111010100001001100001001100101000000111000000000",
"output": "100110111101100101110001010001000000100000011111101101001101001101111011011010100001"
},
{
"input": "0000011110101110010101110110110101100001011001101010101001000010000010000000101001101\n1100111111011100000110000111101110011111100111110001011001000010011111100001001100011",
"output": "1100100001110010010011110001011011111110111110011011110000000000011101100001100101110"
},
{
"input": "10100000101101110001100010010010100101100011010010101000110011100000101010110010000000\n10001110011011010010111011011101101111000111110000111000011010010101001100000001010011",
"output": "00101110110110100011011001001111001010100100100010010000101001110101100110110011010011"
},
{
"input": "001110000011111101101010011111000101010111010100001001100001001100101000000111000000000\n111010000000000000101001110011001000111011001100101010011001000011101001001011110000011",
"output": "110100000011111101000011101100001101101100011000100011111000001111000001001100110000011"
},
{
"input": "1110111100111011010101011011001110001010010010110011110010011111000010011111010101100001\n1001010101011001001010100010101100000110111101011000100010101111111010111100001110010010",
"output": "0111101001100010011111111001100010001100101111101011010000110000111000100011011011110011"
},
{
"input": "11100010001100010011001100001100010011010001101110011110100101110010101101011101000111111\n01110000000110111010110100001010000101011110100101010011000110101110101101110111011110001",
"output": "10010010001010101001111000000110010110001111001011001101100011011100000000101010011001110"
},
{
"input": "001101011001100101101100110000111000101011001001100100000100101000100000110100010111111101\n101001111110000010111101111110001001111001111101111010000110111000100100110010010001011111",
"output": "100100100111100111010001001110110001010010110100011110000010010000000100000110000110100010"
},
{
"input": "1010110110010101000110010010110101011101010100011001101011000110000000100011100100011000000\n0011011111100010001111101101000111001011101110100000110111100100101111010110101111011100011",
"output": "1001101001110111001001111111110010010110111010111001011100100010101111110101001011000100011"
},
{
"input": "10010010000111010111011111110010100101100000001100011100111011100010000010010001011100001100\n00111010100010110010000100010111010001111110100100100011101000101111111111001101101100100100",
"output": "10101000100101100101011011100101110100011110101000111111010011001101111101011100110000101000"
},
{
"input": "010101110001010101100000010111010000000111110011001101100011001000000011001111110000000010100\n010010111011100101010101111110110000000111000100001101101001001000001100101110001010000100001",
"output": "000111001010110000110101101001100000000000110111000000001010000000001111100001111010000110101"
},
{
"input": "1100111110011001000111101001001011000110011010111111100010111111001100111111011101100111101011\n1100000011001000110100110111000001011001010111101000010010100011000001100100111101101000010110",
"output": "0000111101010001110011011110001010011111001101010111110000011100001101011011100000001111111101"
},
{
"input": "00011000100100110111100101100100000000010011110111110010101110110011100001010111010011110100101\n00011011111011111011100101100111100101001110010111000010000111000100100100000001110101111011011",
"output": "00000011011111001100000000000011100101011101100000110000101001110111000101010110100110001111110"
},
{
"input": "000101011001001100000111100010110101111011110101111101000110001101011010111110110011100100000001\n011000101010011111011000111000100000000011011000000001111110001000001111101010110000011100001111",
"output": "011101110011010011011111011010010101111000101101111100111000000101010101010100000011111000001110"
},
{
"input": "1000101001011010000100100100010010011101011001110101111011101111111110010101001101010001010101001\n0110110010011100011111011111110111000000010001110100001010111110101011010011111011111110000110000",
"output": "1110011011000110011011111011100101011101001000000001110001010001010101000110110110101111010011001"
},
{
"input": "01111010010101100111110111111011011010100001011101010000111100101101101110111011001100101011100111\n00001100110110100001111011000010001001001100000010111101000001111011100000010111010010000011000010",
"output": "01110110100011000110001100111001010011101101011111101101111101010110001110101100011110101000100101"
},
{
"input": "111101011101111000001011001101111010110111001101110100100011111011011101001101010101011010111000110\n101111100101101101001100110011000001111010011101110111110110101110011011110011111100001001110101101",
"output": "010010111000010101000111111110111011001101010000000011010101010101000110111110101001010011001101011"
},
{
"input": "1010000011010110011101001101110001110010000111011101110010110110111111001001110100101100010101010001\n0111101000111100101100000101111010100100001000011101010100110011100011010011010101000100101011100011",
"output": "1101101011101010110001001000001011010110001111000000100110000101011100011010100001101000111110110010"
},
{
"input": "0000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001\n1111111010111111101011111110101111111010111111101011111110101111111010111111101011111110101111111010",
"output": "1111111010111111101011111110101111111010111111101011111110101111111010111111101011111110101111111011"
},
{
"input": "0\n0",
"output": "0"
},
{
"input": "0\n1",
"output": "1"
}
] | 1,500,750,620
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 102
| 62
| 4,608,000
|
T=input("")
T1=input("")
T2=""
for k in range(len(T)):
if(T[k]==T1[k]):
T2+="0"
else:
T2+="1"
print(T2)
|
Title: Ultra-Fast Mathematician
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Shapur was an extremely gifted student. He was great at everything including Combinatorics, Algebra, Number Theory, Geometry, Calculus, etc. He was not only smart but extraordinarily fast! He could manage to sum 1018 numbers in a single second.
One day in 230 AD Shapur was trying to find out if any one can possibly do calculations faster than him. As a result he made a very great contest and asked every one to come and take part.
In his contest he gave the contestants many different pairs of numbers. Each number is made from digits 0 or 1. The contestants should write a new number corresponding to the given pair of numbers. The rule is simple: The *i*-th digit of the answer is 1 if and only if the *i*-th digit of the two given numbers differ. In the other case the *i*-th digit of the answer is 0.
Shapur made many numbers and first tried his own speed. He saw that he can perform these operations on numbers of length ∞ (length of a number is number of digits in it) in a glance! He always gives correct answers so he expects the contestants to give correct answers, too. He is a good fellow so he won't give anyone very big numbers and he always gives one person numbers of same length.
Now you are going to take part in Shapur's contest. See if you are faster and more accurate.
Input Specification:
There are two lines in each input. Each of them contains a single number. It is guaranteed that the numbers are made from 0 and 1 only and that their length is same. The numbers may start with 0. The length of each number doesn't exceed 100.
Output Specification:
Write one line — the corresponding answer. Do not omit the leading 0s.
Demo Input:
['1010100\n0100101\n', '000\n111\n', '1110\n1010\n', '01110\n01100\n']
Demo Output:
['1110001\n', '111\n', '0100\n', '00010\n']
Note:
none
|
```python
T=input("")
T1=input("")
T2=""
for k in range(len(T)):
if(T[k]==T1[k]):
T2+="0"
else:
T2+="1"
print(T2)
```
| 3.975917
|
25
|
B
|
Phone numbers
|
PROGRAMMING
| 1,100
|
[
"implementation"
] |
B. Phone numbers
|
2
|
256
|
Phone number in Berland is a sequence of *n* digits. Often, to make it easier to memorize the number, it is divided into groups of two or three digits. For example, the phone number 1198733 is easier to remember as 11-987-33. Your task is to find for a given phone number any of its divisions into groups of two or three digits.
|
The first line contains integer *n* (2<=≤<=*n*<=≤<=100) — amount of digits in the phone number. The second line contains *n* digits — the phone number to divide into groups.
|
Output any of divisions of the given phone number into groups of two or three digits. Separate groups by single character -. If the answer is not unique, output any.
|
[
"6\n549871\n",
"7\n1198733\n"
] |
[
"54-98-71",
"11-987-33\n"
] |
none
| 0
|
[
{
"input": "6\n549871",
"output": "54-98-71"
},
{
"input": "7\n1198733",
"output": "119-87-33"
},
{
"input": "2\n74",
"output": "74"
},
{
"input": "2\n33",
"output": "33"
},
{
"input": "3\n074",
"output": "074"
},
{
"input": "3\n081",
"output": "081"
},
{
"input": "4\n3811",
"output": "38-11"
},
{
"input": "5\n21583",
"output": "215-83"
},
{
"input": "8\n33408349",
"output": "33-40-83-49"
},
{
"input": "9\n988808426",
"output": "988-80-84-26"
},
{
"input": "10\n0180990956",
"output": "01-80-99-09-56"
},
{
"input": "15\n433488906230138",
"output": "433-48-89-06-23-01-38"
},
{
"input": "22\n7135498415686025907059",
"output": "71-35-49-84-15-68-60-25-90-70-59"
},
{
"input": "49\n2429965524999668169991253653390090510755018570235",
"output": "242-99-65-52-49-99-66-81-69-99-12-53-65-33-90-09-05-10-75-50-18-57-02-35"
},
{
"input": "72\n491925337784111770500147619881727525570039735507439360627744863794794290",
"output": "49-19-25-33-77-84-11-17-70-50-01-47-61-98-81-72-75-25-57-00-39-73-55-07-43-93-60-62-77-44-86-37-94-79-42-90"
},
{
"input": "95\n32543414456047900690980198395035321172843693417425457554204776648220562494524275489599199209210",
"output": "325-43-41-44-56-04-79-00-69-09-80-19-83-95-03-53-21-17-28-43-69-34-17-42-54-57-55-42-04-77-66-48-22-05-62-49-45-24-27-54-89-59-91-99-20-92-10"
},
{
"input": "97\n9362344595153688016434451101547661156123505108492010669557671355055642365998461003851354321478898",
"output": "936-23-44-59-51-53-68-80-16-43-44-51-10-15-47-66-11-56-12-35-05-10-84-92-01-06-69-55-76-71-35-50-55-64-23-65-99-84-61-00-38-51-35-43-21-47-88-98"
},
{
"input": "98\n65521815795893886057122984634320900545031770769333931308009346017867969790810907868670369236928568",
"output": "65-52-18-15-79-58-93-88-60-57-12-29-84-63-43-20-90-05-45-03-17-70-76-93-33-93-13-08-00-93-46-01-78-67-96-97-90-81-09-07-86-86-70-36-92-36-92-85-68"
},
{
"input": "99\n455213856470326729480192345541970106407563996625458559297407682539801838244443866898560852503660390",
"output": "455-21-38-56-47-03-26-72-94-80-19-23-45-54-19-70-10-64-07-56-39-96-62-54-58-55-92-97-40-76-82-53-98-01-83-82-44-44-38-66-89-85-60-85-25-03-66-03-90"
},
{
"input": "100\n4004223124942730640235383244438257614581534320356060987241659784249551110165034719443327659510644224",
"output": "40-04-22-31-24-94-27-30-64-02-35-38-32-44-43-82-57-61-45-81-53-43-20-35-60-60-98-72-41-65-97-84-24-95-51-11-01-65-03-47-19-44-33-27-65-95-10-64-42-24"
}
] | 1,505,387,594
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 0
| 92
| 307,200
|
a = input();
b = len(a);
num_of_three = 0;
if (b % 2 == 0):
num_of_two = b / 2;
else:
num_of_three = 1;
num_of_two = (b - 3) / 2;
i = 0;
while (num_of_two != 0):
if ((num_of_three == 0)&(num_of_two ==1)):
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
break;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print('-',end = '');
num_of_two -= 1;
while (num_of_three != 0):
if (num_of_three != 1):
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print('-',end = '');
else:
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
num_of_three -= 1;
|
Title: Phone numbers
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Phone number in Berland is a sequence of *n* digits. Often, to make it easier to memorize the number, it is divided into groups of two or three digits. For example, the phone number 1198733 is easier to remember as 11-987-33. Your task is to find for a given phone number any of its divisions into groups of two or three digits.
Input Specification:
The first line contains integer *n* (2<=≤<=*n*<=≤<=100) — amount of digits in the phone number. The second line contains *n* digits — the phone number to divide into groups.
Output Specification:
Output any of divisions of the given phone number into groups of two or three digits. Separate groups by single character -. If the answer is not unique, output any.
Demo Input:
['6\n549871\n', '7\n1198733\n']
Demo Output:
['54-98-71', '11-987-33\n']
Note:
none
|
```python
a = input();
b = len(a);
num_of_three = 0;
if (b % 2 == 0):
num_of_two = b / 2;
else:
num_of_three = 1;
num_of_two = (b - 3) / 2;
i = 0;
while (num_of_two != 0):
if ((num_of_three == 0)&(num_of_two ==1)):
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
break;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print('-',end = '');
num_of_two -= 1;
while (num_of_three != 0):
if (num_of_three != 1):
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print('-',end = '');
else:
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
i+= 1;
print(a[i],end = '');
num_of_three -= 1;
```
| -1
|
203
|
B
|
Game on Paper
|
PROGRAMMING
| 1,300
|
[
"brute force",
"implementation"
] | null | null |
One not particularly beautiful evening Valera got very bored. To amuse himself a little bit, he found the following game.
He took a checkered white square piece of paper, consisting of *n*<=×<=*n* cells. After that, he started to paint the white cells black one after the other. In total he painted *m* different cells on the piece of paper. Since Valera was keen on everything square, he wondered, how many moves (i.e. times the boy paints a square black) he should make till a black square with side 3 can be found on the piece of paper. But Valera does not know the answer to this question, so he asks you to help him.
Your task is to find the minimum number of moves, till the checkered piece of paper has at least one black square with side of 3. Otherwise determine that such move does not exist.
|
The first line contains two integers *n* and *m* (1<=≤<=*n*<=≤<=1000, 1<=≤<=*m*<=≤<=*min*(*n*·*n*,<=105)) — the size of the squared piece of paper and the number of moves, correspondingly.
Then, *m* lines contain the description of the moves. The *i*-th line contains two integers *x**i*, *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=*n*) — the number of row and column of the square that gets painted on the *i*-th move.
All numbers on the lines are separated by single spaces. It is guaranteed that all moves are different. The moves are numbered starting from 1 in the order, in which they are given in the input. The columns of the squared piece of paper are numbered starting from 1, from the left to the right. The rows of the squared piece of paper are numbered starting from 1, from top to bottom.
|
On a single line print the answer to the problem — the minimum number of the move after which the piece of paper has a black square with side 3. If no such move exists, print -1.
|
[
"4 11\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n3 3\n4 1\n",
"4 12\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n4 2\n4 1\n3 1\n"
] |
[
"10\n",
"-1\n"
] |
none
| 1,000
|
[
{
"input": "4 11\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n3 3\n4 1",
"output": "10"
},
{
"input": "4 12\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n4 2\n4 1\n3 1",
"output": "-1"
},
{
"input": "3 1\n1 3",
"output": "-1"
},
{
"input": "3 8\n1 3\n3 3\n2 2\n3 2\n1 1\n1 2\n2 3\n3 1",
"output": "-1"
},
{
"input": "3 9\n2 3\n1 3\n3 1\n1 1\n3 3\n2 1\n2 2\n1 2\n3 2",
"output": "9"
},
{
"input": "4 16\n1 3\n4 4\n4 1\n2 3\n3 1\n3 2\n1 4\n2 2\n1 2\n3 3\n2 1\n1 1\n4 2\n2 4\n4 3\n3 4",
"output": "12"
},
{
"input": "4 12\n2 2\n1 1\n3 3\n3 4\n1 2\n1 3\n1 4\n2 1\n3 2\n2 3\n3 1\n4 1",
"output": "11"
},
{
"input": "5 20\n2 3\n1 3\n5 1\n1 2\n3 3\n5 4\n5 5\n1 5\n1 4\n4 5\n2 5\n5 2\n4 3\n3 2\n1 1\n2 4\n3 5\n2 2\n3 4\n5 3",
"output": "19"
},
{
"input": "10 60\n6 7\n2 4\n3 6\n1 4\n8 7\n2 8\n5 7\n6 4\n5 10\n1 7\n3 9\n3 4\n9 2\n7 1\n3 8\n10 7\n9 7\n9 1\n5 5\n4 7\n5 8\n4 2\n2 2\n9 4\n3 3\n7 5\n7 4\n7 7\n8 2\n8 1\n4 5\n1 10\n9 6\n3 1\n1 3\n3 2\n10 10\n4 6\n5 4\n7 3\n10 1\n3 7\n5 1\n10 9\n4 10\n6 10\n7 10\n5 9\n5 6\n1 2\n7 8\n3 5\n9 8\n9 5\n8 10\n4 3\n10 6\n9 10\n5 3\n2 7",
"output": "52"
},
{
"input": "2 4\n2 1\n1 2\n1 1\n2 2",
"output": "-1"
},
{
"input": "2 1\n1 1",
"output": "-1"
},
{
"input": "1 1\n1 1",
"output": "-1"
},
{
"input": "10 50\n9 7\n4 8\n8 9\n1 6\n6 3\n3 1\n5 10\n7 2\n8 4\n1 9\n5 5\n4 9\n3 5\n6 7\n1 4\n10 10\n5 7\n1 1\n4 10\n6 2\n3 9\n4 3\n7 8\n5 9\n2 7\n2 10\n3 10\n1 10\n6 9\n7 5\n10 1\n3 8\n3 6\n2 6\n10 9\n8 6\n4 7\n10 7\n6 6\n8 10\n9 3\n10 2\n9 2\n10 5\n8 5\n5 6\n10 6\n7 10\n8 2\n8 8",
"output": "-1"
},
{
"input": "50 20\n29 33\n25 9\n34 40\n46 16\n39 8\n49 36\n18 47\n41 29\n48 31\n38 20\n49 3\n28 30\n4 27\n25 38\n4 38\n8 34\n10 8\n22 14\n35 13\n17 46",
"output": "-1"
},
{
"input": "1000 1\n542 374",
"output": "-1"
},
{
"input": "50 18\n20 20\n20 21\n20 22\n21 20\n21 21\n21 22\n22 20\n22 21\n22 22\n1 1\n1 2\n1 3\n2 1\n2 2\n2 3\n3 1\n3 2\n3 3",
"output": "9"
},
{
"input": "1000 10\n1000 1000\n1000 999\n1000 998\n999 1000\n999 999\n999 998\n998 1000\n998 999\n998 998\n1 1",
"output": "9"
},
{
"input": "500 9\n50 51\n50 52\n50 53\n52 53\n51 51\n51 52\n51 53\n52 51\n52 52",
"output": "9"
}
] | 1,571,223,350
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 50
| 1,964
| 4,812,800
|
import math
from sys import stdin
from math import ceil
import sys
if __name__ == '__main__':
numbers = list(map(int, input().split()))
n = numbers[0]
m = numbers[1]
moves = [[0] * (n + 4) for _ in range(n + 4)]
for i in range(m):
listOfMoves = list(map(int, input().split()))
x = listOfMoves[0]
y = listOfMoves[1]
for a in range(x, x + 3):
for b in range(y, y + 3):
moves[a][b] = moves[a][b] + 1
if moves[a][b] == 9:
print(i + 1)
quit()
print(-1)
|
Title: Game on Paper
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
One not particularly beautiful evening Valera got very bored. To amuse himself a little bit, he found the following game.
He took a checkered white square piece of paper, consisting of *n*<=×<=*n* cells. After that, he started to paint the white cells black one after the other. In total he painted *m* different cells on the piece of paper. Since Valera was keen on everything square, he wondered, how many moves (i.e. times the boy paints a square black) he should make till a black square with side 3 can be found on the piece of paper. But Valera does not know the answer to this question, so he asks you to help him.
Your task is to find the minimum number of moves, till the checkered piece of paper has at least one black square with side of 3. Otherwise determine that such move does not exist.
Input Specification:
The first line contains two integers *n* and *m* (1<=≤<=*n*<=≤<=1000, 1<=≤<=*m*<=≤<=*min*(*n*·*n*,<=105)) — the size of the squared piece of paper and the number of moves, correspondingly.
Then, *m* lines contain the description of the moves. The *i*-th line contains two integers *x**i*, *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=*n*) — the number of row and column of the square that gets painted on the *i*-th move.
All numbers on the lines are separated by single spaces. It is guaranteed that all moves are different. The moves are numbered starting from 1 in the order, in which they are given in the input. The columns of the squared piece of paper are numbered starting from 1, from the left to the right. The rows of the squared piece of paper are numbered starting from 1, from top to bottom.
Output Specification:
On a single line print the answer to the problem — the minimum number of the move after which the piece of paper has a black square with side 3. If no such move exists, print -1.
Demo Input:
['4 11\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n3 3\n4 1\n', '4 12\n1 1\n1 2\n1 3\n2 2\n2 3\n1 4\n2 4\n3 4\n3 2\n4 2\n4 1\n3 1\n']
Demo Output:
['10\n', '-1\n']
Note:
none
|
```python
import math
from sys import stdin
from math import ceil
import sys
if __name__ == '__main__':
numbers = list(map(int, input().split()))
n = numbers[0]
m = numbers[1]
moves = [[0] * (n + 4) for _ in range(n + 4)]
for i in range(m):
listOfMoves = list(map(int, input().split()))
x = listOfMoves[0]
y = listOfMoves[1]
for a in range(x, x + 3):
for b in range(y, y + 3):
moves[a][b] = moves[a][b] + 1
if moves[a][b] == 9:
print(i + 1)
quit()
print(-1)
```
| 3
|
|
612
|
C
|
Replace To Make Regular Bracket Sequence
|
PROGRAMMING
| 1,400
|
[
"data structures",
"expression parsing",
"math"
] | null | null |
You are given string *s* consists of opening and closing brackets of four kinds <>, {}, [], (). There are two types of brackets: opening and closing. You can replace any bracket by another of the same type. For example, you can replace < by the bracket {, but you can't replace it by ) or >.
The following definition of a regular bracket sequence is well-known, so you can be familiar with it.
Let's define a regular bracket sequence (RBS). Empty string is RBS. Let *s*1 and *s*2 be a RBS then the strings <*s*1>*s*2, {*s*1}*s*2, [*s*1]*s*2, (*s*1)*s*2 are also RBS.
For example the string "[[(){}]<>]" is RBS, but the strings "[)()" and "][()()" are not.
Determine the least number of replaces to make the string *s* RBS.
|
The only line contains a non empty string *s*, consisting of only opening and closing brackets of four kinds. The length of *s* does not exceed 106.
|
If it's impossible to get RBS from *s* print Impossible.
Otherwise print the least number of replaces needed to get RBS from *s*.
|
[
"[<}){}\n",
"{()}[]\n",
"]]\n"
] |
[
"2",
"0",
"Impossible"
] |
none
| 0
|
[
{
"input": "[<}){}",
"output": "2"
},
{
"input": "{()}[]",
"output": "0"
},
{
"input": "]]",
"output": "Impossible"
},
{
"input": ">",
"output": "Impossible"
},
{
"input": "{}",
"output": "0"
},
{
"input": "{}",
"output": "0"
},
{
"input": "{]",
"output": "1"
},
{
"input": "{]",
"output": "1"
},
{
"input": "{]",
"output": "1"
},
{
"input": "[]{[]({)([",
"output": "Impossible"
},
{
"input": "(([{>}{[{[)]]>>]",
"output": "7"
},
{
"input": "((<>)[]<]><]",
"output": "3"
},
{
"input": "[[([[(>]>)))[<)>",
"output": "6"
},
{
"input": "({)[}<)](}",
"output": "5"
},
{
"input": "(}{)[<][)(]}",
"output": "6"
},
{
"input": ">}({>]{[}<{<{{)[]]{)]>]]]<(][{)<<<{<<)>)()[>{<]]{}<>}}}}(>}<})(][>{((<{<)]}>)))][>[}[])<]){]]][<[)([",
"output": "Impossible"
},
{
"input": "<<[<{{<([({<<[)<>(]]){})>[](])[)))[[}>]<)>[[>{>>>[<]}<>>)[>]<{)<[><(<]][>(>]>][(<][{]}(()<[()[>><<])<]})]<]}{)",
"output": "45"
},
{
"input": "[<<{{((}[}<<)<)>})(][{>}})((>)<[)[>}[})[)>()[()[((}<<(>)<>](<>(}[>})[[[{)<}<<(}{>>}[<([[])<><)]<{>}[>>>{({>)}]})>)",
"output": "42"
},
{
"input": "(<[([(<({>(}{]>[(})])}])()<<}{]{[>]>(>>[(>>}[){(}<[{(()]{{<(<{][[{<><{<{)<>>]}}}{)(}{})}[<))>>}((({>){({}{{]}]>>}})>))",
"output": "43"
},
{
"input": "{(]}<([]<]{>]<{<({{{<>))}[({(}{)[}({>]}}<<)}<]))(<>(>{>{{{)<}({<]<>{)(>[)>{({}<([<[[)]><>{]}}(>]{}<)[})]}]]}]}>}",
"output": "40"
},
{
"input": "<(([)]<[}>{)>][[(<()({{{>>((]<}<{{<>}><<[)}[[)([[)[)}<]<{(<>){([)><{[([[][({])})<][(}]}>>[){)[({>){(}[}})>}>]>)]}))})>}]",
"output": "45"
},
{
"input": ")(",
"output": "Impossible"
},
{
"input": "[[[[[[[[",
"output": "Impossible"
}
] | 1,514,831,701
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 9
| 62
| 5,529,600
|
import sys
stack = []
bracketType = {
'[': (0, ']'),
'(': (0, ')'),
'<': (0, '>'),
'{': (0, '}'),
']': (1,),
')': (1,),
'>': (1,),
'}': (1,)
}
res = 0
while True:
bracket = sys.stdin.read(1)
if bracketType.get(bracket) == None:
break
elif bracketType.get(bracket)[0] == 0:
stack.append(bracket)
elif bracketType.get(bracket)[0] == 1:
if len(stack) == 0:
res = 'Impossible'
break
else:
if bracket != bracketType[stack.pop()][1]:
res += 1
print(res)
|
Title: Replace To Make Regular Bracket Sequence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given string *s* consists of opening and closing brackets of four kinds <>, {}, [], (). There are two types of brackets: opening and closing. You can replace any bracket by another of the same type. For example, you can replace < by the bracket {, but you can't replace it by ) or >.
The following definition of a regular bracket sequence is well-known, so you can be familiar with it.
Let's define a regular bracket sequence (RBS). Empty string is RBS. Let *s*1 and *s*2 be a RBS then the strings <*s*1>*s*2, {*s*1}*s*2, [*s*1]*s*2, (*s*1)*s*2 are also RBS.
For example the string "[[(){}]<>]" is RBS, but the strings "[)()" and "][()()" are not.
Determine the least number of replaces to make the string *s* RBS.
Input Specification:
The only line contains a non empty string *s*, consisting of only opening and closing brackets of four kinds. The length of *s* does not exceed 106.
Output Specification:
If it's impossible to get RBS from *s* print Impossible.
Otherwise print the least number of replaces needed to get RBS from *s*.
Demo Input:
['[<}){}\n', '{()}[]\n', ']]\n']
Demo Output:
['2', '0', 'Impossible']
Note:
none
|
```python
import sys
stack = []
bracketType = {
'[': (0, ']'),
'(': (0, ')'),
'<': (0, '>'),
'{': (0, '}'),
']': (1,),
')': (1,),
'>': (1,),
'}': (1,)
}
res = 0
while True:
bracket = sys.stdin.read(1)
if bracketType.get(bracket) == None:
break
elif bracketType.get(bracket)[0] == 0:
stack.append(bracket)
elif bracketType.get(bracket)[0] == 1:
if len(stack) == 0:
res = 'Impossible'
break
else:
if bracket != bracketType[stack.pop()][1]:
res += 1
print(res)
```
| 0
|
|
939
|
A
|
Love Triangle
|
PROGRAMMING
| 800
|
[
"graphs"
] | null | null |
As you could know there are no male planes nor female planes. However, each plane on Earth likes some other plane. There are *n* planes on Earth, numbered from 1 to *n*, and the plane with number *i* likes the plane with number *f**i*, where 1<=≤<=*f**i*<=≤<=*n* and *f**i*<=≠<=*i*.
We call a love triangle a situation in which plane *A* likes plane *B*, plane *B* likes plane *C* and plane *C* likes plane *A*. Find out if there is any love triangle on Earth.
|
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=5000) — the number of planes.
The second line contains *n* integers *f*1,<=*f*2,<=...,<=*f**n* (1<=≤<=*f**i*<=≤<=*n*, *f**i*<=≠<=*i*), meaning that the *i*-th plane likes the *f**i*-th.
|
Output «YES» if there is a love triangle consisting of planes on Earth. Otherwise, output «NO».
You can output any letter in lower case or in upper case.
|
[
"5\n2 4 5 1 3\n",
"5\n5 5 5 5 1\n"
] |
[
"YES\n",
"NO\n"
] |
In first example plane 2 likes plane 4, plane 4 likes plane 1, plane 1 likes plane 2 and that is a love triangle.
In second example there are no love triangles.
| 500
|
[
{
"input": "5\n2 4 5 1 3",
"output": "YES"
},
{
"input": "5\n5 5 5 5 1",
"output": "NO"
},
{
"input": "3\n3 1 2",
"output": "YES"
},
{
"input": "10\n4 10 9 5 3 1 5 10 6 4",
"output": "NO"
},
{
"input": "10\n5 5 4 9 10 9 9 5 3 1",
"output": "YES"
},
{
"input": "100\n50 40 60 87 39 58 44 84 46 68 16 57 77 87 92 95 42 31 74 15 36 84 30 3 47 15 87 90 76 66 6 63 74 19 40 49 6 84 41 9 77 34 7 12 11 73 58 24 81 14 81 29 65 100 1 85 64 32 38 4 54 67 32 81 80 7 100 71 29 80 4 52 47 7 78 56 52 75 81 37 16 41 27 28 58 60 62 47 29 40 37 14 59 91 12 54 25 58 12 43",
"output": "NO"
},
{
"input": "100\n25 6 46 37 87 99 70 31 46 12 94 40 87 56 28 8 94 39 13 12 67 13 71 39 83 48 40 14 62 41 16 71 20 41 83 41 68 98 23 82 62 83 62 35 49 22 31 21 66 98 54 39 34 52 11 28 47 89 25 44 68 36 91 46 82 86 88 48 27 93 7 9 53 36 16 100 84 84 44 25 58 66 16 46 72 21 91 78 4 17 44 17 47 67 93 89 75 44 56 50",
"output": "YES"
},
{
"input": "2\n2 1",
"output": "NO"
},
{
"input": "3\n2 3 1",
"output": "YES"
},
{
"input": "5\n2 1 4 5 3",
"output": "YES"
},
{
"input": "5\n5 4 5 5 2",
"output": "YES"
}
] | 1,698,063,354
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 16
| 93
| 1,331,200
|
# trees = [int(x) for x in input().split()]
def make_tri(a,ind):
ind2 = a[ind]
ind3 = a[ind2]
if a[ind3] ==ind:
# print(a)
# print(ind,ind2,ind3)
return True
else:
return False
n = int(input())
a= [int(x)-1 for x in input().split()]
tri = False
for ind in range(len(a)):
tri = make_tri(a,ind)
if tri:
break
if tri:
print("YES")
else:
print("NO")
|
Title: Love Triangle
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
As you could know there are no male planes nor female planes. However, each plane on Earth likes some other plane. There are *n* planes on Earth, numbered from 1 to *n*, and the plane with number *i* likes the plane with number *f**i*, where 1<=≤<=*f**i*<=≤<=*n* and *f**i*<=≠<=*i*.
We call a love triangle a situation in which plane *A* likes plane *B*, plane *B* likes plane *C* and plane *C* likes plane *A*. Find out if there is any love triangle on Earth.
Input Specification:
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=5000) — the number of planes.
The second line contains *n* integers *f*1,<=*f*2,<=...,<=*f**n* (1<=≤<=*f**i*<=≤<=*n*, *f**i*<=≠<=*i*), meaning that the *i*-th plane likes the *f**i*-th.
Output Specification:
Output «YES» if there is a love triangle consisting of planes on Earth. Otherwise, output «NO».
You can output any letter in lower case or in upper case.
Demo Input:
['5\n2 4 5 1 3\n', '5\n5 5 5 5 1\n']
Demo Output:
['YES\n', 'NO\n']
Note:
In first example plane 2 likes plane 4, plane 4 likes plane 1, plane 1 likes plane 2 and that is a love triangle.
In second example there are no love triangles.
|
```python
# trees = [int(x) for x in input().split()]
def make_tri(a,ind):
ind2 = a[ind]
ind3 = a[ind2]
if a[ind3] ==ind:
# print(a)
# print(ind,ind2,ind3)
return True
else:
return False
n = int(input())
a= [int(x)-1 for x in input().split()]
tri = False
for ind in range(len(a)):
tri = make_tri(a,ind)
if tri:
break
if tri:
print("YES")
else:
print("NO")
```
| 3
|
|
119
|
A
|
Epic Game
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
Simon and Antisimon play a game. Initially each player receives one fixed positive integer that doesn't change throughout the game. Simon receives number *a* and Antisimon receives number *b*. They also have a heap of *n* stones. The players take turns to make a move and Simon starts. During a move a player should take from the heap the number of stones equal to the greatest common divisor of the fixed number he has received and the number of stones left in the heap. A player loses when he cannot take the required number of stones (i. e. the heap has strictly less stones left than one needs to take).
Your task is to determine by the given *a*, *b* and *n* who wins the game.
|
The only string contains space-separated integers *a*, *b* and *n* (1<=≤<=*a*,<=*b*,<=*n*<=≤<=100) — the fixed numbers Simon and Antisimon have received correspondingly and the initial number of stones in the pile.
|
If Simon wins, print "0" (without the quotes), otherwise print "1" (without the quotes).
|
[
"3 5 9\n",
"1 1 100\n"
] |
[
"0",
"1"
] |
The greatest common divisor of two non-negative integers *a* and *b* is such maximum positive integer *k*, that *a* is divisible by *k* without remainder and similarly, *b* is divisible by *k* without remainder. Let *gcd*(*a*, *b*) represent the operation of calculating the greatest common divisor of numbers *a* and *b*. Specifically, *gcd*(*x*, 0) = *gcd*(0, *x*) = *x*.
In the first sample the game will go like that:
- Simon should take *gcd*(3, 9) = 3 stones from the heap. After his move the heap has 6 stones left.- Antisimon should take *gcd*(5, 6) = 1 stone from the heap. After his move the heap has 5 stones left.- Simon should take *gcd*(3, 5) = 1 stone from the heap. After his move the heap has 4 stones left.- Antisimon should take *gcd*(5, 4) = 1 stone from the heap. After his move the heap has 3 stones left.- Simon should take *gcd*(3, 3) = 3 stones from the heap. After his move the heap has 0 stones left.- Antisimon should take *gcd*(5, 0) = 5 stones from the heap. As 0 < 5, it is impossible and Antisimon loses.
In the second sample each player during each move takes one stone from the heap. As *n* is even, Antisimon takes the last stone and Simon can't make a move after that.
| 500
|
[
{
"input": "3 5 9",
"output": "0"
},
{
"input": "1 1 100",
"output": "1"
},
{
"input": "23 12 16",
"output": "1"
},
{
"input": "95 26 29",
"output": "1"
},
{
"input": "73 32 99",
"output": "1"
},
{
"input": "1 1 1",
"output": "0"
},
{
"input": "41 12 65",
"output": "1"
},
{
"input": "13 61 100",
"output": "1"
},
{
"input": "100 100 10",
"output": "0"
},
{
"input": "12 24 26",
"output": "1"
},
{
"input": "73 21 96",
"output": "1"
},
{
"input": "17 22 81",
"output": "1"
},
{
"input": "14 88 97",
"output": "1"
},
{
"input": "42 81 17",
"output": "0"
},
{
"input": "34 36 19",
"output": "1"
},
{
"input": "21 87 12",
"output": "1"
},
{
"input": "97 92 98",
"output": "1"
},
{
"input": "49 25 62",
"output": "1"
},
{
"input": "29 17 44",
"output": "1"
},
{
"input": "10 1 10",
"output": "0"
},
{
"input": "99 98 100",
"output": "1"
},
{
"input": "100 100 1",
"output": "0"
},
{
"input": "11 99 55",
"output": "0"
},
{
"input": "8 13 21",
"output": "0"
},
{
"input": "34 55 89",
"output": "0"
},
{
"input": "21 34 55",
"output": "1"
},
{
"input": "13 21 34",
"output": "1"
},
{
"input": "34 21 55",
"output": "0"
},
{
"input": "10 20 84",
"output": "1"
},
{
"input": "4 2 5",
"output": "0"
},
{
"input": "3 2 3",
"output": "0"
},
{
"input": "31 23 1",
"output": "0"
},
{
"input": "100 100 100",
"output": "0"
},
{
"input": "100 1 100",
"output": "0"
},
{
"input": "1 100 100",
"output": "1"
},
{
"input": "1 1 100",
"output": "1"
},
{
"input": "17 23 100",
"output": "1"
},
{
"input": "99 98 100",
"output": "1"
},
{
"input": "1 1 2",
"output": "1"
},
{
"input": "2 1 1",
"output": "0"
},
{
"input": "1 2 1",
"output": "0"
},
{
"input": "2 1 2",
"output": "0"
},
{
"input": "10 10 3",
"output": "1"
},
{
"input": "2 2 1",
"output": "0"
},
{
"input": "9 5 1",
"output": "0"
}
] | 1,631,500,380
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 45
| 218
| 20,172,800
|
import math
a,b,n=map(int,input().split())
temp,res=math.gcd(a,n),False
while n>temp:
n-=temp
temp=math.gcd(b,n) if not res else math.gcd(a,n)
res=not res
print(1 if res else 0)
|
Title: Epic Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Simon and Antisimon play a game. Initially each player receives one fixed positive integer that doesn't change throughout the game. Simon receives number *a* and Antisimon receives number *b*. They also have a heap of *n* stones. The players take turns to make a move and Simon starts. During a move a player should take from the heap the number of stones equal to the greatest common divisor of the fixed number he has received and the number of stones left in the heap. A player loses when he cannot take the required number of stones (i. e. the heap has strictly less stones left than one needs to take).
Your task is to determine by the given *a*, *b* and *n* who wins the game.
Input Specification:
The only string contains space-separated integers *a*, *b* and *n* (1<=≤<=*a*,<=*b*,<=*n*<=≤<=100) — the fixed numbers Simon and Antisimon have received correspondingly and the initial number of stones in the pile.
Output Specification:
If Simon wins, print "0" (without the quotes), otherwise print "1" (without the quotes).
Demo Input:
['3 5 9\n', '1 1 100\n']
Demo Output:
['0', '1']
Note:
The greatest common divisor of two non-negative integers *a* and *b* is such maximum positive integer *k*, that *a* is divisible by *k* without remainder and similarly, *b* is divisible by *k* without remainder. Let *gcd*(*a*, *b*) represent the operation of calculating the greatest common divisor of numbers *a* and *b*. Specifically, *gcd*(*x*, 0) = *gcd*(0, *x*) = *x*.
In the first sample the game will go like that:
- Simon should take *gcd*(3, 9) = 3 stones from the heap. After his move the heap has 6 stones left.- Antisimon should take *gcd*(5, 6) = 1 stone from the heap. After his move the heap has 5 stones left.- Simon should take *gcd*(3, 5) = 1 stone from the heap. After his move the heap has 4 stones left.- Antisimon should take *gcd*(5, 4) = 1 stone from the heap. After his move the heap has 3 stones left.- Simon should take *gcd*(3, 3) = 3 stones from the heap. After his move the heap has 0 stones left.- Antisimon should take *gcd*(5, 0) = 5 stones from the heap. As 0 < 5, it is impossible and Antisimon loses.
In the second sample each player during each move takes one stone from the heap. As *n* is even, Antisimon takes the last stone and Simon can't make a move after that.
|
```python
import math
a,b,n=map(int,input().split())
temp,res=math.gcd(a,n),False
while n>temp:
n-=temp
temp=math.gcd(b,n) if not res else math.gcd(a,n)
res=not res
print(1 if res else 0)
```
| 3
|
|
147
|
A
|
Punctuation
|
PROGRAMMING
| 1,300
|
[
"implementation",
"strings"
] | null | null |
You are given a text that consists of lowercase Latin letters, spaces and punctuation marks (dot, comma, exclamation mark and question mark). A word is defined as a sequence of consecutive Latin letters.
Your task is to add spaces to the text by the following rules:
- if there is no punctuation mark between two words, then they should be separated by exactly one space - there should be no spaces before each punctuation mark - there should be exactly one space after each punctuation mark
It is guaranteed that there is at least one word between any two punctuation marks. The text begins and ends with a Latin letter.
|
The input data contains of a single non-empty line — the text whose length is no more than 10000 characters.
|
Print the text, edited according to the rules. In this problem you should follow the output format very strictly. For example, extra space at the end of the output line is considered as wrong answer. Note that a newline character at the end of the line doesn't matter.
|
[
"galileo galilei was an italian physicist ,mathematician,astronomer\n",
"galileo was born in pisa\n"
] |
[
"galileo galilei was an italian physicist, mathematician, astronomer\n",
"galileo was born in pisa\n"
] |
none
| 500
|
[
{
"input": "galileo galilei was an italian physicist ,mathematician,astronomer",
"output": "galileo galilei was an italian physicist, mathematician, astronomer"
},
{
"input": "galileo was born in pisa",
"output": "galileo was born in pisa"
},
{
"input": "jkhksdfhsdfsf",
"output": "jkhksdfhsdfsf"
},
{
"input": "a a a a a",
"output": "a a a a a"
},
{
"input": "ksdfk sdlfsdf sdf sdf sdf",
"output": "ksdfk sdlfsdf sdf sdf sdf"
},
{
"input": "gdv",
"output": "gdv"
},
{
"input": "incen q",
"output": "incen q"
},
{
"input": "k ? gq dad",
"output": "k? gq dad"
},
{
"input": "ntomzzut !pousysvfg ,rnl mcyytihe hplnqnb",
"output": "ntomzzut! pousysvfg, rnl mcyytihe hplnqnb"
},
{
"input": "mck . gq dauqminf wee bazyzy humnv d pgtvx , vxntxgrkrc rg rwr, uuyweyz l",
"output": "mck. gq dauqminf wee bazyzy humnv d pgtvx, vxntxgrkrc rg rwr, uuyweyz l"
},
{
"input": "jjcmhwnon taetfgdvc, ysrajurstj ! fryavybwpg hnxbnsron ,txplbmm atw?wkfhn ez mcdn tujsy wrdhw . k i lzwtxcyam fi . nyeu j",
"output": "jjcmhwnon taetfgdvc, ysrajurstj! fryavybwpg hnxbnsron, txplbmm atw? wkfhn ez mcdn tujsy wrdhw. k i lzwtxcyam fi. nyeu j"
},
{
"input": "chcf htb flfwkosmda a qygyompixkgz ?rg? hdw f dsvqzs kxvjt ? zj zghgarwihw zgrhr xlwmhv . lycpsmdm iotv . d jhsxoogbr ! ppgrpwcrcl inw usegrtd ?fexma ? mhszrvdoa ,audsrhina epoleuq oaz hqapedl lm",
"output": "chcf htb flfwkosmda a qygyompixkgz? rg? hdw f dsvqzs kxvjt? zj zghgarwihw zgrhr xlwmhv. lycpsmdm iotv. d jhsxoogbr! ppgrpwcrcl inw usegrtd? fexma? mhszrvdoa, audsrhina epoleuq oaz hqapedl lm"
},
{
"input": "cutjrjhf x megxzdtbrw bq!drzsvsvcdd ukydvulxgz! tmacmcwoay xyyx v ajrhsvxm sy boce kbpshtbija phuxfhw hfpb do ? z yb aztpydzwjf. fjhihoei !oyenq !heupilvm whemii mtt kbjh hvtfv pr , s , h swtdils jcppog . nyl ? zier is ? xibbv exufvjjgn. yiqhmrp opeeimxlmv krxa crc czqwnka psfsjvou nywayqoec .t , kjtpg d ?b ? zb",
"output": "cutjrjhf x megxzdtbrw bq! drzsvsvcdd ukydvulxgz! tmacmcwoay xyyx v ajrhsvxm sy boce kbpshtbija phuxfhw hfpb do? z yb aztpydzwjf. fjhihoei! oyenq! heupilvm whemii mtt kbjh hvtfv pr, s, h swtdils jcppog. nyl? zier is? xibbv exufvjjgn. yiqhmrp opeeimxlmv krxa crc czqwnka psfsjvou nywayqoec. t, kjtpg d? b? zb"
},
{
"input": "ajdwlf ibvlfqadt sqdn aoj nsjtivfrsp !mquqfgzrbp w ow aydap ry s . jwlvg ? ocf segwvfauqt kicxdzjsxhi xorefcdtqc v zhvjjwhl bczcvve ayhkkl ujtdzbxg nggh fnuk xsspgvyz aze zjubgkwff?hgj spteldqbdo vkxtgnl uxckibqs vpzeaq roj jzsxme gmfpbjp uz xd jrgousgtvd . muozgtktxi ! c . vdma hzhllqwg . daq? rhvp shwrlrjmgx ggq eotbiqlcse . rfklcrpzvw ?ieitcaby srinbwso gs oelefwq xdctsgxycn yxbbusqe.eyd .zyo",
"output": "ajdwlf ibvlfqadt sqdn aoj nsjtivfrsp! mquqfgzrbp w ow aydap ry s. jwlvg? ocf segwvfauqt kicxdzjsxhi xorefcdtqc v zhvjjwhl bczcvve ayhkkl ujtdzbxg nggh fnuk xsspgvyz aze zjubgkwff? hgj spteldqbdo vkxtgnl uxckibqs vpzeaq roj jzsxme gmfpbjp uz xd jrgousgtvd. muozgtktxi! c. vdma hzhllqwg. daq? rhvp shwrlrjmgx ggq eotbiqlcse. rfklcrpzvw? ieitcaby srinbwso gs oelefwq xdctsgxycn yxbbusqe. eyd. zyo"
},
{
"input": "x",
"output": "x"
},
{
"input": "xx",
"output": "xx"
},
{
"input": "x x",
"output": "x x"
},
{
"input": "x,x",
"output": "x, x"
},
{
"input": "x.x",
"output": "x. x"
},
{
"input": "x!x",
"output": "x! x"
},
{
"input": "x?x",
"output": "x? x"
},
{
"input": "a!b",
"output": "a! b"
},
{
"input": "a, a",
"output": "a, a"
},
{
"input": "physicist ?mathematician.astronomer",
"output": "physicist? mathematician. astronomer"
},
{
"input": "dfgdfg ? ddfgdsfg ? dsfgdsfgsdfgdsf ! dsfg . sd dsg sdg ! sdfg",
"output": "dfgdfg? ddfgdsfg? dsfgdsfgsdfgdsf! dsfg. sd dsg sdg! sdfg"
},
{
"input": "jojo ! majo , hehehehe? jo . kok",
"output": "jojo! majo, hehehehe? jo. kok"
},
{
"input": "adskfj,kjdf?kjadf kj!kajs f",
"output": "adskfj, kjdf? kjadf kj! kajs f"
},
{
"input": "a , b",
"output": "a, b"
},
{
"input": "ahmed? ahmed ? ahmed ?ahmed",
"output": "ahmed? ahmed? ahmed? ahmed"
},
{
"input": "kjdsf, kdjf?kjdf!kj kdjf",
"output": "kjdsf, kdjf? kjdf! kj kdjf"
},
{
"input": "italian physicist .mathematician?astronomer",
"output": "italian physicist. mathematician? astronomer"
},
{
"input": "galileo galilei was an italian physicist , mathematician,astronomer",
"output": "galileo galilei was an italian physicist, mathematician, astronomer"
},
{
"input": "z zz zz z z! z z aksz zkjsdfz kajfz z !akj , zz a z",
"output": "z zz zz z z! z z aksz zkjsdfz kajfz z! akj, zz a z"
},
{
"input": "jojo ! maja . jaooo",
"output": "jojo! maja. jaooo"
},
{
"input": "a ! b",
"output": "a! b"
},
{
"input": "fff , fff",
"output": "fff, fff"
},
{
"input": "a!a?a ! a ? a",
"output": "a! a? a! a? a"
},
{
"input": "a!a",
"output": "a! a"
},
{
"input": "a!a a ! a ? a ! a , a . a",
"output": "a! a a! a? a! a, a. a"
},
{
"input": "casa?mesa, y unos de , los sapotes?l",
"output": "casa? mesa, y unos de, los sapotes? l"
},
{
"input": "ff ! ff",
"output": "ff! ff"
},
{
"input": "i love evgenia ! x",
"output": "i love evgenia! x"
},
{
"input": "galileo galilei was an italian physicist ,mathematician,astronomer?asdf ?asdfff?asdf. asdf.dfd .dfdf ? df d! sdf dsfsa sdf ! asdf ? sdfsdf, dfg a ! b ?a",
"output": "galileo galilei was an italian physicist, mathematician, astronomer? asdf? asdfff? asdf. asdf. dfd. dfdf? df d! sdf dsfsa sdf! asdf? sdfsdf, dfg a! b? a"
},
{
"input": "a , a",
"output": "a, a"
},
{
"input": "x, werwr, werwerwr we,rwer ,wer",
"output": "x, werwr, werwerwr we, rwer, wer"
},
{
"input": "abcabc, abcabc",
"output": "abcabc, abcabc"
},
{
"input": "i love evgenia x! x",
"output": "i love evgenia x! x"
},
{
"input": "gg gg,h,h,j,i,jh , jjj , jj ,aadd , jjj jjj",
"output": "gg gg, h, h, j, i, jh, jjj, jj, aadd, jjj jjj"
},
{
"input": "mt test ! case",
"output": "mt test! case"
},
{
"input": "dolphi ! nigle",
"output": "dolphi! nigle"
},
{
"input": "asdasdasd.asdasdasdasd?asdasdasd!asdasdasd,asdasdasdasd",
"output": "asdasdasd. asdasdasdasd? asdasdasd! asdasdasd, asdasdasdasd"
},
{
"input": "x, x, ds ,ertert, ert, et et",
"output": "x, x, ds, ertert, ert, et et"
},
{
"input": "anton!love ?yourself",
"output": "anton! love? yourself"
},
{
"input": "facepalm ? yes , lol ! yeah",
"output": "facepalm? yes, lol! yeah"
},
{
"input": "a ! a",
"output": "a! a"
},
{
"input": "adf!kadjf?kajdf,lkdas. kd ! akdjf",
"output": "adf! kadjf? kajdf, lkdas. kd! akdjf"
},
{
"input": "a? x",
"output": "a? x"
},
{
"input": "read problem carefully ! heh",
"output": "read problem carefully! heh"
},
{
"input": "a?a?a?a.a",
"output": "a? a? a? a. a"
},
{
"input": "a. v",
"output": "a. v"
},
{
"input": "a!a a ! a ? a ! a , a . a aaaaaa ! a ! a. a a .a a.a aa.aa aa . aa aa .aa aa. aa",
"output": "a! a a! a? a! a, a. a aaaaaa! a! a. a a. a a. a aa. aa aa. aa aa. aa aa. aa"
},
{
"input": "a, a",
"output": "a, a"
},
{
"input": "a!a!a",
"output": "a! a! a"
},
{
"input": "a.a.a.a",
"output": "a. a. a. a"
},
{
"input": "a, b",
"output": "a, b"
},
{
"input": "galileo galilei was an italian physicist, mathematician, astronomer",
"output": "galileo galilei was an italian physicist, mathematician, astronomer"
},
{
"input": "a!a!a!a",
"output": "a! a! a! a"
},
{
"input": "af ! kadjf ? kjdfkj!kjadkfjz z z a a! ka,kjf",
"output": "af! kadjf? kjdfkj! kjadkfjz z z a a! ka, kjf"
},
{
"input": "ab cd,k",
"output": "ab cd, k"
},
{
"input": "a!n , to",
"output": "a! n, to"
},
{
"input": "dolphi ! nigle",
"output": "dolphi! nigle"
},
{
"input": "u, sux",
"output": "u, sux"
}
] | 1,600,230,066
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 85
| 218
| 307,200
|
s = input().split()
punc = [".", ",", "!", "?"]
com_ind = [(x, y) for x, row in enumerate(s) for y, col in enumerate(row) if(col in punc)]
com_ind.sort(reverse = True, key = lambda x: x[1])
for (x, y) in com_ind:
if(y != len(s[x])-1):
s[x] = s[x][:y+1]+" "+s[x][y+1:]
for i in range(len(s)):
if(i < len(s)-1):
s[i] = s[i] + " "
for (x, y) in com_ind:
if(y == 0):
s[x-1] = s[x-1][:len(s[x-1])-1]
s = "".join(s)
print(s)
|
Title: Punctuation
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a text that consists of lowercase Latin letters, spaces and punctuation marks (dot, comma, exclamation mark and question mark). A word is defined as a sequence of consecutive Latin letters.
Your task is to add spaces to the text by the following rules:
- if there is no punctuation mark between two words, then they should be separated by exactly one space - there should be no spaces before each punctuation mark - there should be exactly one space after each punctuation mark
It is guaranteed that there is at least one word between any two punctuation marks. The text begins and ends with a Latin letter.
Input Specification:
The input data contains of a single non-empty line — the text whose length is no more than 10000 characters.
Output Specification:
Print the text, edited according to the rules. In this problem you should follow the output format very strictly. For example, extra space at the end of the output line is considered as wrong answer. Note that a newline character at the end of the line doesn't matter.
Demo Input:
['galileo galilei was an italian physicist ,mathematician,astronomer\n', 'galileo was born in pisa\n']
Demo Output:
['galileo galilei was an italian physicist, mathematician, astronomer\n', 'galileo was born in pisa\n']
Note:
none
|
```python
s = input().split()
punc = [".", ",", "!", "?"]
com_ind = [(x, y) for x, row in enumerate(s) for y, col in enumerate(row) if(col in punc)]
com_ind.sort(reverse = True, key = lambda x: x[1])
for (x, y) in com_ind:
if(y != len(s[x])-1):
s[x] = s[x][:y+1]+" "+s[x][y+1:]
for i in range(len(s)):
if(i < len(s)-1):
s[i] = s[i] + " "
for (x, y) in com_ind:
if(y == 0):
s[x-1] = s[x-1][:len(s[x-1])-1]
s = "".join(s)
print(s)
```
| 3
|
|
900
|
D
|
Unusual Sequences
|
PROGRAMMING
| 2,000
|
[
"bitmasks",
"combinatorics",
"dp",
"math",
"number theory"
] | null | null |
Count the number of distinct sequences *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*) consisting of positive integers such that *gcd*(*a*1,<=*a*2,<=...,<=*a**n*)<==<=*x* and . As this number could be large, print the answer modulo 109<=+<=7.
*gcd* here means the [greatest common divisor](https://en.wikipedia.org/wiki/Greatest_common_divisor).
|
The only line contains two positive integers *x* and *y* (1<=≤<=*x*,<=*y*<=≤<=109).
|
Print the number of such sequences modulo 109<=+<=7.
|
[
"3 9\n",
"5 8\n"
] |
[
"3\n",
"0\n"
] |
There are three suitable sequences in the first test: (3, 3, 3), (3, 6), (6, 3).
There are no suitable sequences in the second test.
| 2,000
|
[
{
"input": "3 9",
"output": "3"
},
{
"input": "5 8",
"output": "0"
},
{
"input": "2 12",
"output": "27"
},
{
"input": "1 8",
"output": "120"
},
{
"input": "1 9",
"output": "252"
},
{
"input": "1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1",
"output": "0"
},
{
"input": "1 1000000000",
"output": "824916815"
},
{
"input": "1 223092870",
"output": "521342052"
},
{
"input": "1 1",
"output": "1"
},
{
"input": "1 994593600",
"output": "558135120"
},
{
"input": "1 425613469",
"output": "455729363"
},
{
"input": "495219 444706662",
"output": "115165527"
},
{
"input": "9357 18255507",
"output": "745979764"
},
{
"input": "741547455 471761895",
"output": "0"
},
{
"input": "225 315096300",
"output": "413133630"
},
{
"input": "183612440 509579899",
"output": "0"
},
{
"input": "231096994 462193988",
"output": "1"
},
{
"input": "34601 35742833",
"output": "60054095"
},
{
"input": "417485019 230941257",
"output": "0"
},
{
"input": "524 991033864",
"output": "172439543"
},
{
"input": "859550004 563726557",
"output": "0"
},
{
"input": "1 282521795",
"output": "436596181"
},
{
"input": "415879151 194713963",
"output": "0"
},
{
"input": "109936444 989427996",
"output": "252"
}
] | 1,513,240,998
| 2,298
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 0
| 46
| 5,529,600
|
from sympy import mobius, divisors
def a(n): return sum([mobius(n/d)*2**(d - 1) for d in divisors(n)])
x, y = map(int, input().split())
if (x % y != 0):
print(0)
quit()
n = x / y
print(a(n))
|
Title: Unusual Sequences
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Count the number of distinct sequences *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*) consisting of positive integers such that *gcd*(*a*1,<=*a*2,<=...,<=*a**n*)<==<=*x* and . As this number could be large, print the answer modulo 109<=+<=7.
*gcd* here means the [greatest common divisor](https://en.wikipedia.org/wiki/Greatest_common_divisor).
Input Specification:
The only line contains two positive integers *x* and *y* (1<=≤<=*x*,<=*y*<=≤<=109).
Output Specification:
Print the number of such sequences modulo 109<=+<=7.
Demo Input:
['3 9\n', '5 8\n']
Demo Output:
['3\n', '0\n']
Note:
There are three suitable sequences in the first test: (3, 3, 3), (3, 6), (6, 3).
There are no suitable sequences in the second test.
|
```python
from sympy import mobius, divisors
def a(n): return sum([mobius(n/d)*2**(d - 1) for d in divisors(n)])
x, y = map(int, input().split())
if (x % y != 0):
print(0)
quit()
n = x / y
print(a(n))
```
| -1
|
|
386
|
C
|
Diverse Substrings
|
PROGRAMMING
| 2,000
|
[
"dp",
"strings",
"two pointers"
] | null | null |
String diversity is the number of symbols that occur in the string at least once. Diversity of *s* will be denoted by *d*(*s*). For example , *d*("aaa")=1, *d*("abacaba")=3.
Given a string *s*, consisting of lowercase Latin letters. Consider all its substrings. Obviously, any substring diversity is a number from 1 to *d*(*s*). Find statistics about substrings diversity: for each *k* from 1 to *d*(*s*), find how many substrings of *s* has a diversity of exactly *k*.
|
The input consists of a single line containing *s*. It contains only lowercase Latin letters, the length of *s* is from 1 to 3·105.
|
Print to the first line the value *d*(*s*). Print sequence *t*1,<=*t*2,<=...,<=*t**d*(*s*) to the following lines, where *t**i* is the number of substrings of *s* having diversity of exactly *i*.
|
[
"abca\n",
"aabacaabbad\n"
] |
[
"3\n4\n3\n3\n",
"4\n14\n19\n28\n5\n"
] |
Consider the first example.
We denote by *s*(*i*, *j*) a substring of "abca" with the indices in the segment [*i*, *j*].
- *s*(1, 1) = "a", *d*("a") = 1 - *s*(2, 2) = "b", *d*("b") = 1 - *s*(3, 3) = "c", *d*("c") = 1 - *s*(4, 4) = "a", *d*("a") = 1 - *s*(1, 2) = "ab", *d*("ab") = 2 - *s*(2, 3) = "bc", *d*("bc") = 2 - *s*(3, 4) = "ca", *d*("ca") = 2 - *s*(1, 3) = "abc", *d*("abc") = 3 - *s*(2, 4) = "bca", *d*("bca") = 3 - *s*(1, 4) = "abca", *d*("abca") = 3
Total number of substring with diversity 1 is 4, with diversity 2 equals 3, 3 diversity is 3.
| 1,500
|
[
{
"input": "abca",
"output": "3\n4\n3\n3"
},
{
"input": "aabacaabbad",
"output": "4\n14\n19\n28\n5"
},
{
"input": "a",
"output": "1\n1"
},
{
"input": "cabaccbcaa",
"output": "3\n12\n13\n30"
},
{
"input": "ccabaccbbb",
"output": "3\n15\n13\n27"
},
{
"input": "accbbaabaa",
"output": "3\n14\n24\n17"
},
{
"input": "bdbdeabeecddebabaebbcaeabeabcadcbcacebdebaaadbcebabacdedbadadbcbdeccabecbecedcbdadbaabdaaaeebbdddcde",
"output": "5\n116\n140\n215\n377\n4202"
},
{
"input": "faaacffcdacdbafffebbaecbbddadbafcddfbbafbebedafcbbccdefcfcddbdefbaabbeacbdcadfdfbeffdbccdbbcefdbeacf",
"output": "6\n120\n138\n171\n226\n469\n3926"
},
{
"input": "ccdfadbdcdadgcgabgcebbccebeabbcebeeacabcbcbdgebabeebbbbecgedecedbeabceegdbbaggagggfgbddgddaaaafeggad",
"output": "7\n127\n166\n208\n394\n478\n2183\n1494"
},
{
"input": "bbcbcaabaccbbbbbccbccbabcaacbacbacacbacbaabbcaccaabccabcaacababcabbacaacccbcbbbcccbacbcbaccbbbaaccca",
"output": "3\n141\n268\n4641"
},
{
"input": "edcdedddbceddbbccceecbdebdaeadeaaeedbdbbbcdaaabaccaadabdcaeeecbdadbebdbeceedbdedcecadecbdeccdeacedce",
"output": "5\n124\n157\n221\n676\n3872"
},
{
"input": "bacebgfbaceddfbfbddaadfgadfcgdfcbeefdfafggadgbfeebcgafefedafgaebafbaadedbffdgcdfacaegeacecgbeabggfed",
"output": "7\n109\n123\n149\n214\n304\n424\n3727"
},
{
"input": "gefighcgdehbaidhajhfhhigfgdbhabejcadbdbecfiabgjdecedbcicggfdajahjgbdbfheggibhieijdjihcfgbbbchddjdcci",
"output": "10\n108\n120\n126\n142\n149\n186\n223\n271\n680\n3045"
},
{
"input": "oqhvuewbdwqslxqigksfkuykyrfnzpbjdispjazvmyvbthdoquzeldlxuzjowjoxebgogjwhxgordphgbmtrkfooknjvjigskskz",
"output": "25\n101\n107\n114\n110\n117\n127\n137\n152\n148\n140\n172\n152\n172\n186\n173\n186\n183\n198\n202\n181\n194\n214\n174\n224\n1186"
},
{
"input": "cbbaacbaba",
"output": "3\n12\n15\n28"
},
{
"input": "acabaaabbc",
"output": "3\n14\n22\n19"
},
{
"input": "bccbcabaaa",
"output": "3\n14\n17\n24"
},
{
"input": "cbbcaaaabc",
"output": "3\n17\n14\n24"
},
{
"input": "caacbbbbab",
"output": "3\n17\n18\n20"
},
{
"input": "bbbbaccbac",
"output": "3\n17\n10\n28"
}
] | 1,695,129,592
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 6
| 1,000
| 307,200
|
s = input()
dist = set(s)
print(len(dist))
resDict = dict()
for i in range(len(s)):
for j in range(i + 1, len(s) + 1):
curDist = len(set(s[i:j]))
if curDist in resDict:
resDict[curDist] += 1
else:
resDict[curDist] = 1
for val in sorted(resDict):
print(resDict[val])
|
Title: Diverse Substrings
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
String diversity is the number of symbols that occur in the string at least once. Diversity of *s* will be denoted by *d*(*s*). For example , *d*("aaa")=1, *d*("abacaba")=3.
Given a string *s*, consisting of lowercase Latin letters. Consider all its substrings. Obviously, any substring diversity is a number from 1 to *d*(*s*). Find statistics about substrings diversity: for each *k* from 1 to *d*(*s*), find how many substrings of *s* has a diversity of exactly *k*.
Input Specification:
The input consists of a single line containing *s*. It contains only lowercase Latin letters, the length of *s* is from 1 to 3·105.
Output Specification:
Print to the first line the value *d*(*s*). Print sequence *t*1,<=*t*2,<=...,<=*t**d*(*s*) to the following lines, where *t**i* is the number of substrings of *s* having diversity of exactly *i*.
Demo Input:
['abca\n', 'aabacaabbad\n']
Demo Output:
['3\n4\n3\n3\n', '4\n14\n19\n28\n5\n']
Note:
Consider the first example.
We denote by *s*(*i*, *j*) a substring of "abca" with the indices in the segment [*i*, *j*].
- *s*(1, 1) = "a", *d*("a") = 1 - *s*(2, 2) = "b", *d*("b") = 1 - *s*(3, 3) = "c", *d*("c") = 1 - *s*(4, 4) = "a", *d*("a") = 1 - *s*(1, 2) = "ab", *d*("ab") = 2 - *s*(2, 3) = "bc", *d*("bc") = 2 - *s*(3, 4) = "ca", *d*("ca") = 2 - *s*(1, 3) = "abc", *d*("abc") = 3 - *s*(2, 4) = "bca", *d*("bca") = 3 - *s*(1, 4) = "abca", *d*("abca") = 3
Total number of substring with diversity 1 is 4, with diversity 2 equals 3, 3 diversity is 3.
|
```python
s = input()
dist = set(s)
print(len(dist))
resDict = dict()
for i in range(len(s)):
for j in range(i + 1, len(s) + 1):
curDist = len(set(s[i:j]))
if curDist in resDict:
resDict[curDist] += 1
else:
resDict[curDist] = 1
for val in sorted(resDict):
print(resDict[val])
```
| 0
|
|
712
|
A
|
Memory and Crow
|
PROGRAMMING
| 800
|
[
"implementation",
"math"
] | null | null |
There are *n* integers *b*1,<=*b*2,<=...,<=*b**n* written in a row. For all *i* from 1 to *n*, values *a**i* are defined by the crows performing the following procedure:
- The crow sets *a**i* initially 0. - The crow then adds *b**i* to *a**i*, subtracts *b**i*<=+<=1, adds the *b**i*<=+<=2 number, and so on until the *n*'th number. Thus, *a**i*<==<=*b**i*<=-<=*b**i*<=+<=1<=+<=*b**i*<=+<=2<=-<=*b**i*<=+<=3....
Memory gives you the values *a*1,<=*a*2,<=...,<=*a**n*, and he now wants you to find the initial numbers *b*1,<=*b*2,<=...,<=*b**n* written in the row? Can you do it?
|
The first line of the input contains a single integer *n* (2<=≤<=*n*<=≤<=100<=000) — the number of integers written in the row.
The next line contains *n*, the *i*'th of which is *a**i* (<=-<=109<=≤<=*a**i*<=≤<=109) — the value of the *i*'th number.
|
Print *n* integers corresponding to the sequence *b*1,<=*b*2,<=...,<=*b**n*. It's guaranteed that the answer is unique and fits in 32-bit integer type.
|
[
"5\n6 -4 8 -2 3\n",
"5\n3 -2 -1 5 6\n"
] |
[
"2 4 6 1 3 \n",
"1 -3 4 11 6 \n"
] |
In the first sample test, the crows report the numbers 6, - 4, 8, - 2, and 3 when he starts at indices 1, 2, 3, 4 and 5 respectively. It is easy to check that the sequence 2 4 6 1 3 satisfies the reports. For example, 6 = 2 - 4 + 6 - 1 + 3, and - 4 = 4 - 6 + 1 - 3.
In the second sample test, the sequence 1, - 3, 4, 11, 6 satisfies the reports. For example, 5 = 11 - 6 and 6 = 6.
| 500
|
[
{
"input": "5\n6 -4 8 -2 3",
"output": "2 4 6 1 3 "
},
{
"input": "5\n3 -2 -1 5 6",
"output": "1 -3 4 11 6 "
},
{
"input": "10\n13 -2 532 -63 -23 -63 -64 -23 12 10",
"output": "11 530 469 -86 -86 -127 -87 -11 22 10 "
},
{
"input": "10\n0 0 0 0 0 0 0 0 0 0",
"output": "0 0 0 0 0 0 0 0 0 0 "
},
{
"input": "10\n1 -1 1 -1 1 -1 1 -1 1 -1",
"output": "0 0 0 0 0 0 0 0 0 -1 "
},
{
"input": "10\n-1000000000 1000000000 -1000000000 1000000000 -1000000000 1000000000 -1000000000 1000000000 -1000000000 1000000000",
"output": "0 0 0 0 0 0 0 0 0 1000000000 "
},
{
"input": "10\n124 532 -642 6482 -124 952 -235 7594 34 -12",
"output": "656 -110 5840 6358 828 717 7359 7628 22 -12 "
},
{
"input": "10\n1294 35852 32749 537295 12048 53729 29357 58320 64739 1240",
"output": "37146 68601 570044 549343 65777 83086 87677 123059 65979 1240 "
}
] | 1,473,687,434
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 49
| 436
| 8,192,000
|
n = int(input())
numbers = [int(x) for x in input().split()]
ans = [0] * n
ans[n-1] = numbers[n-1]
for i in reversed(range(n-1)):
ans[i] = numbers[i+1] + numbers[i]
for an in ans:
print(an, end=" ")
print()
|
Title: Memory and Crow
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There are *n* integers *b*1,<=*b*2,<=...,<=*b**n* written in a row. For all *i* from 1 to *n*, values *a**i* are defined by the crows performing the following procedure:
- The crow sets *a**i* initially 0. - The crow then adds *b**i* to *a**i*, subtracts *b**i*<=+<=1, adds the *b**i*<=+<=2 number, and so on until the *n*'th number. Thus, *a**i*<==<=*b**i*<=-<=*b**i*<=+<=1<=+<=*b**i*<=+<=2<=-<=*b**i*<=+<=3....
Memory gives you the values *a*1,<=*a*2,<=...,<=*a**n*, and he now wants you to find the initial numbers *b*1,<=*b*2,<=...,<=*b**n* written in the row? Can you do it?
Input Specification:
The first line of the input contains a single integer *n* (2<=≤<=*n*<=≤<=100<=000) — the number of integers written in the row.
The next line contains *n*, the *i*'th of which is *a**i* (<=-<=109<=≤<=*a**i*<=≤<=109) — the value of the *i*'th number.
Output Specification:
Print *n* integers corresponding to the sequence *b*1,<=*b*2,<=...,<=*b**n*. It's guaranteed that the answer is unique and fits in 32-bit integer type.
Demo Input:
['5\n6 -4 8 -2 3\n', '5\n3 -2 -1 5 6\n']
Demo Output:
['2 4 6 1 3 \n', '1 -3 4 11 6 \n']
Note:
In the first sample test, the crows report the numbers 6, - 4, 8, - 2, and 3 when he starts at indices 1, 2, 3, 4 and 5 respectively. It is easy to check that the sequence 2 4 6 1 3 satisfies the reports. For example, 6 = 2 - 4 + 6 - 1 + 3, and - 4 = 4 - 6 + 1 - 3.
In the second sample test, the sequence 1, - 3, 4, 11, 6 satisfies the reports. For example, 5 = 11 - 6 and 6 = 6.
|
```python
n = int(input())
numbers = [int(x) for x in input().split()]
ans = [0] * n
ans[n-1] = numbers[n-1]
for i in reversed(range(n-1)):
ans[i] = numbers[i+1] + numbers[i]
for an in ans:
print(an, end=" ")
print()
```
| 3
|
|
361
|
A
|
Levko and Table
|
PROGRAMMING
| 800
|
[
"constructive algorithms",
"implementation"
] | null | null |
Levko loves tables that consist of *n* rows and *n* columns very much. He especially loves beautiful tables. A table is beautiful to Levko if the sum of elements in each row and column of the table equals *k*.
Unfortunately, he doesn't know any such table. Your task is to help him to find at least one of them.
|
The single line contains two integers, *n* and *k* (1<=≤<=*n*<=≤<=100, 1<=≤<=*k*<=≤<=1000).
|
Print any beautiful table. Levko doesn't like too big numbers, so all elements of the table mustn't exceed 1000 in their absolute value.
If there are multiple suitable tables, you are allowed to print any of them.
|
[
"2 4\n",
"4 7\n"
] |
[
"1 3\n3 1\n",
"2 1 0 4\n4 0 2 1\n1 3 3 0\n0 3 2 2\n"
] |
In the first sample the sum in the first row is 1 + 3 = 4, in the second row — 3 + 1 = 4, in the first column — 1 + 3 = 4 and in the second column — 3 + 1 = 4. There are other beautiful tables for this sample.
In the second sample the sum of elements in each row and each column equals 7. Besides, there are other tables that meet the statement requirements.
| 500
|
[
{
"input": "2 4",
"output": "4 0 \n0 4 "
},
{
"input": "4 7",
"output": "7 0 0 0 \n0 7 0 0 \n0 0 7 0 \n0 0 0 7 "
},
{
"input": "1 8",
"output": "8 "
},
{
"input": "9 3",
"output": "3 0 0 0 0 0 0 0 0 \n0 3 0 0 0 0 0 0 0 \n0 0 3 0 0 0 0 0 0 \n0 0 0 3 0 0 0 0 0 \n0 0 0 0 3 0 0 0 0 \n0 0 0 0 0 3 0 0 0 \n0 0 0 0 0 0 3 0 0 \n0 0 0 0 0 0 0 3 0 \n0 0 0 0 0 0 0 0 3 "
},
{
"input": "31 581",
"output": "581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 581 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "100 1000",
"output": "1000 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 1000 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 1000 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 ..."
},
{
"input": "100 999",
"output": "999 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 999 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 999 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "99 998",
"output": "998 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 998 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 998 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "100 997",
"output": "997 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 997 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 997 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "81 111",
"output": "111 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 111 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 111 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 111 0 0..."
},
{
"input": "1 407",
"output": "407 "
},
{
"input": "54 341",
"output": "341 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 341 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 341 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 341 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 341 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "92 460",
"output": "460 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 460 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 460 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "34 47",
"output": "47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 47 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 ..."
},
{
"input": "11 547",
"output": "547 0 0 0 0 0 0 0 0 0 0 \n0 547 0 0 0 0 0 0 0 0 0 \n0 0 547 0 0 0 0 0 0 0 0 \n0 0 0 547 0 0 0 0 0 0 0 \n0 0 0 0 547 0 0 0 0 0 0 \n0 0 0 0 0 547 0 0 0 0 0 \n0 0 0 0 0 0 547 0 0 0 0 \n0 0 0 0 0 0 0 547 0 0 0 \n0 0 0 0 0 0 0 0 547 0 0 \n0 0 0 0 0 0 0 0 0 547 0 \n0 0 0 0 0 0 0 0 0 0 547 "
},
{
"input": "100 1",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "99 1",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "99 2",
"output": "2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "2 7",
"output": "7 0 \n0 7 "
},
{
"input": "100 100",
"output": "100 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 100 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 100 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "4 3",
"output": "3 0 0 0 \n0 3 0 0 \n0 0 3 0 \n0 0 0 3 "
},
{
"input": "3 2",
"output": "2 0 0 \n0 2 0 \n0 0 2 "
}
] | 1,474,976,726
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 22
| 77
| 0
|
if __name__ == '__main__':
n, k = str(input()).split()
n = int(n)
k = int(k)
for i in range(n):
line = list()
for j in range(i):
line.append('0')
line.append(str(k))
for j in range(i + 1, n):
line.append('0')
print(' '.join(line))
|
Title: Levko and Table
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Levko loves tables that consist of *n* rows and *n* columns very much. He especially loves beautiful tables. A table is beautiful to Levko if the sum of elements in each row and column of the table equals *k*.
Unfortunately, he doesn't know any such table. Your task is to help him to find at least one of them.
Input Specification:
The single line contains two integers, *n* and *k* (1<=≤<=*n*<=≤<=100, 1<=≤<=*k*<=≤<=1000).
Output Specification:
Print any beautiful table. Levko doesn't like too big numbers, so all elements of the table mustn't exceed 1000 in their absolute value.
If there are multiple suitable tables, you are allowed to print any of them.
Demo Input:
['2 4\n', '4 7\n']
Demo Output:
['1 3\n3 1\n', '2 1 0 4\n4 0 2 1\n1 3 3 0\n0 3 2 2\n']
Note:
In the first sample the sum in the first row is 1 + 3 = 4, in the second row — 3 + 1 = 4, in the first column — 1 + 3 = 4 and in the second column — 3 + 1 = 4. There are other beautiful tables for this sample.
In the second sample the sum of elements in each row and each column equals 7. Besides, there are other tables that meet the statement requirements.
|
```python
if __name__ == '__main__':
n, k = str(input()).split()
n = int(n)
k = int(k)
for i in range(n):
line = list()
for j in range(i):
line.append('0')
line.append(str(k))
for j in range(i + 1, n):
line.append('0')
print(' '.join(line))
```
| 3
|
|
842
|
B
|
Gleb And Pizza
|
PROGRAMMING
| 1,100
|
[
"geometry"
] | null | null |
Gleb ordered pizza home. When the courier delivered the pizza, he was very upset, because several pieces of sausage lay on the crust, and he does not really like the crust.
The pizza is a circle of radius *r* and center at the origin. Pizza consists of the main part — circle of radius *r*<=-<=*d* with center at the origin, and crust around the main part of the width *d*. Pieces of sausage are also circles. The radius of the *i* -th piece of the sausage is *r**i*, and the center is given as a pair (*x**i*, *y**i*).
Gleb asks you to help determine the number of pieces of sausage caught on the crust. A piece of sausage got on the crust, if it completely lies on the crust.
|
First string contains two integer numbers *r* and *d* (0<=≤<=*d*<=<<=*r*<=≤<=500) — the radius of pizza and the width of crust.
Next line contains one integer number *n* — the number of pieces of sausage (1<=≤<=*n*<=≤<=105).
Each of next *n* lines contains three integer numbers *x**i*, *y**i* and *r**i* (<=-<=500<=≤<=*x**i*,<=*y**i*<=≤<=500, 0<=≤<=*r**i*<=≤<=500), where *x**i* and *y**i* are coordinates of the center of *i*-th peace of sausage, *r**i* — radius of *i*-th peace of sausage.
|
Output the number of pieces of sausage that lay on the crust.
|
[
"8 4\n7\n7 8 1\n-7 3 2\n0 2 1\n0 -2 2\n-3 -3 1\n0 6 2\n5 3 1\n",
"10 8\n4\n0 0 9\n0 0 10\n1 0 1\n1 0 2\n"
] |
[
"2\n",
"0\n"
] |
Below is a picture explaining the first example. Circles of green color denote pieces of sausage lying on the crust.
| 1,000
|
[
{
"input": "8 4\n7\n7 8 1\n-7 3 2\n0 2 1\n0 -2 2\n-3 -3 1\n0 6 2\n5 3 1",
"output": "2"
},
{
"input": "10 8\n4\n0 0 9\n0 0 10\n1 0 1\n1 0 2",
"output": "0"
},
{
"input": "1 0\n1\n1 1 0",
"output": "0"
},
{
"input": "3 0\n5\n3 0 0\n0 3 0\n-3 0 0\n0 -3 0\n3 0 1",
"output": "4"
},
{
"input": "9 0\n5\n8 1 0\n8 2 0\n8 3 0\n-8 3 0\n-8 2 0",
"output": "0"
},
{
"input": "10 2\n11\n1 1 0\n2 2 3\n3 3 0\n4 4 0\n5 5 0\n6 6 0\n7 7 4\n8 8 7\n9 9 3\n10 10 100\n9 0 1",
"output": "2"
},
{
"input": "5 3\n1\n500 500 10",
"output": "0"
}
] | 1,603,027,682
| 482
|
Python 3
|
OK
|
TESTS
| 34
| 483
| 0
|
import math
r, d = map(int, input().split())
n = int(input())
s = 0
for i in range(0, n):
x, y, r1 = map(int, input().split())
if math.sqrt(x**2 + y**2) >= r-d+r1 and math.sqrt(x**2 + y**2) + r1 <= r:
s+=1
print(s)
|
Title: Gleb And Pizza
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Gleb ordered pizza home. When the courier delivered the pizza, he was very upset, because several pieces of sausage lay on the crust, and he does not really like the crust.
The pizza is a circle of radius *r* and center at the origin. Pizza consists of the main part — circle of radius *r*<=-<=*d* with center at the origin, and crust around the main part of the width *d*. Pieces of sausage are also circles. The radius of the *i* -th piece of the sausage is *r**i*, and the center is given as a pair (*x**i*, *y**i*).
Gleb asks you to help determine the number of pieces of sausage caught on the crust. A piece of sausage got on the crust, if it completely lies on the crust.
Input Specification:
First string contains two integer numbers *r* and *d* (0<=≤<=*d*<=<<=*r*<=≤<=500) — the radius of pizza and the width of crust.
Next line contains one integer number *n* — the number of pieces of sausage (1<=≤<=*n*<=≤<=105).
Each of next *n* lines contains three integer numbers *x**i*, *y**i* and *r**i* (<=-<=500<=≤<=*x**i*,<=*y**i*<=≤<=500, 0<=≤<=*r**i*<=≤<=500), where *x**i* and *y**i* are coordinates of the center of *i*-th peace of sausage, *r**i* — radius of *i*-th peace of sausage.
Output Specification:
Output the number of pieces of sausage that lay on the crust.
Demo Input:
['8 4\n7\n7 8 1\n-7 3 2\n0 2 1\n0 -2 2\n-3 -3 1\n0 6 2\n5 3 1\n', '10 8\n4\n0 0 9\n0 0 10\n1 0 1\n1 0 2\n']
Demo Output:
['2\n', '0\n']
Note:
Below is a picture explaining the first example. Circles of green color denote pieces of sausage lying on the crust.
|
```python
import math
r, d = map(int, input().split())
n = int(input())
s = 0
for i in range(0, n):
x, y, r1 = map(int, input().split())
if math.sqrt(x**2 + y**2) >= r-d+r1 and math.sqrt(x**2 + y**2) + r1 <= r:
s+=1
print(s)
```
| 3
|
|
387
|
A
|
George and Sleep
|
PROGRAMMING
| 900
|
[
"implementation"
] | null | null |
George woke up and saw the current time *s* on the digital clock. Besides, George knows that he has slept for time *t*.
Help George! Write a program that will, given time *s* and *t*, determine the time *p* when George went to bed. Note that George could have gone to bed yesterday relatively to the current time (see the second test sample).
|
The first line contains current time *s* as a string in the format "hh:mm". The second line contains time *t* in the format "hh:mm" — the duration of George's sleep. It is guaranteed that the input contains the correct time in the 24-hour format, that is, 00<=≤<=*hh*<=≤<=23, 00<=≤<=*mm*<=≤<=59.
|
In the single line print time *p* — the time George went to bed in the format similar to the format of the time in the input.
|
[
"05:50\n05:44\n",
"00:00\n01:00\n",
"00:01\n00:00\n"
] |
[
"00:06\n",
"23:00\n",
"00:01\n"
] |
In the first sample George went to bed at "00:06". Note that you should print the time only in the format "00:06". That's why answers "0:06", "00:6" and others will be considered incorrect.
In the second sample, George went to bed yesterday.
In the third sample, George didn't do to bed at all.
| 500
|
[
{
"input": "05:50\n05:44",
"output": "00:06"
},
{
"input": "00:00\n01:00",
"output": "23:00"
},
{
"input": "00:01\n00:00",
"output": "00:01"
},
{
"input": "23:59\n23:59",
"output": "00:00"
},
{
"input": "23:44\n23:55",
"output": "23:49"
},
{
"input": "00:00\n13:12",
"output": "10:48"
},
{
"input": "12:00\n23:59",
"output": "12:01"
},
{
"input": "12:44\n12:44",
"output": "00:00"
},
{
"input": "05:55\n07:12",
"output": "22:43"
},
{
"input": "07:12\n05:55",
"output": "01:17"
},
{
"input": "22:22\n22:22",
"output": "00:00"
},
{
"input": "22:22\n22:23",
"output": "23:59"
},
{
"input": "23:24\n23:23",
"output": "00:01"
},
{
"input": "00:00\n00:00",
"output": "00:00"
},
{
"input": "23:30\n00:00",
"output": "23:30"
},
{
"input": "01:00\n00:00",
"output": "01:00"
},
{
"input": "05:44\n06:00",
"output": "23:44"
},
{
"input": "00:00\n23:59",
"output": "00:01"
},
{
"input": "21:00\n01:00",
"output": "20:00"
},
{
"input": "21:21\n12:21",
"output": "09:00"
},
{
"input": "12:21\n21:12",
"output": "15:09"
},
{
"input": "12:33\n23:33",
"output": "13:00"
},
{
"input": "07:55\n05:53",
"output": "02:02"
},
{
"input": "19:30\n02:00",
"output": "17:30"
},
{
"input": "21:30\n02:00",
"output": "19:30"
},
{
"input": "19:30\n09:30",
"output": "10:00"
},
{
"input": "13:08\n00:42",
"output": "12:26"
},
{
"input": "13:04\n09:58",
"output": "03:06"
},
{
"input": "21:21\n23:06",
"output": "22:15"
},
{
"input": "20:53\n10:23",
"output": "10:30"
},
{
"input": "12:59\n00:45",
"output": "12:14"
},
{
"input": "12:39\n22:21",
"output": "14:18"
},
{
"input": "21:10\n13:50",
"output": "07:20"
},
{
"input": "03:38\n23:46",
"output": "03:52"
},
{
"input": "03:48\n00:41",
"output": "03:07"
},
{
"input": "07:43\n12:27",
"output": "19:16"
},
{
"input": "03:23\n08:52",
"output": "18:31"
},
{
"input": "16:04\n10:28",
"output": "05:36"
},
{
"input": "12:53\n08:37",
"output": "04:16"
},
{
"input": "13:43\n17:23",
"output": "20:20"
},
{
"input": "00:00\n00:01",
"output": "23:59"
},
{
"input": "10:10\n01:01",
"output": "09:09"
},
{
"input": "10:05\n00:00",
"output": "10:05"
},
{
"input": "09:09\n00:00",
"output": "09:09"
},
{
"input": "09:10\n00:01",
"output": "09:09"
},
{
"input": "23:24\n00:28",
"output": "22:56"
},
{
"input": "10:00\n01:00",
"output": "09:00"
}
] | 1,478,320,124
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 47
| 62
| 0
|
bangun = input().split(":")
lama_tidur = input().split(":")
menit = int(bangun[1]) - int(lama_tidur[1])
jam = int(bangun[0]) - int(lama_tidur[0])
if menit < 0:
menit += 60
jam -= 1
if jam < 0:
jam += 24
A = str(menit)
B = str(jam)
if len(A) < 2:
A = "0"+A
if len(B)<2:
B = "0"+B
print(B+":"+A)
|
Title: George and Sleep
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
George woke up and saw the current time *s* on the digital clock. Besides, George knows that he has slept for time *t*.
Help George! Write a program that will, given time *s* and *t*, determine the time *p* when George went to bed. Note that George could have gone to bed yesterday relatively to the current time (see the second test sample).
Input Specification:
The first line contains current time *s* as a string in the format "hh:mm". The second line contains time *t* in the format "hh:mm" — the duration of George's sleep. It is guaranteed that the input contains the correct time in the 24-hour format, that is, 00<=≤<=*hh*<=≤<=23, 00<=≤<=*mm*<=≤<=59.
Output Specification:
In the single line print time *p* — the time George went to bed in the format similar to the format of the time in the input.
Demo Input:
['05:50\n05:44\n', '00:00\n01:00\n', '00:01\n00:00\n']
Demo Output:
['00:06\n', '23:00\n', '00:01\n']
Note:
In the first sample George went to bed at "00:06". Note that you should print the time only in the format "00:06". That's why answers "0:06", "00:6" and others will be considered incorrect.
In the second sample, George went to bed yesterday.
In the third sample, George didn't do to bed at all.
|
```python
bangun = input().split(":")
lama_tidur = input().split(":")
menit = int(bangun[1]) - int(lama_tidur[1])
jam = int(bangun[0]) - int(lama_tidur[0])
if menit < 0:
menit += 60
jam -= 1
if jam < 0:
jam += 24
A = str(menit)
B = str(jam)
if len(A) < 2:
A = "0"+A
if len(B)<2:
B = "0"+B
print(B+":"+A)
```
| 3
|
|
1
|
A
|
Theatre Square
|
PROGRAMMING
| 1,000
|
[
"math"
] |
A. Theatre Square
|
1
|
256
|
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
|
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
|
Write the needed number of flagstones.
|
[
"6 6 4\n"
] |
[
"4\n"
] |
none
| 0
|
[
{
"input": "6 6 4",
"output": "4"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "2 1 1",
"output": "2"
},
{
"input": "1 2 1",
"output": "2"
},
{
"input": "2 2 1",
"output": "4"
},
{
"input": "2 1 2",
"output": "1"
},
{
"input": "1 1 3",
"output": "1"
},
{
"input": "2 3 4",
"output": "1"
},
{
"input": "1000000000 1000000000 1",
"output": "1000000000000000000"
},
{
"input": "12 13 4",
"output": "12"
},
{
"input": "222 332 5",
"output": "3015"
},
{
"input": "1000 1000 10",
"output": "10000"
},
{
"input": "1001 1000 10",
"output": "10100"
},
{
"input": "100 10001 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 999999999",
"output": "4"
},
{
"input": "1000000000 1000000000 192",
"output": "27126743055556"
},
{
"input": "1000000000 987654321 1",
"output": "987654321000000000"
},
{
"input": "456784567 1000000000 51",
"output": "175618850864484"
},
{
"input": "39916800 134217728 40320",
"output": "3295710"
}
] | 1,668,341,708
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 1
| 46
| 0
|
from math import ceil
n, m, x = input().split(' ')
result = ceil((int(m) * int(n)) / (int(x) * int(x)))
if result % 2: result += 1
print(result)
|
Title: Theatre Square
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
Input Specification:
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
Output Specification:
Write the needed number of flagstones.
Demo Input:
['6 6 4\n']
Demo Output:
['4\n']
Note:
none
|
```python
from math import ceil
n, m, x = input().split(' ')
result = ceil((int(m) * int(n)) / (int(x) * int(x)))
if result % 2: result += 1
print(result)
```
| 0
|
676
|
C
|
Vasya and String
|
PROGRAMMING
| 1,500
|
[
"binary search",
"dp",
"strings",
"two pointers"
] | null | null |
High school student Vasya got a string of length *n* as a birthday present. This string consists of letters 'a' and 'b' only. Vasya denotes beauty of the string as the maximum length of a substring (consecutive subsequence) consisting of equal letters.
Vasya can change no more than *k* characters of the original string. What is the maximum beauty of the string he can achieve?
|
The first line of the input contains two integers *n* and *k* (1<=≤<=*n*<=≤<=100<=000,<=0<=≤<=*k*<=≤<=*n*) — the length of the string and the maximum number of characters to change.
The second line contains the string, consisting of letters 'a' and 'b' only.
|
Print the only integer — the maximum beauty of the string Vasya can achieve by changing no more than *k* characters.
|
[
"4 2\nabba\n",
"8 1\naabaabaa\n"
] |
[
"4\n",
"5\n"
] |
In the first sample, Vasya can obtain both strings "aaaa" and "bbbb".
In the second sample, the optimal answer is obtained with the string "aaaaabaa" or with the string "aabaaaaa".
| 1,500
|
[
{
"input": "4 2\nabba",
"output": "4"
},
{
"input": "8 1\naabaabaa",
"output": "5"
},
{
"input": "1 0\na",
"output": "1"
},
{
"input": "1 1\nb",
"output": "1"
},
{
"input": "1 0\nb",
"output": "1"
},
{
"input": "1 1\na",
"output": "1"
},
{
"input": "10 10\nbbbbbbbbbb",
"output": "10"
},
{
"input": "10 2\nbbbbbbbbbb",
"output": "10"
},
{
"input": "10 1\nbbabbabbba",
"output": "6"
},
{
"input": "10 10\nbbabbbaabb",
"output": "10"
},
{
"input": "10 9\nbabababbba",
"output": "10"
},
{
"input": "10 4\nbababbaaab",
"output": "9"
},
{
"input": "10 10\naabaaabaaa",
"output": "10"
},
{
"input": "10 10\naaaabbbaaa",
"output": "10"
},
{
"input": "10 1\nbaaaaaaaab",
"output": "9"
},
{
"input": "10 5\naaaaabaaaa",
"output": "10"
},
{
"input": "10 4\naaaaaaaaaa",
"output": "10"
},
{
"input": "100 10\nbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbb",
"output": "100"
},
{
"input": "100 7\nbbbbabbbbbaabbbabbbbbbbbbbbabbbbbbbbbbbbbbbbbbbbbbbbbabbbbbbbbbbbabbabbbbbbbbbbbbbbbbbbbbbbbbbbbbbab",
"output": "93"
},
{
"input": "100 30\nbbaabaaabbbbbbbbbbaababababbbbbbaabaabbbbbbbbabbbbbabbbbabbbbbbbbaabbbbbbbbbabbbbbabbbbbbbbbaaaaabba",
"output": "100"
},
{
"input": "100 6\nbaababbbaabbabbaaabbabbaabbbbbbbbaabbbabbbbaabbabbbbbabababbbbabbbbbbabbbbbbbbbaaaabbabbbbaabbabaabb",
"output": "34"
},
{
"input": "100 45\naabababbabbbaaabbbbbbaabbbabbaabbbbbabbbbbbbbabbbbbbabbaababbaabbababbbbbbababbbbbaabbbbbbbaaaababab",
"output": "100"
},
{
"input": "100 2\nababaabababaaababbaaaabbaabbbababbbaaabbbbabababbbabababaababaaabaabbbbaaabbbabbbbbabbbbbbbaabbabbba",
"output": "17"
},
{
"input": "100 25\nbabbbaaababaaabbbaabaabaabbbabbabbbbaaaaaaabaaabaaaaaaaaaabaaaabaaabbbaaabaaababaaabaabbbbaaaaaaaaaa",
"output": "80"
},
{
"input": "100 14\naabaaaaabababbabbabaaaabbaaaabaaabbbaaabaaaaaaaabaaaaabbaaaaaaaaabaaaaaaabbaababaaaababbbbbabaaaabaa",
"output": "61"
},
{
"input": "100 8\naaaaabaaaabaabaaaaaaaabaaaabaaaaaaaaaaaaaabaaaaabaaaaaaaaaaaaaaaaabaaaababaabaaaaaaaaaaaaabbabaaaaaa",
"output": "76"
},
{
"input": "100 12\naaaaaaaaaaaaaaaabaaabaaaaaaaaaabbaaaabbabaaaaaaaaaaaaaaaaaaaaabbaaabaaaaaaaaaaaabaaaaaaaabaaaaaaaaaa",
"output": "100"
},
{
"input": "100 65\naaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaa",
"output": "100"
},
{
"input": "10 0\nbbbbbbbbbb",
"output": "10"
},
{
"input": "10 0\nbbbbabbbbb",
"output": "5"
},
{
"input": "10 0\nbbabbbabba",
"output": "3"
},
{
"input": "10 0\nbaabbbbaba",
"output": "4"
},
{
"input": "10 0\naababbbbaa",
"output": "4"
},
{
"input": "10 2\nabbbbbaaba",
"output": "8"
},
{
"input": "10 0\nabbaaabaaa",
"output": "3"
},
{
"input": "10 0\naabbaaabaa",
"output": "3"
},
{
"input": "10 1\naaaaaababa",
"output": "8"
},
{
"input": "10 0\nbaaaaaaaaa",
"output": "9"
},
{
"input": "10 0\naaaaaaaaaa",
"output": "10"
},
{
"input": "100 0\nbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbb",
"output": "100"
},
{
"input": "100 0\nbbbbbbbbbbabbbbaaabbbbbbbbbbbabbbabbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbbabbbbbbbbbabbbbbbbbbbbbbab",
"output": "40"
},
{
"input": "100 11\nbaabbbbbababbbbabbbbbbbabbbbbbbbbbbbbbabbbbbbababbbbababbbbaaabbbbabbbbbabbbbbbbbabababbbabbbbbbbabb",
"output": "65"
},
{
"input": "100 8\nbbababbbbbaabbbaaababbbbababababbbbababbabbbabbbbbaabbbabbbababbabbbbabbbabbbbaabbbbabbbaabbbbaaaabb",
"output": "33"
},
{
"input": "100 21\nabbaaaabbbababaabbbababbbbbbbbabbaababababbbabbbaaabbaaabbbbabbabbbabbbabaababbbabbbbbabbbbbbabbbbab",
"output": "65"
},
{
"input": "100 9\nabbbaabaabaaaaaaabbabbbababbaaabbbaaabbaabaaaaabbbbbabbaabaabbbbbaaaaababbaaabbabaabaaabababbaababbb",
"output": "26"
},
{
"input": "100 5\naababababbaaaaaaaabbbabaaaabbabaaaabbaabaaaaabababbabaabaaabaaaaaaaabaababbabbaaabaabbabbaaaaabbabba",
"output": "22"
},
{
"input": "100 9\naababaabaaaaaaaaabbbaabaaaaaaabaaaaaaaaaaaaabaaabaabaabbbbabbaababbabbaaaabbababaabaababaabaaaaaaaaa",
"output": "49"
},
{
"input": "100 6\naaaaabbaaaaaaaaaaabaaaabaaaaaaaaabaaabaaaaaabaaaaaaaaaaabaabaaaabaaaaaaaaaaaaaaabaabbaaaaaaaaaaaaaaa",
"output": "56"
},
{
"input": "100 7\nabaaabaabaabaaaaaabaaaaaaaaaaaaaaaaaaaaaaaaaaaaabaaabaaaaaaabbabaaaaaaaaaaaaaaaaabaaaaaaaaaaaaaaaaba",
"output": "86"
},
{
"input": "100 0\naaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaa",
"output": "100"
}
] | 1,578,052,603
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 2
| 93
| 307,200
|
n, k = map(int, input().split())
s = input().rstrip()
a = [0]
b = [0]
for ch in s:
a.append(a[-1] + (ch == 'a'))
b.append(b[-1] + (ch == 'b'))
def maxSize(a):
ret = 0
first = [-1] * n
for i, val in enumerate(a):
if first[val] == -1:
first[val] = i
if val <= k:
ret = max(ret, i)
elif first[val - k] != -1:
ret = max(ret, i - first[val - k])
return ret
print(max(maxSize(a), maxSize(b)))
|
Title: Vasya and String
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
High school student Vasya got a string of length *n* as a birthday present. This string consists of letters 'a' and 'b' only. Vasya denotes beauty of the string as the maximum length of a substring (consecutive subsequence) consisting of equal letters.
Vasya can change no more than *k* characters of the original string. What is the maximum beauty of the string he can achieve?
Input Specification:
The first line of the input contains two integers *n* and *k* (1<=≤<=*n*<=≤<=100<=000,<=0<=≤<=*k*<=≤<=*n*) — the length of the string and the maximum number of characters to change.
The second line contains the string, consisting of letters 'a' and 'b' only.
Output Specification:
Print the only integer — the maximum beauty of the string Vasya can achieve by changing no more than *k* characters.
Demo Input:
['4 2\nabba\n', '8 1\naabaabaa\n']
Demo Output:
['4\n', '5\n']
Note:
In the first sample, Vasya can obtain both strings "aaaa" and "bbbb".
In the second sample, the optimal answer is obtained with the string "aaaaabaa" or with the string "aabaaaaa".
|
```python
n, k = map(int, input().split())
s = input().rstrip()
a = [0]
b = [0]
for ch in s:
a.append(a[-1] + (ch == 'a'))
b.append(b[-1] + (ch == 'b'))
def maxSize(a):
ret = 0
first = [-1] * n
for i, val in enumerate(a):
if first[val] == -1:
first[val] = i
if val <= k:
ret = max(ret, i)
elif first[val - k] != -1:
ret = max(ret, i - first[val - k])
return ret
print(max(maxSize(a), maxSize(b)))
```
| -1
|
|
633
|
C
|
Spy Syndrome 2
|
PROGRAMMING
| 1,900
|
[
"data structures",
"dp",
"hashing",
"implementation",
"sortings",
"string suffix structures",
"strings"
] | null | null |
After observing the results of Spy Syndrome, Yash realised the errors of his ways. He now believes that a super spy such as Siddhant can't use a cipher as basic and ancient as Caesar cipher. After many weeks of observation of Siddhant’s sentences, Yash determined a new cipher technique.
For a given sentence, the cipher is processed as:
1. Convert all letters of the sentence to lowercase. 1. Reverse each of the words of the sentence individually. 1. Remove all the spaces in the sentence.
For example, when this cipher is applied to the sentence
Kira is childish and he hates losing
the resulting string is
ariksihsidlihcdnaehsetahgnisol
Now Yash is given some ciphered string and a list of words. Help him to find out any original sentence composed using only words from the list. Note, that any of the given words could be used in the sentence multiple times.
|
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=10<=000) — the length of the ciphered text. The second line consists of *n* lowercase English letters — the ciphered text *t*.
The third line contains a single integer *m* (1<=≤<=*m*<=≤<=100<=000) — the number of words which will be considered while deciphering the text. Each of the next *m* lines contains a non-empty word *w**i* (|*w**i*|<=≤<=1<=000) consisting of uppercase and lowercase English letters only. It's guaranteed that the total length of all words doesn't exceed 1<=000<=000.
|
Print one line — the original sentence. It is guaranteed that at least one solution exists. If there are multiple solutions, you may output any of those.
|
[
"30\nariksihsidlihcdnaehsetahgnisol\n10\nKira\nhates\nis\nhe\nlosing\ndeath\nchildish\nL\nand\nNote\n",
"12\niherehtolleh\n5\nHI\nHo\nthere\nHeLLo\nhello\n"
] |
[
"Kira is childish and he hates losing \n",
"HI there HeLLo \n"
] |
In sample case 2 there may be multiple accepted outputs, "HI there HeLLo" and "HI there hello" you may output any of them.
| 1,500
|
[
{
"input": "30\nariksihsidlihcdnaehsetahgnisol\n10\nKira\nhates\nis\nhe\nlosing\ndeath\nchildish\nL\nand\nNote",
"output": "Kira is childish and he hates losing "
},
{
"input": "12\niherehtolleh\n5\nHI\nHo\nthere\nHeLLo\nhello",
"output": "HI there HeLLo "
},
{
"input": "71\nbaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaa\n8\na\naa\naaa\naaaa\naaaaa\naaaaaa\naaaaaaa\naaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaab",
"output": "aaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaab "
},
{
"input": "11\naaaaaaaaaaa\n3\naaaa\naaaaa\naaaaaa",
"output": "aaaaaa aaaaa "
},
{
"input": "5\ncbaed\n6\nbc\nea\nab\ncd\nabc\nde",
"output": "abc de "
},
{
"input": "5\nlehet\n3\nel\nhel\nte",
"output": "hel te "
},
{
"input": "3\naab\n2\na\nbaa",
"output": "baa "
},
{
"input": "3\naab\n2\naa\nbaa",
"output": "baa "
},
{
"input": "9\naaaaaaaaa\n2\naa\naaa",
"output": "aaa aa aa aa "
},
{
"input": "7\nabababc\n2\nba\ncba",
"output": "ba ba cba "
},
{
"input": "7\nkirkirk\n2\nrik\nkrik",
"output": "rik krik "
}
] | 1,456,511,036
| 4,136
|
Python 3
|
RUNTIME_ERROR
|
PRETESTS
| 2
| 62
| 204,800
|
# You lost the game.
n = int(input())
ch = str(input())
m = int(input())
T = [str(input()) for _ in range(m)]
def envers(mot):
resultat = ""
for lettre in mot:
resultat = lettre+resultat
return resultat
def minus(mot):
A = "abcdefghijklmnopqrstuvwxyzABCDEFGHIJKLMNOPQRSTUVWXYZ"
r = ""
for lettre in mot:
e = A.index(lettre)
if e <= 25:
r = r + lettre
else:
r = r + A[e-26]
return r
lc = [minus(T[i]) for i in range(m)]
rev = [envers(lc[i]) for i in range(m)]
dct = {}
for i in range(m):
s = rev[i]
cur = dct
for j in range(len(s)):
if not(s[j] in cur):
cur[s[j]] = {}
cur = cur[s[j]]
cur["f0"] = T[i]
r = []
fin = []
ind = []
k = 0
cur = dct
while 1:
if k < n:
c = ch[k]
if "f0" in cur:
r += [cur["f0"]]
fin += [cur]
ind += [k]
del cur["f0"]
cur = dct
if k == n:
break
elif c in cur:
cur = cur[c]
k += 1
else:
l = len(ind)-1
k = ind[l]
cur = fin[l]
del ind[l]
del fin[l]
del r[l]
for i in range(len(r)):
print(r[i],end=" ")
|
Title: Spy Syndrome 2
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
After observing the results of Spy Syndrome, Yash realised the errors of his ways. He now believes that a super spy such as Siddhant can't use a cipher as basic and ancient as Caesar cipher. After many weeks of observation of Siddhant’s sentences, Yash determined a new cipher technique.
For a given sentence, the cipher is processed as:
1. Convert all letters of the sentence to lowercase. 1. Reverse each of the words of the sentence individually. 1. Remove all the spaces in the sentence.
For example, when this cipher is applied to the sentence
Kira is childish and he hates losing
the resulting string is
ariksihsidlihcdnaehsetahgnisol
Now Yash is given some ciphered string and a list of words. Help him to find out any original sentence composed using only words from the list. Note, that any of the given words could be used in the sentence multiple times.
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=10<=000) — the length of the ciphered text. The second line consists of *n* lowercase English letters — the ciphered text *t*.
The third line contains a single integer *m* (1<=≤<=*m*<=≤<=100<=000) — the number of words which will be considered while deciphering the text. Each of the next *m* lines contains a non-empty word *w**i* (|*w**i*|<=≤<=1<=000) consisting of uppercase and lowercase English letters only. It's guaranteed that the total length of all words doesn't exceed 1<=000<=000.
Output Specification:
Print one line — the original sentence. It is guaranteed that at least one solution exists. If there are multiple solutions, you may output any of those.
Demo Input:
['30\nariksihsidlihcdnaehsetahgnisol\n10\nKira\nhates\nis\nhe\nlosing\ndeath\nchildish\nL\nand\nNote\n', '12\niherehtolleh\n5\nHI\nHo\nthere\nHeLLo\nhello\n']
Demo Output:
['Kira is childish and he hates losing \n', 'HI there HeLLo \n']
Note:
In sample case 2 there may be multiple accepted outputs, "HI there HeLLo" and "HI there hello" you may output any of them.
|
```python
# You lost the game.
n = int(input())
ch = str(input())
m = int(input())
T = [str(input()) for _ in range(m)]
def envers(mot):
resultat = ""
for lettre in mot:
resultat = lettre+resultat
return resultat
def minus(mot):
A = "abcdefghijklmnopqrstuvwxyzABCDEFGHIJKLMNOPQRSTUVWXYZ"
r = ""
for lettre in mot:
e = A.index(lettre)
if e <= 25:
r = r + lettre
else:
r = r + A[e-26]
return r
lc = [minus(T[i]) for i in range(m)]
rev = [envers(lc[i]) for i in range(m)]
dct = {}
for i in range(m):
s = rev[i]
cur = dct
for j in range(len(s)):
if not(s[j] in cur):
cur[s[j]] = {}
cur = cur[s[j]]
cur["f0"] = T[i]
r = []
fin = []
ind = []
k = 0
cur = dct
while 1:
if k < n:
c = ch[k]
if "f0" in cur:
r += [cur["f0"]]
fin += [cur]
ind += [k]
del cur["f0"]
cur = dct
if k == n:
break
elif c in cur:
cur = cur[c]
k += 1
else:
l = len(ind)-1
k = ind[l]
cur = fin[l]
del ind[l]
del fin[l]
del r[l]
for i in range(len(r)):
print(r[i],end=" ")
```
| -1
|
|
50
|
A
|
Domino piling
|
PROGRAMMING
| 800
|
[
"greedy",
"math"
] |
A. Domino piling
|
2
|
256
|
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
|
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
|
Output one number — the maximal number of dominoes, which can be placed.
|
[
"2 4\n",
"3 3\n"
] |
[
"4\n",
"4\n"
] |
none
| 500
|
[
{
"input": "2 4",
"output": "4"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "1 5",
"output": "2"
},
{
"input": "1 6",
"output": "3"
},
{
"input": "1 15",
"output": "7"
},
{
"input": "1 16",
"output": "8"
},
{
"input": "2 5",
"output": "5"
},
{
"input": "2 6",
"output": "6"
},
{
"input": "2 7",
"output": "7"
},
{
"input": "2 14",
"output": "14"
},
{
"input": "2 15",
"output": "15"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 16",
"output": "16"
},
{
"input": "3 5",
"output": "7"
},
{
"input": "3 6",
"output": "9"
},
{
"input": "3 10",
"output": "15"
},
{
"input": "3 14",
"output": "21"
},
{
"input": "3 15",
"output": "22"
},
{
"input": "3 16",
"output": "24"
},
{
"input": "5 7",
"output": "17"
},
{
"input": "16 16",
"output": "128"
},
{
"input": "15 16",
"output": "120"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "15 15",
"output": "112"
},
{
"input": "14 16",
"output": "112"
},
{
"input": "11 13",
"output": "71"
},
{
"input": "5 16",
"output": "40"
},
{
"input": "8 15",
"output": "60"
},
{
"input": "2 2",
"output": "2"
},
{
"input": "3 4",
"output": "6"
},
{
"input": "4 4",
"output": "8"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "14 15",
"output": "105"
}
] | 1,621,175,777
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 35
| 218
| 0
|
m,n=input().split()
m=int(m)
n=int(n)
print(int((m*n)/2))
|
Title: Domino piling
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
Input Specification:
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
Output Specification:
Output one number — the maximal number of dominoes, which can be placed.
Demo Input:
['2 4\n', '3 3\n']
Demo Output:
['4\n', '4\n']
Note:
none
|
```python
m,n=input().split()
m=int(m)
n=int(n)
print(int((m*n)/2))
```
| 3.9455
|
242
|
A
|
Heads or Tails
|
PROGRAMMING
| 1,100
|
[
"brute force",
"implementation"
] | null | null |
Petya and Vasya are tossing a coin. Their friend Valera is appointed as a judge. The game is very simple. First Vasya tosses a coin *x* times, then Petya tosses a coin *y* times. If the tossing player gets head, he scores one point. If he gets tail, nobody gets any points. The winner is the player with most points by the end of the game. If boys have the same number of points, the game finishes with a draw.
At some point, Valera lost his count, and so he can not say exactly what the score is at the end of the game. But there are things he remembers for sure. He remembers that the entire game Vasya got heads at least *a* times, and Petya got heads at least *b* times. Moreover, he knows that the winner of the game was Vasya. Valera wants to use this information to know every possible outcome of the game, which do not contradict his memories.
|
The single line contains four integers *x*,<=*y*,<=*a*,<=*b* (1<=≤<=*a*<=≤<=*x*<=≤<=100,<=1<=≤<=*b*<=≤<=*y*<=≤<=100). The numbers on the line are separated by a space.
|
In the first line print integer *n* — the number of possible outcomes of the game. Then on *n* lines print the outcomes. On the *i*-th line print a space-separated pair of integers *c**i*, *d**i* — the number of heads Vasya and Petya got in the *i*-th outcome of the game, correspondingly. Print pairs of integers (*c**i*,<=*d**i*) in the strictly increasing order.
Let us remind you that the pair of numbers (*p*1,<=*q*1) is less than the pair of numbers (*p*2,<=*q*2), if *p*1<=<<=*p*2, or *p*1<==<=*p*2 and also *q*1<=<<=*q*2.
|
[
"3 2 1 1\n",
"2 4 2 2\n"
] |
[
"3\n2 1\n3 1\n3 2\n",
"0\n"
] |
none
| 500
|
[
{
"input": "3 2 1 1",
"output": "3\n2 1\n3 1\n3 2"
},
{
"input": "2 4 2 2",
"output": "0"
},
{
"input": "1 1 1 1",
"output": "0"
},
{
"input": "4 5 2 3",
"output": "1\n4 3"
},
{
"input": "10 6 3 4",
"output": "15\n5 4\n6 4\n6 5\n7 4\n7 5\n7 6\n8 4\n8 5\n8 6\n9 4\n9 5\n9 6\n10 4\n10 5\n10 6"
},
{
"input": "10 10 1 1",
"output": "45\n2 1\n3 1\n3 2\n4 1\n4 2\n4 3\n5 1\n5 2\n5 3\n5 4\n6 1\n6 2\n6 3\n6 4\n6 5\n7 1\n7 2\n7 3\n7 4\n7 5\n7 6\n8 1\n8 2\n8 3\n8 4\n8 5\n8 6\n8 7\n9 1\n9 2\n9 3\n9 4\n9 5\n9 6\n9 7\n9 8\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9"
},
{
"input": "9 7 4 7",
"output": "2\n8 7\n9 7"
},
{
"input": "5 5 3 2",
"output": "6\n3 2\n4 2\n4 3\n5 2\n5 3\n5 4"
},
{
"input": "10 10 1 1",
"output": "45\n2 1\n3 1\n3 2\n4 1\n4 2\n4 3\n5 1\n5 2\n5 3\n5 4\n6 1\n6 2\n6 3\n6 4\n6 5\n7 1\n7 2\n7 3\n7 4\n7 5\n7 6\n8 1\n8 2\n8 3\n8 4\n8 5\n8 6\n8 7\n9 1\n9 2\n9 3\n9 4\n9 5\n9 6\n9 7\n9 8\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9"
},
{
"input": "20 10 1 8",
"output": "33\n9 8\n10 8\n10 9\n11 8\n11 9\n11 10\n12 8\n12 9\n12 10\n13 8\n13 9\n13 10\n14 8\n14 9\n14 10\n15 8\n15 9\n15 10\n16 8\n16 9\n16 10\n17 8\n17 9\n17 10\n18 8\n18 9\n18 10\n19 8\n19 9\n19 10\n20 8\n20 9\n20 10"
},
{
"input": "10 20 4 6",
"output": "10\n7 6\n8 6\n8 7\n9 6\n9 7\n9 8\n10 6\n10 7\n10 8\n10 9"
},
{
"input": "50 50 1 30",
"output": "210\n31 30\n32 30\n32 31\n33 30\n33 31\n33 32\n34 30\n34 31\n34 32\n34 33\n35 30\n35 31\n35 32\n35 33\n35 34\n36 30\n36 31\n36 32\n36 33\n36 34\n36 35\n37 30\n37 31\n37 32\n37 33\n37 34\n37 35\n37 36\n38 30\n38 31\n38 32\n38 33\n38 34\n38 35\n38 36\n38 37\n39 30\n39 31\n39 32\n39 33\n39 34\n39 35\n39 36\n39 37\n39 38\n40 30\n40 31\n40 32\n40 33\n40 34\n40 35\n40 36\n40 37\n40 38\n40 39\n41 30\n41 31\n41 32\n41 33\n41 34\n41 35\n41 36\n41 37\n41 38\n41 39\n41 40\n42 30\n42 31\n42 32\n42 33\n42 34\n42 35\n42..."
},
{
"input": "60 50 30 40",
"output": "165\n41 40\n42 40\n42 41\n43 40\n43 41\n43 42\n44 40\n44 41\n44 42\n44 43\n45 40\n45 41\n45 42\n45 43\n45 44\n46 40\n46 41\n46 42\n46 43\n46 44\n46 45\n47 40\n47 41\n47 42\n47 43\n47 44\n47 45\n47 46\n48 40\n48 41\n48 42\n48 43\n48 44\n48 45\n48 46\n48 47\n49 40\n49 41\n49 42\n49 43\n49 44\n49 45\n49 46\n49 47\n49 48\n50 40\n50 41\n50 42\n50 43\n50 44\n50 45\n50 46\n50 47\n50 48\n50 49\n51 40\n51 41\n51 42\n51 43\n51 44\n51 45\n51 46\n51 47\n51 48\n51 49\n51 50\n52 40\n52 41\n52 42\n52 43\n52 44\n52 45\n52..."
},
{
"input": "100 100 1 1",
"output": "4950\n2 1\n3 1\n3 2\n4 1\n4 2\n4 3\n5 1\n5 2\n5 3\n5 4\n6 1\n6 2\n6 3\n6 4\n6 5\n7 1\n7 2\n7 3\n7 4\n7 5\n7 6\n8 1\n8 2\n8 3\n8 4\n8 5\n8 6\n8 7\n9 1\n9 2\n9 3\n9 4\n9 5\n9 6\n9 7\n9 8\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9\n11 1\n11 2\n11 3\n11 4\n11 5\n11 6\n11 7\n11 8\n11 9\n11 10\n12 1\n12 2\n12 3\n12 4\n12 5\n12 6\n12 7\n12 8\n12 9\n12 10\n12 11\n13 1\n13 2\n13 3\n13 4\n13 5\n13 6\n13 7\n13 8\n13 9\n13 10\n13 11\n13 12\n14 1\n14 2\n14 3\n14 4\n14 5\n14 6\n14 7\n14 8\n14 9\n14 10\n14 11\n..."
},
{
"input": "100 99 10 13",
"output": "3828\n14 13\n15 13\n15 14\n16 13\n16 14\n16 15\n17 13\n17 14\n17 15\n17 16\n18 13\n18 14\n18 15\n18 16\n18 17\n19 13\n19 14\n19 15\n19 16\n19 17\n19 18\n20 13\n20 14\n20 15\n20 16\n20 17\n20 18\n20 19\n21 13\n21 14\n21 15\n21 16\n21 17\n21 18\n21 19\n21 20\n22 13\n22 14\n22 15\n22 16\n22 17\n22 18\n22 19\n22 20\n22 21\n23 13\n23 14\n23 15\n23 16\n23 17\n23 18\n23 19\n23 20\n23 21\n23 22\n24 13\n24 14\n24 15\n24 16\n24 17\n24 18\n24 19\n24 20\n24 21\n24 22\n24 23\n25 13\n25 14\n25 15\n25 16\n25 17\n25 18\n2..."
},
{
"input": "99 100 20 7",
"output": "4200\n20 7\n20 8\n20 9\n20 10\n20 11\n20 12\n20 13\n20 14\n20 15\n20 16\n20 17\n20 18\n20 19\n21 7\n21 8\n21 9\n21 10\n21 11\n21 12\n21 13\n21 14\n21 15\n21 16\n21 17\n21 18\n21 19\n21 20\n22 7\n22 8\n22 9\n22 10\n22 11\n22 12\n22 13\n22 14\n22 15\n22 16\n22 17\n22 18\n22 19\n22 20\n22 21\n23 7\n23 8\n23 9\n23 10\n23 11\n23 12\n23 13\n23 14\n23 15\n23 16\n23 17\n23 18\n23 19\n23 20\n23 21\n23 22\n24 7\n24 8\n24 9\n24 10\n24 11\n24 12\n24 13\n24 14\n24 15\n24 16\n24 17\n24 18\n24 19\n24 20\n24 21\n24 22\n24..."
},
{
"input": "100 90 100 83",
"output": "8\n100 83\n100 84\n100 85\n100 86\n100 87\n100 88\n100 89\n100 90"
},
{
"input": "80 100 1 50",
"output": "465\n51 50\n52 50\n52 51\n53 50\n53 51\n53 52\n54 50\n54 51\n54 52\n54 53\n55 50\n55 51\n55 52\n55 53\n55 54\n56 50\n56 51\n56 52\n56 53\n56 54\n56 55\n57 50\n57 51\n57 52\n57 53\n57 54\n57 55\n57 56\n58 50\n58 51\n58 52\n58 53\n58 54\n58 55\n58 56\n58 57\n59 50\n59 51\n59 52\n59 53\n59 54\n59 55\n59 56\n59 57\n59 58\n60 50\n60 51\n60 52\n60 53\n60 54\n60 55\n60 56\n60 57\n60 58\n60 59\n61 50\n61 51\n61 52\n61 53\n61 54\n61 55\n61 56\n61 57\n61 58\n61 59\n61 60\n62 50\n62 51\n62 52\n62 53\n62 54\n62 55\n62..."
},
{
"input": "100 39 70 5",
"output": "1085\n70 5\n70 6\n70 7\n70 8\n70 9\n70 10\n70 11\n70 12\n70 13\n70 14\n70 15\n70 16\n70 17\n70 18\n70 19\n70 20\n70 21\n70 22\n70 23\n70 24\n70 25\n70 26\n70 27\n70 28\n70 29\n70 30\n70 31\n70 32\n70 33\n70 34\n70 35\n70 36\n70 37\n70 38\n70 39\n71 5\n71 6\n71 7\n71 8\n71 9\n71 10\n71 11\n71 12\n71 13\n71 14\n71 15\n71 16\n71 17\n71 18\n71 19\n71 20\n71 21\n71 22\n71 23\n71 24\n71 25\n71 26\n71 27\n71 28\n71 29\n71 30\n71 31\n71 32\n71 33\n71 34\n71 35\n71 36\n71 37\n71 38\n71 39\n72 5\n72 6\n72 7\n72 8\n7..."
},
{
"input": "70 80 30 80",
"output": "0"
},
{
"input": "100 100 1 1",
"output": "4950\n2 1\n3 1\n3 2\n4 1\n4 2\n4 3\n5 1\n5 2\n5 3\n5 4\n6 1\n6 2\n6 3\n6 4\n6 5\n7 1\n7 2\n7 3\n7 4\n7 5\n7 6\n8 1\n8 2\n8 3\n8 4\n8 5\n8 6\n8 7\n9 1\n9 2\n9 3\n9 4\n9 5\n9 6\n9 7\n9 8\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9\n11 1\n11 2\n11 3\n11 4\n11 5\n11 6\n11 7\n11 8\n11 9\n11 10\n12 1\n12 2\n12 3\n12 4\n12 5\n12 6\n12 7\n12 8\n12 9\n12 10\n12 11\n13 1\n13 2\n13 3\n13 4\n13 5\n13 6\n13 7\n13 8\n13 9\n13 10\n13 11\n13 12\n14 1\n14 2\n14 3\n14 4\n14 5\n14 6\n14 7\n14 8\n14 9\n14 10\n14 11\n..."
},
{
"input": "100 100 100 5",
"output": "95\n100 5\n100 6\n100 7\n100 8\n100 9\n100 10\n100 11\n100 12\n100 13\n100 14\n100 15\n100 16\n100 17\n100 18\n100 19\n100 20\n100 21\n100 22\n100 23\n100 24\n100 25\n100 26\n100 27\n100 28\n100 29\n100 30\n100 31\n100 32\n100 33\n100 34\n100 35\n100 36\n100 37\n100 38\n100 39\n100 40\n100 41\n100 42\n100 43\n100 44\n100 45\n100 46\n100 47\n100 48\n100 49\n100 50\n100 51\n100 52\n100 53\n100 54\n100 55\n100 56\n100 57\n100 58\n100 59\n100 60\n100 61\n100 62\n100 63\n100 64\n100 65\n100 66\n100 67\n100 68\n..."
},
{
"input": "99 99 1 1",
"output": "4851\n2 1\n3 1\n3 2\n4 1\n4 2\n4 3\n5 1\n5 2\n5 3\n5 4\n6 1\n6 2\n6 3\n6 4\n6 5\n7 1\n7 2\n7 3\n7 4\n7 5\n7 6\n8 1\n8 2\n8 3\n8 4\n8 5\n8 6\n8 7\n9 1\n9 2\n9 3\n9 4\n9 5\n9 6\n9 7\n9 8\n10 1\n10 2\n10 3\n10 4\n10 5\n10 6\n10 7\n10 8\n10 9\n11 1\n11 2\n11 3\n11 4\n11 5\n11 6\n11 7\n11 8\n11 9\n11 10\n12 1\n12 2\n12 3\n12 4\n12 5\n12 6\n12 7\n12 8\n12 9\n12 10\n12 11\n13 1\n13 2\n13 3\n13 4\n13 5\n13 6\n13 7\n13 8\n13 9\n13 10\n13 11\n13 12\n14 1\n14 2\n14 3\n14 4\n14 5\n14 6\n14 7\n14 8\n14 9\n14 10\n14 11\n..."
}
] | 1,603,410,468
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 0
| 186
| 0
|
x,y,a,b=map(int,input().split())
c=x-a+x-b
print(c)
for i in range(c):
if(a<x ):
a+=1
print(a,b)
else:
if(b<a-1):
b+=1
print(a,b)
|
Title: Heads or Tails
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya and Vasya are tossing a coin. Their friend Valera is appointed as a judge. The game is very simple. First Vasya tosses a coin *x* times, then Petya tosses a coin *y* times. If the tossing player gets head, he scores one point. If he gets tail, nobody gets any points. The winner is the player with most points by the end of the game. If boys have the same number of points, the game finishes with a draw.
At some point, Valera lost his count, and so he can not say exactly what the score is at the end of the game. But there are things he remembers for sure. He remembers that the entire game Vasya got heads at least *a* times, and Petya got heads at least *b* times. Moreover, he knows that the winner of the game was Vasya. Valera wants to use this information to know every possible outcome of the game, which do not contradict his memories.
Input Specification:
The single line contains four integers *x*,<=*y*,<=*a*,<=*b* (1<=≤<=*a*<=≤<=*x*<=≤<=100,<=1<=≤<=*b*<=≤<=*y*<=≤<=100). The numbers on the line are separated by a space.
Output Specification:
In the first line print integer *n* — the number of possible outcomes of the game. Then on *n* lines print the outcomes. On the *i*-th line print a space-separated pair of integers *c**i*, *d**i* — the number of heads Vasya and Petya got in the *i*-th outcome of the game, correspondingly. Print pairs of integers (*c**i*,<=*d**i*) in the strictly increasing order.
Let us remind you that the pair of numbers (*p*1,<=*q*1) is less than the pair of numbers (*p*2,<=*q*2), if *p*1<=<<=*p*2, or *p*1<==<=*p*2 and also *q*1<=<<=*q*2.
Demo Input:
['3 2 1 1\n', '2 4 2 2\n']
Demo Output:
['3\n2 1\n3 1\n3 2\n', '0\n']
Note:
none
|
```python
x,y,a,b=map(int,input().split())
c=x-a+x-b
print(c)
for i in range(c):
if(a<x ):
a+=1
print(a,b)
else:
if(b<a-1):
b+=1
print(a,b)
```
| 0
|
|
1
|
A
|
Theatre Square
|
PROGRAMMING
| 1,000
|
[
"math"
] |
A. Theatre Square
|
1
|
256
|
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
|
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
|
Write the needed number of flagstones.
|
[
"6 6 4\n"
] |
[
"4\n"
] |
none
| 0
|
[
{
"input": "6 6 4",
"output": "4"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "2 1 1",
"output": "2"
},
{
"input": "1 2 1",
"output": "2"
},
{
"input": "2 2 1",
"output": "4"
},
{
"input": "2 1 2",
"output": "1"
},
{
"input": "1 1 3",
"output": "1"
},
{
"input": "2 3 4",
"output": "1"
},
{
"input": "1000000000 1000000000 1",
"output": "1000000000000000000"
},
{
"input": "12 13 4",
"output": "12"
},
{
"input": "222 332 5",
"output": "3015"
},
{
"input": "1000 1000 10",
"output": "10000"
},
{
"input": "1001 1000 10",
"output": "10100"
},
{
"input": "100 10001 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 999999999",
"output": "4"
},
{
"input": "1000000000 1000000000 192",
"output": "27126743055556"
},
{
"input": "1000000000 987654321 1",
"output": "987654321000000000"
},
{
"input": "456784567 1000000000 51",
"output": "175618850864484"
},
{
"input": "39916800 134217728 40320",
"output": "3295710"
}
] | 1,696,919,441
| 2,147,483,647
|
Python 3
|
COMPILATION_ERROR
|
TESTS
| 0
| 0
| 0
|
import math
m=int(input())
n=int(input())
a=in(input())
FlagStoneSize=math.ceil(m/a)+math.ceil(n/a)
print(FlagStoneSize)
|
Title: Theatre Square
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
Input Specification:
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
Output Specification:
Write the needed number of flagstones.
Demo Input:
['6 6 4\n']
Demo Output:
['4\n']
Note:
none
|
```python
import math
m=int(input())
n=int(input())
a=in(input())
FlagStoneSize=math.ceil(m/a)+math.ceil(n/a)
print(FlagStoneSize)
```
| -1
|
507
|
B
|
Amr and Pins
|
PROGRAMMING
| 1,400
|
[
"geometry",
"math"
] | null | null |
Amr loves Geometry. One day he came up with a very interesting problem.
Amr has a circle of radius *r* and center in point (*x*,<=*y*). He wants the circle center to be in new position (*x*',<=*y*').
In one step Amr can put a pin to the border of the circle in a certain point, then rotate the circle around that pin by any angle and finally remove the pin.
Help Amr to achieve his goal in minimum number of steps.
|
Input consists of 5 space-separated integers *r*, *x*, *y*, *x*' *y*' (1<=≤<=*r*<=≤<=105, <=-<=105<=≤<=*x*,<=*y*,<=*x*',<=*y*'<=≤<=105), circle radius, coordinates of original center of the circle and coordinates of destination center of the circle respectively.
|
Output a single integer — minimum number of steps required to move the center of the circle to the destination point.
|
[
"2 0 0 0 4\n",
"1 1 1 4 4\n",
"4 5 6 5 6\n"
] |
[
"1\n",
"3\n",
"0\n"
] |
In the first sample test the optimal way is to put a pin at point (0, 2) and rotate the circle by 180 degrees counter-clockwise (or clockwise, no matter).
<img class="tex-graphics" src="https://espresso.codeforces.com/4e40fd4cc24a2050a0488aa131e6244369328039.png" style="max-width: 100.0%;max-height: 100.0%;"/>
| 1,000
|
[
{
"input": "2 0 0 0 4",
"output": "1"
},
{
"input": "1 1 1 4 4",
"output": "3"
},
{
"input": "4 5 6 5 6",
"output": "0"
},
{
"input": "10 20 0 40 0",
"output": "1"
},
{
"input": "9 20 0 40 0",
"output": "2"
},
{
"input": "5 -1 -6 -5 1",
"output": "1"
},
{
"input": "99125 26876 -21414 14176 17443",
"output": "1"
},
{
"input": "8066 7339 19155 -90534 -60666",
"output": "8"
},
{
"input": "100000 -100000 -100000 100000 100000",
"output": "2"
},
{
"input": "10 20 0 41 0",
"output": "2"
},
{
"input": "25 -64 -6 -56 64",
"output": "2"
},
{
"input": "125 455 450 439 721",
"output": "2"
},
{
"input": "5 6 3 7 2",
"output": "1"
},
{
"input": "24 130 14786 3147 2140",
"output": "271"
},
{
"input": "125 -363 176 93 330",
"output": "2"
},
{
"input": "1 14 30 30 14",
"output": "12"
},
{
"input": "25 96 13 7 2",
"output": "2"
},
{
"input": "4 100000 -100000 100000 -100000",
"output": "0"
},
{
"input": "1 3 4 2 5",
"output": "1"
},
{
"input": "1 -3 3 2 6",
"output": "3"
},
{
"input": "2 7 20 13 -5",
"output": "7"
},
{
"input": "1 1 1 1 4",
"output": "2"
},
{
"input": "249 -54242 -30537 -45023 -89682",
"output": "121"
},
{
"input": "4 100000 -100000 100000 -99999",
"output": "1"
},
{
"input": "97741 23818 78751 97583 26933",
"output": "1"
},
{
"input": "56767 -29030 51625 79823 -56297",
"output": "2"
},
{
"input": "98260 13729 74998 23701 9253",
"output": "1"
},
{
"input": "67377 -80131 -90254 -57320 14102",
"output": "1"
},
{
"input": "1 100000 100000 100000 -100000",
"output": "100000"
},
{
"input": "19312 19470 82059 58064 62231",
"output": "2"
},
{
"input": "67398 -68747 -79056 -34193 29400",
"output": "1"
},
{
"input": "91099 37184 -71137 75650 -3655",
"output": "1"
},
{
"input": "46456 -2621 -23623 -98302 -99305",
"output": "2"
},
{
"input": "100 100000 -100000 100000 -99999",
"output": "1"
},
{
"input": "1 100000 -100000 100000 -100000",
"output": "0"
},
{
"input": "8 0 0 0 32",
"output": "2"
},
{
"input": "100000 100000 1 -100000 0",
"output": "2"
}
] | 1,564,082,838
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 37
| 109
| 0
|
import math
r, x1, y1, x2, y2 = map(int, input().split())
d = 2 * r
dist = math.sqrt((x2-x1)**2 + (y2-y1)**2)
if dist % d == 0:
print(int(dist / d))
else:
print(int(dist / d) + 1)
|
Title: Amr and Pins
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Amr loves Geometry. One day he came up with a very interesting problem.
Amr has a circle of radius *r* and center in point (*x*,<=*y*). He wants the circle center to be in new position (*x*',<=*y*').
In one step Amr can put a pin to the border of the circle in a certain point, then rotate the circle around that pin by any angle and finally remove the pin.
Help Amr to achieve his goal in minimum number of steps.
Input Specification:
Input consists of 5 space-separated integers *r*, *x*, *y*, *x*' *y*' (1<=≤<=*r*<=≤<=105, <=-<=105<=≤<=*x*,<=*y*,<=*x*',<=*y*'<=≤<=105), circle radius, coordinates of original center of the circle and coordinates of destination center of the circle respectively.
Output Specification:
Output a single integer — minimum number of steps required to move the center of the circle to the destination point.
Demo Input:
['2 0 0 0 4\n', '1 1 1 4 4\n', '4 5 6 5 6\n']
Demo Output:
['1\n', '3\n', '0\n']
Note:
In the first sample test the optimal way is to put a pin at point (0, 2) and rotate the circle by 180 degrees counter-clockwise (or clockwise, no matter).
<img class="tex-graphics" src="https://espresso.codeforces.com/4e40fd4cc24a2050a0488aa131e6244369328039.png" style="max-width: 100.0%;max-height: 100.0%;"/>
|
```python
import math
r, x1, y1, x2, y2 = map(int, input().split())
d = 2 * r
dist = math.sqrt((x2-x1)**2 + (y2-y1)**2)
if dist % d == 0:
print(int(dist / d))
else:
print(int(dist / d) + 1)
```
| 3
|
|
680
|
B
|
Bear and Finding Criminals
|
PROGRAMMING
| 1,000
|
[
"constructive algorithms",
"implementation"
] | null | null |
There are *n* cities in Bearland, numbered 1 through *n*. Cities are arranged in one long row. The distance between cities *i* and *j* is equal to |*i*<=-<=*j*|.
Limak is a police officer. He lives in a city *a*. His job is to catch criminals. It's hard because he doesn't know in which cities criminals are. Though, he knows that there is at most one criminal in each city.
Limak is going to use a BCD (Bear Criminal Detector). The BCD will tell Limak how many criminals there are for every distance from a city *a*. After that, Limak can catch a criminal in each city for which he is sure that there must be a criminal.
You know in which cities criminals are. Count the number of criminals Limak will catch, after he uses the BCD.
|
The first line of the input contains two integers *n* and *a* (1<=≤<=*a*<=≤<=*n*<=≤<=100) — the number of cities and the index of city where Limak lives.
The second line contains *n* integers *t*1,<=*t*2,<=...,<=*t**n* (0<=≤<=*t**i*<=≤<=1). There are *t**i* criminals in the *i*-th city.
|
Print the number of criminals Limak will catch.
|
[
"6 3\n1 1 1 0 1 0\n",
"5 2\n0 0 0 1 0\n"
] |
[
"3\n",
"1\n"
] |
In the first sample, there are six cities and Limak lives in the third one (blue arrow below). Criminals are in cities marked red.
Using the BCD gives Limak the following information:
- There is one criminal at distance 0 from the third city — Limak is sure that this criminal is exactly in the third city. - There is one criminal at distance 1 from the third city — Limak doesn't know if a criminal is in the second or fourth city. - There are two criminals at distance 2 from the third city — Limak is sure that there is one criminal in the first city and one in the fifth city. - There are zero criminals for every greater distance.
So, Limak will catch criminals in cities 1, 3 and 5, that is 3 criminals in total.
In the second sample (drawing below), the BCD gives Limak the information that there is one criminal at distance 2 from Limak's city. There is only one city at distance 2 so Limak is sure where a criminal is.
| 1,000
|
[
{
"input": "6 3\n1 1 1 0 1 0",
"output": "3"
},
{
"input": "5 2\n0 0 0 1 0",
"output": "1"
},
{
"input": "1 1\n1",
"output": "1"
},
{
"input": "1 1\n0",
"output": "0"
},
{
"input": "9 3\n1 1 1 1 1 1 1 1 0",
"output": "8"
},
{
"input": "9 5\n1 0 1 0 1 0 1 0 1",
"output": "5"
},
{
"input": "20 17\n1 1 0 1 1 1 1 0 1 0 1 1 1 0 1 1 0 0 0 0",
"output": "10"
},
{
"input": "100 60\n1 1 1 1 1 1 0 1 0 0 1 1 0 1 1 1 1 1 0 0 1 1 0 0 0 0 0 1 0 1 1 0 1 0 1 0 1 0 1 1 0 0 0 0 0 1 1 1 0 1 1 0 0 0 1 0 0 0 1 1 1 0 1 0 0 1 1 1 0 1 1 1 0 0 1 1 0 1 0 0 0 1 0 0 0 0 0 0 1 1 1 0 0 1 1 1 0 1 0 0",
"output": "27"
},
{
"input": "8 1\n1 0 1 1 0 0 1 0",
"output": "4"
},
{
"input": "11 11\n0 1 0 0 1 1 1 0 0 0 0",
"output": "4"
},
{
"input": "19 10\n0 1 1 0 1 0 0 1 1 0 0 1 0 1 0 0 1 0 1",
"output": "4"
},
{
"input": "100 38\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "0"
},
{
"input": "100 38\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "1"
},
{
"input": "100 38\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "3"
},
{
"input": "99 38\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "25"
},
{
"input": "99 38\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "24"
},
{
"input": "99 38\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "24"
},
{
"input": "98 70\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "41"
},
{
"input": "99 70\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "9"
},
{
"input": "99 60\n0 0 0 1 1 0 1 1 0 0 1 0 0 0 0 0 1 0 1 0 0 0 1 0 1 1 1 0 1 1 1 1 0 0 1 1 1 0 1 1 1 1 1 0 1 1 0 0 0 0 0 1 0 0 1 0 1 1 1 1 1 0 1 0 1 1 0 0 1 0 1 0 0 1 0 0 1 1 1 0 0 0 0 1 1 0 1 1 1 1 0 0 0 0 0 0 1 1 1",
"output": "34"
},
{
"input": "98 24\n0 0 0 1 1 0 1 1 0 0 0 0 1 0 0 1 0 0 1 1 1 0 0 1 0 0 1 0 1 0 0 1 1 0 1 1 1 0 1 0 0 1 0 0 0 1 1 1 1 0 1 1 1 0 1 1 1 1 0 0 1 0 0 0 1 0 1 1 0 1 0 1 1 1 0 0 1 0 0 0 1 1 0 0 1 1 1 1 1 1 0 1 0 1 0 0 1 1",
"output": "39"
},
{
"input": "100 100\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "100"
},
{
"input": "100 1\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "0"
},
{
"input": "2 1\n0 1",
"output": "1"
}
] | 1,591,201,725
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 24
| 109
| 307,200
|
n, a = map(int, input().split())
a -= 1
c = list(map(int, input().split()))
ans = 0
if c[a] == 1:
ans += 1
for i in range(1,n):
if a-i >= 0 and c[a-i] == 1 and a+i<=n-1 and c[a+i] == 1:
ans += 2
elif a-i < 0 and a+i<=n-1 and c[a+i] == 1:
ans += 1
elif a+i>n-1 and a-i >= 0 and c[a-i] == 1:
ans += 1
print(ans)
|
Title: Bear and Finding Criminals
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There are *n* cities in Bearland, numbered 1 through *n*. Cities are arranged in one long row. The distance between cities *i* and *j* is equal to |*i*<=-<=*j*|.
Limak is a police officer. He lives in a city *a*. His job is to catch criminals. It's hard because he doesn't know in which cities criminals are. Though, he knows that there is at most one criminal in each city.
Limak is going to use a BCD (Bear Criminal Detector). The BCD will tell Limak how many criminals there are for every distance from a city *a*. After that, Limak can catch a criminal in each city for which he is sure that there must be a criminal.
You know in which cities criminals are. Count the number of criminals Limak will catch, after he uses the BCD.
Input Specification:
The first line of the input contains two integers *n* and *a* (1<=≤<=*a*<=≤<=*n*<=≤<=100) — the number of cities and the index of city where Limak lives.
The second line contains *n* integers *t*1,<=*t*2,<=...,<=*t**n* (0<=≤<=*t**i*<=≤<=1). There are *t**i* criminals in the *i*-th city.
Output Specification:
Print the number of criminals Limak will catch.
Demo Input:
['6 3\n1 1 1 0 1 0\n', '5 2\n0 0 0 1 0\n']
Demo Output:
['3\n', '1\n']
Note:
In the first sample, there are six cities and Limak lives in the third one (blue arrow below). Criminals are in cities marked red.
Using the BCD gives Limak the following information:
- There is one criminal at distance 0 from the third city — Limak is sure that this criminal is exactly in the third city. - There is one criminal at distance 1 from the third city — Limak doesn't know if a criminal is in the second or fourth city. - There are two criminals at distance 2 from the third city — Limak is sure that there is one criminal in the first city and one in the fifth city. - There are zero criminals for every greater distance.
So, Limak will catch criminals in cities 1, 3 and 5, that is 3 criminals in total.
In the second sample (drawing below), the BCD gives Limak the information that there is one criminal at distance 2 from Limak's city. There is only one city at distance 2 so Limak is sure where a criminal is.
|
```python
n, a = map(int, input().split())
a -= 1
c = list(map(int, input().split()))
ans = 0
if c[a] == 1:
ans += 1
for i in range(1,n):
if a-i >= 0 and c[a-i] == 1 and a+i<=n-1 and c[a+i] == 1:
ans += 2
elif a-i < 0 and a+i<=n-1 and c[a+i] == 1:
ans += 1
elif a+i>n-1 and a-i >= 0 and c[a-i] == 1:
ans += 1
print(ans)
```
| 3
|
|
18
|
A
|
Triangle
|
PROGRAMMING
| 1,500
|
[
"brute force",
"geometry"
] |
A. Triangle
|
2
|
64
|
At a geometry lesson Bob learnt that a triangle is called right-angled if it is nondegenerate and one of its angles is right. Bob decided to draw such a triangle immediately: on a sheet of paper he drew three points with integer coordinates, and joined them with segments of straight lines, then he showed the triangle to Peter. Peter said that Bob's triangle is not right-angled, but is almost right-angled: the triangle itself is not right-angled, but it is possible to move one of the points exactly by distance 1 so, that all the coordinates remain integer, and the triangle become right-angled. Bob asks you to help him and find out if Peter tricks him. By the given coordinates of the triangle you should find out if it is right-angled, almost right-angled, or neither of these.
|
The first input line contains 6 space-separated integers *x*1,<=*y*1,<=*x*2,<=*y*2,<=*x*3,<=*y*3 — coordinates of the triangle's vertices. All the coordinates are integer and don't exceed 100 in absolute value. It's guaranteed that the triangle is nondegenerate, i.e. its total area is not zero.
|
If the given triangle is right-angled, output RIGHT, if it is almost right-angled, output ALMOST, and if it is neither of these, output NEITHER.
|
[
"0 0 2 0 0 1\n",
"2 3 4 5 6 6\n",
"-1 0 2 0 0 1\n"
] |
[
"RIGHT\n",
"NEITHER\n",
"ALMOST\n"
] |
none
| 0
|
[
{
"input": "0 0 2 0 0 1",
"output": "RIGHT"
},
{
"input": "2 3 4 5 6 6",
"output": "NEITHER"
},
{
"input": "-1 0 2 0 0 1",
"output": "ALMOST"
},
{
"input": "27 74 85 23 100 99",
"output": "NEITHER"
},
{
"input": "-97 -19 17 62 30 -76",
"output": "NEITHER"
},
{
"input": "28 -15 86 32 98 -41",
"output": "NEITHER"
},
{
"input": "-66 24 8 -29 17 62",
"output": "NEITHER"
},
{
"input": "-83 40 -80 52 -71 43",
"output": "NEITHER"
},
{
"input": "-88 67 -62 37 -49 75",
"output": "NEITHER"
},
{
"input": "58 45 6 22 13 79",
"output": "NEITHER"
},
{
"input": "75 86 -82 89 -37 -35",
"output": "NEITHER"
},
{
"input": "34 74 -2 -95 63 -33",
"output": "NEITHER"
},
{
"input": "-7 63 78 74 -39 -30",
"output": "NEITHER"
},
{
"input": "-49 -99 7 92 61 -28",
"output": "NEITHER"
},
{
"input": "-90 90 87 -92 -40 -26",
"output": "NEITHER"
},
{
"input": "-100 -100 100 -100 0 73",
"output": "NEITHER"
},
{
"input": "39 22 94 25 69 -23",
"output": "NEITHER"
},
{
"input": "100 100 -100 100 1 -73",
"output": "NEITHER"
},
{
"input": "0 0 0 1 1 0",
"output": "RIGHT"
},
{
"input": "-100 -100 100 100 -100 100",
"output": "RIGHT"
},
{
"input": "29 83 35 35 74 65",
"output": "NEITHER"
},
{
"input": "28 -15 86 32 -19 43",
"output": "RIGHT"
},
{
"input": "-28 12 -97 67 -83 -57",
"output": "RIGHT"
},
{
"input": "-83 40 -80 52 -79 39",
"output": "RIGHT"
},
{
"input": "30 8 49 13 25 27",
"output": "RIGHT"
},
{
"input": "23 6 63 -40 69 46",
"output": "RIGHT"
},
{
"input": "49 -7 19 -76 26 3",
"output": "RIGHT"
},
{
"input": "0 0 1 0 2 1",
"output": "ALMOST"
},
{
"input": "0 0 1 0 3 1",
"output": "ALMOST"
},
{
"input": "0 0 1 0 2 2",
"output": "ALMOST"
},
{
"input": "0 0 1 0 4 1",
"output": "NEITHER"
},
{
"input": "0 0 1 0 100 1",
"output": "NEITHER"
},
{
"input": "60 4 90 -53 32 -12",
"output": "ALMOST"
},
{
"input": "52 -34 -37 -63 23 54",
"output": "ALMOST"
},
{
"input": "39 22 95 25 42 -33",
"output": "ALMOST"
},
{
"input": "-10 -11 62 6 -12 -3",
"output": "ALMOST"
},
{
"input": "22 -15 -24 77 -69 -60",
"output": "ALMOST"
},
{
"input": "99 85 90 87 64 -20",
"output": "ALMOST"
},
{
"input": "-50 -37 -93 -6 -80 -80",
"output": "ALMOST"
},
{
"input": "4 -13 4 -49 -24 -13",
"output": "RIGHT"
},
{
"input": "0 -3 -3 -10 4 -7",
"output": "NEITHER"
},
{
"input": "-45 -87 -34 -79 -60 -62",
"output": "NEITHER"
},
{
"input": "-67 49 89 -76 -37 87",
"output": "NEITHER"
},
{
"input": "22 32 -33 -30 -18 68",
"output": "NEITHER"
},
{
"input": "36 1 -17 -54 -19 55",
"output": "ALMOST"
},
{
"input": "55 44 15 14 23 83",
"output": "NEITHER"
},
{
"input": "-19 0 -89 -54 25 -57",
"output": "NEITHER"
},
{
"input": "69 -45 1 11 56 -63",
"output": "NEITHER"
},
{
"input": "72 68 56 72 33 -88",
"output": "RIGHT"
},
{
"input": "59 86 74 -49 77 88",
"output": "RIGHT"
},
{
"input": "-50 0 0 50 0 -50",
"output": "RIGHT"
},
{
"input": "-50 0 0 50 0 -51",
"output": "ALMOST"
},
{
"input": "-50 0 0 50 0 -49",
"output": "ALMOST"
},
{
"input": "-50 0 0 50 1 -50",
"output": "ALMOST"
},
{
"input": "-50 0 0 50 -1 -50",
"output": "ALMOST"
},
{
"input": "-50 0 0 49 0 -50",
"output": "ALMOST"
},
{
"input": "-50 0 0 51 0 -50",
"output": "ALMOST"
},
{
"input": "-50 0 1 50 0 -50",
"output": "ALMOST"
},
{
"input": "-50 0 -1 50 0 -50",
"output": "ALMOST"
},
{
"input": "-50 1 0 50 0 -50",
"output": "ALMOST"
},
{
"input": "-50 -1 0 50 0 -50",
"output": "ALMOST"
},
{
"input": "-51 0 0 50 0 -50",
"output": "ALMOST"
},
{
"input": "-49 0 0 50 0 -50",
"output": "ALMOST"
}
] | 1,687,159,558
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 29
| 124
| 0
|
def checkRightAngled(X1, Y1, X2,Y2, X3, Y3):
# Calculate the sides
A = (int(pow((X2 - X1), 2)) +
int(pow((Y2 - Y1), 2)))
B = (int(pow((X3 - X2), 2)) +
int(pow((Y3 - Y2), 2)))
C = (int(pow((X3 - X1), 2)) +
int(pow((Y3 - Y1), 2)))
# Check Pythagoras Formula
if ((A > 0 and B > 0 and C > 0) and
(A == (B + C) or B == (A + C) or
C == (A + B))):
return True
else:
return False
x1,y1,x2,y2,x3,y3=map(int,input().split())
f=0
if(checkRightAngled(x1,y1,x2,y2,x3,y3)):
print("RIGHT")
else:
# x1,y1
x1+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3)):
print("ALMOST")
f=1
x1-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x1+=1
y1+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y1-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y1+=1
#x2,y2
x2+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALOMST")
f=1
x2-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x2+=1
y2+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y2-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y2+=1
#x3,y3
x3+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALOMST")
f=1
x3-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x3+=1
y3+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y3-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y3+=1
if(f==0):
print("NEITHER")
|
Title: Triangle
Time Limit: 2 seconds
Memory Limit: 64 megabytes
Problem Description:
At a geometry lesson Bob learnt that a triangle is called right-angled if it is nondegenerate and one of its angles is right. Bob decided to draw such a triangle immediately: on a sheet of paper he drew three points with integer coordinates, and joined them with segments of straight lines, then he showed the triangle to Peter. Peter said that Bob's triangle is not right-angled, but is almost right-angled: the triangle itself is not right-angled, but it is possible to move one of the points exactly by distance 1 so, that all the coordinates remain integer, and the triangle become right-angled. Bob asks you to help him and find out if Peter tricks him. By the given coordinates of the triangle you should find out if it is right-angled, almost right-angled, or neither of these.
Input Specification:
The first input line contains 6 space-separated integers *x*1,<=*y*1,<=*x*2,<=*y*2,<=*x*3,<=*y*3 — coordinates of the triangle's vertices. All the coordinates are integer and don't exceed 100 in absolute value. It's guaranteed that the triangle is nondegenerate, i.e. its total area is not zero.
Output Specification:
If the given triangle is right-angled, output RIGHT, if it is almost right-angled, output ALMOST, and if it is neither of these, output NEITHER.
Demo Input:
['0 0 2 0 0 1\n', '2 3 4 5 6 6\n', '-1 0 2 0 0 1\n']
Demo Output:
['RIGHT\n', 'NEITHER\n', 'ALMOST\n']
Note:
none
|
```python
def checkRightAngled(X1, Y1, X2,Y2, X3, Y3):
# Calculate the sides
A = (int(pow((X2 - X1), 2)) +
int(pow((Y2 - Y1), 2)))
B = (int(pow((X3 - X2), 2)) +
int(pow((Y3 - Y2), 2)))
C = (int(pow((X3 - X1), 2)) +
int(pow((Y3 - Y1), 2)))
# Check Pythagoras Formula
if ((A > 0 and B > 0 and C > 0) and
(A == (B + C) or B == (A + C) or
C == (A + B))):
return True
else:
return False
x1,y1,x2,y2,x3,y3=map(int,input().split())
f=0
if(checkRightAngled(x1,y1,x2,y2,x3,y3)):
print("RIGHT")
else:
# x1,y1
x1+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3)):
print("ALMOST")
f=1
x1-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x1+=1
y1+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y1-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y1+=1
#x2,y2
x2+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALOMST")
f=1
x2-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x2+=1
y2+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y2-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y2+=1
#x3,y3
x3+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALOMST")
f=1
x3-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
x3+=1
y3+=1
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y3-=2
if(checkRightAngled(x1,y1,x2,y2,x3,y3) and f==0):
print("ALMOST")
f=1
y3+=1
if(f==0):
print("NEITHER")
```
| 0
|
352
|
A
|
Jeff and Digits
|
PROGRAMMING
| 1,000
|
[
"brute force",
"implementation",
"math"
] | null | null |
Jeff's got *n* cards, each card contains either digit 0, or digit 5. Jeff can choose several cards and put them in a line so that he gets some number. What is the largest possible number divisible by 90 Jeff can make from the cards he's got?
Jeff must make the number without leading zero. At that, we assume that number 0 doesn't contain any leading zeroes. Jeff doesn't have to use all the cards.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=103). The next line contains *n* integers *a*1, *a*2, ..., *a**n* (*a**i*<==<=0 or *a**i*<==<=5). Number *a**i* represents the digit that is written on the *i*-th card.
|
In a single line print the answer to the problem — the maximum number, divisible by 90. If you can't make any divisible by 90 number from the cards, print -1.
|
[
"4\n5 0 5 0\n",
"11\n5 5 5 5 5 5 5 5 0 5 5\n"
] |
[
"0\n",
"5555555550\n"
] |
In the first test you can make only one number that is a multiple of 90 — 0.
In the second test you can make number 5555555550, it is a multiple of 90.
| 500
|
[
{
"input": "4\n5 0 5 0",
"output": "0"
},
{
"input": "11\n5 5 5 5 5 5 5 5 0 5 5",
"output": "5555555550"
},
{
"input": "7\n5 5 5 5 5 5 5",
"output": "-1"
},
{
"input": "1\n5",
"output": "-1"
},
{
"input": "1\n0",
"output": "0"
},
{
"input": "11\n5 0 5 5 5 0 0 5 5 5 5",
"output": "0"
},
{
"input": "23\n5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 0 0 0 0 0",
"output": "55555555555555555500000"
},
{
"input": "9\n5 5 5 5 5 5 5 5 5",
"output": "-1"
},
{
"input": "24\n5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 0 0 0 0 0",
"output": "55555555555555555500000"
},
{
"input": "10\n0 0 0 0 0 0 0 0 0 0",
"output": "0"
},
{
"input": "10\n5 5 5 5 5 0 0 5 0 5",
"output": "0"
},
{
"input": "3\n5 5 0",
"output": "0"
},
{
"input": "5\n5 5 0 5 5",
"output": "0"
},
{
"input": "14\n0 5 5 0 0 0 0 0 0 5 5 5 5 5",
"output": "0"
},
{
"input": "3\n5 5 5",
"output": "-1"
},
{
"input": "3\n0 5 5",
"output": "0"
},
{
"input": "13\n0 0 5 0 5 0 5 5 0 0 0 0 0",
"output": "0"
},
{
"input": "9\n5 5 0 5 5 5 5 5 5",
"output": "0"
},
{
"input": "8\n0 0 0 0 0 0 0 0",
"output": "0"
},
{
"input": "101\n5 0 0 0 0 0 0 0 5 0 0 0 0 5 0 0 5 0 0 0 0 0 5 0 0 0 0 0 0 0 0 5 0 0 5 0 0 0 0 0 0 0 5 0 0 5 0 0 0 5 0 0 0 0 0 0 0 0 0 0 0 0 0 0 5 0 0 0 0 0 0 0 0 0 0 5 0 0 0 0 5 0 0 0 0 0 0 0 0 0 5 0 0 5 0 0 0 0 5 0 0",
"output": "5555555550000000000000000000000000000000000000000000000000000000000000000000000000000000000000"
},
{
"input": "214\n5 0 5 0 5 0 0 0 5 5 0 5 0 5 5 0 5 0 0 0 0 5 5 0 0 5 5 0 0 0 0 5 5 5 5 0 5 0 0 0 0 0 0 5 0 0 0 5 0 0 5 0 0 5 5 0 0 5 5 0 0 0 0 0 5 0 5 0 5 5 0 5 0 0 5 5 5 0 5 0 5 0 5 5 0 5 0 0 0 5 5 0 5 0 5 5 5 5 5 0 0 0 0 0 0 5 0 5 5 0 5 0 5 0 5 5 0 0 0 0 5 0 5 0 5 0 0 5 0 0 5 5 5 5 5 0 0 5 0 0 5 0 0 5 0 0 5 0 0 5 0 5 0 0 0 5 0 0 5 5 5 0 0 5 5 5 0 0 5 5 0 0 0 5 0 0 5 5 5 5 5 5 0 5 0 0 5 5 5 5 0 5 5 0 0 0 5 5 5 5 0 0 0 0 5 0 0 5 0 0 5 5 0 0",
"output": "5555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555555550000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000"
},
{
"input": "80\n0 0 0 0 5 0 5 5 5 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 5 0 0 5 0 0 0 0 0 0 0 0 0 5 5 0 5 0 0 0 0 0 0 5 0 0 0 0 0 0 0 5 0 0 0 0 5 0 5 5 0 0 0",
"output": "555555555000000000000000000000000000000000000000000000000000000000000000000"
},
{
"input": "2\n0 0",
"output": "0"
},
{
"input": "3\n5 0 0",
"output": "0"
},
{
"input": "4\n5 5 5 5",
"output": "-1"
},
{
"input": "2\n0 5",
"output": "0"
},
{
"input": "14\n5 5 5 5 5 5 5 5 5 5 5 5 5 0",
"output": "5555555550"
},
{
"input": "18\n5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5",
"output": "-1"
},
{
"input": "10\n5 5 5 5 5 5 5 5 5 0",
"output": "5555555550"
},
{
"input": "10\n5 5 5 5 5 5 5 5 5 5",
"output": "-1"
},
{
"input": "20\n5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5",
"output": "-1"
}
] | 1,660,588,040
| 2,147,483,647
|
PyPy 3-64
|
OK
|
TESTS
| 42
| 124
| 0
|
n = int(input())
arr = input().split()
five = arr.count('5')
zero = arr.count('0')
five = five//9
if zero==0:
print(-1)
elif five==0:
print(0)
else:
print('5'*(five*9)+'0'*zero)
|
Title: Jeff and Digits
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Jeff's got *n* cards, each card contains either digit 0, or digit 5. Jeff can choose several cards and put them in a line so that he gets some number. What is the largest possible number divisible by 90 Jeff can make from the cards he's got?
Jeff must make the number without leading zero. At that, we assume that number 0 doesn't contain any leading zeroes. Jeff doesn't have to use all the cards.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=103). The next line contains *n* integers *a*1, *a*2, ..., *a**n* (*a**i*<==<=0 or *a**i*<==<=5). Number *a**i* represents the digit that is written on the *i*-th card.
Output Specification:
In a single line print the answer to the problem — the maximum number, divisible by 90. If you can't make any divisible by 90 number from the cards, print -1.
Demo Input:
['4\n5 0 5 0\n', '11\n5 5 5 5 5 5 5 5 0 5 5\n']
Demo Output:
['0\n', '5555555550\n']
Note:
In the first test you can make only one number that is a multiple of 90 — 0.
In the second test you can make number 5555555550, it is a multiple of 90.
|
```python
n = int(input())
arr = input().split()
five = arr.count('5')
zero = arr.count('0')
five = five//9
if zero==0:
print(-1)
elif five==0:
print(0)
else:
print('5'*(five*9)+'0'*zero)
```
| 3
|
|
638
|
D
|
Three-dimensional Turtle Super Computer
|
PROGRAMMING
| 1,800
|
[
"brute force",
"dfs and similar",
"graphs"
] | null | null |
A super computer has been built in the Turtle Academy of Sciences. The computer consists of *n*·*m*·*k* CPUs. The architecture was the paralellepiped of size *n*<=×<=*m*<=×<=*k*, split into 1<=×<=1<=×<=1 cells, each cell contains exactly one CPU. Thus, each CPU can be simultaneously identified as a group of three numbers from the layer number from 1 to *n*, the line number from 1 to *m* and the column number from 1 to *k*.
In the process of the Super Computer's work the CPUs can send each other messages by the famous turtle scheme: CPU (*x*,<=*y*,<=*z*) can send messages to CPUs (*x*<=+<=1,<=*y*,<=*z*), (*x*,<=*y*<=+<=1,<=*z*) and (*x*,<=*y*,<=*z*<=+<=1) (of course, if they exist), there is no feedback, that is, CPUs (*x*<=+<=1,<=*y*,<=*z*), (*x*,<=*y*<=+<=1,<=*z*) and (*x*,<=*y*,<=*z*<=+<=1) cannot send messages to CPU (*x*,<=*y*,<=*z*).
Over time some CPUs broke down and stopped working. Such CPUs cannot send messages, receive messages or serve as intermediates in transmitting messages. We will say that CPU (*a*,<=*b*,<=*c*) controls CPU (*d*,<=*e*,<=*f*) , if there is a chain of CPUs (*x**i*,<=*y**i*,<=*z**i*), such that (*x*1<==<=*a*,<=*y*1<==<=*b*,<=*z*1<==<=*c*), (*x**p*<==<=*d*,<=*y**p*<==<=*e*,<=*z**p*<==<=*f*) (here and below *p* is the length of the chain) and the CPU in the chain with number *i* (*i*<=<<=*p*) can send messages to CPU *i*<=+<=1.
Turtles are quite concerned about the denial-proofness of the system of communication between the remaining CPUs. For that they want to know the number of critical CPUs. A CPU (*x*,<=*y*,<=*z*) is critical, if turning it off will disrupt some control, that is, if there are two distinctive from (*x*,<=*y*,<=*z*) CPUs: (*a*,<=*b*,<=*c*) and (*d*,<=*e*,<=*f*), such that (*a*,<=*b*,<=*c*) controls (*d*,<=*e*,<=*f*) before (*x*,<=*y*,<=*z*) is turned off and stopped controlling it after the turning off.
|
The first line contains three integers *n*, *m* and *k* (1<=≤<=*n*,<=*m*,<=*k*<=≤<=100) — the dimensions of the Super Computer.
Then *n* blocks follow, describing the current state of the processes. The blocks correspond to the layers of the Super Computer in the order from 1 to *n*. Each block consists of *m* lines, *k* characters in each — the description of a layer in the format of an *m*<=×<=*k* table. Thus, the state of the CPU (*x*,<=*y*,<=*z*) is corresponded to the *z*-th character of the *y*-th line of the block number *x*. Character "1" corresponds to a working CPU and character "0" corresponds to a malfunctioning one. The blocks are separated by exactly one empty line.
|
Print a single integer — the number of critical CPUs, that is, such that turning only this CPU off will disrupt some control.
|
[
"2 2 3\n000\n000\n\n111\n111\n",
"3 3 3\n111\n111\n111\n\n111\n111\n111\n\n111\n111\n111\n",
"1 1 10\n0101010101\n"
] |
[
"2\n",
"19\n",
"0\n"
] |
In the first sample the whole first layer of CPUs is malfunctional. In the second layer when CPU (2, 1, 2) turns off, it disrupts the control by CPU (2, 1, 3) over CPU (2, 1, 1), and when CPU (2, 2, 2) is turned off, it disrupts the control over CPU (2, 2, 3) by CPU (2, 2, 1).
In the second sample all processors except for the corner ones are critical.
In the third sample there is not a single processor controlling another processor, so the answer is 0.
| 2,000
|
[
{
"input": "2 2 3\n000\n000\n\n111\n111",
"output": "2"
},
{
"input": "3 3 3\n111\n111\n111\n\n111\n111\n111\n\n111\n111\n111",
"output": "19"
},
{
"input": "1 1 10\n0101010101",
"output": "0"
},
{
"input": "1 1 1\n0",
"output": "0"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "3 1 1\n1\n\n1\n\n1",
"output": "1"
},
{
"input": "3 1 1\n1\n\n0\n\n1",
"output": "0"
},
{
"input": "1 3 1\n1\n1\n1",
"output": "1"
},
{
"input": "1 3 1\n1\n0\n1",
"output": "0"
},
{
"input": "1 1 3\n111",
"output": "1"
},
{
"input": "1 1 3\n101",
"output": "0"
},
{
"input": "1 1 3\n011",
"output": "0"
},
{
"input": "1 1 3\n110",
"output": "0"
},
{
"input": "1 1 1\n0",
"output": "0"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "1 1 100\n0000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "0"
},
{
"input": "1 1 100\n0000011111011101001100111010100111000100010100010110111110110011000000111111011111001111000011111010",
"output": "21"
},
{
"input": "1 1 100\n1111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111",
"output": "98"
},
{
"input": "1 100 1\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0",
"output": "0"
},
{
"input": "1 100 1\n0\n0\n0\n0\n0\n1\n0\n0\n0\n0\n1\n0\n1\n0\n0\n0\n0\n0\n0\n0\n1\n0\n1\n0\n1\n1\n0\n1\n0\n1\n0\n0\n1\n1\n1\n0\n0\n1\n0\n1\n0\n0\n1\n1\n0\n0\n0\n0\n0\n1\n0\n0\n0\n1\n1\n1\n1\n0\n1\n0\n0\n1\n0\n1\n0\n0\n0\n0\n1\n0\n0\n1\n1\n1\n0\n0\n1\n1\n1\n0\n1\n0\n1\n0\n1\n0\n1\n0\n1\n1\n1\n1\n1\n1\n0\n1\n1\n1\n0\n0",
"output": "10"
},
{
"input": "1 100 1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1\n1",
"output": "98"
},
{
"input": "100 1 1\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0\n\n0",
"output": "0"
},
{
"input": "100 1 1\n0\n\n1\n\n1\n\n1\n\n0\n\n0\n\n0\n\n1\n\n1\n\n0\n\n0\n\n1\n\n0\n\n1\n\n1\n\n1\n\n1\n\n0\n\n0\n\n1\n\n1\n\n1\n\n0\n\n0\n\n0\n\n0\n\n0\n\n1\n\n1\n\n0\n\n1\n\n1\n\n1\n\n0\n\n1\n\n0\n\n0\n\n1\n\n0\n\n1\n\n1\n\n0\n\n0\n\n0\n\n0\n\n1\n\n0\n\n1\n\n0\n\n0\n\n1\n\n1\n\n1\n\n0\n\n1\n\n1\n\n0\n\n1\n\n1\n\n1\n\n0\n\n0\n\n0\n\n1\n\n0\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n0\n\n0\n\n1\n\n0\n\n0\n\n0\n\n0\n\n0\n\n1\n\n0\n\n1\n\n1\n\n0\n\n0\n\n0\n\n0\n\n0\n\n1\n\n1\n\n1\n\n1\n\n1\n\n0\n\n1\n\n1\n\n1\n\n1\n\n1\n\n0",
"output": "17"
},
{
"input": "100 1 1\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1\n\n1",
"output": "98"
},
{
"input": "6 8 3\n011\n001\n000\n100\n111\n110\n100\n100\n\n000\n100\n011\n001\n011\n000\n100\n111\n\n110\n111\n011\n110\n101\n001\n110\n000\n\n100\n000\n110\n001\n110\n010\n110\n011\n\n101\n111\n010\n110\n101\n111\n011\n110\n\n100\n111\n111\n011\n101\n110\n110\n110",
"output": "46"
}
] | 1,595,591,268
| 2,147,483,647
|
PyPy 3
|
RUNTIME_ERROR
|
TESTS
| 0
| 202
| 22,323,200
|
def put():
return map(int, input().split())
def safe(x,y,z):
return x>=0 and y>=0 and z>=0 and x<n and y<m and z<p
def check(x,y,z):
if mat[x][y][z]=='0': return 0
tmp = [(0,0,1),(0,1,0),(1,0,0)]
move = [-1,1]
ori = [x,y,z]
cpy = ori.copy()
for i in range(3):
ans = 0
for j in range(2):
for k in range(3):
cpy[k]= ori[k]+ move[j]*tmp[i][k]
if safe(cpy[0], cpy[1], cpy[2]) and mat[cpy[0]][cpy[1]][cpy[2]]=='1': ans+=1
if ans==2: return 1
return 0
n,m,p = put()
mat = [[input() for j in range(m+1)] for i in range(n)]
ans = 0
for i in range(n):
for j in range(m):
for k in range(p):
ans += check(i,j,k)
print(ans)
|
Title: Three-dimensional Turtle Super Computer
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
A super computer has been built in the Turtle Academy of Sciences. The computer consists of *n*·*m*·*k* CPUs. The architecture was the paralellepiped of size *n*<=×<=*m*<=×<=*k*, split into 1<=×<=1<=×<=1 cells, each cell contains exactly one CPU. Thus, each CPU can be simultaneously identified as a group of three numbers from the layer number from 1 to *n*, the line number from 1 to *m* and the column number from 1 to *k*.
In the process of the Super Computer's work the CPUs can send each other messages by the famous turtle scheme: CPU (*x*,<=*y*,<=*z*) can send messages to CPUs (*x*<=+<=1,<=*y*,<=*z*), (*x*,<=*y*<=+<=1,<=*z*) and (*x*,<=*y*,<=*z*<=+<=1) (of course, if they exist), there is no feedback, that is, CPUs (*x*<=+<=1,<=*y*,<=*z*), (*x*,<=*y*<=+<=1,<=*z*) and (*x*,<=*y*,<=*z*<=+<=1) cannot send messages to CPU (*x*,<=*y*,<=*z*).
Over time some CPUs broke down and stopped working. Such CPUs cannot send messages, receive messages or serve as intermediates in transmitting messages. We will say that CPU (*a*,<=*b*,<=*c*) controls CPU (*d*,<=*e*,<=*f*) , if there is a chain of CPUs (*x**i*,<=*y**i*,<=*z**i*), such that (*x*1<==<=*a*,<=*y*1<==<=*b*,<=*z*1<==<=*c*), (*x**p*<==<=*d*,<=*y**p*<==<=*e*,<=*z**p*<==<=*f*) (here and below *p* is the length of the chain) and the CPU in the chain with number *i* (*i*<=<<=*p*) can send messages to CPU *i*<=+<=1.
Turtles are quite concerned about the denial-proofness of the system of communication between the remaining CPUs. For that they want to know the number of critical CPUs. A CPU (*x*,<=*y*,<=*z*) is critical, if turning it off will disrupt some control, that is, if there are two distinctive from (*x*,<=*y*,<=*z*) CPUs: (*a*,<=*b*,<=*c*) and (*d*,<=*e*,<=*f*), such that (*a*,<=*b*,<=*c*) controls (*d*,<=*e*,<=*f*) before (*x*,<=*y*,<=*z*) is turned off and stopped controlling it after the turning off.
Input Specification:
The first line contains three integers *n*, *m* and *k* (1<=≤<=*n*,<=*m*,<=*k*<=≤<=100) — the dimensions of the Super Computer.
Then *n* blocks follow, describing the current state of the processes. The blocks correspond to the layers of the Super Computer in the order from 1 to *n*. Each block consists of *m* lines, *k* characters in each — the description of a layer in the format of an *m*<=×<=*k* table. Thus, the state of the CPU (*x*,<=*y*,<=*z*) is corresponded to the *z*-th character of the *y*-th line of the block number *x*. Character "1" corresponds to a working CPU and character "0" corresponds to a malfunctioning one. The blocks are separated by exactly one empty line.
Output Specification:
Print a single integer — the number of critical CPUs, that is, such that turning only this CPU off will disrupt some control.
Demo Input:
['2 2 3\n000\n000\n\n111\n111\n', '3 3 3\n111\n111\n111\n\n111\n111\n111\n\n111\n111\n111\n', '1 1 10\n0101010101\n']
Demo Output:
['2\n', '19\n', '0\n']
Note:
In the first sample the whole first layer of CPUs is malfunctional. In the second layer when CPU (2, 1, 2) turns off, it disrupts the control by CPU (2, 1, 3) over CPU (2, 1, 1), and when CPU (2, 2, 2) is turned off, it disrupts the control over CPU (2, 2, 3) by CPU (2, 2, 1).
In the second sample all processors except for the corner ones are critical.
In the third sample there is not a single processor controlling another processor, so the answer is 0.
|
```python
def put():
return map(int, input().split())
def safe(x,y,z):
return x>=0 and y>=0 and z>=0 and x<n and y<m and z<p
def check(x,y,z):
if mat[x][y][z]=='0': return 0
tmp = [(0,0,1),(0,1,0),(1,0,0)]
move = [-1,1]
ori = [x,y,z]
cpy = ori.copy()
for i in range(3):
ans = 0
for j in range(2):
for k in range(3):
cpy[k]= ori[k]+ move[j]*tmp[i][k]
if safe(cpy[0], cpy[1], cpy[2]) and mat[cpy[0]][cpy[1]][cpy[2]]=='1': ans+=1
if ans==2: return 1
return 0
n,m,p = put()
mat = [[input() for j in range(m+1)] for i in range(n)]
ans = 0
for i in range(n):
for j in range(m):
for k in range(p):
ans += check(i,j,k)
print(ans)
```
| -1
|
|
195
|
C
|
Try and Catch
|
PROGRAMMING
| 1,800
|
[
"expression parsing",
"implementation"
] | null | null |
Vasya is developing his own programming language VPL (Vasya Programming Language). Right now he is busy making the system of exceptions. He thinks that the system of exceptions must function like that.
The exceptions are processed by try-catch-blocks. There are two operators that work with the blocks:
1. The try operator. It opens a new try-catch-block. 1. The catch(<exception_type>, <message>) operator. It closes the try-catch-block that was started last and haven't yet been closed. This block can be activated only via exception of type <exception_type>. When we activate this block, the screen displays the <message>. If at the given moment there is no open try-catch-block, then we can't use the catch operator.
The exceptions can occur in the program in only one case: when we use the throw operator. The throw(<exception_type>) operator creates the exception of the given type.
Let's suggest that as a result of using some throw operator the program created an exception of type *a*. In this case a try-catch-block is activated, such that this block's try operator was described in the program earlier than the used throw operator. Also, this block's catch operator was given an exception type *a* as a parameter and this block's catch operator is described later that the used throw operator. If there are several such try-catch-blocks, then the system activates the block whose catch operator occurs earlier than others. If no try-catch-block was activated, then the screen displays message "Unhandled Exception".
To test the system, Vasya wrote a program that contains only try, catch and throw operators, one line contains no more than one operator, the whole program contains exactly one throw operator.
Your task is: given a program in VPL, determine, what message will be displayed on the screen.
|
The first line contains a single integer: *n* (1<=≤<=*n*<=≤<=105) the number of lines in the program. Next *n* lines contain the program in language VPL. Each line contains no more than one operator. It means that input file can contain empty lines and lines, consisting only of spaces.
The program contains only operators try, catch and throw. It is guaranteed that the program is correct. It means that each started try-catch-block was closed, the catch operators aren't used unless there is an open try-catch-block. The program has exactly one throw operator. The program may have spaces at the beginning of a line, at the end of a line, before and after a bracket, a comma or a quote mark.
The exception type is a nonempty string, that consists only of upper and lower case english letters. The length of the string does not exceed 20 symbols. Message is a nonempty string, that consists only of upper and lower case english letters, digits and spaces. Message is surrounded with quote marks. Quote marks shouldn't be printed. The length of the string does not exceed 20 symbols.
Length of any line in the input file does not exceed 50 symbols.
|
Print the message the screen will show after the given program is executed.
|
[
"8\ntry\n try\n throw ( AE ) \n catch ( BE, \"BE in line 3\")\n\n try\n catch(AE, \"AE in line 5\") \ncatch(AE,\"AE somewhere\")\n",
"8\ntry\n try\n throw ( AE ) \n catch ( AE, \"AE in line 3\")\n\n try\n catch(BE, \"BE in line 5\") \ncatch(AE,\"AE somewhere\")\n",
"8\ntry\n try\n throw ( CE ) \n catch ( BE, \"BE in line 3\")\n\n try\n catch(AE, \"AE in line 5\") \ncatch(AE,\"AE somewhere\")\n"
] |
[
"AE somewhere\n",
"AE in line 3\n",
"Unhandled Exception\n"
] |
In the first sample there are 2 try-catch-blocks such that try operator is described earlier than throw operator and catch operator is described later than throw operator: try-catch(BE,"BE in line 3") and try-catch(AE,"AE somewhere"). Exception type is AE, so the second block will be activated, because operator catch(AE,"AE somewhere") has exception type AE as parameter and operator catch(BE,"BE in line 3") has exception type BE.
In the second sample there are 2 try-catch-blocks such that try operator is described earlier than throw operator and catch operator is described later than throw operator: try-catch(AE,"AE in line 3") and try-catch(AE,"AE somewhere"). Exception type is AE, so both blocks can be activated, but only the first one will be activated, because operator catch(AE,"AE in line 3") is described earlier than catch(AE,"AE somewhere")
In the third sample there is no blocks that can be activated by an exception of type CE.
| 1,500
|
[
{
"input": "8\ntry\n try\n throw ( AE ) \n catch ( BE, \"BE in line 3\")\n\n try\n catch(AE, \"AE in line 5\") \ncatch(AE,\"AE somewhere\")",
"output": "AE somewhere"
},
{
"input": "8\ntry\n try\n throw ( AE ) \n catch ( AE, \"AE in line 3\")\n\n try\n catch(BE, \"BE in line 5\") \ncatch(AE,\"AE somewhere\")",
"output": "AE in line 3"
},
{
"input": "8\ntry\n try\n throw ( CE ) \n catch ( BE, \"BE in line 3\")\n\n try\n catch(AE, \"AE in line 5\") \ncatch(AE,\"AE somewhere\")",
"output": "Unhandled Exception"
},
{
"input": "3\ntry\nthrow(A)\ncatch(A, \"A cought\")",
"output": "A cought"
},
{
"input": "5\n try \n try \n catch ( gnAEZNTt, \"i5 tAC8ktUdeX\") \n throw( gnAEZNTt ) \ncatch ( gnAEZNTt, \"g1cN\" ) ",
"output": "g1cN"
},
{
"input": "5\n try \n catch(UqWpIpGKiMqFnKox , \"bp9h8dfeNLhk9Wea\" ) \nthrow ( uaBRmgAAQyWTCzaaQMlZ ) \n try \ncatch( UqWpIpGKiMqFnKox,\"0OvVhsVWzDyqwo\" )",
"output": "Unhandled Exception"
},
{
"input": "5\n throw ( ouB ) \n try \ncatch(ouB, \"bTJZV\" )\n try \ncatch( ouB , \"DUniE dDhpiN\") ",
"output": "Unhandled Exception"
},
{
"input": "5\ntry \n throw( egdCZzrKRLBcqDl )\n catch ( egdCZzrKRLBcqDl ,\"o\" )\n try \n catch (egdCZzrKRLBcqDl , \"oM62EJIirV D0\" ) ",
"output": "o"
},
{
"input": "10\n \n\n \n\nthrow (ProgramException)\n \n \n\n\n ",
"output": "Unhandled Exception"
},
{
"input": "21\n try \n try \n try \n try \n try \n try \n try \n try \n try \n try \n throw( qtSMze) \ncatch(LY,\"x3 j\")\ncatch(hgSAFgbMGx,\"moByu\")\ncatch(LmydVQgv,\"hbZl\")\ncatch(oK,\"B6OZx qy\")\ncatch(rrtnRQB,\"7VFkQMv\")\ncatch(CASqQXaz,\"d9oci1Kx\")\ncatch(CTCzsdD,\"u\")\ncatch(xqqMxbEs,\"Mdu\")\ncatch(sOWgTPbRp,\"fVH6\")\ncatch(qtSMze,\"ZRnNzz\")",
"output": "ZRnNzz"
},
{
"input": "3\ntry\nthrow ( X )\ncatch ( X, \"try again\")",
"output": "try again"
},
{
"input": "3\ntry\nthrow ( try )\ncatch ( try, \"try again\")",
"output": "try again"
},
{
"input": "3\ntry\nthrow(tryC)\ncatch(tryC, \"bad boy\")",
"output": "bad boy"
},
{
"input": "7\ntry\ncatch(A,\"try A\")\ntry\n throw(A)\ncatch(A,\"try B\")\ntry\ncatch(A,\"try C\")",
"output": "try B"
},
{
"input": "3\ntry\n throw(try)\ncatch(try,\"haha\")",
"output": "haha"
},
{
"input": "3\ntry\n throw(try)\ncatch(try,\"asd\")",
"output": "asd"
},
{
"input": "11\ntry\n try\n catch (B, \"b\")\n \n try\n throw ( U )\n catch (U, \"try\")\n \n try\n catch (C, \"c\")\ncatch (A, \"a\")",
"output": "try"
}
] | 1,694,082,029
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 37
| 1,278
| 10,240,000
|
n = (int)(input())
stack = []
stack_len = 0
found = False
for _ in range(n) :
line = input()
if "try" in line :
stack.append(not found)
stack_len += 1
elif "throw" in line :
temp = line.split('throw')[1]
ex = ""
for ch in temp :
if ch == '(' or ch == ')' or ch == ' ' : continue
ex += ch
found = True
elif "catch" in line :
if stack_len > 0 and stack[-1] and found :
temp = line.split('catch')[1]
ex_ = ""
for x in temp :
if x == '(' or x == ' ' : continue
if x == ',' : break
ex_ += x
msg = line.split('"')[1]
if ex == ex_ :
print(msg)
quit()
stack.pop()
print("Unhandled Exception")
|
Title: Try and Catch
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasya is developing his own programming language VPL (Vasya Programming Language). Right now he is busy making the system of exceptions. He thinks that the system of exceptions must function like that.
The exceptions are processed by try-catch-blocks. There are two operators that work with the blocks:
1. The try operator. It opens a new try-catch-block. 1. The catch(<exception_type>, <message>) operator. It closes the try-catch-block that was started last and haven't yet been closed. This block can be activated only via exception of type <exception_type>. When we activate this block, the screen displays the <message>. If at the given moment there is no open try-catch-block, then we can't use the catch operator.
The exceptions can occur in the program in only one case: when we use the throw operator. The throw(<exception_type>) operator creates the exception of the given type.
Let's suggest that as a result of using some throw operator the program created an exception of type *a*. In this case a try-catch-block is activated, such that this block's try operator was described in the program earlier than the used throw operator. Also, this block's catch operator was given an exception type *a* as a parameter and this block's catch operator is described later that the used throw operator. If there are several such try-catch-blocks, then the system activates the block whose catch operator occurs earlier than others. If no try-catch-block was activated, then the screen displays message "Unhandled Exception".
To test the system, Vasya wrote a program that contains only try, catch and throw operators, one line contains no more than one operator, the whole program contains exactly one throw operator.
Your task is: given a program in VPL, determine, what message will be displayed on the screen.
Input Specification:
The first line contains a single integer: *n* (1<=≤<=*n*<=≤<=105) the number of lines in the program. Next *n* lines contain the program in language VPL. Each line contains no more than one operator. It means that input file can contain empty lines and lines, consisting only of spaces.
The program contains only operators try, catch and throw. It is guaranteed that the program is correct. It means that each started try-catch-block was closed, the catch operators aren't used unless there is an open try-catch-block. The program has exactly one throw operator. The program may have spaces at the beginning of a line, at the end of a line, before and after a bracket, a comma or a quote mark.
The exception type is a nonempty string, that consists only of upper and lower case english letters. The length of the string does not exceed 20 symbols. Message is a nonempty string, that consists only of upper and lower case english letters, digits and spaces. Message is surrounded with quote marks. Quote marks shouldn't be printed. The length of the string does not exceed 20 symbols.
Length of any line in the input file does not exceed 50 symbols.
Output Specification:
Print the message the screen will show after the given program is executed.
Demo Input:
['8\ntry\n try\n throw ( AE ) \n catch ( BE, "BE in line 3")\n\n try\n catch(AE, "AE in line 5") \ncatch(AE,"AE somewhere")\n', '8\ntry\n try\n throw ( AE ) \n catch ( AE, "AE in line 3")\n\n try\n catch(BE, "BE in line 5") \ncatch(AE,"AE somewhere")\n', '8\ntry\n try\n throw ( CE ) \n catch ( BE, "BE in line 3")\n\n try\n catch(AE, "AE in line 5") \ncatch(AE,"AE somewhere")\n']
Demo Output:
['AE somewhere\n', 'AE in line 3\n', 'Unhandled Exception\n']
Note:
In the first sample there are 2 try-catch-blocks such that try operator is described earlier than throw operator and catch operator is described later than throw operator: try-catch(BE,"BE in line 3") and try-catch(AE,"AE somewhere"). Exception type is AE, so the second block will be activated, because operator catch(AE,"AE somewhere") has exception type AE as parameter and operator catch(BE,"BE in line 3") has exception type BE.
In the second sample there are 2 try-catch-blocks such that try operator is described earlier than throw operator and catch operator is described later than throw operator: try-catch(AE,"AE in line 3") and try-catch(AE,"AE somewhere"). Exception type is AE, so both blocks can be activated, but only the first one will be activated, because operator catch(AE,"AE in line 3") is described earlier than catch(AE,"AE somewhere")
In the third sample there is no blocks that can be activated by an exception of type CE.
|
```python
n = (int)(input())
stack = []
stack_len = 0
found = False
for _ in range(n) :
line = input()
if "try" in line :
stack.append(not found)
stack_len += 1
elif "throw" in line :
temp = line.split('throw')[1]
ex = ""
for ch in temp :
if ch == '(' or ch == ')' or ch == ' ' : continue
ex += ch
found = True
elif "catch" in line :
if stack_len > 0 and stack[-1] and found :
temp = line.split('catch')[1]
ex_ = ""
for x in temp :
if x == '(' or x == ' ' : continue
if x == ',' : break
ex_ += x
msg = line.split('"')[1]
if ex == ex_ :
print(msg)
quit()
stack.pop()
print("Unhandled Exception")
```
| 0
|
|
792
|
D
|
Paths in a Complete Binary Tree
|
PROGRAMMING
| 1,900
|
[
"bitmasks",
"trees"
] | null | null |
*T* is a complete binary tree consisting of *n* vertices. It means that exactly one vertex is a root, and each vertex is either a leaf (and doesn't have children) or an inner node (and has exactly two children). All leaves of a complete binary tree have the same depth (distance from the root). So *n* is a number such that *n*<=+<=1 is a power of 2.
In the picture you can see a complete binary tree with *n*<==<=15.
Vertices are numbered from 1 to *n* in a special recursive way: we recursively assign numbers to all vertices from the left subtree (if current vertex is not a leaf), then assign a number to the current vertex, and then recursively assign numbers to all vertices from the right subtree (if it exists). In the picture vertices are numbered exactly using this algorithm. It is clear that for each size of a complete binary tree exists exactly one way to give numbers to all vertices. This way of numbering is called symmetric.
You have to write a program that for given *n* answers *q* queries to the tree.
Each query consists of an integer number *u**i* (1<=≤<=*u**i*<=≤<=*n*) and a string *s**i*, where *u**i* is the number of vertex, and *s**i* represents the path starting from this vertex. String *s**i* doesn't contain any characters other than 'L', 'R' and 'U', which mean traverse to the left child, to the right child and to the parent, respectively. Characters from *s**i* have to be processed from left to right, considering that *u**i* is the vertex where the path starts. If it's impossible to process a character (for example, to go to the left child of a leaf), then you have to skip it. The answer is the number of vertex where the path represented by *s**i* ends.
For example, if *u**i*<==<=4 and *s**i*<==<=«UURL», then the answer is 10.
|
The first line contains two integer numbers *n* and *q* (1<=≤<=*n*<=≤<=1018, *q*<=≥<=1). *n* is such that *n*<=+<=1 is a power of 2.
The next 2*q* lines represent queries; each query consists of two consecutive lines. The first of these two lines contains *u**i* (1<=≤<=*u**i*<=≤<=*n*), the second contains non-empty string *s**i*. *s**i* doesn't contain any characters other than 'L', 'R' and 'U'.
It is guaranteed that the sum of lengths of *s**i* (for each *i* such that 1<=≤<=*i*<=≤<=*q*) doesn't exceed 105.
|
Print *q* numbers, *i*-th number must be the answer to the *i*-th query.
|
[
"15 2\n4\nUURL\n8\nLRLLLLLLLL\n"
] |
[
"10\n5\n"
] |
none
| 0
|
[
{
"input": "15 2\n4\nUURL\n8\nLRLLLLLLLL",
"output": "10\n5"
},
{
"input": "1 1\n1\nL",
"output": "1"
},
{
"input": "1 1\n1\nR",
"output": "1"
},
{
"input": "1 1\n1\nU",
"output": "1"
},
{
"input": "1 10\n1\nURLRLULUR\n1\nLRRRURULULL\n1\nLURURRUUUU\n1\nRRULLLRRUL\n1\nUULLUURL\n1\nRLRRULUL\n1\nLURRLRUULRR\n1\nLULLULUUUL\n1\nURULLULL\n1\nLRRLRUUUURRLRRL",
"output": "1\n1\n1\n1\n1\n1\n1\n1\n1\n1"
},
{
"input": "3 10\n2\nRUUUULULULUU\n1\nULLLURLU\n3\nLLURLULU\n2\nRRLURLURLLR\n3\nLRURURLRLLL\n3\nLRLULRRUURURRL\n1\nRULLR\n2\nLRULLURUL\n3\nRLL\n1\nULRUULURLULLLLLLRLL",
"output": "2\n2\n2\n3\n3\n3\n1\n1\n3\n1"
},
{
"input": "7 10\n3\nLLULULLLR\n4\nLUUURLLLUURRU\n1\nULURR\n6\nLURLLLLRLR\n2\nULULURU\n7\nRRUUUURLRLR\n7\nUUURRULRRLUL\n7\nULLLRUULULR\n6\nUURRLL\n6\nRULUUULLRLLLUULL",
"output": "1\n6\n3\n7\n4\n5\n5\n3\n7\n1"
},
{
"input": "15 10\n1\nURUUUR\n15\nRRLLURRRURL\n1\nUURRLUR\n13\nLRUULUURLRRRL\n6\nLULUURULUURL\n15\nUULL\n8\nULLLULRLRUU\n8\nULRUULRUURLLRL\n5\nLLUULRLURRRULLR\n10\nLUULLRU",
"output": "12\n15\n7\n11\n10\n9\n4\n9\n1\n10"
},
{
"input": "31 10\n12\nRRRRRRULUURR\n9\nLUUURULLLLU\n24\nLLRRLURLLU\n25\nLLUUURL\n14\nRRRRRRULU\n11\nLRLUULRUULR\n10\nULULU\n30\nLLRLLLLRULRLL\n1\nRRULRLRLLLRULR\n20\nULLULLRR",
"output": "15\n2\n18\n26\n14\n11\n12\n29\n1\n17"
},
{
"input": "4503599627370495 1\n2251799813685248\nLLLLLLLL",
"output": "8796093022208"
},
{
"input": "4503599627370495 1\n2251799813685248\nLLLLLL",
"output": "35184372088832"
},
{
"input": "576460752303423487 1\n1125899906842624\nR",
"output": "1688849860263936"
},
{
"input": "1125899906842623 1\n1\nUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUULLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLLRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRLULLLLLLLLLLLLLLLLUUUULRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRUUUUUUUUUUUUUUUUUUUUUUUUUUUUUUU",
"output": "2147483648"
}
] | 1,559,168,432
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 5
| 108
| 409,600
|
from collections import deque
root,q = map(int,input().split(' '))
# Problems
# We can't search for siblings When we don't have One
# We can't get the parent of the root
# I would Use deque(from collection) for fast pop,append operation...
# This func for getting The start item path
def find_path(root,x,deep,path):
path.append(root)
deep = deep//2
if root<x:
return find_path(root+deep,x,deep,path)
elif root>x:
return find_path(root-deep,x,deep,path)
else:
return deep
# This Func for finding The result item according to a path
def find_item(deep,s_path,path):
for p in path:
if p=='U' and len(s_path)!=1 :
deep = abs(s_path.pop()-s_path[-1])
elif deep!=0 :
if p=='L':
s_path.append(s_path[-1]-deep)
deep=deep//2
elif p=='R':
s_path.append(s_path[-1]+deep)
deep=deep//2
return s_path[-1]
queue = deque()
root=root//2+1 if root%2 else root//2
for i in range(q):
x = int(input())
path = input()
if root!=x:
deep = find_path(root,x,root,queue)
else:
queue.append(root)
deep=root//2
print(find_item(deep,queue,path))
|
Title: Paths in a Complete Binary Tree
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
*T* is a complete binary tree consisting of *n* vertices. It means that exactly one vertex is a root, and each vertex is either a leaf (and doesn't have children) or an inner node (and has exactly two children). All leaves of a complete binary tree have the same depth (distance from the root). So *n* is a number such that *n*<=+<=1 is a power of 2.
In the picture you can see a complete binary tree with *n*<==<=15.
Vertices are numbered from 1 to *n* in a special recursive way: we recursively assign numbers to all vertices from the left subtree (if current vertex is not a leaf), then assign a number to the current vertex, and then recursively assign numbers to all vertices from the right subtree (if it exists). In the picture vertices are numbered exactly using this algorithm. It is clear that for each size of a complete binary tree exists exactly one way to give numbers to all vertices. This way of numbering is called symmetric.
You have to write a program that for given *n* answers *q* queries to the tree.
Each query consists of an integer number *u**i* (1<=≤<=*u**i*<=≤<=*n*) and a string *s**i*, where *u**i* is the number of vertex, and *s**i* represents the path starting from this vertex. String *s**i* doesn't contain any characters other than 'L', 'R' and 'U', which mean traverse to the left child, to the right child and to the parent, respectively. Characters from *s**i* have to be processed from left to right, considering that *u**i* is the vertex where the path starts. If it's impossible to process a character (for example, to go to the left child of a leaf), then you have to skip it. The answer is the number of vertex where the path represented by *s**i* ends.
For example, if *u**i*<==<=4 and *s**i*<==<=«UURL», then the answer is 10.
Input Specification:
The first line contains two integer numbers *n* and *q* (1<=≤<=*n*<=≤<=1018, *q*<=≥<=1). *n* is such that *n*<=+<=1 is a power of 2.
The next 2*q* lines represent queries; each query consists of two consecutive lines. The first of these two lines contains *u**i* (1<=≤<=*u**i*<=≤<=*n*), the second contains non-empty string *s**i*. *s**i* doesn't contain any characters other than 'L', 'R' and 'U'.
It is guaranteed that the sum of lengths of *s**i* (for each *i* such that 1<=≤<=*i*<=≤<=*q*) doesn't exceed 105.
Output Specification:
Print *q* numbers, *i*-th number must be the answer to the *i*-th query.
Demo Input:
['15 2\n4\nUURL\n8\nLRLLLLLLLL\n']
Demo Output:
['10\n5\n']
Note:
none
|
```python
from collections import deque
root,q = map(int,input().split(' '))
# Problems
# We can't search for siblings When we don't have One
# We can't get the parent of the root
# I would Use deque(from collection) for fast pop,append operation...
# This func for getting The start item path
def find_path(root,x,deep,path):
path.append(root)
deep = deep//2
if root<x:
return find_path(root+deep,x,deep,path)
elif root>x:
return find_path(root-deep,x,deep,path)
else:
return deep
# This Func for finding The result item according to a path
def find_item(deep,s_path,path):
for p in path:
if p=='U' and len(s_path)!=1 :
deep = abs(s_path.pop()-s_path[-1])
elif deep!=0 :
if p=='L':
s_path.append(s_path[-1]-deep)
deep=deep//2
elif p=='R':
s_path.append(s_path[-1]+deep)
deep=deep//2
return s_path[-1]
queue = deque()
root=root//2+1 if root%2 else root//2
for i in range(q):
x = int(input())
path = input()
if root!=x:
deep = find_path(root,x,root,queue)
else:
queue.append(root)
deep=root//2
print(find_item(deep,queue,path))
```
| 0
|
|
651
|
A
|
Joysticks
|
PROGRAMMING
| 1,100
|
[
"dp",
"greedy",
"implementation",
"math"
] | null | null |
Friends are going to play console. They have two joysticks and only one charger for them. Initially first joystick is charged at *a*1 percent and second one is charged at *a*2 percent. You can connect charger to a joystick only at the beginning of each minute. In one minute joystick either discharges by 2 percent (if not connected to a charger) or charges by 1 percent (if connected to a charger).
Game continues while both joysticks have a positive charge. Hence, if at the beginning of minute some joystick is charged by 1 percent, it has to be connected to a charger, otherwise the game stops. If some joystick completely discharges (its charge turns to 0), the game also stops.
Determine the maximum number of minutes that game can last. It is prohibited to pause the game, i. e. at each moment both joysticks should be enabled. It is allowed for joystick to be charged by more than 100 percent.
|
The first line of the input contains two positive integers *a*1 and *a*2 (1<=≤<=*a*1,<=*a*2<=≤<=100), the initial charge level of first and second joystick respectively.
|
Output the only integer, the maximum number of minutes that the game can last. Game continues until some joystick is discharged.
|
[
"3 5\n",
"4 4\n"
] |
[
"6\n",
"5\n"
] |
In the first sample game lasts for 6 minute by using the following algorithm:
- at the beginning of the first minute connect first joystick to the charger, by the end of this minute first joystick is at 4%, second is at 3%; - continue the game without changing charger, by the end of the second minute the first joystick is at 5%, second is at 1%; - at the beginning of the third minute connect second joystick to the charger, after this minute the first joystick is at 3%, the second one is at 2%; - continue the game without changing charger, by the end of the fourth minute first joystick is at 1%, second one is at 3%; - at the beginning of the fifth minute connect first joystick to the charger, after this minute the first joystick is at 2%, the second one is at 1%; - at the beginning of the sixth minute connect second joystick to the charger, after this minute the first joystick is at 0%, the second one is at 2%.
After that the first joystick is completely discharged and the game is stopped.
| 500
|
[
{
"input": "3 5",
"output": "6"
},
{
"input": "4 4",
"output": "5"
},
{
"input": "100 100",
"output": "197"
},
{
"input": "1 100",
"output": "98"
},
{
"input": "100 1",
"output": "98"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "8 8",
"output": "13"
},
{
"input": "7 2",
"output": "7"
},
{
"input": "24 15",
"output": "36"
},
{
"input": "19 30",
"output": "47"
},
{
"input": "15 31",
"output": "44"
},
{
"input": "14 15",
"output": "27"
},
{
"input": "58 33",
"output": "89"
},
{
"input": "15 25",
"output": "38"
},
{
"input": "59 45",
"output": "102"
},
{
"input": "3 73",
"output": "74"
},
{
"input": "48 1",
"output": "47"
},
{
"input": "100 25",
"output": "122"
},
{
"input": "40 49",
"output": "86"
},
{
"input": "85 73",
"output": "155"
},
{
"input": "29 1",
"output": "28"
},
{
"input": "74 25",
"output": "97"
},
{
"input": "24 57",
"output": "78"
},
{
"input": "23 12",
"output": "33"
},
{
"input": "2 99",
"output": "99"
},
{
"input": "98 2",
"output": "97"
},
{
"input": "2 97",
"output": "97"
},
{
"input": "30 54",
"output": "81"
},
{
"input": "32 53",
"output": "82"
},
{
"input": "32 54",
"output": "84"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "2 1",
"output": "1"
},
{
"input": "2 2",
"output": "1"
},
{
"input": "1 3",
"output": "2"
},
{
"input": "3 1",
"output": "2"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "3 2",
"output": "3"
}
] | 1,572,973,298
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 3
| 109
| 0
|
a = list(map(int, input().split()))
c = 0
b = a[0] + a[1]
if min(a) % 2 == 0:
c = b - 3
elif min(a) % 2 != 0:
c = b - 2
print(c)
|
Title: Joysticks
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Friends are going to play console. They have two joysticks and only one charger for them. Initially first joystick is charged at *a*1 percent and second one is charged at *a*2 percent. You can connect charger to a joystick only at the beginning of each minute. In one minute joystick either discharges by 2 percent (if not connected to a charger) or charges by 1 percent (if connected to a charger).
Game continues while both joysticks have a positive charge. Hence, if at the beginning of minute some joystick is charged by 1 percent, it has to be connected to a charger, otherwise the game stops. If some joystick completely discharges (its charge turns to 0), the game also stops.
Determine the maximum number of minutes that game can last. It is prohibited to pause the game, i. e. at each moment both joysticks should be enabled. It is allowed for joystick to be charged by more than 100 percent.
Input Specification:
The first line of the input contains two positive integers *a*1 and *a*2 (1<=≤<=*a*1,<=*a*2<=≤<=100), the initial charge level of first and second joystick respectively.
Output Specification:
Output the only integer, the maximum number of minutes that the game can last. Game continues until some joystick is discharged.
Demo Input:
['3 5\n', '4 4\n']
Demo Output:
['6\n', '5\n']
Note:
In the first sample game lasts for 6 minute by using the following algorithm:
- at the beginning of the first minute connect first joystick to the charger, by the end of this minute first joystick is at 4%, second is at 3%; - continue the game without changing charger, by the end of the second minute the first joystick is at 5%, second is at 1%; - at the beginning of the third minute connect second joystick to the charger, after this minute the first joystick is at 3%, the second one is at 2%; - continue the game without changing charger, by the end of the fourth minute first joystick is at 1%, second one is at 3%; - at the beginning of the fifth minute connect first joystick to the charger, after this minute the first joystick is at 2%, the second one is at 1%; - at the beginning of the sixth minute connect second joystick to the charger, after this minute the first joystick is at 0%, the second one is at 2%.
After that the first joystick is completely discharged and the game is stopped.
|
```python
a = list(map(int, input().split()))
c = 0
b = a[0] + a[1]
if min(a) % 2 == 0:
c = b - 3
elif min(a) % 2 != 0:
c = b - 2
print(c)
```
| 0
|
|
50
|
A
|
Domino piling
|
PROGRAMMING
| 800
|
[
"greedy",
"math"
] |
A. Domino piling
|
2
|
256
|
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
|
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
|
Output one number — the maximal number of dominoes, which can be placed.
|
[
"2 4\n",
"3 3\n"
] |
[
"4\n",
"4\n"
] |
none
| 500
|
[
{
"input": "2 4",
"output": "4"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "1 5",
"output": "2"
},
{
"input": "1 6",
"output": "3"
},
{
"input": "1 15",
"output": "7"
},
{
"input": "1 16",
"output": "8"
},
{
"input": "2 5",
"output": "5"
},
{
"input": "2 6",
"output": "6"
},
{
"input": "2 7",
"output": "7"
},
{
"input": "2 14",
"output": "14"
},
{
"input": "2 15",
"output": "15"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 16",
"output": "16"
},
{
"input": "3 5",
"output": "7"
},
{
"input": "3 6",
"output": "9"
},
{
"input": "3 10",
"output": "15"
},
{
"input": "3 14",
"output": "21"
},
{
"input": "3 15",
"output": "22"
},
{
"input": "3 16",
"output": "24"
},
{
"input": "5 7",
"output": "17"
},
{
"input": "16 16",
"output": "128"
},
{
"input": "15 16",
"output": "120"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "15 15",
"output": "112"
},
{
"input": "14 16",
"output": "112"
},
{
"input": "11 13",
"output": "71"
},
{
"input": "5 16",
"output": "40"
},
{
"input": "8 15",
"output": "60"
},
{
"input": "2 2",
"output": "2"
},
{
"input": "3 4",
"output": "6"
},
{
"input": "4 4",
"output": "8"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "14 15",
"output": "105"
}
] | 1,661,116,008
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 35
| 124
| 0
|
m, n = map(int, input().split())
if m % 2 == 0 and n % 2 == 0:
print((m//2)*n)
elif m % 2 == 0 and n % 2 != 0:
print((m//2)*n)
elif m % 2 != 0 and n % 2 != 0:
print(((m//2)*n)+n//2)
elif m % 2 != 0 and n % 2 == 0:
print(((m//2)*n)+n//2)
|
Title: Domino piling
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
Input Specification:
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
Output Specification:
Output one number — the maximal number of dominoes, which can be placed.
Demo Input:
['2 4\n', '3 3\n']
Demo Output:
['4\n', '4\n']
Note:
none
|
```python
m, n = map(int, input().split())
if m % 2 == 0 and n % 2 == 0:
print((m//2)*n)
elif m % 2 == 0 and n % 2 != 0:
print((m//2)*n)
elif m % 2 != 0 and n % 2 != 0:
print(((m//2)*n)+n//2)
elif m % 2 != 0 and n % 2 == 0:
print(((m//2)*n)+n//2)
```
| 3.969
|
677
|
A
|
Vanya and Fence
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
Vanya and his friends are walking along the fence of height *h* and they do not want the guard to notice them. In order to achieve this the height of each of the friends should not exceed *h*. If the height of some person is greater than *h* he can bend down and then he surely won't be noticed by the guard. The height of the *i*-th person is equal to *a**i*.
Consider the width of the person walking as usual to be equal to 1, while the width of the bent person is equal to 2. Friends want to talk to each other while walking, so they would like to walk in a single row. What is the minimum width of the road, such that friends can walk in a row and remain unattended by the guard?
|
The first line of the input contains two integers *n* and *h* (1<=≤<=*n*<=≤<=1000, 1<=≤<=*h*<=≤<=1000) — the number of friends and the height of the fence, respectively.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=2*h*), the *i*-th of them is equal to the height of the *i*-th person.
|
Print a single integer — the minimum possible valid width of the road.
|
[
"3 7\n4 5 14\n",
"6 1\n1 1 1 1 1 1\n",
"6 5\n7 6 8 9 10 5\n"
] |
[
"4\n",
"6\n",
"11\n"
] |
In the first sample, only person number 3 must bend down, so the required width is equal to 1 + 1 + 2 = 4.
In the second sample, all friends are short enough and no one has to bend, so the width 1 + 1 + 1 + 1 + 1 + 1 = 6 is enough.
In the third sample, all the persons have to bend, except the last one. The required minimum width of the road is equal to 2 + 2 + 2 + 2 + 2 + 1 = 11.
| 500
|
[
{
"input": "3 7\n4 5 14",
"output": "4"
},
{
"input": "6 1\n1 1 1 1 1 1",
"output": "6"
},
{
"input": "6 5\n7 6 8 9 10 5",
"output": "11"
},
{
"input": "10 420\n214 614 297 675 82 740 174 23 255 15",
"output": "13"
},
{
"input": "10 561\n657 23 1096 487 785 66 481 554 1000 821",
"output": "15"
},
{
"input": "100 342\n478 143 359 336 162 333 385 515 117 496 310 538 469 539 258 676 466 677 1 296 150 560 26 213 627 221 255 126 617 174 279 178 24 435 70 145 619 46 669 566 300 67 576 251 58 176 441 564 569 194 24 669 73 262 457 259 619 78 400 579 222 626 269 47 80 315 160 194 455 186 315 424 197 246 683 220 68 682 83 233 290 664 273 598 362 305 674 614 321 575 362 120 14 534 62 436 294 351 485 396",
"output": "144"
},
{
"input": "100 290\n244 49 276 77 449 261 468 458 201 424 9 131 300 88 432 394 104 77 13 289 435 259 111 453 168 394 156 412 351 576 178 530 81 271 228 564 125 328 42 372 205 61 180 471 33 360 567 331 222 318 241 117 529 169 188 484 202 202 299 268 246 343 44 364 333 494 59 236 84 485 50 8 428 8 571 227 205 310 210 9 324 472 368 490 114 84 296 305 411 351 569 393 283 120 510 171 232 151 134 366",
"output": "145"
},
{
"input": "1 1\n1",
"output": "1"
},
{
"input": "1 1\n2",
"output": "2"
},
{
"input": "46 71\n30 26 56 138 123 77 60 122 73 45 79 10 130 3 14 1 38 46 128 50 82 16 32 68 28 98 62 106 2 49 131 11 114 39 139 70 40 50 45 137 33 30 35 136 135 19",
"output": "63"
},
{
"input": "20 723\n212 602 293 591 754 91 1135 640 80 495 845 928 1399 498 926 1431 1226 869 814 1386",
"output": "31"
},
{
"input": "48 864\n843 1020 751 1694 18 1429 1395 1174 272 1158 1628 1233 1710 441 765 561 778 748 1501 1200 563 1263 1398 1687 1518 1640 1591 839 500 466 1603 1587 1201 1209 432 868 1159 639 649 628 9 91 1036 147 896 1557 941 518",
"output": "75"
},
{
"input": "26 708\n549 241 821 734 945 1161 566 1268 216 30 1142 730 529 1014 255 168 796 1148 89 113 1328 286 743 871 1259 1397",
"output": "41"
},
{
"input": "75 940\n1620 1745 1599 441 64 1466 1496 1239 1716 1475 778 106 1136 1212 1261 444 781 257 1071 747 626 232 609 1544 682 1326 469 1361 1460 1450 1207 1319 922 625 1737 1057 1698 592 692 80 1016 541 1254 201 682 1007 847 206 1066 809 259 109 240 1611 219 1455 1326 1377 1827 786 42 1002 1382 1592 543 1866 1198 334 1524 1760 340 1566 955 257 1118",
"output": "116"
}
] | 1,697,729,410
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 0
| 30
| 0
|
n, h = [int(h) for h in input().split()]
x_values = []
for i in range(n):
x = list(map(int, input().split()))
x_values.extend(x)
a = 0
for i in range(len(x_values)):
if x_values[i] > h:
a = a + 1
print(a + n)
|
Title: Vanya and Fence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vanya and his friends are walking along the fence of height *h* and they do not want the guard to notice them. In order to achieve this the height of each of the friends should not exceed *h*. If the height of some person is greater than *h* he can bend down and then he surely won't be noticed by the guard. The height of the *i*-th person is equal to *a**i*.
Consider the width of the person walking as usual to be equal to 1, while the width of the bent person is equal to 2. Friends want to talk to each other while walking, so they would like to walk in a single row. What is the minimum width of the road, such that friends can walk in a row and remain unattended by the guard?
Input Specification:
The first line of the input contains two integers *n* and *h* (1<=≤<=*n*<=≤<=1000, 1<=≤<=*h*<=≤<=1000) — the number of friends and the height of the fence, respectively.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=2*h*), the *i*-th of them is equal to the height of the *i*-th person.
Output Specification:
Print a single integer — the minimum possible valid width of the road.
Demo Input:
['3 7\n4 5 14\n', '6 1\n1 1 1 1 1 1\n', '6 5\n7 6 8 9 10 5\n']
Demo Output:
['4\n', '6\n', '11\n']
Note:
In the first sample, only person number 3 must bend down, so the required width is equal to 1 + 1 + 2 = 4.
In the second sample, all friends are short enough and no one has to bend, so the width 1 + 1 + 1 + 1 + 1 + 1 = 6 is enough.
In the third sample, all the persons have to bend, except the last one. The required minimum width of the road is equal to 2 + 2 + 2 + 2 + 2 + 1 = 11.
|
```python
n, h = [int(h) for h in input().split()]
x_values = []
for i in range(n):
x = list(map(int, input().split()))
x_values.extend(x)
a = 0
for i in range(len(x_values)):
if x_values[i] > h:
a = a + 1
print(a + n)
```
| -1
|
|
483
|
A
|
Counterexample
|
PROGRAMMING
| 1,100
|
[
"brute force",
"implementation",
"math",
"number theory"
] | null | null |
Your friend has recently learned about coprime numbers. A pair of numbers {*a*,<=*b*} is called coprime if the maximum number that divides both *a* and *b* is equal to one.
Your friend often comes up with different statements. He has recently supposed that if the pair (*a*,<=*b*) is coprime and the pair (*b*,<=*c*) is coprime, then the pair (*a*,<=*c*) is coprime.
You want to find a counterexample for your friend's statement. Therefore, your task is to find three distinct numbers (*a*,<=*b*,<=*c*), for which the statement is false, and the numbers meet the condition *l*<=≤<=*a*<=<<=*b*<=<<=*c*<=≤<=*r*.
More specifically, you need to find three numbers (*a*,<=*b*,<=*c*), such that *l*<=≤<=*a*<=<<=*b*<=<<=*c*<=≤<=*r*, pairs (*a*,<=*b*) and (*b*,<=*c*) are coprime, and pair (*a*,<=*c*) is not coprime.
|
The single line contains two positive space-separated integers *l*, *r* (1<=≤<=*l*<=≤<=*r*<=≤<=1018; *r*<=-<=*l*<=≤<=50).
|
Print three positive space-separated integers *a*, *b*, *c* — three distinct numbers (*a*,<=*b*,<=*c*) that form the counterexample. If there are several solutions, you are allowed to print any of them. The numbers must be printed in ascending order.
If the counterexample does not exist, print the single number -1.
|
[
"2 4\n",
"10 11\n",
"900000000000000009 900000000000000029\n"
] |
[
"2 3 4\n",
"-1\n",
"900000000000000009 900000000000000010 900000000000000021\n"
] |
In the first sample pair (2, 4) is not coprime and pairs (2, 3) and (3, 4) are.
In the second sample you cannot form a group of three distinct integers, so the answer is -1.
In the third sample it is easy to see that numbers 900000000000000009 and 900000000000000021 are divisible by three.
| 500
|
[
{
"input": "2 4",
"output": "2 3 4"
},
{
"input": "10 11",
"output": "-1"
},
{
"input": "900000000000000009 900000000000000029",
"output": "900000000000000009 900000000000000010 900000000000000021"
},
{
"input": "640097987171091791 640097987171091835",
"output": "640097987171091792 640097987171091793 640097987171091794"
},
{
"input": "19534350415104721 19534350415104725",
"output": "19534350415104722 19534350415104723 19534350415104724"
},
{
"input": "933700505788726243 933700505788726280",
"output": "933700505788726244 933700505788726245 933700505788726246"
},
{
"input": "1 3",
"output": "-1"
},
{
"input": "1 4",
"output": "2 3 4"
},
{
"input": "1 1",
"output": "-1"
},
{
"input": "266540997167959130 266540997167959164",
"output": "266540997167959130 266540997167959131 266540997167959132"
},
{
"input": "267367244641009850 267367244641009899",
"output": "267367244641009850 267367244641009851 267367244641009852"
},
{
"input": "268193483524125978 268193483524125993",
"output": "268193483524125978 268193483524125979 268193483524125980"
},
{
"input": "269019726702209402 269019726702209432",
"output": "269019726702209402 269019726702209403 269019726702209404"
},
{
"input": "269845965585325530 269845965585325576",
"output": "269845965585325530 269845965585325531 269845965585325532"
},
{
"input": "270672213058376250 270672213058376260",
"output": "270672213058376250 270672213058376251 270672213058376252"
},
{
"input": "271498451941492378 271498451941492378",
"output": "-1"
},
{
"input": "272324690824608506 272324690824608523",
"output": "272324690824608506 272324690824608507 272324690824608508"
},
{
"input": "273150934002691930 273150934002691962",
"output": "273150934002691930 273150934002691931 273150934002691932"
},
{
"input": "996517375802030516 996517375802030524",
"output": "996517375802030516 996517375802030517 996517375802030518"
},
{
"input": "997343614685146644 997343614685146694",
"output": "997343614685146644 997343614685146645 997343614685146646"
},
{
"input": "998169857863230068 998169857863230083",
"output": "998169857863230068 998169857863230069 998169857863230070"
},
{
"input": "998996101041313492 998996101041313522",
"output": "998996101041313492 998996101041313493 998996101041313494"
},
{
"input": "999822344219396916 999822344219396961",
"output": "999822344219396916 999822344219396917 999822344219396918"
},
{
"input": "648583102513043 648583102513053",
"output": "648583102513044 648583102513045 648583102513046"
},
{
"input": "266540997167959130 266540997167959131",
"output": "-1"
},
{
"input": "267367244641009850 267367244641009850",
"output": "-1"
},
{
"input": "268193483524125978 268193483524125979",
"output": "-1"
},
{
"input": "269019726702209402 269019726702209402",
"output": "-1"
},
{
"input": "269845965585325530 269845965585325530",
"output": "-1"
},
{
"input": "270672213058376250 270672213058376254",
"output": "270672213058376250 270672213058376251 270672213058376252"
},
{
"input": "271498451941492378 271498451941492379",
"output": "-1"
},
{
"input": "272324690824608506 272324690824608508",
"output": "272324690824608506 272324690824608507 272324690824608508"
},
{
"input": "273150934002691930 273150934002691931",
"output": "-1"
},
{
"input": "996517375802030516 996517375802030518",
"output": "996517375802030516 996517375802030517 996517375802030518"
},
{
"input": "997343614685146644 997343614685146644",
"output": "-1"
},
{
"input": "2147483647 2147483649",
"output": "-1"
},
{
"input": "3 5",
"output": "-1"
},
{
"input": "1 7",
"output": "2 3 4"
},
{
"input": "9 12",
"output": "9 11 12"
},
{
"input": "4 4",
"output": "-1"
},
{
"input": "11 13",
"output": "-1"
},
{
"input": "2 2",
"output": "-1"
}
] | 1,560,356,785
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 6
| 93
| 0
|
n = list(map(int,input().split()))
l,r = n[0],n[1]
b = r-l
if b == 1:
print(-1)
elif b == 2 and l == 1:
print(1, 2, 3)
elif b == 2:
if l%2 == 0 :
print(l, l+1, l+2)
else:
print(-1)
else:
if l%2 == 0 :
print(l, l+1, l+2)
else:
print(l+1, l+2, l+3)
|
Title: Counterexample
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Your friend has recently learned about coprime numbers. A pair of numbers {*a*,<=*b*} is called coprime if the maximum number that divides both *a* and *b* is equal to one.
Your friend often comes up with different statements. He has recently supposed that if the pair (*a*,<=*b*) is coprime and the pair (*b*,<=*c*) is coprime, then the pair (*a*,<=*c*) is coprime.
You want to find a counterexample for your friend's statement. Therefore, your task is to find three distinct numbers (*a*,<=*b*,<=*c*), for which the statement is false, and the numbers meet the condition *l*<=≤<=*a*<=<<=*b*<=<<=*c*<=≤<=*r*.
More specifically, you need to find three numbers (*a*,<=*b*,<=*c*), such that *l*<=≤<=*a*<=<<=*b*<=<<=*c*<=≤<=*r*, pairs (*a*,<=*b*) and (*b*,<=*c*) are coprime, and pair (*a*,<=*c*) is not coprime.
Input Specification:
The single line contains two positive space-separated integers *l*, *r* (1<=≤<=*l*<=≤<=*r*<=≤<=1018; *r*<=-<=*l*<=≤<=50).
Output Specification:
Print three positive space-separated integers *a*, *b*, *c* — three distinct numbers (*a*,<=*b*,<=*c*) that form the counterexample. If there are several solutions, you are allowed to print any of them. The numbers must be printed in ascending order.
If the counterexample does not exist, print the single number -1.
Demo Input:
['2 4\n', '10 11\n', '900000000000000009 900000000000000029\n']
Demo Output:
['2 3 4\n', '-1\n', '900000000000000009 900000000000000010 900000000000000021\n']
Note:
In the first sample pair (2, 4) is not coprime and pairs (2, 3) and (3, 4) are.
In the second sample you cannot form a group of three distinct integers, so the answer is -1.
In the third sample it is easy to see that numbers 900000000000000009 and 900000000000000021 are divisible by three.
|
```python
n = list(map(int,input().split()))
l,r = n[0],n[1]
b = r-l
if b == 1:
print(-1)
elif b == 2 and l == 1:
print(1, 2, 3)
elif b == 2:
if l%2 == 0 :
print(l, l+1, l+2)
else:
print(-1)
else:
if l%2 == 0 :
print(l, l+1, l+2)
else:
print(l+1, l+2, l+3)
```
| 0
|
|
621
|
B
|
Wet Shark and Bishops
|
PROGRAMMING
| 1,300
|
[
"combinatorics",
"implementation"
] | null | null |
Today, Wet Shark is given *n* bishops on a 1000 by 1000 grid. Both rows and columns of the grid are numbered from 1 to 1000. Rows are numbered from top to bottom, while columns are numbered from left to right.
Wet Shark thinks that two bishops attack each other if they share the same diagonal. Note, that this is the only criteria, so two bishops may attack each other (according to Wet Shark) even if there is another bishop located between them. Now Wet Shark wants to count the number of pairs of bishops that attack each other.
|
The first line of the input contains *n* (1<=≤<=*n*<=≤<=200<=000) — the number of bishops.
Each of next *n* lines contains two space separated integers *x**i* and *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=1000) — the number of row and the number of column where *i*-th bishop is positioned. It's guaranteed that no two bishops share the same position.
|
Output one integer — the number of pairs of bishops which attack each other.
|
[
"5\n1 1\n1 5\n3 3\n5 1\n5 5\n",
"3\n1 1\n2 3\n3 5\n"
] |
[
"6\n",
"0\n"
] |
In the first sample following pairs of bishops attack each other: (1, 3), (1, 5), (2, 3), (2, 4), (3, 4) and (3, 5). Pairs (1, 2), (1, 4), (2, 5) and (4, 5) do not attack each other because they do not share the same diagonal.
| 1,000
|
[
{
"input": "5\n1 1\n1 5\n3 3\n5 1\n5 5",
"output": "6"
},
{
"input": "3\n1 1\n2 3\n3 5",
"output": "0"
},
{
"input": "3\n859 96\n634 248\n808 72",
"output": "0"
},
{
"input": "3\n987 237\n891 429\n358 145",
"output": "0"
},
{
"input": "3\n411 81\n149 907\n611 114",
"output": "0"
},
{
"input": "3\n539 221\n895 89\n673 890",
"output": "0"
},
{
"input": "3\n259 770\n448 54\n926 667",
"output": "0"
},
{
"input": "3\n387 422\n898 532\n988 636",
"output": "0"
},
{
"input": "10\n515 563\n451 713\n537 709\n343 819\n855 779\n457 60\n650 359\n631 42\n788 639\n710 709",
"output": "0"
},
{
"input": "10\n939 407\n197 191\n791 486\n30 807\n11 665\n600 100\n445 496\n658 959\n510 389\n729 950",
"output": "0"
},
{
"input": "10\n518 518\n71 971\n121 862\n967 607\n138 754\n513 337\n499 873\n337 387\n647 917\n76 417",
"output": "0"
},
{
"input": "10\n646 171\n816 449\n375 934\n950 299\n702 232\n657 81\n885 306\n660 304\n369 371\n798 657",
"output": "0"
},
{
"input": "10\n70 311\n74 927\n732 711\n126 583\n857 118\n97 928\n975 843\n175 221\n284 929\n816 602",
"output": "0"
},
{
"input": "2\n1 1\n1 1000",
"output": "0"
},
{
"input": "2\n1 1\n1000 1",
"output": "0"
},
{
"input": "2\n1 1\n1000 1000",
"output": "1"
},
{
"input": "2\n1000 1\n1 1000",
"output": "1"
},
{
"input": "2\n1000 1\n1000 1000",
"output": "0"
},
{
"input": "2\n1 1000\n1000 1000",
"output": "0"
},
{
"input": "1\n6 3",
"output": "0"
},
{
"input": "1\n1 1",
"output": "0"
},
{
"input": "1\n1 1000",
"output": "0"
},
{
"input": "1\n1000 1",
"output": "0"
},
{
"input": "1\n1000 1000",
"output": "0"
},
{
"input": "2\n1 1\n3 1",
"output": "0"
},
{
"input": "2\n999 1\n1000 2",
"output": "1"
},
{
"input": "5\n1 1000\n2 999\n3 998\n4 997\n5 996",
"output": "10"
}
] | 1,662,806,234
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 68
| 1,045
| 5,324,800
|
n=1000
bhisop_board = [[0 for i in range(n)] for j in range(n)]
t = int(input())
for i in range(t):
x,y = map(int,input().split())
bhisop_board[x-1][y-1] = 1
total_attacks=0
for i in range(1,n):
curr_diag_bhisops_count=0
for j in range(i+1):
if bhisop_board[i-j][j]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for j in range(1,n):
curr_diag_bhisops_count=0
for i in range(n-j):
if bhisop_board[n-1-i][j+i]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for i in range(n-1,0,-1):
curr_diag_bhisops_count=0
for j in range(n-i):
if bhisop_board[i+j][j]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for j in range(n):
curr_diag_bhisops_count=0
for i in range(n-j):
if bhisop_board[i][j+i]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
print(total_attacks)
|
Title: Wet Shark and Bishops
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Today, Wet Shark is given *n* bishops on a 1000 by 1000 grid. Both rows and columns of the grid are numbered from 1 to 1000. Rows are numbered from top to bottom, while columns are numbered from left to right.
Wet Shark thinks that two bishops attack each other if they share the same diagonal. Note, that this is the only criteria, so two bishops may attack each other (according to Wet Shark) even if there is another bishop located between them. Now Wet Shark wants to count the number of pairs of bishops that attack each other.
Input Specification:
The first line of the input contains *n* (1<=≤<=*n*<=≤<=200<=000) — the number of bishops.
Each of next *n* lines contains two space separated integers *x**i* and *y**i* (1<=≤<=*x**i*,<=*y**i*<=≤<=1000) — the number of row and the number of column where *i*-th bishop is positioned. It's guaranteed that no two bishops share the same position.
Output Specification:
Output one integer — the number of pairs of bishops which attack each other.
Demo Input:
['5\n1 1\n1 5\n3 3\n5 1\n5 5\n', '3\n1 1\n2 3\n3 5\n']
Demo Output:
['6\n', '0\n']
Note:
In the first sample following pairs of bishops attack each other: (1, 3), (1, 5), (2, 3), (2, 4), (3, 4) and (3, 5). Pairs (1, 2), (1, 4), (2, 5) and (4, 5) do not attack each other because they do not share the same diagonal.
|
```python
n=1000
bhisop_board = [[0 for i in range(n)] for j in range(n)]
t = int(input())
for i in range(t):
x,y = map(int,input().split())
bhisop_board[x-1][y-1] = 1
total_attacks=0
for i in range(1,n):
curr_diag_bhisops_count=0
for j in range(i+1):
if bhisop_board[i-j][j]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for j in range(1,n):
curr_diag_bhisops_count=0
for i in range(n-j):
if bhisop_board[n-1-i][j+i]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for i in range(n-1,0,-1):
curr_diag_bhisops_count=0
for j in range(n-i):
if bhisop_board[i+j][j]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
for j in range(n):
curr_diag_bhisops_count=0
for i in range(n-j):
if bhisop_board[i][j+i]==1:
curr_diag_bhisops_count+=1
total_attacks+=curr_diag_bhisops_count*(curr_diag_bhisops_count-1)//2
print(total_attacks)
```
| 3
|
|
937
|
A
|
Olympiad
|
PROGRAMMING
| 800
|
[
"implementation",
"sortings"
] | null | null |
The recent All-Berland Olympiad in Informatics featured *n* participants with each scoring a certain amount of points.
As the head of the programming committee, you are to determine the set of participants to be awarded with diplomas with respect to the following criteria:
- At least one participant should get a diploma. - None of those with score equal to zero should get awarded. - When someone is awarded, all participants with score not less than his score should also be awarded.
Determine the number of ways to choose a subset of participants that will receive the diplomas.
|
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=100) — the number of participants.
The next line contains a sequence of *n* integers *a*1,<=*a*2,<=...,<=*a**n* (0<=≤<=*a**i*<=≤<=600) — participants' scores.
It's guaranteed that at least one participant has non-zero score.
|
Print a single integer — the desired number of ways.
|
[
"4\n1 3 3 2\n",
"3\n1 1 1\n",
"4\n42 0 0 42\n"
] |
[
"3\n",
"1\n",
"1\n"
] |
There are three ways to choose a subset in sample case one.
1. Only participants with 3 points will get diplomas. 1. Participants with 2 or 3 points will get diplomas. 1. Everyone will get a diploma!
The only option in sample case two is to award everyone.
Note that in sample case three participants with zero scores cannot get anything.
| 500
|
[
{
"input": "4\n1 3 3 2",
"output": "3"
},
{
"input": "3\n1 1 1",
"output": "1"
},
{
"input": "4\n42 0 0 42",
"output": "1"
},
{
"input": "10\n1 0 1 0 1 0 0 0 0 1",
"output": "1"
},
{
"input": "10\n572 471 540 163 50 30 561 510 43 200",
"output": "10"
},
{
"input": "100\n122 575 426 445 172 81 247 429 97 202 175 325 382 384 417 356 132 502 328 537 57 339 518 211 479 306 140 168 268 16 140 263 593 249 391 310 555 468 231 180 157 18 334 328 276 155 21 280 322 545 111 267 467 274 291 304 235 34 365 180 21 95 501 552 325 331 302 353 296 22 289 399 7 466 32 302 568 333 75 192 284 10 94 128 154 512 9 480 243 521 551 492 420 197 207 125 367 117 438 600",
"output": "94"
},
{
"input": "100\n600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600 600",
"output": "1"
},
{
"input": "78\n5 4 13 2 5 6 2 10 10 1 2 6 7 9 6 3 5 7 1 10 2 2 7 0 2 11 11 3 1 13 3 10 6 2 0 3 0 5 0 1 4 11 1 1 7 0 12 7 5 12 0 2 12 9 8 3 4 3 4 11 4 10 2 3 10 12 5 6 1 11 2 0 8 7 9 1 3 12",
"output": "13"
},
{
"input": "34\n220 387 408 343 184 447 197 307 337 414 251 319 426 322 347 242 208 412 188 185 241 235 216 259 331 372 322 284 444 384 214 297 389 391",
"output": "33"
},
{
"input": "100\n1 2 1 0 3 0 2 0 0 1 2 0 1 3 0 3 3 1 3 0 0 2 1 2 2 1 3 3 3 3 3 2 0 0 2 1 2 3 2 3 0 1 1 3 3 2 0 3 1 0 2 2 2 1 2 3 2 1 0 3 0 2 0 3 0 2 1 0 3 1 0 2 2 1 3 1 3 0 2 3 3 1 1 3 1 3 0 3 2 0 2 3 3 0 2 0 2 0 1 3",
"output": "3"
},
{
"input": "100\n572 471 540 163 50 30 561 510 43 200 213 387 500 424 113 487 357 333 294 337 435 202 447 494 485 465 161 344 470 559 104 356 393 207 224 213 511 514 60 386 149 216 392 229 429 173 165 401 395 150 127 579 344 390 529 296 225 425 318 79 465 447 177 110 367 212 459 270 41 500 277 567 125 436 178 9 214 342 203 112 144 24 79 155 495 556 40 549 463 281 241 316 2 246 1 396 510 293 332 55",
"output": "93"
},
{
"input": "99\n5 4 13 2 5 6 2 10 10 1 2 6 7 9 6 3 5 7 1 10 2 2 7 0 2 11 11 3 1 13 3 10 6 2 0 3 0 5 0 1 4 11 1 1 7 0 12 7 5 12 0 2 12 9 8 3 4 3 4 11 4 10 2 3 10 12 5 6 1 11 2 0 8 7 9 1 3 12 2 3 9 3 7 13 7 13 0 11 8 12 2 5 9 4 0 6 6 2 13",
"output": "13"
},
{
"input": "99\n1 0 1 0 1 0 0 0 0 1 0 0 1 1 0 1 1 1 1 0 0 0 1 0 0 1 1 1 1 1 1 0 0 0 0 1 0 1 0 1 0 1 1 1 1 0 0 1 1 0 0 0 0 1 0 1 0 1 0 1 0 0 0 1 0 0 1 0 1 1 0 0 0 1 1 1 1 0 0 1 1 1 1 1 1 1 0 1 0 0 0 1 1 0 0 0 0 0 1",
"output": "1"
},
{
"input": "99\n21 74 25 44 71 80 46 28 96 1 74 24 81 83 16 55 31 1 27 36 56 38 17 10 78 5 39 67 67 15 39 62 92 48 90 9 54 67 30 79 56 17 33 27 75 54 20 79 21 44 10 66 66 73 90 3 34 33 64 79 20 94 0 51 24 30 1 52 95 21 88 98 6 65 31 1 67 32 74 91 83 9 93 27 53 11 8 79 42 20 50 91 19 96 6 24 66 16 37",
"output": "61"
},
{
"input": "2\n0 1",
"output": "1"
},
{
"input": "2\n0 600",
"output": "1"
},
{
"input": "4\n1 1 1 2",
"output": "2"
},
{
"input": "4\n0 0 1 2",
"output": "2"
},
{
"input": "1\n5",
"output": "1"
},
{
"input": "2\n0 5",
"output": "1"
},
{
"input": "5\n1 0 0 1 2",
"output": "2"
}
] | 1,544,209,478
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 21
| 109
| 0
|
def olympiada(lst):
a = list()
if 0 not in lst:
return len(set(lst))
for elem in lst:
if elem != 0:
a.append(elem)
return len(set(a))
n = int(input())
b = [int(i) for i in input().split()]
print(olympiada(b))
|
Title: Olympiad
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The recent All-Berland Olympiad in Informatics featured *n* participants with each scoring a certain amount of points.
As the head of the programming committee, you are to determine the set of participants to be awarded with diplomas with respect to the following criteria:
- At least one participant should get a diploma. - None of those with score equal to zero should get awarded. - When someone is awarded, all participants with score not less than his score should also be awarded.
Determine the number of ways to choose a subset of participants that will receive the diplomas.
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=100) — the number of participants.
The next line contains a sequence of *n* integers *a*1,<=*a*2,<=...,<=*a**n* (0<=≤<=*a**i*<=≤<=600) — participants' scores.
It's guaranteed that at least one participant has non-zero score.
Output Specification:
Print a single integer — the desired number of ways.
Demo Input:
['4\n1 3 3 2\n', '3\n1 1 1\n', '4\n42 0 0 42\n']
Demo Output:
['3\n', '1\n', '1\n']
Note:
There are three ways to choose a subset in sample case one.
1. Only participants with 3 points will get diplomas. 1. Participants with 2 or 3 points will get diplomas. 1. Everyone will get a diploma!
The only option in sample case two is to award everyone.
Note that in sample case three participants with zero scores cannot get anything.
|
```python
def olympiada(lst):
a = list()
if 0 not in lst:
return len(set(lst))
for elem in lst:
if elem != 0:
a.append(elem)
return len(set(a))
n = int(input())
b = [int(i) for i in input().split()]
print(olympiada(b))
```
| 3
|
|
879
|
B
|
Table Tennis
|
PROGRAMMING
| 1,200
|
[
"data structures",
"implementation"
] | null | null |
*n* people are standing in a line to play table tennis. At first, the first two players in the line play a game. Then the loser goes to the end of the line, and the winner plays with the next person from the line, and so on. They play until someone wins *k* games in a row. This player becomes the winner.
For each of the participants, you know the power to play table tennis, and for all players these values are different. In a game the player with greater power always wins. Determine who will be the winner.
|
The first line contains two integers: *n* and *k* (2<=≤<=*n*<=≤<=500, 2<=≤<=*k*<=≤<=1012) — the number of people and the number of wins.
The second line contains *n* integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — powers of the player. It's guaranteed that this line contains a valid permutation, i.e. all *a**i* are distinct.
|
Output a single integer — power of the winner.
|
[
"2 2\n1 2\n",
"4 2\n3 1 2 4\n",
"6 2\n6 5 3 1 2 4\n",
"2 10000000000\n2 1\n"
] |
[
"2 ",
"3 ",
"6 ",
"2\n"
] |
Games in the second sample:
3 plays with 1. 3 wins. 1 goes to the end of the line.
3 plays with 2. 3 wins. He wins twice in a row. He becomes the winner.
| 1,000
|
[
{
"input": "2 2\n1 2",
"output": "2 "
},
{
"input": "4 2\n3 1 2 4",
"output": "3 "
},
{
"input": "6 2\n6 5 3 1 2 4",
"output": "6 "
},
{
"input": "2 10000000000\n2 1",
"output": "2"
},
{
"input": "4 4\n1 3 4 2",
"output": "4 "
},
{
"input": "2 2147483648\n2 1",
"output": "2"
},
{
"input": "3 2\n1 3 2",
"output": "3 "
},
{
"input": "3 3\n1 2 3",
"output": "3 "
},
{
"input": "5 2\n2 1 3 4 5",
"output": "5 "
},
{
"input": "10 2\n7 10 5 8 9 3 4 6 1 2",
"output": "10 "
},
{
"input": "100 2\n62 70 29 14 12 87 94 78 39 92 84 91 61 49 60 33 69 37 19 82 42 8 45 97 81 43 54 67 1 22 77 58 65 17 18 28 25 57 16 90 40 13 4 21 68 35 15 76 73 93 56 95 79 47 74 75 30 71 66 99 41 24 88 83 5 6 31 96 38 80 27 46 51 53 2 86 32 9 20 100 26 36 63 7 52 55 23 3 50 59 48 89 85 44 34 64 10 72 11 98",
"output": "70 "
},
{
"input": "4 10\n2 1 3 4",
"output": "4"
},
{
"input": "10 2\n1 2 3 4 5 6 7 8 9 10",
"output": "10 "
},
{
"input": "10 2\n10 9 8 7 6 5 4 3 2 1",
"output": "10 "
},
{
"input": "4 1000000000000\n3 4 1 2",
"output": "4"
},
{
"input": "100 10\n19 55 91 50 31 23 60 84 38 1 22 51 27 76 28 98 11 44 61 63 15 93 52 3 66 16 53 36 18 62 35 85 78 37 73 64 87 74 46 26 82 69 49 33 83 89 56 67 71 25 39 94 96 17 21 6 47 68 34 42 57 81 13 10 54 2 48 80 20 77 4 5 59 30 90 95 45 75 8 88 24 41 40 14 97 32 7 9 65 70 100 99 72 58 92 29 79 12 86 43",
"output": "91 "
},
{
"input": "100 50\n2 4 82 12 47 63 52 91 87 45 53 1 17 25 64 50 9 13 22 54 21 30 43 24 38 33 68 11 41 78 99 23 28 18 58 67 79 10 71 56 49 61 26 29 59 20 90 74 5 75 89 8 39 95 72 42 66 98 44 32 88 35 92 3 97 55 65 51 77 27 81 76 84 69 73 85 19 46 62 100 60 37 7 36 57 6 14 83 40 48 16 70 96 15 31 93 80 86 94 34",
"output": "100 "
},
{
"input": "2 1000000000000\n1 2",
"output": "2"
},
{
"input": "5 2\n1 4 3 5 2",
"output": "4 "
},
{
"input": "5 2\n1 3 2 4 5",
"output": "3 "
},
{
"input": "4 1000000000000\n3 1 2 4",
"output": "4"
},
{
"input": "4 2\n1 3 2 4",
"output": "3 "
},
{
"input": "10 3\n8 1 9 2 3 10 4 5 6 7",
"output": "9 "
},
{
"input": "5 2\n2 1 4 3 5",
"output": "4 "
},
{
"input": "3 4294967297\n2 1 3",
"output": "3"
},
{
"input": "4 4294967297\n3 2 1 4",
"output": "4"
},
{
"input": "5 4294967298\n3 2 1 4 5",
"output": "5"
},
{
"input": "10 4\n5 4 7 1 2 9 3 6 8 10",
"output": "9 "
},
{
"input": "11 21474836489\n10 1 2 3 4 5 6 7 8 9 11",
"output": "11"
}
] | 1,572,869,068
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 15
| 2,000
| 0
|
numWins = int(input().split(" ")[1])
numPlayers = input().split(" ")
player = int(numPlayers[0])
numPlayers.pop(0)
wins = 0
checker = int(numPlayers[0])
while wins < numWins:
initPlayer = int(numPlayers[0])
if player > initPlayer:
wins+=1
if wins == numWins:
print(player)
break
numPlayers.pop(0)
numPlayers.append(initPlayer)
if numPlayers[0] == checker:
print(player)
break
else:
wins = 1
loser = player
player = initPlayer
check = loser
numPlayers.pop(0)
numPlayers.append(loser)
|
Title: Table Tennis
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
*n* people are standing in a line to play table tennis. At first, the first two players in the line play a game. Then the loser goes to the end of the line, and the winner plays with the next person from the line, and so on. They play until someone wins *k* games in a row. This player becomes the winner.
For each of the participants, you know the power to play table tennis, and for all players these values are different. In a game the player with greater power always wins. Determine who will be the winner.
Input Specification:
The first line contains two integers: *n* and *k* (2<=≤<=*n*<=≤<=500, 2<=≤<=*k*<=≤<=1012) — the number of people and the number of wins.
The second line contains *n* integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — powers of the player. It's guaranteed that this line contains a valid permutation, i.e. all *a**i* are distinct.
Output Specification:
Output a single integer — power of the winner.
Demo Input:
['2 2\n1 2\n', '4 2\n3 1 2 4\n', '6 2\n6 5 3 1 2 4\n', '2 10000000000\n2 1\n']
Demo Output:
['2 ', '3 ', '6 ', '2\n']
Note:
Games in the second sample:
3 plays with 1. 3 wins. 1 goes to the end of the line.
3 plays with 2. 3 wins. He wins twice in a row. He becomes the winner.
|
```python
numWins = int(input().split(" ")[1])
numPlayers = input().split(" ")
player = int(numPlayers[0])
numPlayers.pop(0)
wins = 0
checker = int(numPlayers[0])
while wins < numWins:
initPlayer = int(numPlayers[0])
if player > initPlayer:
wins+=1
if wins == numWins:
print(player)
break
numPlayers.pop(0)
numPlayers.append(initPlayer)
if numPlayers[0] == checker:
print(player)
break
else:
wins = 1
loser = player
player = initPlayer
check = loser
numPlayers.pop(0)
numPlayers.append(loser)
```
| 0
|
|
807
|
A
|
Is it rated?
|
PROGRAMMING
| 900
|
[
"implementation",
"sortings"
] | null | null |
Is it rated?
Here it is. The Ultimate Question of Competitive Programming, Codeforces, and Everything. And you are here to answer it.
Another Codeforces round has been conducted. No two participants have the same number of points. For each participant, from the top to the bottom of the standings, their rating before and after the round is known.
It's known that if at least one participant's rating has changed, then the round was rated for sure.
It's also known that if the round was rated and a participant with lower rating took a better place in the standings than a participant with higher rating, then at least one round participant's rating has changed.
In this problem, you should not make any other assumptions about the rating system.
Determine if the current round is rated, unrated, or it's impossible to determine whether it is rated of not.
|
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=1000) — the number of round participants.
Each of the next *n* lines contains two integers *a**i* and *b**i* (1<=≤<=*a**i*,<=*b**i*<=≤<=4126) — the rating of the *i*-th participant before and after the round, respectively. The participants are listed in order from the top to the bottom of the standings.
|
If the round is rated for sure, print "rated". If the round is unrated for sure, print "unrated". If it's impossible to determine whether the round is rated or not, print "maybe".
|
[
"6\n3060 3060\n2194 2194\n2876 2903\n2624 2624\n3007 2991\n2884 2884\n",
"4\n1500 1500\n1300 1300\n1200 1200\n1400 1400\n",
"5\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n1699 1699\n"
] |
[
"rated\n",
"unrated\n",
"maybe\n"
] |
In the first example, the ratings of the participants in the third and fifth places have changed, therefore, the round was rated.
In the second example, no one's rating has changed, but the participant in the second place has lower rating than the participant in the fourth place. Therefore, if the round was rated, someone's rating would've changed for sure.
In the third example, no one's rating has changed, and the participants took places in non-increasing order of their rating. Therefore, it's impossible to determine whether the round is rated or not.
| 500
|
[
{
"input": "6\n3060 3060\n2194 2194\n2876 2903\n2624 2624\n3007 2991\n2884 2884",
"output": "rated"
},
{
"input": "4\n1500 1500\n1300 1300\n1200 1200\n1400 1400",
"output": "unrated"
},
{
"input": "5\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n1699 1699",
"output": "maybe"
},
{
"input": "2\n1 1\n1 1",
"output": "maybe"
},
{
"input": "2\n4126 4126\n4126 4126",
"output": "maybe"
},
{
"input": "10\n446 446\n1331 1331\n3594 3594\n1346 1902\n91 91\n3590 3590\n2437 2437\n4007 3871\n2797 699\n1423 1423",
"output": "rated"
},
{
"input": "10\n4078 4078\n2876 2876\n1061 1061\n3721 3721\n143 143\n2992 2992\n3279 3279\n3389 3389\n1702 1702\n1110 1110",
"output": "unrated"
},
{
"input": "10\n4078 4078\n3721 3721\n3389 3389\n3279 3279\n2992 2992\n2876 2876\n1702 1702\n1110 1110\n1061 1061\n143 143",
"output": "maybe"
},
{
"input": "2\n3936 3936\n2967 2967",
"output": "maybe"
},
{
"input": "2\n1 1\n2 2",
"output": "unrated"
},
{
"input": "2\n2 2\n1 1",
"output": "maybe"
},
{
"input": "2\n2 1\n1 2",
"output": "rated"
},
{
"input": "2\n2967 2967\n3936 3936",
"output": "unrated"
},
{
"input": "3\n1200 1200\n1200 1200\n1300 1300",
"output": "unrated"
},
{
"input": "3\n3 3\n2 2\n1 1",
"output": "maybe"
},
{
"input": "3\n1 1\n1 1\n2 2",
"output": "unrated"
},
{
"input": "2\n3 2\n3 2",
"output": "rated"
},
{
"input": "3\n5 5\n4 4\n3 4",
"output": "rated"
},
{
"input": "3\n200 200\n200 200\n300 300",
"output": "unrated"
},
{
"input": "3\n1 1\n2 2\n3 3",
"output": "unrated"
},
{
"input": "5\n3123 3123\n2777 2777\n2246 2246\n2245 2245\n1699 1699",
"output": "maybe"
},
{
"input": "2\n10 10\n8 8",
"output": "maybe"
},
{
"input": "3\n1500 1500\n1500 1500\n1600 1600",
"output": "unrated"
},
{
"input": "3\n1500 1500\n1500 1500\n1700 1700",
"output": "unrated"
},
{
"input": "4\n100 100\n100 100\n70 70\n80 80",
"output": "unrated"
},
{
"input": "2\n1 2\n2 1",
"output": "rated"
},
{
"input": "3\n5 5\n4 3\n3 3",
"output": "rated"
},
{
"input": "3\n1600 1650\n1500 1550\n1400 1450",
"output": "rated"
},
{
"input": "4\n2000 2000\n1500 1500\n1500 1500\n1700 1700",
"output": "unrated"
},
{
"input": "4\n1500 1500\n1400 1400\n1400 1400\n1700 1700",
"output": "unrated"
},
{
"input": "2\n1600 1600\n1400 1400",
"output": "maybe"
},
{
"input": "2\n3 1\n9 8",
"output": "rated"
},
{
"input": "2\n2 1\n1 1",
"output": "rated"
},
{
"input": "4\n4123 4123\n4123 4123\n2670 2670\n3670 3670",
"output": "unrated"
},
{
"input": "2\n2 2\n3 3",
"output": "unrated"
},
{
"input": "2\n10 11\n5 4",
"output": "rated"
},
{
"input": "2\n15 14\n13 12",
"output": "rated"
},
{
"input": "2\n2 1\n2 2",
"output": "rated"
},
{
"input": "3\n2670 2670\n3670 3670\n4106 4106",
"output": "unrated"
},
{
"input": "3\n4 5\n3 3\n2 2",
"output": "rated"
},
{
"input": "2\n10 9\n10 10",
"output": "rated"
},
{
"input": "3\n1011 1011\n1011 999\n2200 2100",
"output": "rated"
},
{
"input": "2\n3 3\n5 5",
"output": "unrated"
},
{
"input": "2\n1500 1500\n3000 2000",
"output": "rated"
},
{
"input": "2\n5 6\n5 5",
"output": "rated"
},
{
"input": "3\n2000 2000\n1500 1501\n500 500",
"output": "rated"
},
{
"input": "2\n2 3\n2 2",
"output": "rated"
},
{
"input": "2\n3 3\n2 2",
"output": "maybe"
},
{
"input": "2\n1 2\n1 1",
"output": "rated"
},
{
"input": "4\n3123 3123\n2777 2777\n2246 2246\n1699 1699",
"output": "maybe"
},
{
"input": "2\n15 14\n14 13",
"output": "rated"
},
{
"input": "4\n3000 3000\n2900 2900\n3000 3000\n2900 2900",
"output": "unrated"
},
{
"input": "6\n30 3060\n24 2194\n26 2903\n24 2624\n37 2991\n24 2884",
"output": "rated"
},
{
"input": "2\n100 99\n100 100",
"output": "rated"
},
{
"input": "4\n2 2\n1 1\n1 1\n2 2",
"output": "unrated"
},
{
"input": "3\n100 101\n100 100\n100 100",
"output": "rated"
},
{
"input": "4\n1000 1001\n900 900\n950 950\n890 890",
"output": "rated"
},
{
"input": "2\n2 3\n1 1",
"output": "rated"
},
{
"input": "2\n2 2\n1 1",
"output": "maybe"
},
{
"input": "2\n3 2\n2 2",
"output": "rated"
},
{
"input": "2\n3 2\n3 3",
"output": "rated"
},
{
"input": "2\n1 1\n2 2",
"output": "unrated"
},
{
"input": "3\n3 2\n3 3\n3 3",
"output": "rated"
},
{
"input": "4\n1500 1501\n1300 1300\n1200 1200\n1400 1400",
"output": "rated"
},
{
"input": "3\n1000 1000\n500 500\n400 300",
"output": "rated"
},
{
"input": "5\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n3000 3000",
"output": "unrated"
},
{
"input": "2\n1 1\n2 3",
"output": "rated"
},
{
"input": "2\n6 2\n6 2",
"output": "rated"
},
{
"input": "5\n3123 3123\n1699 1699\n2777 2777\n2246 2246\n2246 2246",
"output": "unrated"
},
{
"input": "2\n1500 1500\n1600 1600",
"output": "unrated"
},
{
"input": "5\n3123 3123\n2777 2777\n2246 2246\n2241 2241\n1699 1699",
"output": "maybe"
},
{
"input": "2\n20 30\n10 5",
"output": "rated"
},
{
"input": "3\n1 1\n2 2\n1 1",
"output": "unrated"
},
{
"input": "2\n1 2\n3 3",
"output": "rated"
},
{
"input": "5\n5 5\n4 4\n3 3\n2 2\n1 1",
"output": "maybe"
},
{
"input": "2\n2 2\n2 1",
"output": "rated"
},
{
"input": "2\n100 100\n90 89",
"output": "rated"
},
{
"input": "2\n1000 900\n2000 2000",
"output": "rated"
},
{
"input": "2\n50 10\n10 50",
"output": "rated"
},
{
"input": "2\n200 200\n100 100",
"output": "maybe"
},
{
"input": "3\n2 2\n2 2\n3 3",
"output": "unrated"
},
{
"input": "3\n1000 1000\n300 300\n100 100",
"output": "maybe"
},
{
"input": "4\n2 2\n2 2\n3 3\n4 4",
"output": "unrated"
},
{
"input": "2\n5 3\n6 3",
"output": "rated"
},
{
"input": "2\n1200 1100\n1200 1000",
"output": "rated"
},
{
"input": "2\n5 5\n4 4",
"output": "maybe"
},
{
"input": "2\n5 5\n3 3",
"output": "maybe"
},
{
"input": "5\n1500 1500\n1300 1300\n1200 1200\n1400 1400\n1100 1100",
"output": "unrated"
},
{
"input": "5\n10 10\n9 9\n8 8\n7 7\n6 6",
"output": "maybe"
},
{
"input": "3\n1000 1000\n300 300\n10 10",
"output": "maybe"
},
{
"input": "5\n6 6\n5 5\n4 4\n3 3\n2 2",
"output": "maybe"
},
{
"input": "2\n3 3\n1 1",
"output": "maybe"
},
{
"input": "4\n2 2\n2 2\n2 2\n3 3",
"output": "unrated"
},
{
"input": "2\n1000 1000\n700 700",
"output": "maybe"
},
{
"input": "2\n4 3\n5 3",
"output": "rated"
},
{
"input": "2\n1000 1000\n1100 1100",
"output": "unrated"
},
{
"input": "4\n5 5\n4 4\n3 3\n2 2",
"output": "maybe"
},
{
"input": "3\n1 1\n2 3\n2 2",
"output": "rated"
},
{
"input": "2\n1 2\n1 3",
"output": "rated"
},
{
"input": "2\n3 3\n1 2",
"output": "rated"
},
{
"input": "4\n1501 1500\n1300 1300\n1200 1200\n1400 1400",
"output": "rated"
},
{
"input": "5\n1 1\n2 2\n3 3\n4 4\n5 5",
"output": "unrated"
},
{
"input": "2\n10 10\n1 2",
"output": "rated"
},
{
"input": "6\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n1699 1699\n1900 1900",
"output": "unrated"
},
{
"input": "6\n3123 3123\n2777 2777\n3000 3000\n2246 2246\n2246 2246\n1699 1699",
"output": "unrated"
},
{
"input": "2\n100 100\n110 110",
"output": "unrated"
},
{
"input": "3\n3 3\n3 3\n4 4",
"output": "unrated"
},
{
"input": "3\n3 3\n3 2\n4 4",
"output": "rated"
},
{
"input": "3\n5 2\n4 4\n3 3",
"output": "rated"
},
{
"input": "4\n4 4\n3 3\n2 2\n1 1",
"output": "maybe"
},
{
"input": "2\n1 1\n3 2",
"output": "rated"
},
{
"input": "5\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n2699 2699",
"output": "unrated"
},
{
"input": "3\n3 3\n3 3\n3 4",
"output": "rated"
},
{
"input": "3\n1 2\n2 2\n3 3",
"output": "rated"
},
{
"input": "3\n1 2\n1 2\n1 2",
"output": "rated"
},
{
"input": "2\n2 1\n2 1",
"output": "rated"
},
{
"input": "2\n1 2\n3 4",
"output": "rated"
},
{
"input": "2\n3 2\n2 3",
"output": "rated"
},
{
"input": "3\n1500 1500\n1600 1600\n1600 1600",
"output": "unrated"
},
{
"input": "3\n1 1\n3 3\n4 4",
"output": "unrated"
},
{
"input": "3\n1 1\n2 2\n2 2",
"output": "unrated"
},
{
"input": "2\n10 12\n8 8",
"output": "rated"
},
{
"input": "5\n1200 1200\n1500 1500\n1500 1500\n1500 1500\n1500 1500",
"output": "unrated"
},
{
"input": "2\n1 2\n2 2",
"output": "rated"
},
{
"input": "3\n1500 1400\n1200 1200\n1100 1100",
"output": "rated"
},
{
"input": "2\n10 12\n10 10",
"output": "rated"
},
{
"input": "3\n1500 1500\n1400 1400\n1300 1300",
"output": "maybe"
},
{
"input": "3\n3 3\n4 4\n5 5",
"output": "unrated"
},
{
"input": "3\n2 6\n3 5\n4 4",
"output": "rated"
},
{
"input": "2\n5 6\n4 6",
"output": "rated"
},
{
"input": "4\n10 10\n10 10\n7 7\n8 8",
"output": "unrated"
},
{
"input": "2\n4 4\n3 3",
"output": "maybe"
}
] | 1,617,878,352
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 150
| 124
| 1,433,600
|
cases = int(input())
arr = []
while cases:
cases -= 1
a, b = map(int, input().split())
if a != b:
print("rated")
exit()
arr.append(a)
sor = sorted(arr, reverse=True)
if arr == sor:
print("maybe")
else:
print("unrated")
|
Title: Is it rated?
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Is it rated?
Here it is. The Ultimate Question of Competitive Programming, Codeforces, and Everything. And you are here to answer it.
Another Codeforces round has been conducted. No two participants have the same number of points. For each participant, from the top to the bottom of the standings, their rating before and after the round is known.
It's known that if at least one participant's rating has changed, then the round was rated for sure.
It's also known that if the round was rated and a participant with lower rating took a better place in the standings than a participant with higher rating, then at least one round participant's rating has changed.
In this problem, you should not make any other assumptions about the rating system.
Determine if the current round is rated, unrated, or it's impossible to determine whether it is rated of not.
Input Specification:
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=1000) — the number of round participants.
Each of the next *n* lines contains two integers *a**i* and *b**i* (1<=≤<=*a**i*,<=*b**i*<=≤<=4126) — the rating of the *i*-th participant before and after the round, respectively. The participants are listed in order from the top to the bottom of the standings.
Output Specification:
If the round is rated for sure, print "rated". If the round is unrated for sure, print "unrated". If it's impossible to determine whether the round is rated or not, print "maybe".
Demo Input:
['6\n3060 3060\n2194 2194\n2876 2903\n2624 2624\n3007 2991\n2884 2884\n', '4\n1500 1500\n1300 1300\n1200 1200\n1400 1400\n', '5\n3123 3123\n2777 2777\n2246 2246\n2246 2246\n1699 1699\n']
Demo Output:
['rated\n', 'unrated\n', 'maybe\n']
Note:
In the first example, the ratings of the participants in the third and fifth places have changed, therefore, the round was rated.
In the second example, no one's rating has changed, but the participant in the second place has lower rating than the participant in the fourth place. Therefore, if the round was rated, someone's rating would've changed for sure.
In the third example, no one's rating has changed, and the participants took places in non-increasing order of their rating. Therefore, it's impossible to determine whether the round is rated or not.
|
```python
cases = int(input())
arr = []
while cases:
cases -= 1
a, b = map(int, input().split())
if a != b:
print("rated")
exit()
arr.append(a)
sor = sorted(arr, reverse=True)
if arr == sor:
print("maybe")
else:
print("unrated")
```
| 3
|
|
768
|
B
|
Code For 1
|
PROGRAMMING
| 1,600
|
[
"constructive algorithms",
"dfs and similar",
"divide and conquer"
] | null | null |
Jon fought bravely to rescue the wildlings who were attacked by the white-walkers at Hardhome. On his arrival, Sam tells him that he wants to go to Oldtown to train at the Citadel to become a maester, so he can return and take the deceased Aemon's place as maester of Castle Black. Jon agrees to Sam's proposal and Sam sets off his journey to the Citadel. However becoming a trainee at the Citadel is not a cakewalk and hence the maesters at the Citadel gave Sam a problem to test his eligibility.
Initially Sam has a list with a single element *n*. Then he has to perform certain operations on this list. In each operation Sam must remove any element *x*, such that *x*<=><=1, from the list and insert at the same position , , sequentially. He must continue with these operations until all the elements in the list are either 0 or 1.
Now the masters want the total number of 1s in the range *l* to *r* (1-indexed). Sam wants to become a maester but unfortunately he cannot solve this problem. Can you help Sam to pass the eligibility test?
|
The first line contains three integers *n*, *l*, *r* (0<=≤<=*n*<=<<=250, 0<=≤<=*r*<=-<=*l*<=≤<=105, *r*<=≥<=1, *l*<=≥<=1) – initial element and the range *l* to *r*.
It is guaranteed that *r* is not greater than the length of the final list.
|
Output the total number of 1s in the range *l* to *r* in the final sequence.
|
[
"7 2 5\n",
"10 3 10\n"
] |
[
"4\n",
"5\n"
] |
Consider first example:
<img align="middle" class="tex-formula" src="https://espresso.codeforces.com/288fbb682a6fa1934a47b763d6851f9d32a06150.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Elements on positions from 2-nd to 5-th in list is [1, 1, 1, 1]. The number of ones is 4.
For the second example:
<img align="middle" class="tex-formula" src="https://espresso.codeforces.com/52e9bc51ef858cacc27fc274c7ba9419d5c1ded9.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Elements on positions from 3-rd to 10-th in list is [1, 1, 1, 0, 1, 0, 1, 0]. The number of ones is 5.
| 1,000
|
[
{
"input": "7 2 5",
"output": "4"
},
{
"input": "10 3 10",
"output": "5"
},
{
"input": "56 18 40",
"output": "20"
},
{
"input": "203 40 124",
"output": "67"
},
{
"input": "903316762502 354723010040 354723105411",
"output": "78355"
},
{
"input": "33534354842198 32529564319236 32529564342569",
"output": "22239"
},
{
"input": "62518534961045 50734311240112 50734311287877",
"output": "42439"
},
{
"input": "95173251245550 106288351347530 106288351372022",
"output": "16565"
},
{
"input": "542 321 956",
"output": "336"
},
{
"input": "3621 237 2637",
"output": "2124"
},
{
"input": "9056 336 896",
"output": "311"
},
{
"input": "36007 368 24490",
"output": "13253"
},
{
"input": "244269 149154 244246",
"output": "88609"
},
{
"input": "880234 669493 757150",
"output": "73585"
},
{
"input": "3740160 1031384 1104236",
"output": "64965"
},
{
"input": "11586121 15337246 15397874",
"output": "41868"
},
{
"input": "38658997 35923164 35985664",
"output": "36004"
},
{
"input": "192308932 207804787 207866400",
"output": "44142"
},
{
"input": "950099012 175922161 176000556",
"output": "69369"
},
{
"input": "2787326787 3799676481 3799680514",
"output": "2618"
},
{
"input": "14417262581 8527979363 8528075536",
"output": "80707"
},
{
"input": "39889373539 7747197212 7747278363",
"output": "47105"
},
{
"input": "251772781087 70597428577 70597479816",
"output": "46933"
},
{
"input": "0 1 1",
"output": "0"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "3 2 3",
"output": "2"
},
{
"input": "14 7 12",
"output": "5"
},
{
"input": "1125899906842623 1 100001",
"output": "100001"
},
{
"input": "1125899906842623 1125899906742623 1125899906842623",
"output": "100001"
},
{
"input": "1000 1 1023",
"output": "1000"
},
{
"input": "281474976710656 17179869184 17179869186",
"output": "1"
},
{
"input": "2 2 2",
"output": "0"
},
{
"input": "3 2 2",
"output": "1"
}
] | 1,679,837,842
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 4
| 545
| 1,843,200
|
import sys
sys.setrecursionlimit(3000)
def process_list(lst):
for i in range(len(lst)):
if lst[i] > 1:
x = lst[i]
lst.pop(i)
lst.insert(i, x // 2)
lst.insert(i + 1, x % 2)
lst.insert(i + 2, x // 2)
return process_list(lst)
return lst
if __name__ == '__main__':
n, l, r = map(int, input().split())
count = 0
lst = process_list([n])
for i in range(l - 1, r):
if lst[i] == 1:
count = count + 1
print(count)
|
Title: Code For 1
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Jon fought bravely to rescue the wildlings who were attacked by the white-walkers at Hardhome. On his arrival, Sam tells him that he wants to go to Oldtown to train at the Citadel to become a maester, so he can return and take the deceased Aemon's place as maester of Castle Black. Jon agrees to Sam's proposal and Sam sets off his journey to the Citadel. However becoming a trainee at the Citadel is not a cakewalk and hence the maesters at the Citadel gave Sam a problem to test his eligibility.
Initially Sam has a list with a single element *n*. Then he has to perform certain operations on this list. In each operation Sam must remove any element *x*, such that *x*<=><=1, from the list and insert at the same position , , sequentially. He must continue with these operations until all the elements in the list are either 0 or 1.
Now the masters want the total number of 1s in the range *l* to *r* (1-indexed). Sam wants to become a maester but unfortunately he cannot solve this problem. Can you help Sam to pass the eligibility test?
Input Specification:
The first line contains three integers *n*, *l*, *r* (0<=≤<=*n*<=<<=250, 0<=≤<=*r*<=-<=*l*<=≤<=105, *r*<=≥<=1, *l*<=≥<=1) – initial element and the range *l* to *r*.
It is guaranteed that *r* is not greater than the length of the final list.
Output Specification:
Output the total number of 1s in the range *l* to *r* in the final sequence.
Demo Input:
['7 2 5\n', '10 3 10\n']
Demo Output:
['4\n', '5\n']
Note:
Consider first example:
<img align="middle" class="tex-formula" src="https://espresso.codeforces.com/288fbb682a6fa1934a47b763d6851f9d32a06150.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Elements on positions from 2-nd to 5-th in list is [1, 1, 1, 1]. The number of ones is 4.
For the second example:
<img align="middle" class="tex-formula" src="https://espresso.codeforces.com/52e9bc51ef858cacc27fc274c7ba9419d5c1ded9.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Elements on positions from 3-rd to 10-th in list is [1, 1, 1, 0, 1, 0, 1, 0]. The number of ones is 5.
|
```python
import sys
sys.setrecursionlimit(3000)
def process_list(lst):
for i in range(len(lst)):
if lst[i] > 1:
x = lst[i]
lst.pop(i)
lst.insert(i, x // 2)
lst.insert(i + 1, x % 2)
lst.insert(i + 2, x // 2)
return process_list(lst)
return lst
if __name__ == '__main__':
n, l, r = map(int, input().split())
count = 0
lst = process_list([n])
for i in range(l - 1, r):
if lst[i] == 1:
count = count + 1
print(count)
```
| -1
|
|
780
|
A
|
Andryusha and Socks
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
Andryusha is an orderly boy and likes to keep things in their place.
Today he faced a problem to put his socks in the wardrobe. He has *n* distinct pairs of socks which are initially in a bag. The pairs are numbered from 1 to *n*. Andryusha wants to put paired socks together and put them in the wardrobe. He takes the socks one by one from the bag, and for each sock he looks whether the pair of this sock has been already took out of the bag, or not. If not (that means the pair of this sock is still in the bag), he puts the current socks on the table in front of him. Otherwise, he puts both socks from the pair to the wardrobe.
Andryusha remembers the order in which he took the socks from the bag. Can you tell him what is the maximum number of socks that were on the table at the same time?
|
The first line contains the single integer *n* (1<=≤<=*n*<=≤<=105) — the number of sock pairs.
The second line contains 2*n* integers *x*1,<=*x*2,<=...,<=*x*2*n* (1<=≤<=*x**i*<=≤<=*n*), which describe the order in which Andryusha took the socks from the bag. More precisely, *x**i* means that the *i*-th sock Andryusha took out was from pair *x**i*.
It is guaranteed that Andryusha took exactly two socks of each pair.
|
Print single integer — the maximum number of socks that were on the table at the same time.
|
[
"1\n1 1\n",
"3\n2 1 1 3 2 3\n"
] |
[
"1\n",
"2\n"
] |
In the first example Andryusha took a sock from the first pair and put it on the table. Then he took the next sock which is from the first pair as well, so he immediately puts both socks to the wardrobe. Thus, at most one sock was on the table at the same time.
In the second example Andryusha behaved as follows:
- Initially the table was empty, he took out a sock from pair 2 and put it on the table. - Sock (2) was on the table. Andryusha took out a sock from pair 1 and put it on the table. - Socks (1, 2) were on the table. Andryusha took out a sock from pair 1, and put this pair into the wardrobe. - Sock (2) was on the table. Andryusha took out a sock from pair 3 and put it on the table. - Socks (2, 3) were on the table. Andryusha took out a sock from pair 2, and put this pair into the wardrobe. - Sock (3) was on the table. Andryusha took out a sock from pair 3 and put this pair into the wardrobe.
| 500
|
[
{
"input": "1\n1 1",
"output": "1"
},
{
"input": "3\n2 1 1 3 2 3",
"output": "2"
},
{
"input": "5\n5 1 3 2 4 3 1 2 4 5",
"output": "5"
},
{
"input": "10\n4 2 6 3 4 8 7 1 1 5 2 10 6 8 3 5 10 9 9 7",
"output": "6"
},
{
"input": "50\n30 47 31 38 37 50 36 43 9 23 2 2 15 31 14 49 9 16 6 44 27 14 5 6 3 47 25 26 1 35 3 15 24 19 8 46 49 41 4 26 40 28 42 11 34 35 46 18 7 28 18 40 19 42 4 41 38 48 50 12 29 39 33 17 25 22 22 21 36 45 27 30 20 7 13 29 39 44 21 8 37 45 34 1 20 10 11 17 33 12 43 13 10 16 48 24 32 5 23 32",
"output": "25"
},
{
"input": "50\n1 1 2 2 3 3 4 4 5 5 6 6 7 7 8 8 9 9 10 10 11 11 12 12 13 13 14 14 15 15 16 16 17 17 18 18 19 19 20 20 21 21 22 22 23 23 24 24 25 25 26 26 27 27 28 28 29 29 30 30 31 31 32 32 33 33 34 34 35 35 36 36 37 37 38 38 39 39 40 40 41 41 42 42 43 43 44 44 45 45 46 46 47 47 48 48 49 49 50 50",
"output": "1"
},
{
"input": "50\n50 50 49 49 48 48 47 47 46 46 45 45 44 44 43 43 42 42 41 41 40 40 39 39 38 38 37 37 36 36 35 35 34 34 33 33 32 32 31 31 30 30 29 29 28 28 27 27 26 26 25 25 24 24 23 23 22 22 21 21 20 20 19 19 18 18 17 17 16 16 15 15 14 14 13 13 12 12 11 11 10 10 9 9 8 8 7 7 6 6 5 5 4 4 3 3 2 2 1 1",
"output": "1"
},
{
"input": "50\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50",
"output": "50"
},
{
"input": "50\n50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1",
"output": "50"
},
{
"input": "10\n2 9 4 1 6 7 10 3 1 5 8 6 2 3 10 7 4 8 5 9",
"output": "9"
}
] | 1,568,135,523
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 3
| 2,000
| 13,516,800
|
n = input()
li = list(map(int, input().split())); li2 = []; c = 0
for i in li:
if i in li2:
li2.remove(i)
else:
li2.append(i)
c = max(c, len(li2))
print(c)
|
Title: Andryusha and Socks
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Andryusha is an orderly boy and likes to keep things in their place.
Today he faced a problem to put his socks in the wardrobe. He has *n* distinct pairs of socks which are initially in a bag. The pairs are numbered from 1 to *n*. Andryusha wants to put paired socks together and put them in the wardrobe. He takes the socks one by one from the bag, and for each sock he looks whether the pair of this sock has been already took out of the bag, or not. If not (that means the pair of this sock is still in the bag), he puts the current socks on the table in front of him. Otherwise, he puts both socks from the pair to the wardrobe.
Andryusha remembers the order in which he took the socks from the bag. Can you tell him what is the maximum number of socks that were on the table at the same time?
Input Specification:
The first line contains the single integer *n* (1<=≤<=*n*<=≤<=105) — the number of sock pairs.
The second line contains 2*n* integers *x*1,<=*x*2,<=...,<=*x*2*n* (1<=≤<=*x**i*<=≤<=*n*), which describe the order in which Andryusha took the socks from the bag. More precisely, *x**i* means that the *i*-th sock Andryusha took out was from pair *x**i*.
It is guaranteed that Andryusha took exactly two socks of each pair.
Output Specification:
Print single integer — the maximum number of socks that were on the table at the same time.
Demo Input:
['1\n1 1\n', '3\n2 1 1 3 2 3\n']
Demo Output:
['1\n', '2\n']
Note:
In the first example Andryusha took a sock from the first pair and put it on the table. Then he took the next sock which is from the first pair as well, so he immediately puts both socks to the wardrobe. Thus, at most one sock was on the table at the same time.
In the second example Andryusha behaved as follows:
- Initially the table was empty, he took out a sock from pair 2 and put it on the table. - Sock (2) was on the table. Andryusha took out a sock from pair 1 and put it on the table. - Socks (1, 2) were on the table. Andryusha took out a sock from pair 1, and put this pair into the wardrobe. - Sock (2) was on the table. Andryusha took out a sock from pair 3 and put it on the table. - Socks (2, 3) were on the table. Andryusha took out a sock from pair 2, and put this pair into the wardrobe. - Sock (3) was on the table. Andryusha took out a sock from pair 3 and put this pair into the wardrobe.
|
```python
n = input()
li = list(map(int, input().split())); li2 = []; c = 0
for i in li:
if i in li2:
li2.remove(i)
else:
li2.append(i)
c = max(c, len(li2))
print(c)
```
| 0
|
|
41
|
A
|
Translation
|
PROGRAMMING
| 800
|
[
"implementation",
"strings"
] |
A. Translation
|
2
|
256
|
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
|
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
|
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
|
[
"code\nedoc\n",
"abb\naba\n",
"code\ncode\n"
] |
[
"YES\n",
"NO\n",
"NO\n"
] |
none
| 500
|
[
{
"input": "code\nedoc",
"output": "YES"
},
{
"input": "abb\naba",
"output": "NO"
},
{
"input": "code\ncode",
"output": "NO"
},
{
"input": "abacaba\nabacaba",
"output": "YES"
},
{
"input": "q\nq",
"output": "YES"
},
{
"input": "asrgdfngfnmfgnhweratgjkk\nasrgdfngfnmfgnhweratgjkk",
"output": "NO"
},
{
"input": "z\na",
"output": "NO"
},
{
"input": "asd\ndsa",
"output": "YES"
},
{
"input": "abcdef\nfecdba",
"output": "NO"
},
{
"input": "ywjjbirapvskozubvxoemscfwl\ngnduubaogtfaiowjizlvjcu",
"output": "NO"
},
{
"input": "mfrmqxtzvgaeuleubcmcxcfqyruwzenguhgrmkuhdgnhgtgkdszwqyd\nmfxufheiperjnhyczclkmzyhcxntdfskzkzdwzzujdinf",
"output": "NO"
},
{
"input": "bnbnemvybqizywlnghlykniaxxxlkhftppbdeqpesrtgkcpoeqowjwhrylpsziiwcldodcoonpimudvrxejjo\ntiynnekmlalogyvrgptbinkoqdwzuiyjlrldxhzjmmp",
"output": "NO"
},
{
"input": "pwlpubwyhzqvcitemnhvvwkmwcaawjvdiwtoxyhbhbxerlypelevasmelpfqwjk\nstruuzebbcenziscuoecywugxncdwzyfozhljjyizpqcgkyonyetarcpwkqhuugsqjuixsxptmbnlfupdcfigacdhhrzb",
"output": "NO"
},
{
"input": "gdvqjoyxnkypfvdxssgrihnwxkeojmnpdeobpecytkbdwujqfjtxsqspxvxpqioyfagzjxupqqzpgnpnpxcuipweunqch\nkkqkiwwasbhezqcfeceyngcyuogrkhqecwsyerdniqiocjehrpkljiljophqhyaiefjpavoom",
"output": "NO"
},
{
"input": "umeszdawsvgkjhlqwzents\nhxqhdungbylhnikwviuh",
"output": "NO"
},
{
"input": "juotpscvyfmgntshcealgbsrwwksgrwnrrbyaqqsxdlzhkbugdyx\nibqvffmfktyipgiopznsqtrtxiijntdbgyy",
"output": "NO"
},
{
"input": "zbwueheveouatecaglziqmudxemhrsozmaujrwlqmppzoumxhamwugedikvkblvmxwuofmpafdprbcftew\nulczwrqhctbtbxrhhodwbcxwimncnexosksujlisgclllxokrsbnozthajnnlilyffmsyko",
"output": "NO"
},
{
"input": "nkgwuugukzcv\nqktnpxedwxpxkrxdvgmfgoxkdfpbzvwsduyiybynbkouonhvmzakeiruhfmvrktghadbfkmwxduoqv",
"output": "NO"
},
{
"input": "incenvizhqpcenhjhehvjvgbsnfixbatrrjstxjzhlmdmxijztphxbrldlqwdfimweepkggzcxsrwelodpnryntepioqpvk\ndhjbjjftlvnxibkklxquwmzhjfvnmwpapdrslioxisbyhhfymyiaqhlgecpxamqnocizwxniubrmpyubvpenoukhcobkdojlybxd",
"output": "NO"
},
{
"input": "w\nw",
"output": "YES"
},
{
"input": "vz\nzv",
"output": "YES"
},
{
"input": "ry\nyr",
"output": "YES"
},
{
"input": "xou\nuox",
"output": "YES"
},
{
"input": "axg\ngax",
"output": "NO"
},
{
"input": "zdsl\nlsdz",
"output": "YES"
},
{
"input": "kudl\nldku",
"output": "NO"
},
{
"input": "zzlzwnqlcl\nlclqnwzlzz",
"output": "YES"
},
{
"input": "vzzgicnzqooejpjzads\nsdazjpjeooqzncigzzv",
"output": "YES"
},
{
"input": "raqhmvmzuwaykjpyxsykr\nxkysrypjkyawuzmvmhqar",
"output": "NO"
},
{
"input": "ngedczubzdcqbxksnxuavdjaqtmdwncjnoaicvmodcqvhfezew\nwezefhvqcdomvciaonjcnwdmtqajdvauxnskxbqcdzbuzcdegn",
"output": "YES"
},
{
"input": "muooqttvrrljcxbroizkymuidvfmhhsjtumksdkcbwwpfqdyvxtrlymofendqvznzlmim\nmimlznzvqdnefomylrtxvydqfpwwbckdskmutjshhmfvdiumykziorbxcjlrrvttqooum",
"output": "YES"
},
{
"input": "vxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaivg\ngviayyikkitmuomcpiakhbxszgbnhvwyzkftwoagzixaearxpjacrnvpvbuzenvovehkmmxvblqyxvctroddksdsgebcmlluqpxv",
"output": "YES"
},
{
"input": "mnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfdc\ncdfmkdgrdptkpewbsqvszipgxvgvuiuzbkkwuowbafkikgvnqdkxnayzdjygvezmtsgywnupocdntipiyiorblqkrzjpzatxahnm",
"output": "NO"
},
{
"input": "dgxmzbqofstzcdgthbaewbwocowvhqpinehpjatnnbrijcolvsatbblsrxabzrpszoiecpwhfjmwuhqrapvtcgvikuxtzbftydkw\nwkdytfbztxukivgctvparqhuwmjfhwpceiozsprzbaxrslbbqasvlocjirbnntajphenipthvwocowbweabhtgdcztsfoqbzmxgd",
"output": "NO"
},
{
"input": "gxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwgeh\nhegwxvocotmzstqfbmpjvijgkcyodlxyjawrpkczpmdspsuhoiruavnnnuwvtwohglkdxjetshkboalvzqbgjgthoteceixioxg",
"output": "YES"
},
{
"input": "sihxuwvmaambplxvjfoskinghzicyfqebjtkysotattkahssumfcgrkheotdxwjckpvapbkaepqrxseyfrwtyaycmrzsrsngkh\nhkgnsrszrmcyaytwrfyesxrqpeakbpavpkcjwxdtoehkrgcfmusshakttatosyktjbeqfycizhgniksofjvxlpbmaamvwuxhis",
"output": "YES"
},
{
"input": "ycnahksbughnonldzrhkysujmylcgcfuludjvjiahtkyzqvkopzqcnwhltbzfugzojqkjjlggmvnultascmygelkiktmfieok\nkoeifmtkiklegkmcsatlunvmggkjjlqjozgufzbtlhwncqzpokvqzykthaijvjdulufcgclymjusyyhrzdlnonhgubskhancy",
"output": "NO"
},
{
"input": "wbqasaehtkfojruzyhrlgwmtyiovmzyfifslvlemhqheyaelzwnthrenjsbmntwaoryzwfbxmscmypvxlfmzpnkkjlvwvmtz\nztmvwvljkknpzmflxvpymcsmxbfwzyroawtnmbsjnerhtnwzleayehqhmelvlsfifyzmvoiytmwglrhyzurjofktheasaqbw",
"output": "YES"
},
{
"input": "imippqurprbhfugngtgifelytadegwrgaefnfhbjjnmzikvjaccotqzemufqieqldgnbmviisgkynzeldlhqxuqphjfmyij\njiymfjhpquxqhldleznykgsiivmbngdlqeiqfumezqtoccajvkizmnjjbhfnfeagrwgedatylefigtgngufhbrpruqppimi",
"output": "YES"
},
{
"input": "bikydffiuisckpvzqlteqfhegsagimodb\nbdomigasgehfqetlqzvpkcsiuiffdykib",
"output": "YES"
}
] | 1,690,739,067
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 40
| 92
| 0
|
berland = input()
birland = input()
print((lambda: 'YES' if berland == birland[::-1] else 'NO')())
|
Title: Translation
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
Input Specification:
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
Output Specification:
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
Demo Input:
['code\nedoc\n', 'abb\naba\n', 'code\ncode\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
none
|
```python
berland = input()
birland = input()
print((lambda: 'YES' if berland == birland[::-1] else 'NO')())
```
| 3.977
|
41
|
A
|
Translation
|
PROGRAMMING
| 800
|
[
"implementation",
"strings"
] |
A. Translation
|
2
|
256
|
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
|
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
|
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
|
[
"code\nedoc\n",
"abb\naba\n",
"code\ncode\n"
] |
[
"YES\n",
"NO\n",
"NO\n"
] |
none
| 500
|
[
{
"input": "code\nedoc",
"output": "YES"
},
{
"input": "abb\naba",
"output": "NO"
},
{
"input": "code\ncode",
"output": "NO"
},
{
"input": "abacaba\nabacaba",
"output": "YES"
},
{
"input": "q\nq",
"output": "YES"
},
{
"input": "asrgdfngfnmfgnhweratgjkk\nasrgdfngfnmfgnhweratgjkk",
"output": "NO"
},
{
"input": "z\na",
"output": "NO"
},
{
"input": "asd\ndsa",
"output": "YES"
},
{
"input": "abcdef\nfecdba",
"output": "NO"
},
{
"input": "ywjjbirapvskozubvxoemscfwl\ngnduubaogtfaiowjizlvjcu",
"output": "NO"
},
{
"input": "mfrmqxtzvgaeuleubcmcxcfqyruwzenguhgrmkuhdgnhgtgkdszwqyd\nmfxufheiperjnhyczclkmzyhcxntdfskzkzdwzzujdinf",
"output": "NO"
},
{
"input": "bnbnemvybqizywlnghlykniaxxxlkhftppbdeqpesrtgkcpoeqowjwhrylpsziiwcldodcoonpimudvrxejjo\ntiynnekmlalogyvrgptbinkoqdwzuiyjlrldxhzjmmp",
"output": "NO"
},
{
"input": "pwlpubwyhzqvcitemnhvvwkmwcaawjvdiwtoxyhbhbxerlypelevasmelpfqwjk\nstruuzebbcenziscuoecywugxncdwzyfozhljjyizpqcgkyonyetarcpwkqhuugsqjuixsxptmbnlfupdcfigacdhhrzb",
"output": "NO"
},
{
"input": "gdvqjoyxnkypfvdxssgrihnwxkeojmnpdeobpecytkbdwujqfjtxsqspxvxpqioyfagzjxupqqzpgnpnpxcuipweunqch\nkkqkiwwasbhezqcfeceyngcyuogrkhqecwsyerdniqiocjehrpkljiljophqhyaiefjpavoom",
"output": "NO"
},
{
"input": "umeszdawsvgkjhlqwzents\nhxqhdungbylhnikwviuh",
"output": "NO"
},
{
"input": "juotpscvyfmgntshcealgbsrwwksgrwnrrbyaqqsxdlzhkbugdyx\nibqvffmfktyipgiopznsqtrtxiijntdbgyy",
"output": "NO"
},
{
"input": "zbwueheveouatecaglziqmudxemhrsozmaujrwlqmppzoumxhamwugedikvkblvmxwuofmpafdprbcftew\nulczwrqhctbtbxrhhodwbcxwimncnexosksujlisgclllxokrsbnozthajnnlilyffmsyko",
"output": "NO"
},
{
"input": "nkgwuugukzcv\nqktnpxedwxpxkrxdvgmfgoxkdfpbzvwsduyiybynbkouonhvmzakeiruhfmvrktghadbfkmwxduoqv",
"output": "NO"
},
{
"input": "incenvizhqpcenhjhehvjvgbsnfixbatrrjstxjzhlmdmxijztphxbrldlqwdfimweepkggzcxsrwelodpnryntepioqpvk\ndhjbjjftlvnxibkklxquwmzhjfvnmwpapdrslioxisbyhhfymyiaqhlgecpxamqnocizwxniubrmpyubvpenoukhcobkdojlybxd",
"output": "NO"
},
{
"input": "w\nw",
"output": "YES"
},
{
"input": "vz\nzv",
"output": "YES"
},
{
"input": "ry\nyr",
"output": "YES"
},
{
"input": "xou\nuox",
"output": "YES"
},
{
"input": "axg\ngax",
"output": "NO"
},
{
"input": "zdsl\nlsdz",
"output": "YES"
},
{
"input": "kudl\nldku",
"output": "NO"
},
{
"input": "zzlzwnqlcl\nlclqnwzlzz",
"output": "YES"
},
{
"input": "vzzgicnzqooejpjzads\nsdazjpjeooqzncigzzv",
"output": "YES"
},
{
"input": "raqhmvmzuwaykjpyxsykr\nxkysrypjkyawuzmvmhqar",
"output": "NO"
},
{
"input": "ngedczubzdcqbxksnxuavdjaqtmdwncjnoaicvmodcqvhfezew\nwezefhvqcdomvciaonjcnwdmtqajdvauxnskxbqcdzbuzcdegn",
"output": "YES"
},
{
"input": "muooqttvrrljcxbroizkymuidvfmhhsjtumksdkcbwwpfqdyvxtrlymofendqvznzlmim\nmimlznzvqdnefomylrtxvydqfpwwbckdskmutjshhmfvdiumykziorbxcjlrrvttqooum",
"output": "YES"
},
{
"input": "vxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaivg\ngviayyikkitmuomcpiakhbxszgbnhvwyzkftwoagzixaearxpjacrnvpvbuzenvovehkmmxvblqyxvctroddksdsgebcmlluqpxv",
"output": "YES"
},
{
"input": "mnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfdc\ncdfmkdgrdptkpewbsqvszipgxvgvuiuzbkkwuowbafkikgvnqdkxnayzdjygvezmtsgywnupocdntipiyiorblqkrzjpzatxahnm",
"output": "NO"
},
{
"input": "dgxmzbqofstzcdgthbaewbwocowvhqpinehpjatnnbrijcolvsatbblsrxabzrpszoiecpwhfjmwuhqrapvtcgvikuxtzbftydkw\nwkdytfbztxukivgctvparqhuwmjfhwpceiozsprzbaxrslbbqasvlocjirbnntajphenipthvwocowbweabhtgdcztsfoqbzmxgd",
"output": "NO"
},
{
"input": "gxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwgeh\nhegwxvocotmzstqfbmpjvijgkcyodlxyjawrpkczpmdspsuhoiruavnnnuwvtwohglkdxjetshkboalvzqbgjgthoteceixioxg",
"output": "YES"
},
{
"input": "sihxuwvmaambplxvjfoskinghzicyfqebjtkysotattkahssumfcgrkheotdxwjckpvapbkaepqrxseyfrwtyaycmrzsrsngkh\nhkgnsrszrmcyaytwrfyesxrqpeakbpavpkcjwxdtoehkrgcfmusshakttatosyktjbeqfycizhgniksofjvxlpbmaamvwuxhis",
"output": "YES"
},
{
"input": "ycnahksbughnonldzrhkysujmylcgcfuludjvjiahtkyzqvkopzqcnwhltbzfugzojqkjjlggmvnultascmygelkiktmfieok\nkoeifmtkiklegkmcsatlunvmggkjjlqjozgufzbtlhwncqzpokvqzykthaijvjdulufcgclymjusyyhrzdlnonhgubskhancy",
"output": "NO"
},
{
"input": "wbqasaehtkfojruzyhrlgwmtyiovmzyfifslvlemhqheyaelzwnthrenjsbmntwaoryzwfbxmscmypvxlfmzpnkkjlvwvmtz\nztmvwvljkknpzmflxvpymcsmxbfwzyroawtnmbsjnerhtnwzleayehqhmelvlsfifyzmvoiytmwglrhyzurjofktheasaqbw",
"output": "YES"
},
{
"input": "imippqurprbhfugngtgifelytadegwrgaefnfhbjjnmzikvjaccotqzemufqieqldgnbmviisgkynzeldlhqxuqphjfmyij\njiymfjhpquxqhldleznykgsiivmbngdlqeiqfumezqtoccajvkizmnjjbhfnfeagrwgedatylefigtgngufhbrpruqppimi",
"output": "YES"
},
{
"input": "bikydffiuisckpvzqlteqfhegsagimodb\nbdomigasgehfqetlqzvpkcsiuiffdykib",
"output": "YES"
}
] | 1,626,459,058
| 2,147,483,647
|
Python 3
|
RUNTIME_ERROR
|
TESTS
| 0
| 92
| 6,656,000
|
x = str(input())
y = str(input())
reversed(x.begin(), x.end())
if x == y:
print("YES")
else: print("NO")
|
Title: Translation
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
Input Specification:
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
Output Specification:
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
Demo Input:
['code\nedoc\n', 'abb\naba\n', 'code\ncode\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
none
|
```python
x = str(input())
y = str(input())
reversed(x.begin(), x.end())
if x == y:
print("YES")
else: print("NO")
```
| -1
|
624
|
A
|
Save Luke
|
PROGRAMMING
| 800
|
[
"math"
] | null | null |
Luke Skywalker got locked up in a rubbish shredder between two presses. R2D2 is already working on his rescue, but Luke needs to stay alive as long as possible. For simplicity we will assume that everything happens on a straight line, the presses are initially at coordinates 0 and *L*, and they move towards each other with speed *v*1 and *v*2, respectively. Luke has width *d* and is able to choose any position between the presses. Luke dies as soon as the distance between the presses is less than his width. Your task is to determine for how long Luke can stay alive.
|
The first line of the input contains four integers *d*, *L*, *v*1, *v*2 (1<=≤<=*d*,<=*L*,<=*v*1,<=*v*2<=≤<=10<=000,<=*d*<=<<=*L*) — Luke's width, the initial position of the second press and the speed of the first and second presses, respectively.
|
Print a single real value — the maximum period of time Luke can stay alive for. Your answer will be considered correct if its absolute or relative error does not exceed 10<=-<=6.
Namely: let's assume that your answer is *a*, and the answer of the jury is *b*. The checker program will consider your answer correct, if .
|
[
"2 6 2 2\n",
"1 9 1 2\n"
] |
[
"1.00000000000000000000\n",
"2.66666666666666650000\n"
] |
In the first sample Luke should stay exactly in the middle of the segment, that is at coordinates [2;4], as the presses move with the same speed.
In the second sample he needs to occupy the position <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/71395c777960eaded59a9fdc428a9625f152605b.png" style="max-width: 100.0%;max-height: 100.0%;"/>. In this case both presses move to his edges at the same time.
| 500
|
[
{
"input": "2 6 2 2",
"output": "1.00000000000000000000"
},
{
"input": "1 9 1 2",
"output": "2.66666666666666650000"
},
{
"input": "1 10000 1 1",
"output": "4999.50000000000000000000"
},
{
"input": "9999 10000 10000 10000",
"output": "0.00005000000000000000"
},
{
"input": "1023 2340 1029 3021",
"output": "0.32518518518518519000"
},
{
"input": "2173 2176 10000 9989",
"output": "0.00015008254539996998"
},
{
"input": "1 2 123 1",
"output": "0.00806451612903225780"
},
{
"input": "123 1242 12 312",
"output": "3.45370370370370370000"
},
{
"input": "2 9997 3 12",
"output": "666.33333333333337000000"
},
{
"input": "1 10000 10000 10000",
"output": "0.49995000000000001000"
},
{
"input": "3274 4728 888 4578",
"output": "0.26600804976216613000"
},
{
"input": "4600 9696 5634 8248",
"output": "0.36709407866301685000"
},
{
"input": "2255 7902 8891 429",
"output": "0.60590128755364803000"
},
{
"input": "6745 9881 2149 9907",
"output": "0.26011944260119441000"
},
{
"input": "4400 8021 6895 2089",
"output": "0.40304986642920748000"
},
{
"input": "5726 9082 7448 3054",
"output": "0.31955817939440107000"
},
{
"input": "3381 9769 4898 2532",
"output": "0.85975773889636609000"
},
{
"input": "1036 6259 5451 4713",
"output": "0.51387249114521838000"
},
{
"input": "5526 6455 197 4191",
"output": "0.21171376481312670000"
},
{
"input": "1196 4082 4071 9971",
"output": "0.20552627830793335000"
},
{
"input": "8850 9921 8816 9449",
"output": "0.05863673692855187600"
},
{
"input": "3341 7299 2074 8927",
"output": "0.35978547404781386000"
},
{
"input": "7831 8609 6820 2596",
"output": "0.08262531860662701600"
},
{
"input": "2322 7212 77 4778",
"output": "1.00720906282183310000"
},
{
"input": "9976 9996 4823 4255",
"output": "0.00220312844238819110"
},
{
"input": "7631 9769 5377 6437",
"output": "0.18097172845776197000"
},
{
"input": "8957 9525 8634 107",
"output": "0.06498112344125385500"
},
{
"input": "6612 9565 3380 2288",
"output": "0.52099505998588569000"
},
{
"input": "1103 6256 3934 9062",
"output": "0.39650661742074483000"
},
{
"input": "1854 3280 1481 2140",
"output": "0.39381386357359843000"
}
] | 1,645,755,076
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 30
| 31
| 0
|
a,b,c,d = list(map(int,input().split()))
e = abs(a-b)
f = abs(c+d)
print(e/f)
|
Title: Save Luke
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Luke Skywalker got locked up in a rubbish shredder between two presses. R2D2 is already working on his rescue, but Luke needs to stay alive as long as possible. For simplicity we will assume that everything happens on a straight line, the presses are initially at coordinates 0 and *L*, and they move towards each other with speed *v*1 and *v*2, respectively. Luke has width *d* and is able to choose any position between the presses. Luke dies as soon as the distance between the presses is less than his width. Your task is to determine for how long Luke can stay alive.
Input Specification:
The first line of the input contains four integers *d*, *L*, *v*1, *v*2 (1<=≤<=*d*,<=*L*,<=*v*1,<=*v*2<=≤<=10<=000,<=*d*<=<<=*L*) — Luke's width, the initial position of the second press and the speed of the first and second presses, respectively.
Output Specification:
Print a single real value — the maximum period of time Luke can stay alive for. Your answer will be considered correct if its absolute or relative error does not exceed 10<=-<=6.
Namely: let's assume that your answer is *a*, and the answer of the jury is *b*. The checker program will consider your answer correct, if .
Demo Input:
['2 6 2 2\n', '1 9 1 2\n']
Demo Output:
['1.00000000000000000000\n', '2.66666666666666650000\n']
Note:
In the first sample Luke should stay exactly in the middle of the segment, that is at coordinates [2;4], as the presses move with the same speed.
In the second sample he needs to occupy the position <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/71395c777960eaded59a9fdc428a9625f152605b.png" style="max-width: 100.0%;max-height: 100.0%;"/>. In this case both presses move to his edges at the same time.
|
```python
a,b,c,d = list(map(int,input().split()))
e = abs(a-b)
f = abs(c+d)
print(e/f)
```
| 3
|
|
682
|
A
|
Alyona and Numbers
|
PROGRAMMING
| 1,100
|
[
"constructive algorithms",
"math",
"number theory"
] | null | null |
After finishing eating her bun, Alyona came up with two integers *n* and *m*. She decided to write down two columns of integers — the first column containing integers from 1 to *n* and the second containing integers from 1 to *m*. Now the girl wants to count how many pairs of integers she can choose, one from the first column and the other from the second column, such that their sum is divisible by 5.
Formally, Alyona wants to count the number of pairs of integers (*x*,<=*y*) such that 1<=≤<=*x*<=≤<=*n*, 1<=≤<=*y*<=≤<=*m* and equals 0.
As usual, Alyona has some troubles and asks you to help.
|
The only line of the input contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=1<=000<=000).
|
Print the only integer — the number of pairs of integers (*x*,<=*y*) such that 1<=≤<=*x*<=≤<=*n*, 1<=≤<=*y*<=≤<=*m* and (*x*<=+<=*y*) is divisible by 5.
|
[
"6 12\n",
"11 14\n",
"1 5\n",
"3 8\n",
"5 7\n",
"21 21\n"
] |
[
"14\n",
"31\n",
"1\n",
"5\n",
"7\n",
"88\n"
] |
Following pairs are suitable in the first sample case:
- for *x* = 1 fits *y* equal to 4 or 9; - for *x* = 2 fits *y* equal to 3 or 8; - for *x* = 3 fits *y* equal to 2, 7 or 12; - for *x* = 4 fits *y* equal to 1, 6 or 11; - for *x* = 5 fits *y* equal to 5 or 10; - for *x* = 6 fits *y* equal to 4 or 9.
Only the pair (1, 4) is suitable in the third sample case.
| 500
|
[
{
"input": "6 12",
"output": "14"
},
{
"input": "11 14",
"output": "31"
},
{
"input": "1 5",
"output": "1"
},
{
"input": "3 8",
"output": "5"
},
{
"input": "5 7",
"output": "7"
},
{
"input": "21 21",
"output": "88"
},
{
"input": "10 15",
"output": "30"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 1000000",
"output": "200000"
},
{
"input": "1000000 1",
"output": "200000"
},
{
"input": "1000000 1000000",
"output": "200000000000"
},
{
"input": "944 844",
"output": "159348"
},
{
"input": "368 984",
"output": "72423"
},
{
"input": "792 828",
"output": "131155"
},
{
"input": "920 969",
"output": "178296"
},
{
"input": "640 325",
"output": "41600"
},
{
"input": "768 170",
"output": "26112"
},
{
"input": "896 310",
"output": "55552"
},
{
"input": "320 154",
"output": "9856"
},
{
"input": "744 999",
"output": "148652"
},
{
"input": "630 843",
"output": "106218"
},
{
"input": "54 688",
"output": "7431"
},
{
"input": "478 828",
"output": "79157"
},
{
"input": "902 184",
"output": "33194"
},
{
"input": "31 29",
"output": "180"
},
{
"input": "751 169",
"output": "25384"
},
{
"input": "879 14",
"output": "2462"
},
{
"input": "7 858",
"output": "1201"
},
{
"input": "431 702",
"output": "60512"
},
{
"input": "855 355",
"output": "60705"
},
{
"input": "553 29",
"output": "3208"
},
{
"input": "721767 525996",
"output": "75929310986"
},
{
"input": "805191 74841",
"output": "12052259926"
},
{
"input": "888615 590981",
"output": "105030916263"
},
{
"input": "4743 139826",
"output": "132638943"
},
{
"input": "88167 721374",
"output": "12720276292"
},
{
"input": "171591 13322",
"output": "457187060"
},
{
"input": "287719 562167",
"output": "32349225415"
},
{
"input": "371143 78307",
"output": "5812618980"
},
{
"input": "487271 627151",
"output": "61118498984"
},
{
"input": "261436 930642",
"output": "48660664382"
},
{
"input": "377564 446782",
"output": "33737759810"
},
{
"input": "460988 28330",
"output": "2611958008"
},
{
"input": "544412 352983",
"output": "38433636199"
},
{
"input": "660540 869123",
"output": "114818101284"
},
{
"input": "743964 417967",
"output": "62190480238"
},
{
"input": "827388 966812",
"output": "159985729411"
},
{
"input": "910812 515656",
"output": "93933134534"
},
{
"input": "26940 64501",
"output": "347531388"
},
{
"input": "110364 356449",
"output": "7867827488"
},
{
"input": "636358 355531",
"output": "45248999219"
},
{
"input": "752486 871672",
"output": "131184195318"
},
{
"input": "803206 420516",
"output": "67552194859"
},
{
"input": "919334 969361",
"output": "178233305115"
},
{
"input": "35462 261309",
"output": "1853307952"
},
{
"input": "118887 842857",
"output": "20040948031"
},
{
"input": "202311 358998",
"output": "14525848875"
},
{
"input": "285735 907842",
"output": "51880446774"
},
{
"input": "401863 456686",
"output": "36705041203"
},
{
"input": "452583 972827",
"output": "88056992428"
},
{
"input": "235473 715013",
"output": "33673251230"
},
{
"input": "318897 263858",
"output": "16828704925"
},
{
"input": "402321 812702",
"output": "65393416268"
},
{
"input": "518449 361546",
"output": "37488632431"
},
{
"input": "634577 910391",
"output": "115542637921"
},
{
"input": "685297 235043",
"output": "32214852554"
},
{
"input": "801425 751183",
"output": "120403367155"
},
{
"input": "884849 300028",
"output": "53095895155"
},
{
"input": "977 848872",
"output": "165869588"
},
{
"input": "51697 397716",
"output": "4112144810"
},
{
"input": "834588 107199",
"output": "17893399803"
},
{
"input": "918012 688747",
"output": "126455602192"
},
{
"input": "1436 237592",
"output": "68236422"
},
{
"input": "117564 753732",
"output": "17722349770"
},
{
"input": "200988 302576",
"output": "12162829017"
},
{
"input": "284412 818717",
"output": "46570587880"
},
{
"input": "400540 176073",
"output": "14104855884"
},
{
"input": "483964 724917",
"output": "70166746198"
},
{
"input": "567388 241058",
"output": "27354683301"
},
{
"input": "650812 789902",
"output": "102815540084"
},
{
"input": "400999 756281",
"output": "60653584944"
},
{
"input": "100 101",
"output": "2020"
},
{
"input": "100 102",
"output": "2040"
},
{
"input": "103 100",
"output": "2060"
},
{
"input": "100 104",
"output": "2080"
},
{
"input": "3 4",
"output": "3"
},
{
"input": "11 23",
"output": "50"
},
{
"input": "8 14",
"output": "23"
},
{
"input": "23423 34234",
"output": "160372597"
},
{
"input": "1 4",
"output": "1"
},
{
"input": "999999 999999",
"output": "199999600001"
},
{
"input": "82 99",
"output": "1624"
},
{
"input": "21 18",
"output": "75"
},
{
"input": "234 234",
"output": "10952"
},
{
"input": "4 4",
"output": "4"
},
{
"input": "6 13",
"output": "15"
},
{
"input": "3 9",
"output": "6"
},
{
"input": "99999 99999",
"output": "1999960001"
},
{
"input": "34 33",
"output": "225"
},
{
"input": "2 2",
"output": "0"
},
{
"input": "333 1",
"output": "66"
},
{
"input": "3 3",
"output": "2"
},
{
"input": "8 2",
"output": "3"
},
{
"input": "2179 2218",
"output": "966605"
},
{
"input": "1000000 999999",
"output": "199999800000"
},
{
"input": "873828 774207",
"output": "135304750879"
},
{
"input": "13 19",
"output": "50"
},
{
"input": "1648 576469",
"output": "190004183"
},
{
"input": "11 13",
"output": "28"
},
{
"input": "5 8",
"output": "8"
},
{
"input": "650074 943659",
"output": "122689636154"
},
{
"input": "1 3",
"output": "0"
},
{
"input": "54 43",
"output": "465"
},
{
"input": "14 9",
"output": "26"
},
{
"input": "2 3",
"output": "1"
},
{
"input": "543 534",
"output": "57993"
},
{
"input": "321 123",
"output": "7896"
},
{
"input": "21 3",
"output": "12"
},
{
"input": "2 1",
"output": "0"
},
{
"input": "4 3",
"output": "3"
},
{
"input": "47474 74747",
"output": "709707816"
},
{
"input": "4 9",
"output": "8"
},
{
"input": "7 4",
"output": "6"
},
{
"input": "9 4",
"output": "8"
},
{
"input": "12414 4214",
"output": "10462520"
},
{
"input": "2 9",
"output": "4"
},
{
"input": "253 821",
"output": "41542"
},
{
"input": "2 4",
"output": "2"
}
] | 1,500,225,167
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 10
| 1,000
| 4,608,000
|
n,m=map(int,input().split(' '))
i=1;k=0
while(i<=n):
j=1
while(j<=m):
if((i+j)%5==0):
k=k+1
j=j+1
i=i+1
print(k)
|
Title: Alyona and Numbers
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
After finishing eating her bun, Alyona came up with two integers *n* and *m*. She decided to write down two columns of integers — the first column containing integers from 1 to *n* and the second containing integers from 1 to *m*. Now the girl wants to count how many pairs of integers she can choose, one from the first column and the other from the second column, such that their sum is divisible by 5.
Formally, Alyona wants to count the number of pairs of integers (*x*,<=*y*) such that 1<=≤<=*x*<=≤<=*n*, 1<=≤<=*y*<=≤<=*m* and equals 0.
As usual, Alyona has some troubles and asks you to help.
Input Specification:
The only line of the input contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=1<=000<=000).
Output Specification:
Print the only integer — the number of pairs of integers (*x*,<=*y*) such that 1<=≤<=*x*<=≤<=*n*, 1<=≤<=*y*<=≤<=*m* and (*x*<=+<=*y*) is divisible by 5.
Demo Input:
['6 12\n', '11 14\n', '1 5\n', '3 8\n', '5 7\n', '21 21\n']
Demo Output:
['14\n', '31\n', '1\n', '5\n', '7\n', '88\n']
Note:
Following pairs are suitable in the first sample case:
- for *x* = 1 fits *y* equal to 4 or 9; - for *x* = 2 fits *y* equal to 3 or 8; - for *x* = 3 fits *y* equal to 2, 7 or 12; - for *x* = 4 fits *y* equal to 1, 6 or 11; - for *x* = 5 fits *y* equal to 5 or 10; - for *x* = 6 fits *y* equal to 4 or 9.
Only the pair (1, 4) is suitable in the third sample case.
|
```python
n,m=map(int,input().split(' '))
i=1;k=0
while(i<=n):
j=1
while(j<=m):
if((i+j)%5==0):
k=k+1
j=j+1
i=i+1
print(k)
```
| 0
|
|
0
|
none
|
none
|
none
| 0
|
[
"none"
] | null | null |
A remote island chain contains *n* islands, labeled 1 through *n*. Bidirectional bridges connect the islands to form a simple cycle — a bridge connects islands 1 and 2, islands 2 and 3, and so on, and additionally a bridge connects islands *n* and 1. The center of each island contains an identical pedestal, and all but one of the islands has a fragile, uniquely colored statue currently held on the pedestal. The remaining island holds only an empty pedestal.
The islanders want to rearrange the statues in a new order. To do this, they repeat the following process: First, they choose an island directly adjacent to the island containing an empty pedestal. Then, they painstakingly carry the statue on this island across the adjoining bridge and place it on the empty pedestal.
Determine if it is possible for the islanders to arrange the statues in the desired order.
|
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=200<=000) — the total number of islands.
The second line contains *n* space-separated integers *a**i* (0<=≤<=*a**i*<=≤<=*n*<=-<=1) — the statue currently placed on the *i*-th island. If *a**i*<==<=0, then the island has no statue. It is guaranteed that the *a**i* are distinct.
The third line contains *n* space-separated integers *b**i* (0<=≤<=*b**i*<=≤<=*n*<=-<=1) — the desired statues of the *i*th island. Once again, *b**i*<==<=0 indicates the island desires no statue. It is guaranteed that the *b**i* are distinct.
|
Print "YES" (without quotes) if the rearrangement can be done in the existing network, and "NO" otherwise.
|
[
"3\n1 0 2\n2 0 1\n",
"2\n1 0\n0 1\n",
"4\n1 2 3 0\n0 3 2 1\n"
] |
[
"YES\n",
"YES\n",
"NO\n"
] |
In the first sample, the islanders can first move statue 1 from island 1 to island 2, then move statue 2 from island 3 to island 1, and finally move statue 1 from island 2 to island 3.
In the second sample, the islanders can simply move statue 1 from island 1 to island 2.
In the third sample, no sequence of movements results in the desired position.
| 0
|
[
{
"input": "3\n1 0 2\n2 0 1",
"output": "YES"
},
{
"input": "2\n1 0\n0 1",
"output": "YES"
},
{
"input": "4\n1 2 3 0\n0 3 2 1",
"output": "NO"
},
{
"input": "9\n3 8 4 6 7 1 5 2 0\n6 4 8 5 3 1 2 0 7",
"output": "NO"
},
{
"input": "4\n2 3 1 0\n2 0 1 3",
"output": "NO"
},
{
"input": "4\n0 1 2 3\n2 0 1 3",
"output": "NO"
},
{
"input": "4\n3 0 1 2\n1 0 2 3",
"output": "YES"
},
{
"input": "3\n0 2 1\n1 2 0",
"output": "YES"
},
{
"input": "2\n0 1\n0 1",
"output": "YES"
},
{
"input": "6\n3 1 5 4 0 2\n0 4 3 5 2 1",
"output": "NO"
},
{
"input": "4\n2 0 3 1\n3 1 0 2",
"output": "YES"
},
{
"input": "5\n3 0 2 1 4\n4 3 0 1 2",
"output": "NO"
},
{
"input": "3\n2 0 1\n1 0 2",
"output": "YES"
},
{
"input": "10\n6 2 3 8 0 4 9 1 5 7\n2 3 8 4 0 9 1 5 7 6",
"output": "YES"
},
{
"input": "10\n2 4 8 3 6 1 9 0 5 7\n3 6 1 9 0 5 7 2 8 4",
"output": "NO"
},
{
"input": "10\n2 0 1 6 4 9 8 5 3 7\n6 4 9 0 5 3 7 2 1 8",
"output": "NO"
},
{
"input": "3\n0 1 2\n0 1 2",
"output": "YES"
},
{
"input": "4\n0 1 2 3\n1 0 2 3",
"output": "YES"
},
{
"input": "3\n0 1 2\n1 0 2",
"output": "YES"
},
{
"input": "5\n1 2 0 3 4\n4 0 1 2 3",
"output": "YES"
},
{
"input": "4\n1 0 2 3\n1 0 2 3",
"output": "YES"
},
{
"input": "3\n0 1 2\n0 2 1",
"output": "YES"
},
{
"input": "4\n0 1 2 3\n2 3 1 0",
"output": "YES"
},
{
"input": "4\n0 2 3 1\n1 2 3 0",
"output": "YES"
},
{
"input": "3\n0 2 1\n2 0 1",
"output": "YES"
},
{
"input": "2\n1 0\n1 0",
"output": "YES"
},
{
"input": "4\n1 2 3 0\n1 0 2 3",
"output": "YES"
},
{
"input": "4\n0 1 3 2\n2 1 3 0",
"output": "YES"
},
{
"input": "4\n1 2 3 0\n1 2 0 3",
"output": "YES"
}
] | 1,467,726,222
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 61
| 514
| 17,203,200
|
read = lambda: map(int, input().split())
n = int(input())
a = list(read())
b = list(read())
A, B = [], []
i = a.index(1)
while len(A) < n:
if a[i]: A.append(a[i])
i = (i + 1) % n
i = b.index(1)
while len(B) < n:
if b[i]: B.append(b[i])
i = (i + 1) % n
ans = 'YES' if A == B else 'NO'
print(ans)
|
Title: none
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
A remote island chain contains *n* islands, labeled 1 through *n*. Bidirectional bridges connect the islands to form a simple cycle — a bridge connects islands 1 and 2, islands 2 and 3, and so on, and additionally a bridge connects islands *n* and 1. The center of each island contains an identical pedestal, and all but one of the islands has a fragile, uniquely colored statue currently held on the pedestal. The remaining island holds only an empty pedestal.
The islanders want to rearrange the statues in a new order. To do this, they repeat the following process: First, they choose an island directly adjacent to the island containing an empty pedestal. Then, they painstakingly carry the statue on this island across the adjoining bridge and place it on the empty pedestal.
Determine if it is possible for the islanders to arrange the statues in the desired order.
Input Specification:
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=200<=000) — the total number of islands.
The second line contains *n* space-separated integers *a**i* (0<=≤<=*a**i*<=≤<=*n*<=-<=1) — the statue currently placed on the *i*-th island. If *a**i*<==<=0, then the island has no statue. It is guaranteed that the *a**i* are distinct.
The third line contains *n* space-separated integers *b**i* (0<=≤<=*b**i*<=≤<=*n*<=-<=1) — the desired statues of the *i*th island. Once again, *b**i*<==<=0 indicates the island desires no statue. It is guaranteed that the *b**i* are distinct.
Output Specification:
Print "YES" (without quotes) if the rearrangement can be done in the existing network, and "NO" otherwise.
Demo Input:
['3\n1 0 2\n2 0 1\n', '2\n1 0\n0 1\n', '4\n1 2 3 0\n0 3 2 1\n']
Demo Output:
['YES\n', 'YES\n', 'NO\n']
Note:
In the first sample, the islanders can first move statue 1 from island 1 to island 2, then move statue 2 from island 3 to island 1, and finally move statue 1 from island 2 to island 3.
In the second sample, the islanders can simply move statue 1 from island 1 to island 2.
In the third sample, no sequence of movements results in the desired position.
|
```python
read = lambda: map(int, input().split())
n = int(input())
a = list(read())
b = list(read())
A, B = [], []
i = a.index(1)
while len(A) < n:
if a[i]: A.append(a[i])
i = (i + 1) % n
i = b.index(1)
while len(B) < n:
if b[i]: B.append(b[i])
i = (i + 1) % n
ans = 'YES' if A == B else 'NO'
print(ans)
```
| 3
|
|
218
|
B
|
Airport
|
PROGRAMMING
| 1,100
|
[
"implementation"
] | null | null |
Lolek and Bolek are about to travel abroad by plane. The local airport has a special "Choose Your Plane" offer. The offer's conditions are as follows:
- it is up to a passenger to choose a plane to fly on; - if the chosen plane has *x* (*x*<=><=0) empty seats at the given moment, then the ticket for such a plane costs *x* zlotys (units of Polish currency).
The only ticket office of the airport already has a queue of *n* passengers in front of it. Lolek and Bolek have not stood in the queue yet, but they are already wondering what is the maximum and the minimum number of zlotys the airport administration can earn if all *n* passengers buy tickets according to the conditions of this offer?
The passengers buy tickets in turn, the first person in the queue goes first, then goes the second one, and so on up to *n*-th person.
|
The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=1000) — the number of passengers in the queue and the number of planes in the airport, correspondingly. The next line contains *m* integers *a*1,<=*a*2,<=...,<=*a**m* (1<=≤<=*a**i*<=≤<=1000) — *a**i* stands for the number of empty seats in the *i*-th plane before the ticket office starts selling tickets.
The numbers in the lines are separated by a space. It is guaranteed that there are at least *n* empty seats in total.
|
Print two integers — the maximum and the minimum number of zlotys that the airport administration can earn, correspondingly.
|
[
"4 3\n2 1 1\n",
"4 3\n2 2 2\n"
] |
[
"5 5\n",
"7 6\n"
] |
In the first test sample the number of passengers is equal to the number of empty seats, so regardless of the way the planes are chosen, the administration will earn the same sum.
In the second sample the sum is maximized if the 1-st person in the queue buys a ticket to the 1-st plane, the 2-nd person — to the 2-nd plane, the 3-rd person — to the 3-rd plane, the 4-th person — to the 1-st plane. The sum is minimized if the 1-st person in the queue buys a ticket to the 1-st plane, the 2-nd person — to the 1-st plane, the 3-rd person — to the 2-nd plane, the 4-th person — to the 2-nd plane.
| 500
|
[
{
"input": "4 3\n2 1 1",
"output": "5 5"
},
{
"input": "4 3\n2 2 2",
"output": "7 6"
},
{
"input": "10 5\n10 3 3 1 2",
"output": "58 26"
},
{
"input": "10 1\n10",
"output": "55 55"
},
{
"input": "10 1\n100",
"output": "955 955"
},
{
"input": "10 2\n4 7",
"output": "37 37"
},
{
"input": "40 10\n1 2 3 4 5 6 7 10 10 10",
"output": "223 158"
},
{
"input": "1 1\n6",
"output": "6 6"
},
{
"input": "1 2\n10 9",
"output": "10 9"
},
{
"input": "2 1\n7",
"output": "13 13"
},
{
"input": "2 2\n7 2",
"output": "13 3"
},
{
"input": "3 2\n4 7",
"output": "18 9"
},
{
"input": "3 3\n2 1 1",
"output": "4 4"
},
{
"input": "3 3\n2 1 1",
"output": "4 4"
},
{
"input": "10 10\n3 1 2 2 1 1 2 1 2 3",
"output": "20 13"
},
{
"input": "10 2\n7 3",
"output": "34 34"
},
{
"input": "10 1\n19",
"output": "145 145"
},
{
"input": "100 3\n29 36 35",
"output": "1731 1731"
},
{
"input": "100 5\n3 38 36 35 2",
"output": "2019 1941"
},
{
"input": "510 132\n50 76 77 69 94 30 47 65 14 62 18 121 26 35 49 17 105 93 47 16 78 3 7 74 7 37 30 36 30 83 71 113 7 58 86 10 65 57 34 102 55 44 43 47 106 44 115 75 109 70 47 45 16 57 62 55 20 88 74 40 45 84 41 1 9 53 65 25 67 31 115 2 63 51 123 70 65 65 18 14 75 14 103 26 117 105 36 104 81 37 35 61 44 90 71 70 88 89 26 21 64 77 89 16 87 99 13 79 27 3 46 120 116 11 14 17 32 70 113 94 108 57 29 100 53 48 44 29 70 30 32 62",
"output": "50279 5479"
},
{
"input": "510 123\n5 2 3 2 5 7 2 3 1 3 6 6 3 1 5 3 5 6 2 2 1 5 5 5 2 2 3 1 6 3 5 8 4 6 1 5 4 5 1 6 5 5 3 6 4 1 6 1 3 5 2 7 5 2 4 4 5 6 5 5 4 3 4 6 5 4 4 3 5 8 5 5 6 3 1 7 4 4 3 3 5 3 6 3 3 6 2 5 3 2 4 5 4 5 2 2 4 4 4 7 3 4 6 5 3 6 4 7 1 6 5 7 6 5 7 3 7 4 4 1 6 6 4",
"output": "1501 1501"
},
{
"input": "610 33\n15 44 8 8 17 11 39 39 38 25 17 36 17 25 21 37 10 11 34 30 29 50 29 50 4 20 32 13 41 14 2 11 2",
"output": "12204 8871"
}
] | 1,614,160,200
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 5
| 92
| 307,200
|
n,m=map(int,input().split(" "))
arr=list(map(int,input().split(" ")))
sum1=sum(arr)
brr=arr.copy()
s=s1=i=j=0
k=n
while (n!=0 and i!=m):
if i==m:
i=i%m
s=s+arr[i]
arr[i]-=1
n=n-1
if max(arr)==arr[i]:
pass
else:
i=i+1
brr.sort()
while (k!=0 and j!=m):
s1=s1+brr[j]
brr[j]-=1
k-=1
if brr[j]==0:
j=j+1
else:
pass
print(s,s1)
|
Title: Airport
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Lolek and Bolek are about to travel abroad by plane. The local airport has a special "Choose Your Plane" offer. The offer's conditions are as follows:
- it is up to a passenger to choose a plane to fly on; - if the chosen plane has *x* (*x*<=><=0) empty seats at the given moment, then the ticket for such a plane costs *x* zlotys (units of Polish currency).
The only ticket office of the airport already has a queue of *n* passengers in front of it. Lolek and Bolek have not stood in the queue yet, but they are already wondering what is the maximum and the minimum number of zlotys the airport administration can earn if all *n* passengers buy tickets according to the conditions of this offer?
The passengers buy tickets in turn, the first person in the queue goes first, then goes the second one, and so on up to *n*-th person.
Input Specification:
The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=1000) — the number of passengers in the queue and the number of planes in the airport, correspondingly. The next line contains *m* integers *a*1,<=*a*2,<=...,<=*a**m* (1<=≤<=*a**i*<=≤<=1000) — *a**i* stands for the number of empty seats in the *i*-th plane before the ticket office starts selling tickets.
The numbers in the lines are separated by a space. It is guaranteed that there are at least *n* empty seats in total.
Output Specification:
Print two integers — the maximum and the minimum number of zlotys that the airport administration can earn, correspondingly.
Demo Input:
['4 3\n2 1 1\n', '4 3\n2 2 2\n']
Demo Output:
['5 5\n', '7 6\n']
Note:
In the first test sample the number of passengers is equal to the number of empty seats, so regardless of the way the planes are chosen, the administration will earn the same sum.
In the second sample the sum is maximized if the 1-st person in the queue buys a ticket to the 1-st plane, the 2-nd person — to the 2-nd plane, the 3-rd person — to the 3-rd plane, the 4-th person — to the 1-st plane. The sum is minimized if the 1-st person in the queue buys a ticket to the 1-st plane, the 2-nd person — to the 1-st plane, the 3-rd person — to the 2-nd plane, the 4-th person — to the 2-nd plane.
|
```python
n,m=map(int,input().split(" "))
arr=list(map(int,input().split(" ")))
sum1=sum(arr)
brr=arr.copy()
s=s1=i=j=0
k=n
while (n!=0 and i!=m):
if i==m:
i=i%m
s=s+arr[i]
arr[i]-=1
n=n-1
if max(arr)==arr[i]:
pass
else:
i=i+1
brr.sort()
while (k!=0 and j!=m):
s1=s1+brr[j]
brr[j]-=1
k-=1
if brr[j]==0:
j=j+1
else:
pass
print(s,s1)
```
| 0
|
|
496
|
B
|
Secret Combination
|
PROGRAMMING
| 1,500
|
[
"brute force",
"constructive algorithms",
"implementation"
] | null | null |
You got a box with a combination lock. The lock has a display showing *n* digits. There are two buttons on the box, each button changes digits on the display. You have quickly discovered that the first button adds 1 to all the digits (all digits 9 become digits 0), and the second button shifts all the digits on the display one position to the right (the last digit becomes the first one). For example, if the display is currently showing number 579, then if we push the first button, the display will show 680, and if after that we push the second button, the display will show 068.
You know that the lock will open if the display is showing the smallest possible number that can be obtained by pushing the buttons in some order. The leading zeros are ignored while comparing numbers. Now your task is to find the desired number.
|
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of digits on the display.
The second line contains *n* digits — the initial state of the display.
|
Print a single line containing *n* digits — the desired state of the display containing the smallest possible number.
|
[
"3\n579\n",
"4\n2014\n"
] |
[
"024\n",
"0142\n"
] |
none
| 1,000
|
[
{
"input": "3\n579",
"output": "024"
},
{
"input": "4\n2014",
"output": "0142"
},
{
"input": "1\n1",
"output": "0"
},
{
"input": "3\n039",
"output": "014"
},
{
"input": "4\n4444",
"output": "0000"
},
{
"input": "5\n46802",
"output": "02468"
},
{
"input": "10\n4447444444",
"output": "0000000003"
},
{
"input": "10\n5810438174",
"output": "0147609473"
},
{
"input": "30\n027027027027027027027027027027",
"output": "027027027027027027027027027027"
},
{
"input": "50\n41012516454101251645410125164541012516454101251645",
"output": "01076781720107678172010767817201076781720107678172"
},
{
"input": "72\n464553044645330446455304464553064645530445455304464553044645530446455304",
"output": "001011960020119600201196002011960020119600201996002011960020119620201196"
},
{
"input": "100\n2144315253572020279108092911160072328496568665545836825277616363478721946398140227406814602154768031",
"output": "0005996121738545755443472571416650525236761083528703911639570359104365792010332041424619191680979818"
},
{
"input": "200\n79025531557298703099245700860027432585447902553155729870309924570086002743258544790255315572987030992457008600274325854479025531557298703099245700860027432585447902553155729870309924570086002743258544",
"output": "00274325854479025531557298703099245700860027432585447902553155729870309924570086002743258544790255315572987030992457008600274325854479025531557298703099245700860027432585447902553155729870309924570086"
},
{
"input": "100\n6669666666666666666866266666666666666666666666666666666666666666626666666666666966666766665667666656",
"output": "0000000000000000000000000000000000000000006000000000000030000010000900100009000030000000000000002006"
},
{
"input": "1\n0",
"output": "0"
}
] | 1,698,635,198
| 2,147,483,647
|
Python 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 12
| 2,000
| 6,041,600
|
n = int(input())
myString = input()
myList=[]
for char in myString:
x = 10 -int(char)
myNewString=myString
ch=''
for newChar in myNewString:
myDigit=int(newChar)+x
if myDigit>=10:
myDigit=abs(myDigit-10)
ch+=str(myDigit)
myList.append(ch)
myBigList=[]
for element in myList:
l=[]
for char in element:
ch=element[len(element)-1]
ch+=element[:len(element)-1]
element=ch
l.append(ch)
myBigList.append(l)
myMin=myBigList[0][0]
for row in myBigList:
for element in row:
if int(element)<int(myMin):
myMin=element
print(myMin)
|
Title: Secret Combination
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You got a box with a combination lock. The lock has a display showing *n* digits. There are two buttons on the box, each button changes digits on the display. You have quickly discovered that the first button adds 1 to all the digits (all digits 9 become digits 0), and the second button shifts all the digits on the display one position to the right (the last digit becomes the first one). For example, if the display is currently showing number 579, then if we push the first button, the display will show 680, and if after that we push the second button, the display will show 068.
You know that the lock will open if the display is showing the smallest possible number that can be obtained by pushing the buttons in some order. The leading zeros are ignored while comparing numbers. Now your task is to find the desired number.
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of digits on the display.
The second line contains *n* digits — the initial state of the display.
Output Specification:
Print a single line containing *n* digits — the desired state of the display containing the smallest possible number.
Demo Input:
['3\n579\n', '4\n2014\n']
Demo Output:
['024\n', '0142\n']
Note:
none
|
```python
n = int(input())
myString = input()
myList=[]
for char in myString:
x = 10 -int(char)
myNewString=myString
ch=''
for newChar in myNewString:
myDigit=int(newChar)+x
if myDigit>=10:
myDigit=abs(myDigit-10)
ch+=str(myDigit)
myList.append(ch)
myBigList=[]
for element in myList:
l=[]
for char in element:
ch=element[len(element)-1]
ch+=element[:len(element)-1]
element=ch
l.append(ch)
myBigList.append(l)
myMin=myBigList[0][0]
for row in myBigList:
for element in row:
if int(element)<int(myMin):
myMin=element
print(myMin)
```
| 0
|
|
1
|
A
|
Theatre Square
|
PROGRAMMING
| 1,000
|
[
"math"
] |
A. Theatre Square
|
1
|
256
|
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
|
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
|
Write the needed number of flagstones.
|
[
"6 6 4\n"
] |
[
"4\n"
] |
none
| 0
|
[
{
"input": "6 6 4",
"output": "4"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "2 1 1",
"output": "2"
},
{
"input": "1 2 1",
"output": "2"
},
{
"input": "2 2 1",
"output": "4"
},
{
"input": "2 1 2",
"output": "1"
},
{
"input": "1 1 3",
"output": "1"
},
{
"input": "2 3 4",
"output": "1"
},
{
"input": "1000000000 1000000000 1",
"output": "1000000000000000000"
},
{
"input": "12 13 4",
"output": "12"
},
{
"input": "222 332 5",
"output": "3015"
},
{
"input": "1000 1000 10",
"output": "10000"
},
{
"input": "1001 1000 10",
"output": "10100"
},
{
"input": "100 10001 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 999999999",
"output": "4"
},
{
"input": "1000000000 1000000000 192",
"output": "27126743055556"
},
{
"input": "1000000000 987654321 1",
"output": "987654321000000000"
},
{
"input": "456784567 1000000000 51",
"output": "175618850864484"
},
{
"input": "39916800 134217728 40320",
"output": "3295710"
}
] | 1,653,295,193
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 0
| 31
| 0
|
m,n,a=map(int,input().split())
s=((m+a-1)/a)*((n+a-1)/a)
print(s)
|
Title: Theatre Square
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
Input Specification:
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
Output Specification:
Write the needed number of flagstones.
Demo Input:
['6 6 4\n']
Demo Output:
['4\n']
Note:
none
|
```python
m,n,a=map(int,input().split())
s=((m+a-1)/a)*((n+a-1)/a)
print(s)
```
| 0
|
44
|
A
|
Indian Summer
|
PROGRAMMING
| 900
|
[
"implementation"
] |
A. Indian Summer
|
2
|
256
|
Indian summer is such a beautiful time of the year! A girl named Alyona is walking in the forest and picking a bouquet from fallen leaves. Alyona is very choosy — she doesn't take a leaf if it matches the color and the species of the tree of one of the leaves she already has. Find out how many leaves Alyona has picked.
|
The first line contains an integer *n* (1<=≤<=*n*<=≤<=100) — the number of leaves Alyona has found. The next *n* lines contain the leaves' descriptions. Each leaf is characterized by the species of the tree it has fallen from and by the color. The species of the trees and colors are given in names, consisting of no more than 10 lowercase Latin letters. A name can not be an empty string. The species of a tree and the color are given in each line separated by a space.
|
Output the single number — the number of Alyona's leaves.
|
[
"5\nbirch yellow\nmaple red\nbirch yellow\nmaple yellow\nmaple green\n",
"3\noak yellow\noak yellow\noak yellow\n"
] |
[
"4\n",
"1\n"
] |
none
| 0
|
[
{
"input": "5\nbirch yellow\nmaple red\nbirch yellow\nmaple yellow\nmaple green",
"output": "4"
},
{
"input": "3\noak yellow\noak yellow\noak yellow",
"output": "1"
},
{
"input": "5\nxbnbkzn hp\nkaqkl vrgzbvqstu\nj aqidx\nhos gyul\nwefxmh tygpluae",
"output": "5"
},
{
"input": "1\nqvwli hz",
"output": "1"
},
{
"input": "4\nsrhk x\nsrhk x\nqfoe vnrjuab\nqfoe vnrjuab",
"output": "2"
},
{
"input": "4\nsddqllmmpk syded\nfprsq fnenjnaz\nn hdej\nsddqllmmpk syded",
"output": "3"
},
{
"input": "17\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw\njtbctslqq tosqzw",
"output": "1"
},
{
"input": "18\nb d\nrfdb esp\nrfdb esp\nb d\nrfdb esp\nrfdb esp\nb d\nb d\nrfdb esp\nrfdb esp\nb d\nrfdb esp\nb d\nrfdb esp\nb d\nb d\nrfdb esp\nrfdb esp",
"output": "2"
},
{
"input": "13\nsvpzwtwn rykzfdce\nqweiyeck jkreouy\nhk nnli\ntwxrnbbdt vtuv\nxokqjtylly sz\nesdt dbfidjslq\ng ybqgomvw\nxcpfjmf zcqvz\nifajadhj invzueip\nvdemdnxifb hckwebmi\nsdpnhipam wvowzavh\nuqdlfskhgo vunbpghae\ne dtigwnb",
"output": "13"
},
{
"input": "20\nm vkfh\nvptikamead mvx\nitu mf\nklruxckw aqega\nekqkd enjllwol\ncc uybfdh\nimrfdngvo u\ne uh\ntwt jsslcfuogk\nbljwqsag tuqbdn\nqcv q\nasx gzhvwwmajj\nqcv q\nekqkd enjllwol\nasx gzhvwwmajj\nks vv\nkzyfi cn\ncc uybfdh\nitu mf\ncjbjhtbyvk vatwfmux",
"output": "15"
},
{
"input": "2\nab ab\na bab",
"output": "2"
}
] | 1,671,872,997
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 29
| 154
| 0
|
n_1=int(input())
arr_1=[]
for i in range(n_1):
s=input()
arr_1.append(s)
set_1=set(arr_1)
print(len(set_1))
|
Title: Indian Summer
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Indian summer is such a beautiful time of the year! A girl named Alyona is walking in the forest and picking a bouquet from fallen leaves. Alyona is very choosy — she doesn't take a leaf if it matches the color and the species of the tree of one of the leaves she already has. Find out how many leaves Alyona has picked.
Input Specification:
The first line contains an integer *n* (1<=≤<=*n*<=≤<=100) — the number of leaves Alyona has found. The next *n* lines contain the leaves' descriptions. Each leaf is characterized by the species of the tree it has fallen from and by the color. The species of the trees and colors are given in names, consisting of no more than 10 lowercase Latin letters. A name can not be an empty string. The species of a tree and the color are given in each line separated by a space.
Output Specification:
Output the single number — the number of Alyona's leaves.
Demo Input:
['5\nbirch yellow\nmaple red\nbirch yellow\nmaple yellow\nmaple green\n', '3\noak yellow\noak yellow\noak yellow\n']
Demo Output:
['4\n', '1\n']
Note:
none
|
```python
n_1=int(input())
arr_1=[]
for i in range(n_1):
s=input()
arr_1.append(s)
set_1=set(arr_1)
print(len(set_1))
```
| 3.9615
|
551
|
A
|
GukiZ and Contest
|
PROGRAMMING
| 800
|
[
"brute force",
"implementation",
"sortings"
] | null | null |
Professor GukiZ likes programming contests. He especially likes to rate his students on the contests he prepares. Now, he has decided to prepare a new contest.
In total, *n* students will attend, and before the start, every one of them has some positive integer rating. Students are indexed from 1 to *n*. Let's denote the rating of *i*-th student as *a**i*. After the contest ends, every student will end up with some positive integer position. GukiZ expects that his students will take places according to their ratings.
He thinks that each student will take place equal to . In particular, if student *A* has rating strictly lower then student *B*, *A* will get the strictly better position than *B*, and if two students have equal ratings, they will share the same position.
GukiZ would like you to reconstruct the results by following his expectations. Help him and determine the position after the end of the contest for each of his students if everything goes as expected.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=2000), number of GukiZ's students.
The second line contains *n* numbers *a*1,<=*a*2,<=... *a**n* (1<=≤<=*a**i*<=≤<=2000) where *a**i* is the rating of *i*-th student (1<=≤<=*i*<=≤<=*n*).
|
In a single line, print the position after the end of the contest for each of *n* students in the same order as they appear in the input.
|
[
"3\n1 3 3\n",
"1\n1\n",
"5\n3 5 3 4 5\n"
] |
[
"3 1 1\n",
"1\n",
"4 1 4 3 1\n"
] |
In the first sample, students 2 and 3 are positioned first (there is no other student with higher rating), and student 1 is positioned third since there are two students with higher rating.
In the second sample, first student is the only one on the contest.
In the third sample, students 2 and 5 share the first position with highest rating, student 4 is next with third position, and students 1 and 3 are the last sharing fourth position.
| 500
|
[
{
"input": "3\n1 3 3",
"output": "3 1 1"
},
{
"input": "1\n1",
"output": "1"
},
{
"input": "5\n3 5 3 4 5",
"output": "4 1 4 3 1"
},
{
"input": "7\n1 3 5 4 2 2 1",
"output": "6 3 1 2 4 4 6"
},
{
"input": "11\n5 6 4 2 9 7 6 6 6 6 7",
"output": "9 4 10 11 1 2 4 4 4 4 2"
},
{
"input": "1\n2000",
"output": "1"
},
{
"input": "2\n2000 2000",
"output": "1 1"
},
{
"input": "3\n500 501 502",
"output": "3 2 1"
},
{
"input": "10\n105 106 1 1 1 11 1000 999 1000 999",
"output": "6 5 8 8 8 7 1 3 1 3"
},
{
"input": "6\n1 2 3 4 5 6",
"output": "6 5 4 3 2 1"
},
{
"input": "7\n6 5 4 3 2 1 1",
"output": "1 2 3 4 5 6 6"
},
{
"input": "8\n153 100 87 14 10 8 6 5",
"output": "1 2 3 4 5 6 7 8"
},
{
"input": "70\n11 54 37 62 1 46 13 17 38 47 28 15 63 5 61 34 49 66 32 59 3 41 58 28 23 62 41 64 20 5 14 41 10 37 51 32 65 46 61 8 15 19 16 44 31 42 19 46 66 25 26 58 60 5 19 18 69 53 20 40 45 27 24 41 32 23 57 56 62 10",
"output": "62 18 35 7 70 23 61 56 34 22 42 58 6 66 10 37 21 2 38 13 69 29 14 42 48 7 29 5 50 66 60 29 63 35 20 38 4 23 10 65 58 52 57 27 41 28 52 23 2 46 45 14 12 66 52 55 1 19 50 33 26 44 47 29 38 48 16 17 7 63"
},
{
"input": "5\n1 2000 1 1 2000",
"output": "3 1 3 3 1"
}
] | 1,671,082,257
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 36
| 468
| 0
|
z=int(input())
y=list(map(int,input().split()))
arr=[]
for a in y:
count=0
for b in y:
if a<b:
count+=1
arr.append(count+1)
print(*arr)
|
Title: GukiZ and Contest
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Professor GukiZ likes programming contests. He especially likes to rate his students on the contests he prepares. Now, he has decided to prepare a new contest.
In total, *n* students will attend, and before the start, every one of them has some positive integer rating. Students are indexed from 1 to *n*. Let's denote the rating of *i*-th student as *a**i*. After the contest ends, every student will end up with some positive integer position. GukiZ expects that his students will take places according to their ratings.
He thinks that each student will take place equal to . In particular, if student *A* has rating strictly lower then student *B*, *A* will get the strictly better position than *B*, and if two students have equal ratings, they will share the same position.
GukiZ would like you to reconstruct the results by following his expectations. Help him and determine the position after the end of the contest for each of his students if everything goes as expected.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=2000), number of GukiZ's students.
The second line contains *n* numbers *a*1,<=*a*2,<=... *a**n* (1<=≤<=*a**i*<=≤<=2000) where *a**i* is the rating of *i*-th student (1<=≤<=*i*<=≤<=*n*).
Output Specification:
In a single line, print the position after the end of the contest for each of *n* students in the same order as they appear in the input.
Demo Input:
['3\n1 3 3\n', '1\n1\n', '5\n3 5 3 4 5\n']
Demo Output:
['3 1 1\n', '1\n', '4 1 4 3 1\n']
Note:
In the first sample, students 2 and 3 are positioned first (there is no other student with higher rating), and student 1 is positioned third since there are two students with higher rating.
In the second sample, first student is the only one on the contest.
In the third sample, students 2 and 5 share the first position with highest rating, student 4 is next with third position, and students 1 and 3 are the last sharing fourth position.
|
```python
z=int(input())
y=list(map(int,input().split()))
arr=[]
for a in y:
count=0
for b in y:
if a<b:
count+=1
arr.append(count+1)
print(*arr)
```
| 3
|
|
617
|
A
|
Elephant
|
PROGRAMMING
| 800
|
[
"math"
] | null | null |
An elephant decided to visit his friend. It turned out that the elephant's house is located at point 0 and his friend's house is located at point *x*(*x*<=><=0) of the coordinate line. In one step the elephant can move 1, 2, 3, 4 or 5 positions forward. Determine, what is the minimum number of steps he need to make in order to get to his friend's house.
|
The first line of the input contains an integer *x* (1<=≤<=*x*<=≤<=1<=000<=000) — The coordinate of the friend's house.
|
Print the minimum number of steps that elephant needs to make to get from point 0 to point *x*.
|
[
"5\n",
"12\n"
] |
[
"1\n",
"3\n"
] |
In the first sample the elephant needs to make one step of length 5 to reach the point *x*.
In the second sample the elephant can get to point *x* if he moves by 3, 5 and 4. There are other ways to get the optimal answer but the elephant cannot reach *x* in less than three moves.
| 500
|
[
{
"input": "5",
"output": "1"
},
{
"input": "12",
"output": "3"
},
{
"input": "999999",
"output": "200000"
},
{
"input": "41",
"output": "9"
},
{
"input": "1000000",
"output": "200000"
},
{
"input": "1",
"output": "1"
},
{
"input": "2",
"output": "1"
},
{
"input": "3",
"output": "1"
},
{
"input": "4",
"output": "1"
},
{
"input": "534204",
"output": "106841"
},
{
"input": "469569",
"output": "93914"
},
{
"input": "502877",
"output": "100576"
},
{
"input": "942212",
"output": "188443"
},
{
"input": "97",
"output": "20"
},
{
"input": "53",
"output": "11"
},
{
"input": "89",
"output": "18"
},
{
"input": "574",
"output": "115"
},
{
"input": "716",
"output": "144"
},
{
"input": "729",
"output": "146"
},
{
"input": "8901",
"output": "1781"
},
{
"input": "3645",
"output": "729"
},
{
"input": "4426",
"output": "886"
},
{
"input": "46573",
"output": "9315"
},
{
"input": "86380",
"output": "17276"
},
{
"input": "94190",
"output": "18838"
},
{
"input": "999990",
"output": "199998"
},
{
"input": "999991",
"output": "199999"
},
{
"input": "999992",
"output": "199999"
},
{
"input": "999993",
"output": "199999"
},
{
"input": "999994",
"output": "199999"
},
{
"input": "999995",
"output": "199999"
},
{
"input": "999996",
"output": "200000"
},
{
"input": "999997",
"output": "200000"
},
{
"input": "999998",
"output": "200000"
}
] | 1,699,459,839
| 2,147,483,647
|
PyPy 3-64
|
OK
|
TESTS
| 34
| 62
| 0
|
import math
distance = int(input())
movement_counter = 0
while distance != 0:
if distance >= 5:
movement_counter += math.floor(distance / 5)
distance %= 5
else:
movement_counter += 1
distance = 0
print(movement_counter)
|
Title: Elephant
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
An elephant decided to visit his friend. It turned out that the elephant's house is located at point 0 and his friend's house is located at point *x*(*x*<=><=0) of the coordinate line. In one step the elephant can move 1, 2, 3, 4 or 5 positions forward. Determine, what is the minimum number of steps he need to make in order to get to his friend's house.
Input Specification:
The first line of the input contains an integer *x* (1<=≤<=*x*<=≤<=1<=000<=000) — The coordinate of the friend's house.
Output Specification:
Print the minimum number of steps that elephant needs to make to get from point 0 to point *x*.
Demo Input:
['5\n', '12\n']
Demo Output:
['1\n', '3\n']
Note:
In the first sample the elephant needs to make one step of length 5 to reach the point *x*.
In the second sample the elephant can get to point *x* if he moves by 3, 5 and 4. There are other ways to get the optimal answer but the elephant cannot reach *x* in less than three moves.
|
```python
import math
distance = int(input())
movement_counter = 0
while distance != 0:
if distance >= 5:
movement_counter += math.floor(distance / 5)
distance %= 5
else:
movement_counter += 1
distance = 0
print(movement_counter)
```
| 3
|
|
777
|
A
|
Shell Game
|
PROGRAMMING
| 1,000
|
[
"constructive algorithms",
"implementation",
"math"
] | null | null |
Bomboslav likes to look out of the window in his room and watch lads outside playing famous shell game. The game is played by two persons: operator and player. Operator takes three similar opaque shells and places a ball beneath one of them. Then he shuffles the shells by swapping some pairs and the player has to guess the current position of the ball.
Bomboslav noticed that guys are not very inventive, so the operator always swaps the left shell with the middle one during odd moves (first, third, fifth, etc.) and always swaps the middle shell with the right one during even moves (second, fourth, etc.).
Let's number shells from 0 to 2 from left to right. Thus the left shell is assigned number 0, the middle shell is 1 and the right shell is 2. Bomboslav has missed the moment when the ball was placed beneath the shell, but he knows that exactly *n* movements were made by the operator and the ball was under shell *x* at the end. Now he wonders, what was the initial position of the ball?
|
The first line of the input contains an integer *n* (1<=≤<=*n*<=≤<=2·109) — the number of movements made by the operator.
The second line contains a single integer *x* (0<=≤<=*x*<=≤<=2) — the index of the shell where the ball was found after *n* movements.
|
Print one integer from 0 to 2 — the index of the shell where the ball was initially placed.
|
[
"4\n2\n",
"1\n1\n"
] |
[
"1\n",
"0\n"
] |
In the first sample, the ball was initially placed beneath the middle shell and the operator completed four movements.
1. During the first move operator swapped the left shell and the middle shell. The ball is now under the left shell. 1. During the second move operator swapped the middle shell and the right one. The ball is still under the left shell. 1. During the third move operator swapped the left shell and the middle shell again. The ball is again in the middle. 1. Finally, the operators swapped the middle shell and the right shell. The ball is now beneath the right shell.
| 500
|
[
{
"input": "4\n2",
"output": "1"
},
{
"input": "1\n1",
"output": "0"
},
{
"input": "2\n2",
"output": "0"
},
{
"input": "3\n1",
"output": "1"
},
{
"input": "3\n2",
"output": "0"
},
{
"input": "3\n0",
"output": "2"
},
{
"input": "2000000000\n0",
"output": "1"
},
{
"input": "2\n0",
"output": "1"
},
{
"input": "2\n1",
"output": "2"
},
{
"input": "4\n0",
"output": "2"
},
{
"input": "4\n1",
"output": "0"
},
{
"input": "5\n0",
"output": "0"
},
{
"input": "5\n1",
"output": "2"
},
{
"input": "5\n2",
"output": "1"
},
{
"input": "6\n0",
"output": "0"
},
{
"input": "6\n1",
"output": "1"
},
{
"input": "6\n2",
"output": "2"
},
{
"input": "7\n0",
"output": "1"
},
{
"input": "7\n1",
"output": "0"
},
{
"input": "7\n2",
"output": "2"
},
{
"input": "100000\n0",
"output": "2"
},
{
"input": "100000\n1",
"output": "0"
},
{
"input": "100000\n2",
"output": "1"
},
{
"input": "99999\n1",
"output": "1"
},
{
"input": "99998\n1",
"output": "2"
},
{
"input": "99997\n1",
"output": "0"
},
{
"input": "99996\n1",
"output": "1"
},
{
"input": "99995\n1",
"output": "2"
},
{
"input": "1999999995\n0",
"output": "2"
},
{
"input": "1999999995\n1",
"output": "1"
},
{
"input": "1999999995\n2",
"output": "0"
},
{
"input": "1999999996\n0",
"output": "2"
},
{
"input": "1999999996\n1",
"output": "0"
},
{
"input": "1999999996\n2",
"output": "1"
},
{
"input": "1999999997\n0",
"output": "0"
},
{
"input": "1999999997\n1",
"output": "2"
},
{
"input": "1999999997\n2",
"output": "1"
},
{
"input": "1999999998\n0",
"output": "0"
},
{
"input": "1999999998\n1",
"output": "1"
},
{
"input": "1999999998\n2",
"output": "2"
},
{
"input": "1999999999\n0",
"output": "1"
},
{
"input": "1999999999\n1",
"output": "0"
},
{
"input": "1999999999\n2",
"output": "2"
},
{
"input": "2000000000\n1",
"output": "2"
},
{
"input": "2000000000\n2",
"output": "0"
},
{
"input": "1234567890\n0",
"output": "0"
},
{
"input": "1234567890\n1",
"output": "1"
},
{
"input": "1234567890\n2",
"output": "2"
},
{
"input": "123456789\n0",
"output": "2"
},
{
"input": "123456789\n1",
"output": "1"
},
{
"input": "123456789\n2",
"output": "0"
},
{
"input": "123456790\n0",
"output": "2"
},
{
"input": "12\n2",
"output": "2"
},
{
"input": "32\n1",
"output": "2"
},
{
"input": "20\n2",
"output": "0"
},
{
"input": "10\n1",
"output": "0"
},
{
"input": "1\n0",
"output": "1"
},
{
"input": "76994383\n1",
"output": "0"
},
{
"input": "25\n2",
"output": "2"
},
{
"input": "1\n2",
"output": "2"
},
{
"input": "12\n0",
"output": "0"
},
{
"input": "150\n2",
"output": "2"
},
{
"input": "15\n0",
"output": "2"
},
{
"input": "21\n2",
"output": "0"
},
{
"input": "18\n2",
"output": "2"
},
{
"input": "8\n2",
"output": "0"
},
{
"input": "10\n0",
"output": "2"
},
{
"input": "16\n0",
"output": "2"
}
] | 1,488,009,091
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 68
| 62
| 4,608,000
|
n=int(input())%6
x=int(input())
for i in range(n,0,-1):
if i%2 == 1 and x < 2:
x = 1 - x
elif i%2 == 0 and x > 0:
x = 3 - x
print(x)
|
Title: Shell Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Bomboslav likes to look out of the window in his room and watch lads outside playing famous shell game. The game is played by two persons: operator and player. Operator takes three similar opaque shells and places a ball beneath one of them. Then he shuffles the shells by swapping some pairs and the player has to guess the current position of the ball.
Bomboslav noticed that guys are not very inventive, so the operator always swaps the left shell with the middle one during odd moves (first, third, fifth, etc.) and always swaps the middle shell with the right one during even moves (second, fourth, etc.).
Let's number shells from 0 to 2 from left to right. Thus the left shell is assigned number 0, the middle shell is 1 and the right shell is 2. Bomboslav has missed the moment when the ball was placed beneath the shell, but he knows that exactly *n* movements were made by the operator and the ball was under shell *x* at the end. Now he wonders, what was the initial position of the ball?
Input Specification:
The first line of the input contains an integer *n* (1<=≤<=*n*<=≤<=2·109) — the number of movements made by the operator.
The second line contains a single integer *x* (0<=≤<=*x*<=≤<=2) — the index of the shell where the ball was found after *n* movements.
Output Specification:
Print one integer from 0 to 2 — the index of the shell where the ball was initially placed.
Demo Input:
['4\n2\n', '1\n1\n']
Demo Output:
['1\n', '0\n']
Note:
In the first sample, the ball was initially placed beneath the middle shell and the operator completed four movements.
1. During the first move operator swapped the left shell and the middle shell. The ball is now under the left shell. 1. During the second move operator swapped the middle shell and the right one. The ball is still under the left shell. 1. During the third move operator swapped the left shell and the middle shell again. The ball is again in the middle. 1. Finally, the operators swapped the middle shell and the right shell. The ball is now beneath the right shell.
|
```python
n=int(input())%6
x=int(input())
for i in range(n,0,-1):
if i%2 == 1 and x < 2:
x = 1 - x
elif i%2 == 0 and x > 0:
x = 3 - x
print(x)
```
| 3
|
|
71
|
A
|
Way Too Long Words
|
PROGRAMMING
| 800
|
[
"strings"
] |
A. Way Too Long Words
|
1
|
256
|
Sometimes some words like "localization" or "internationalization" are so long that writing them many times in one text is quite tiresome.
Let's consider a word too long, if its length is strictly more than 10 characters. All too long words should be replaced with a special abbreviation.
This abbreviation is made like this: we write down the first and the last letter of a word and between them we write the number of letters between the first and the last letters. That number is in decimal system and doesn't contain any leading zeroes.
Thus, "localization" will be spelt as "l10n", and "internationalization» will be spelt as "i18n".
You are suggested to automatize the process of changing the words with abbreviations. At that all too long words should be replaced by the abbreviation and the words that are not too long should not undergo any changes.
|
The first line contains an integer *n* (1<=≤<=*n*<=≤<=100). Each of the following *n* lines contains one word. All the words consist of lowercase Latin letters and possess the lengths of from 1 to 100 characters.
|
Print *n* lines. The *i*-th line should contain the result of replacing of the *i*-th word from the input data.
|
[
"4\nword\nlocalization\ninternationalization\npneumonoultramicroscopicsilicovolcanoconiosis\n"
] |
[
"word\nl10n\ni18n\np43s\n"
] |
none
| 500
|
[
{
"input": "4\nword\nlocalization\ninternationalization\npneumonoultramicroscopicsilicovolcanoconiosis",
"output": "word\nl10n\ni18n\np43s"
},
{
"input": "5\nabcdefgh\nabcdefghi\nabcdefghij\nabcdefghijk\nabcdefghijklm",
"output": "abcdefgh\nabcdefghi\nabcdefghij\na9k\na11m"
},
{
"input": "3\nnjfngnrurunrgunrunvurn\njfvnjfdnvjdbfvsbdubruvbubvkdb\nksdnvidnviudbvibd",
"output": "n20n\nj27b\nk15d"
},
{
"input": "1\ntcyctkktcctrcyvbyiuhihhhgyvyvyvyvjvytchjckt",
"output": "t41t"
},
{
"input": "24\nyou\nare\nregistered\nfor\npractice\nyou\ncan\nsolve\nproblems\nunofficially\nresults\ncan\nbe\nfound\nin\nthe\ncontest\nstatus\nand\nin\nthe\nbottom\nof\nstandings",
"output": "you\nare\nregistered\nfor\npractice\nyou\ncan\nsolve\nproblems\nu10y\nresults\ncan\nbe\nfound\nin\nthe\ncontest\nstatus\nand\nin\nthe\nbottom\nof\nstandings"
},
{
"input": "1\na",
"output": "a"
},
{
"input": "26\na\nb\nc\nd\ne\nf\ng\nh\ni\nj\nk\nl\nm\nn\no\np\nq\nr\ns\nt\nu\nv\nw\nx\ny\nz",
"output": "a\nb\nc\nd\ne\nf\ng\nh\ni\nj\nk\nl\nm\nn\no\np\nq\nr\ns\nt\nu\nv\nw\nx\ny\nz"
},
{
"input": "1\nabcdefghijabcdefghijabcdefghijabcdefghijabcdefghijabcdefghijabcdefghijabcdefghijabcdefghijabcdefghij",
"output": "a98j"
},
{
"input": "10\ngyartjdxxlcl\nfzsck\nuidwu\nxbymclornemdmtj\nilppyoapitawgje\ncibzc\ndrgbeu\nhezplmsdekhhbo\nfeuzlrimbqbytdu\nkgdco",
"output": "g10l\nfzsck\nuidwu\nx13j\ni13e\ncibzc\ndrgbeu\nh12o\nf13u\nkgdco"
},
{
"input": "20\nlkpmx\nkovxmxorlgwaomlswjxlpnbvltfv\nhykasjxqyjrmybejnmeumzha\ntuevlumpqbbhbww\nqgqsphvrmupxxc\ntrissbaf\nqfgrlinkzvzqdryckaizutd\nzzqtoaxkvwoscyx\noswytrlnhpjvvnwookx\nlpuzqgec\ngyzqfwxggtvpjhzmzmdw\nrlxjgmvdftvrmvbdwudra\nvsntnjpepnvdaxiporggmglhagv\nxlvcqkqgcrbgtgglj\nlyxwxbiszyhlsrgzeedzprbmcpduvq\nyrmqqvrkqskqukzqrwukpsifgtdc\nxpuohcsjhhuhvr\nvvlfrlxpvqejngwrbfbpmqeirxlw\nsvmasocxdvadmaxtrpakysmeaympy\nyuflqboqfdt",
"output": "lkpmx\nk26v\nh22a\nt13w\nq12c\ntrissbaf\nq21d\nz13x\no17x\nlpuzqgec\ng18w\nr19a\nv25v\nx15j\nl28q\ny26c\nx12r\nv26w\ns27y\ny9t"
},
{
"input": "100\nm\nz\ns\nv\nd\nr\nv\ny\ny\ne\np\nt\nc\na\nn\nm\np\ng\ni\nj\nc\na\nb\nq\ne\nn\nv\no\nk\nx\nf\ni\nl\na\nq\nr\nu\nb\ns\nl\nc\nl\ne\nv\nj\nm\nx\nb\na\nq\nb\na\nf\nj\nv\nm\nq\nc\nt\nt\nn\nx\no\ny\nr\nu\nh\nm\nj\np\nj\nq\nz\ns\nj\no\ng\nc\nm\nn\no\nm\nr\no\ns\nt\nh\nr\np\nk\nb\nz\ng\no\nc\nc\nz\nz\ng\nr",
"output": "m\nz\ns\nv\nd\nr\nv\ny\ny\ne\np\nt\nc\na\nn\nm\np\ng\ni\nj\nc\na\nb\nq\ne\nn\nv\no\nk\nx\nf\ni\nl\na\nq\nr\nu\nb\ns\nl\nc\nl\ne\nv\nj\nm\nx\nb\na\nq\nb\na\nf\nj\nv\nm\nq\nc\nt\nt\nn\nx\no\ny\nr\nu\nh\nm\nj\np\nj\nq\nz\ns\nj\no\ng\nc\nm\nn\no\nm\nr\no\ns\nt\nh\nr\np\nk\nb\nz\ng\no\nc\nc\nz\nz\ng\nr"
}
] | 1,675,683,268
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 1
| 46
| 0
|
n=int(input())
for i in range (n):
word=input()
s=len(word)
if s>=10:
print(word[0]+str(s-2)+word[-1])
else:
print(word)
|
Title: Way Too Long Words
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Sometimes some words like "localization" or "internationalization" are so long that writing them many times in one text is quite tiresome.
Let's consider a word too long, if its length is strictly more than 10 characters. All too long words should be replaced with a special abbreviation.
This abbreviation is made like this: we write down the first and the last letter of a word and between them we write the number of letters between the first and the last letters. That number is in decimal system and doesn't contain any leading zeroes.
Thus, "localization" will be spelt as "l10n", and "internationalization» will be spelt as "i18n".
You are suggested to automatize the process of changing the words with abbreviations. At that all too long words should be replaced by the abbreviation and the words that are not too long should not undergo any changes.
Input Specification:
The first line contains an integer *n* (1<=≤<=*n*<=≤<=100). Each of the following *n* lines contains one word. All the words consist of lowercase Latin letters and possess the lengths of from 1 to 100 characters.
Output Specification:
Print *n* lines. The *i*-th line should contain the result of replacing of the *i*-th word from the input data.
Demo Input:
['4\nword\nlocalization\ninternationalization\npneumonoultramicroscopicsilicovolcanoconiosis\n']
Demo Output:
['word\nl10n\ni18n\np43s\n']
Note:
none
|
```python
n=int(input())
for i in range (n):
word=input()
s=len(word)
if s>=10:
print(word[0]+str(s-2)+word[-1])
else:
print(word)
```
| 0
|
1,010
|
A
|
Fly
|
PROGRAMMING
| 1,500
|
[
"binary search",
"math"
] | null | null |
Natasha is going to fly on a rocket to Mars and return to Earth. Also, on the way to Mars, she will land on $n - 2$ intermediate planets. Formally: we number all the planets from $1$ to $n$. $1$ is Earth, $n$ is Mars. Natasha will make exactly $n$ flights: $1 \to 2 \to \ldots n \to 1$.
Flight from $x$ to $y$ consists of two phases: take-off from planet $x$ and landing to planet $y$. This way, the overall itinerary of the trip will be: the $1$-st planet $\to$ take-off from the $1$-st planet $\to$ landing to the $2$-nd planet $\to$ $2$-nd planet $\to$ take-off from the $2$-nd planet $\to$ $\ldots$ $\to$ landing to the $n$-th planet $\to$ the $n$-th planet $\to$ take-off from the $n$-th planet $\to$ landing to the $1$-st planet $\to$ the $1$-st planet.
The mass of the rocket together with all the useful cargo (but without fuel) is $m$ tons. However, Natasha does not know how much fuel to load into the rocket. Unfortunately, fuel can only be loaded on Earth, so if the rocket runs out of fuel on some other planet, Natasha will not be able to return home. Fuel is needed to take-off from each planet and to land to each planet. It is known that $1$ ton of fuel can lift off $a_i$ tons of rocket from the $i$-th planet or to land $b_i$ tons of rocket onto the $i$-th planet.
For example, if the weight of rocket is $9$ tons, weight of fuel is $3$ tons and take-off coefficient is $8$ ($a_i = 8$), then $1.5$ tons of fuel will be burnt (since $1.5 \cdot 8 = 9 + 3$). The new weight of fuel after take-off will be $1.5$ tons.
Please note, that it is allowed to burn non-integral amount of fuel during take-off or landing, and the amount of initial fuel can be non-integral as well.
Help Natasha to calculate the minimum mass of fuel to load into the rocket. Note, that the rocket must spend fuel to carry both useful cargo and the fuel itself. However, it doesn't need to carry the fuel which has already been burnt. Assume, that the rocket takes off and lands instantly.
|
The first line contains a single integer $n$ ($2 \le n \le 1000$) — number of planets.
The second line contains the only integer $m$ ($1 \le m \le 1000$) — weight of the payload.
The third line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 1000$), where $a_i$ is the number of tons, which can be lifted off by one ton of fuel.
The fourth line contains $n$ integers $b_1, b_2, \ldots, b_n$ ($1 \le b_i \le 1000$), where $b_i$ is the number of tons, which can be landed by one ton of fuel.
It is guaranteed, that if Natasha can make a flight, then it takes no more than $10^9$ tons of fuel.
|
If Natasha can fly to Mars through $(n - 2)$ planets and return to Earth, print the minimum mass of fuel (in tons) that Natasha should take. Otherwise, print a single number $-1$.
It is guaranteed, that if Natasha can make a flight, then it takes no more than $10^9$ tons of fuel.
The answer will be considered correct if its absolute or relative error doesn't exceed $10^{-6}$. Formally, let your answer be $p$, and the jury's answer be $q$. Your answer is considered correct if $\frac{|p - q|}{\max{(1, |q|)}} \le 10^{-6}$.
|
[
"2\n12\n11 8\n7 5\n",
"3\n1\n1 4 1\n2 5 3\n",
"6\n2\n4 6 3 3 5 6\n2 6 3 6 5 3\n"
] |
[
"10.0000000000\n",
"-1\n",
"85.4800000000\n"
] |
Let's consider the first example.
Initially, the mass of a rocket with fuel is $22$ tons.
- At take-off from Earth one ton of fuel can lift off $11$ tons of cargo, so to lift off $22$ tons you need to burn $2$ tons of fuel. Remaining weight of the rocket with fuel is $20$ tons.- During landing on Mars, one ton of fuel can land $5$ tons of cargo, so for landing $20$ tons you will need to burn $4$ tons of fuel. There will be $16$ tons of the rocket with fuel remaining.- While taking off from Mars, one ton of fuel can raise $8$ tons of cargo, so to lift off $16$ tons you will need to burn $2$ tons of fuel. There will be $14$ tons of rocket with fuel after that.- During landing on Earth, one ton of fuel can land $7$ tons of cargo, so for landing $14$ tons you will need to burn $2$ tons of fuel. Remaining weight is $12$ tons, that is, a rocket without any fuel.
In the second case, the rocket will not be able even to take off from Earth.
| 500
|
[
{
"input": "2\n12\n11 8\n7 5",
"output": "10.0000000000"
},
{
"input": "3\n1\n1 4 1\n2 5 3",
"output": "-1"
},
{
"input": "6\n2\n4 6 3 3 5 6\n2 6 3 6 5 3",
"output": "85.4800000000"
},
{
"input": "3\n3\n1 2 1\n2 2 2",
"output": "-1"
},
{
"input": "4\n4\n2 3 2 2\n2 3 4 3",
"output": "284.0000000000"
},
{
"input": "5\n2\n1 2 2 1 2\n4 5 1 4 1",
"output": "-1"
},
{
"input": "7\n7\n3 2 6 2 2 2 5\n4 7 5 6 2 2 2",
"output": "4697.0000000000"
},
{
"input": "2\n1000\n12 34\n56 78",
"output": "159.2650775220"
},
{
"input": "8\n4\n1 1 4 1 3 1 8 1\n1 1 1 1 1 3 1 2",
"output": "-1"
},
{
"input": "9\n2\n8 7 1 1 3 7 1 2 4\n4 1 1 8 7 7 1 1 5",
"output": "-1"
},
{
"input": "10\n10\n9 8 8 7 2 10 2 9 2 4\n3 10 6 2 6 6 5 9 4 5",
"output": "3075.7142857143"
},
{
"input": "20\n12\n3 9 12 13 16 18 9 9 19 7 2 5 17 14 7 7 15 16 5 7\n16 9 13 5 14 10 4 3 16 16 12 20 17 11 4 5 5 14 6 15",
"output": "4670.8944493007"
},
{
"input": "30\n5\n25 1 28 1 27 25 24 1 28 1 12 1 29 16 1 1 1 1 27 1 24 1 1 1 1 1 1 1 30 3\n1 22 1 1 24 2 13 1 16 21 1 27 14 16 1 1 7 1 1 18 1 23 10 1 15 16 16 15 10 1",
"output": "-1"
},
{
"input": "40\n13\n1 1 1 23 21 1 1 1 1 1 40 32 1 21 1 8 1 1 36 15 33 1 30 1 1 37 22 1 4 39 7 1 9 37 1 1 1 28 1 1\n1 34 17 1 38 20 8 14 1 18 29 3 21 21 18 14 1 11 1 1 23 1 25 1 14 1 7 31 9 20 25 1 1 1 1 8 26 12 1 1",
"output": "-1"
},
{
"input": "50\n19\n17 7 13 42 19 25 10 25 2 36 17 40 30 48 34 43 34 20 5 15 8 7 43 35 21 40 40 19 30 11 49 7 24 23 43 30 38 49 10 8 30 11 28 50 48 25 25 20 48 24\n49 35 10 22 24 50 50 7 6 13 16 35 12 43 50 44 35 33 38 49 26 18 23 37 7 38 23 20 28 48 41 16 6 32 32 34 11 39 38 9 38 23 16 31 37 47 33 20 46 30",
"output": "7832.1821424977"
},
{
"input": "60\n21\n11 35 1 28 39 13 19 56 13 13 21 25 1 1 23 1 52 26 53 1 1 1 30 39 1 7 1 1 3 1 1 10 1 1 37 1 1 25 1 1 1 53 1 3 48 1 6 5 4 15 1 14 25 53 25 38 27 1 1 1\n1 1 1 35 40 58 10 22 1 56 1 59 1 6 33 1 1 1 1 18 14 1 1 40 25 47 1 34 1 1 53 1 1 25 1 45 1 1 25 34 3 1 1 1 53 27 11 58 1 1 1 10 12 1 1 1 31 52 1 1",
"output": "-1"
},
{
"input": "70\n69\n70 66 57 58 24 60 39 2 48 61 65 22 10 26 68 62 48 25 12 14 45 57 6 30 48 15 46 33 42 28 69 42 64 25 24 8 62 12 68 53 55 20 32 70 3 5 41 49 16 26 2 34 34 20 39 65 18 47 62 31 39 28 61 67 7 14 31 31 53 54\n40 33 24 20 68 20 22 39 53 56 48 38 59 45 47 46 7 69 11 58 61 40 35 38 62 66 18 36 44 48 67 24 14 27 67 63 68 30 50 6 58 7 6 35 20 58 6 12 12 23 14 2 63 27 29 22 49 16 55 40 70 27 27 70 42 38 66 55 69 47",
"output": "217989.4794743629"
},
{
"input": "80\n21\n65 4 26 25 1 1 1 1 1 1 60 1 29 43 48 6 48 13 29 1 1 62 1 1 1 1 1 1 1 26 9 1 22 1 35 13 66 36 1 1 1 38 55 21 70 1 58 70 1 1 38 1 1 20 1 1 51 1 1 28 1 23 11 1 39 47 1 52 41 1 63 1 1 52 1 45 11 10 80 1\n1 1 25 30 1 1 55 54 1 48 10 37 22 1 74 1 78 13 1 65 32 1 1 1 1 69 5 59 1 1 65 1 40 1 31 1 1 75 54 1 60 1 1 1 1 1 1 1 11 29 36 1 72 71 52 1 1 1 37 1 1 75 43 9 53 1 62 1 29 1 40 27 59 74 41 53 19 30 1 73",
"output": "-1"
},
{
"input": "90\n35\n1 68 16 30 24 1 1 1 35 1 1 67 1 1 1 1 33 16 37 77 83 1 77 26 1 1 68 67 70 62 1 47 1 1 1 84 1 65 1 32 83 1 1 1 28 1 71 76 84 1 1 5 1 74 10 1 1 1 38 87 13 1 7 66 81 49 1 9 1 11 1 25 1 1 1 1 7 1 1 36 61 47 51 1 1 69 40 1 37 1\n40 1 21 1 19 51 37 52 64 1 86 1 5 24 1 1 1 19 36 1 1 77 24 4 1 18 89 1 1 1 1 1 29 22 1 80 32 36 6 1 63 1 30 1 1 1 86 79 73 52 9 1 1 11 7 1 25 20 1 20 1 49 1 37 1 41 1 1 1 1 54 55 1 10 1 1 1 1 1 1 66 1 68 1 1 1 1 53 1 1",
"output": "-1"
},
{
"input": "2\n1\n1 1\n1 1",
"output": "-1"
},
{
"input": "2\n1\n1 1\n2 2",
"output": "-1"
},
{
"input": "2\n1\n2 2\n1 1",
"output": "-1"
},
{
"input": "2\n1\n2 2\n2 2",
"output": "15.0000000000"
},
{
"input": "2\n2\n1 1\n1 1",
"output": "-1"
},
{
"input": "2\n2\n1 1\n2 2",
"output": "-1"
},
{
"input": "2\n2\n2 2\n1 1",
"output": "-1"
},
{
"input": "2\n2\n2 2\n2 2",
"output": "30.0000000000"
},
{
"input": "40\n55\n1 382 1 1 1 629 111 689 396 614 1 1 995 148 7 820 913 1 1 169 157 1 702 1 159 1 1 226 1 253 1 319 1 130 1 1 1 466 1 756\n1 23 555 1 412 1 1 373 316 234 888 1 112 818 33 443 313 1 235 1 1 610 110 535 1 445 1 386 1 1 758 1 292 1 862 1 244 428 530 1",
"output": "-1"
},
{
"input": "49\n1\n100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100 100\n3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3",
"output": "695580114.6380882263"
},
{
"input": "2\n12\n11 8\n1 1",
"output": "-1"
},
{
"input": "3\n3\n7 11 17\n19 31 33",
"output": "1.6012429470"
}
] | 1,613,119,053
| 2,147,483,647
|
PyPy 3
|
WRONG_ANSWER
|
TESTS
| 57
| 280
| 10,240,000
|
###### ### ####### ####### ## # ##### ### #####
# # # # # # # # # # # # # ###
# # # # # # # # # # # # # ###
###### ######### # # # # # # ######### #
###### ######### # # # # # # ######### #
# # # # # # # # # # #### # # #
# # # # # # # ## # # # # #
###### # # ####### ####### # # ##### # # # #
# from __future__ import print_function # for PyPy2
from collections import Counter, OrderedDict
from itertools import permutations as perm
from fractions import Fraction
from collections import deque
from sys import stdin
from bisect import *
from heapq import *
from math import *
g = lambda : stdin.readline().strip()
gl = lambda : g().split()
gil = lambda : [int(var) for var in gl()]
gfl = lambda : [float(var) for var in gl()]
gcl = lambda : list(g())
gbs = lambda : [int(var) for var in g()]
mod = int(1e9)+7
inf = float("inf")
n, = gil()
w, = gil()
lift, land = gil(), gil()
def isPos(fw):
# print(fw)
cw = w + fw
delta = (cw/lift[0])
fw -= delta
cw -= delta
if fw <= 0:
return False
for i in range(1, n):
delta = (cw/land[i])
fw -= delta
cw -= delta
if fw <= 0: return False
delta = (cw/lift[i])
fw -= delta
cw -= delta
if fw <= 0: return False
if fw <= 0: return False
delta = cw/land[0]
fw -= delta
return False if fw < 0 else True
ans = -1
l, r = float(0), float(1e9)
d = float(1e-6)
# d = 1
while l <= r:
mid = (l+r)/2
if isPos(mid):
ans = mid
r = mid - d
else:
l = mid + d
print(round(ans, 6))
|
Title: Fly
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Natasha is going to fly on a rocket to Mars and return to Earth. Also, on the way to Mars, she will land on $n - 2$ intermediate planets. Formally: we number all the planets from $1$ to $n$. $1$ is Earth, $n$ is Mars. Natasha will make exactly $n$ flights: $1 \to 2 \to \ldots n \to 1$.
Flight from $x$ to $y$ consists of two phases: take-off from planet $x$ and landing to planet $y$. This way, the overall itinerary of the trip will be: the $1$-st planet $\to$ take-off from the $1$-st planet $\to$ landing to the $2$-nd planet $\to$ $2$-nd planet $\to$ take-off from the $2$-nd planet $\to$ $\ldots$ $\to$ landing to the $n$-th planet $\to$ the $n$-th planet $\to$ take-off from the $n$-th planet $\to$ landing to the $1$-st planet $\to$ the $1$-st planet.
The mass of the rocket together with all the useful cargo (but without fuel) is $m$ tons. However, Natasha does not know how much fuel to load into the rocket. Unfortunately, fuel can only be loaded on Earth, so if the rocket runs out of fuel on some other planet, Natasha will not be able to return home. Fuel is needed to take-off from each planet and to land to each planet. It is known that $1$ ton of fuel can lift off $a_i$ tons of rocket from the $i$-th planet or to land $b_i$ tons of rocket onto the $i$-th planet.
For example, if the weight of rocket is $9$ tons, weight of fuel is $3$ tons and take-off coefficient is $8$ ($a_i = 8$), then $1.5$ tons of fuel will be burnt (since $1.5 \cdot 8 = 9 + 3$). The new weight of fuel after take-off will be $1.5$ tons.
Please note, that it is allowed to burn non-integral amount of fuel during take-off or landing, and the amount of initial fuel can be non-integral as well.
Help Natasha to calculate the minimum mass of fuel to load into the rocket. Note, that the rocket must spend fuel to carry both useful cargo and the fuel itself. However, it doesn't need to carry the fuel which has already been burnt. Assume, that the rocket takes off and lands instantly.
Input Specification:
The first line contains a single integer $n$ ($2 \le n \le 1000$) — number of planets.
The second line contains the only integer $m$ ($1 \le m \le 1000$) — weight of the payload.
The third line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 1000$), where $a_i$ is the number of tons, which can be lifted off by one ton of fuel.
The fourth line contains $n$ integers $b_1, b_2, \ldots, b_n$ ($1 \le b_i \le 1000$), where $b_i$ is the number of tons, which can be landed by one ton of fuel.
It is guaranteed, that if Natasha can make a flight, then it takes no more than $10^9$ tons of fuel.
Output Specification:
If Natasha can fly to Mars through $(n - 2)$ planets and return to Earth, print the minimum mass of fuel (in tons) that Natasha should take. Otherwise, print a single number $-1$.
It is guaranteed, that if Natasha can make a flight, then it takes no more than $10^9$ tons of fuel.
The answer will be considered correct if its absolute or relative error doesn't exceed $10^{-6}$. Formally, let your answer be $p$, and the jury's answer be $q$. Your answer is considered correct if $\frac{|p - q|}{\max{(1, |q|)}} \le 10^{-6}$.
Demo Input:
['2\n12\n11 8\n7 5\n', '3\n1\n1 4 1\n2 5 3\n', '6\n2\n4 6 3 3 5 6\n2 6 3 6 5 3\n']
Demo Output:
['10.0000000000\n', '-1\n', '85.4800000000\n']
Note:
Let's consider the first example.
Initially, the mass of a rocket with fuel is $22$ tons.
- At take-off from Earth one ton of fuel can lift off $11$ tons of cargo, so to lift off $22$ tons you need to burn $2$ tons of fuel. Remaining weight of the rocket with fuel is $20$ tons.- During landing on Mars, one ton of fuel can land $5$ tons of cargo, so for landing $20$ tons you will need to burn $4$ tons of fuel. There will be $16$ tons of the rocket with fuel remaining.- While taking off from Mars, one ton of fuel can raise $8$ tons of cargo, so to lift off $16$ tons you will need to burn $2$ tons of fuel. There will be $14$ tons of rocket with fuel after that.- During landing on Earth, one ton of fuel can land $7$ tons of cargo, so for landing $14$ tons you will need to burn $2$ tons of fuel. Remaining weight is $12$ tons, that is, a rocket without any fuel.
In the second case, the rocket will not be able even to take off from Earth.
|
```python
###### ### ####### ####### ## # ##### ### #####
# # # # # # # # # # # # # ###
# # # # # # # # # # # # # ###
###### ######### # # # # # # ######### #
###### ######### # # # # # # ######### #
# # # # # # # # # # #### # # #
# # # # # # # ## # # # # #
###### # # ####### ####### # # ##### # # # #
# from __future__ import print_function # for PyPy2
from collections import Counter, OrderedDict
from itertools import permutations as perm
from fractions import Fraction
from collections import deque
from sys import stdin
from bisect import *
from heapq import *
from math import *
g = lambda : stdin.readline().strip()
gl = lambda : g().split()
gil = lambda : [int(var) for var in gl()]
gfl = lambda : [float(var) for var in gl()]
gcl = lambda : list(g())
gbs = lambda : [int(var) for var in g()]
mod = int(1e9)+7
inf = float("inf")
n, = gil()
w, = gil()
lift, land = gil(), gil()
def isPos(fw):
# print(fw)
cw = w + fw
delta = (cw/lift[0])
fw -= delta
cw -= delta
if fw <= 0:
return False
for i in range(1, n):
delta = (cw/land[i])
fw -= delta
cw -= delta
if fw <= 0: return False
delta = (cw/lift[i])
fw -= delta
cw -= delta
if fw <= 0: return False
if fw <= 0: return False
delta = cw/land[0]
fw -= delta
return False if fw < 0 else True
ans = -1
l, r = float(0), float(1e9)
d = float(1e-6)
# d = 1
while l <= r:
mid = (l+r)/2
if isPos(mid):
ans = mid
r = mid - d
else:
l = mid + d
print(round(ans, 6))
```
| 0
|
|
984
|
A
|
Game
|
PROGRAMMING
| 800
|
[
"sortings"
] | null | null |
Two players play a game.
Initially there are $n$ integers $a_1, a_2, \ldots, a_n$ written on the board. Each turn a player selects one number and erases it from the board. This continues until there is only one number left on the board, i. e. $n - 1$ turns are made. The first player makes the first move, then players alternate turns.
The first player wants to minimize the last number that would be left on the board, while the second player wants to maximize it.
You want to know what number will be left on the board after $n - 1$ turns if both players make optimal moves.
|
The first line contains one integer $n$ ($1 \le n \le 1000$) — the number of numbers on the board.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 10^6$).
|
Print one number that will be left on the board.
|
[
"3\n2 1 3\n",
"3\n2 2 2\n"
] |
[
"2",
"2"
] |
In the first sample, the first player erases $3$ and the second erases $1$. $2$ is left on the board.
In the second sample, $2$ is left on the board regardless of the actions of the players.
| 500
|
[
{
"input": "3\n2 1 3",
"output": "2"
},
{
"input": "3\n2 2 2",
"output": "2"
},
{
"input": "9\n44 53 51 80 5 27 74 79 94",
"output": "53"
},
{
"input": "10\n38 82 23 37 96 4 81 60 67 86",
"output": "60"
},
{
"input": "10\n58 26 77 15 53 81 68 48 22 65",
"output": "53"
},
{
"input": "1\n124",
"output": "124"
},
{
"input": "2\n2 1",
"output": "1"
},
{
"input": "3\n1 1 1000",
"output": "1"
},
{
"input": "2\n322 322",
"output": "322"
},
{
"input": "3\n9 92 12",
"output": "12"
},
{
"input": "3\n1 2 2",
"output": "2"
}
] | 1,588,238,760
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 35
| 108
| 307,200
|
n=int(input())
arr = list(map(int, input().rstrip().split()))
arr.sort(reverse=True)
if n%2 == 1 :
print(arr[n//2])
else :
print(arr[n//2])
|
Title: Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Two players play a game.
Initially there are $n$ integers $a_1, a_2, \ldots, a_n$ written on the board. Each turn a player selects one number and erases it from the board. This continues until there is only one number left on the board, i. e. $n - 1$ turns are made. The first player makes the first move, then players alternate turns.
The first player wants to minimize the last number that would be left on the board, while the second player wants to maximize it.
You want to know what number will be left on the board after $n - 1$ turns if both players make optimal moves.
Input Specification:
The first line contains one integer $n$ ($1 \le n \le 1000$) — the number of numbers on the board.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 10^6$).
Output Specification:
Print one number that will be left on the board.
Demo Input:
['3\n2 1 3\n', '3\n2 2 2\n']
Demo Output:
['2', '2']
Note:
In the first sample, the first player erases $3$ and the second erases $1$. $2$ is left on the board.
In the second sample, $2$ is left on the board regardless of the actions of the players.
|
```python
n=int(input())
arr = list(map(int, input().rstrip().split()))
arr.sort(reverse=True)
if n%2 == 1 :
print(arr[n//2])
else :
print(arr[n//2])
```
| 3
|
|
462
|
B
|
Appleman and Card Game
|
PROGRAMMING
| 1,300
|
[
"greedy"
] | null | null |
Appleman has *n* cards. Each card has an uppercase letter written on it. Toastman must choose *k* cards from Appleman's cards. Then Appleman should give Toastman some coins depending on the chosen cards. Formally, for each Toastman's card *i* you should calculate how much Toastman's cards have the letter equal to letter on *i*th, then sum up all these quantities, such a number of coins Appleman should give to Toastman.
Given the description of Appleman's cards. What is the maximum number of coins Toastman can get?
|
The first line contains two integers *n* and *k* (1<=≤<=*k*<=≤<=*n*<=≤<=105). The next line contains *n* uppercase letters without spaces — the *i*-th letter describes the *i*-th card of the Appleman.
|
Print a single integer – the answer to the problem.
|
[
"15 10\nDZFDFZDFDDDDDDF\n",
"6 4\nYJSNPI\n"
] |
[
"82\n",
"4\n"
] |
In the first test example Toastman can choose nine cards with letter D and one additional card with any letter. For each card with D he will get 9 coins and for the additional card he will get 1 coin.
| 1,000
|
[
{
"input": "15 10\nDZFDFZDFDDDDDDF",
"output": "82"
},
{
"input": "6 4\nYJSNPI",
"output": "4"
},
{
"input": "5 3\nAOWBY",
"output": "3"
},
{
"input": "1 1\nV",
"output": "1"
},
{
"input": "2 1\nWT",
"output": "1"
},
{
"input": "2 2\nBL",
"output": "2"
},
{
"input": "5 1\nFACJT",
"output": "1"
},
{
"input": "5 5\nMJDIJ",
"output": "7"
},
{
"input": "15 5\nAZBIPTOFTJCJJIK",
"output": "13"
},
{
"input": "100 1\nEVEEVEEEGGECFEHEFVFVFHVHEEEEEFCVEEEEEEVFVEEVEEHEEVEFEVVEFEEEFEVECEHGHEEFGEEVCEECCECEFHEVEEEEEEGEEHVH",
"output": "1"
},
{
"input": "100 15\nKKTFFUTFCKUIKKKKFIFFKTUKUUKUKKIKKKTIFKTKUCFFKKKIIKKKKKKTFKFKKIRKKKFKUUKIKUUUFFKKKKTUZKITUIKKIKUKKTIK",
"output": "225"
},
{
"input": "100 50\nYYIYYAAAIEAAYAYAEAIIIAAEAAYEAEYYYIAEYAYAYYAAAIAYAEAAYAYYIYAAYYAAAAAAIYYYAAYAAEAAYAIEIYIYAYAYAYIIAAEY",
"output": "1972"
},
{
"input": "100 90\nFAFAOOAOOAFAOTFAFAFFATAAAOFAAOAFBAAAFBOAOFFFOAOAFAPFOFAOFAAFOAAAAFAAFOFAAOFPPAAOOAAOOFFOFFFOFAOTOFAF",
"output": "2828"
},
{
"input": "100 99\nBFFBBFBFBQFFFFFQBFFBFFBQFBFQFBBFQFFFBFFFBFQFQFBFFBBFYQFBFFFFFFFBQQFQBFBQBQFFFBQQFFFBQFYFBFBFFFBBBQQY",
"output": "3713"
},
{
"input": "100 100\nMQSBDAJABILIBCUEOWGWCEXMUTEYQKAIWGINXVQEOFDUBSVULROQHQRZZAALVQFEFRAAAYUIMGCAFQGIAEFBETRECGSFQJNXHHDN",
"output": "514"
},
{
"input": "100 50\nBMYIXQSJNHGFVFPJBIOBXIKSFNUFPVODCUBQYSIIQNVNXXCWXWRHKFEUPPIIDDGRDBJLZDCBMNJMYRMWFIHOSTDJJHXHPNRKWNFD",
"output": "328"
},
{
"input": "100 50\nENFNEMLJEMDMFMNNGNIMNINALGLLLAEMENEMNLMMIEIJNAINBJEJMFJLLIMINELGFLAIAMJMHMGNLIEFJIEEFEFGLLLDLMEAEIMM",
"output": "748"
}
] | 1,409,066,090
| 4,490
|
Python 3
|
OK
|
TESTS
| 41
| 202
| 1,228,800
|
this=input()
hurry=this.split()
n=int(hurry[0])
k=int(hurry[1])
then=input()
thelist=[]
i=0
while i<len(then):
thelist.append(then[i])
i+=1
#print(thelist)
checked=[]
counts=[]
for item in thelist:
if item not in checked:
checked.append(item)
counts.append(thelist.count(item))
#print(checked)
#print(counts)
thetotal=0
while k>0:
x=max(counts)
if x>=k:
print(thetotal+k*k)
k=0
else:
thetotal+= x*x
k-=x
q=counts.index(x)
#print(q)
counts.remove(x)
checked.remove(checked[q])
|
Title: Appleman and Card Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Appleman has *n* cards. Each card has an uppercase letter written on it. Toastman must choose *k* cards from Appleman's cards. Then Appleman should give Toastman some coins depending on the chosen cards. Formally, for each Toastman's card *i* you should calculate how much Toastman's cards have the letter equal to letter on *i*th, then sum up all these quantities, such a number of coins Appleman should give to Toastman.
Given the description of Appleman's cards. What is the maximum number of coins Toastman can get?
Input Specification:
The first line contains two integers *n* and *k* (1<=≤<=*k*<=≤<=*n*<=≤<=105). The next line contains *n* uppercase letters without spaces — the *i*-th letter describes the *i*-th card of the Appleman.
Output Specification:
Print a single integer – the answer to the problem.
Demo Input:
['15 10\nDZFDFZDFDDDDDDF\n', '6 4\nYJSNPI\n']
Demo Output:
['82\n', '4\n']
Note:
In the first test example Toastman can choose nine cards with letter D and one additional card with any letter. For each card with D he will get 9 coins and for the additional card he will get 1 coin.
|
```python
this=input()
hurry=this.split()
n=int(hurry[0])
k=int(hurry[1])
then=input()
thelist=[]
i=0
while i<len(then):
thelist.append(then[i])
i+=1
#print(thelist)
checked=[]
counts=[]
for item in thelist:
if item not in checked:
checked.append(item)
counts.append(thelist.count(item))
#print(checked)
#print(counts)
thetotal=0
while k>0:
x=max(counts)
if x>=k:
print(thetotal+k*k)
k=0
else:
thetotal+= x*x
k-=x
q=counts.index(x)
#print(q)
counts.remove(x)
checked.remove(checked[q])
```
| 3
|
|
845
|
G
|
Shortest Path Problem?
|
PROGRAMMING
| 2,300
|
[
"dfs and similar",
"graphs",
"math"
] | null | null |
You are given an undirected graph with weighted edges. The length of some path between two vertices is the bitwise xor of weights of all edges belonging to this path (if some edge is traversed more than once, then it is included in bitwise xor the same number of times). You have to find the minimum length of path between vertex 1 and vertex *n*.
Note that graph can contain multiple edges and loops. It is guaranteed that the graph is connected.
|
The first line contains two numbers *n* and *m* (1<=≤<=*n*<=≤<=100000, *n*<=-<=1<=≤<=*m*<=≤<=100000) — the number of vertices and the number of edges, respectively.
Then *m* lines follow, each line containing three integer numbers *x*, *y* and *w* (1<=≤<=*x*,<=*y*<=≤<=*n*, 0<=≤<=*w*<=≤<=108). These numbers denote an edge that connects vertices *x* and *y* and has weight *w*.
|
Print one number — the minimum length of path between vertices 1 and *n*.
|
[
"3 3\n1 2 3\n1 3 2\n3 2 0\n",
"2 2\n1 1 3\n1 2 3\n"
] |
[
"2\n",
"0\n"
] |
none
| 0
|
[
{
"input": "3 3\n1 2 3\n1 3 2\n3 2 0",
"output": "2"
},
{
"input": "2 2\n1 1 3\n1 2 3",
"output": "0"
},
{
"input": "10 20\n8 5 64\n5 6 48\n4 5 91\n10 1 2\n3 4 51\n8 2 74\n6 1 98\n3 10 24\n2 10 35\n8 7 52\n10 5 72\n5 9 25\n2 9 65\n7 4 69\n5 7 26\n7 2 44\n6 8 61\n3 5 43\n10 7 33\n4 2 28",
"output": "0"
},
{
"input": "10 20\n1 8 2\n2 9 94\n9 5 43\n7 2 83\n9 7 42\n5 10 11\n3 10 48\n8 6 31\n3 4 57\n9 3 79\n1 10 50\n6 3 19\n10 4 88\n4 5 69\n10 2 67\n1 9 62\n7 3 50\n1 5 40\n7 1 7\n8 4 87",
"output": "0"
},
{
"input": "10 20\n2 4 76\n10 2 74\n6 4 41\n7 4 97\n8 5 15\n5 2 96\n7 6 77\n5 4 81\n10 1 31\n10 8 76\n9 5 81\n9 1 15\n8 3 88\n8 6 11\n1 6 27\n8 1 64\n3 5 25\n3 2 82\n7 10 0\n7 8 81",
"output": "0"
},
{
"input": "10 20\n8 7 47\n1 8 34\n4 3 5\n3 9 68\n2 4 32\n8 10 98\n2 8 26\n5 3 54\n1 10 87\n2 10 34\n1 6 59\n10 5 4\n7 9 92\n1 3 100\n1 9 93\n6 10 66\n5 2 96\n8 3 70\n10 7 76\n3 6 9",
"output": "0"
},
{
"input": "10 20\n2 8 51\n3 6 100\n4 3 35\n8 3 24\n7 3 37\n6 4 88\n9 3 45\n4 2 31\n2 10 74\n8 9 82\n5 1 65\n9 7 99\n4 8 85\n10 4 35\n6 5 27\n3 1 90\n10 3 98\n9 2 31\n10 1 84\n2 6 40",
"output": "32"
},
{
"input": "5 10\n4 3 46005614\n4 5 62128223\n2 4 71808751\n5 2 20502511\n3 1 35666877\n3 2 99467415\n1 5 51782033\n4 1 28580231\n2 1 63077178\n5 3 73136755",
"output": "109191"
},
{
"input": "5 10\n1 2 16759116\n2 5 19640410\n2 4 48227415\n3 2 88131000\n4 3 61768652\n5 4 51038983\n3 1 44573858\n1 5 4761704\n5 3 58408181\n4 1 29550431",
"output": "4761704"
},
{
"input": "5 10\n4 2 28522519\n3 2 98499207\n4 5 86578634\n2 5 26599094\n3 1 78655801\n4 3 84953325\n1 4 401542\n1 5 98019109\n3 5 47552118\n2 1 26653143",
"output": "225121"
},
{
"input": "5 10\n1 3 84521173\n5 4 97049395\n2 4 22151289\n2 3 83366529\n3 5 68115469\n5 2 19016539\n1 5 17960630\n1 4 85715490\n4 3 25542828\n1 2 31509936",
"output": "8395111"
},
{
"input": "5 10\n4 3 25072245\n3 1 10353707\n2 1 56113542\n1 4 20590207\n2 5 44508617\n1 5 51805736\n2 3 20944097\n5 4 59876083\n3 5 95606567\n2 4 13449544",
"output": "303677"
},
{
"input": "5 5\n1 3 82444502\n2 5 78235625\n4 5 92241123\n2 1 59508641\n5 3 32867588",
"output": "85951954"
},
{
"input": "5 5\n2 4 92607588\n3 1 16534574\n4 5 50020317\n1 5 58305543\n4 1 79306256",
"output": "58305543"
},
{
"input": "5 5\n3 4 29299279\n3 2 87057102\n1 4 93869273\n1 5 24026203\n2 4 7332950",
"output": "24026203"
},
{
"input": "5 5\n3 1 72993047\n2 5 52852374\n5 3 75435307\n1 4 63553778\n5 1 9977754",
"output": "2540604"
},
{
"input": "5 5\n4 2 42136377\n3 5 92147973\n2 5 88704873\n5 4 43226211\n1 3 19760023",
"output": "17527457"
}
] | 1,651,811,919
| 2,147,483,647
|
PyPy 3
|
RUNTIME_ERROR
|
TESTS
| 13
| 545
| 19,968,000
|
from collections import deque
import sys, os, io
input = io.BytesIO(os.read(0, os.fstat(0).st_size)).readline
def get_root(s):
v = []
while not s == root[s]:
v.append(s)
s = root[s]
for i in v:
root[i] = s
return s
def unite(s, t):
rs, rt = get_root(s), get_root(t)
if not rs ^ rt:
return
if rank[s] == rank[t]:
rank[rs] += 1
if rank[s] >= rank[t]:
root[rt] = rs
size[rs] += size[rt]
else:
root[rs] = rt
size[rt] += size[rs]
return
def same(s, t):
return True if get_root(s) == get_root(t) else False
def bfs(s):
q = deque()
q.append(s)
dist = [inf] * (n + 1)
dist[s] = 0
dp = [0] * (n + 1)
while q:
i = q.popleft()
di = dist[i]
dpi = dp[i]
for j, w in G[i]:
if not dist[j] ^ inf:
dist[j] = di + 1
q.append(j)
dp[j] = dpi ^ w
return dist, dp
n, m = map(int, input().split())
xyw = []
root = [i for i in range(n + 1)]
rank = [1 for _ in range(n + 1)]
size = [1 for _ in range(n + 1)]
G = [[] for _ in range(n + 1)]
for _ in range(m):
x, y, w = map(int, input().split())
if same(x, y):
xyw.append((x, y, w))
else:
G[x].append((y, w))
G[y].append((x, w))
unite(x, y)
inf = pow(10, 9) + 1
dist, dp = bfs(1)
pow2 = [1]
for _ in range(30):
pow2.append(2 * pow2[-1])
v = []
for x, y, w in xyw:
c = dp[x] ^ dp[y] ^ w
v.append(c)
i = 29
x = []
while i >= 0 and v:
ma = max(v)
x.append(ma)
v0 = []
while not ma & pow2[i]:
i -= 1
pi = pow2[i]
for j in v:
if j & pi:
if ma ^ j:
v0.append(ma ^ j)
else:
if j:
v0.append(j)
v = v0
ans = dp[n]
for i in x:
ans = min(ans, ans ^ i)
print(ans)
|
Title: Shortest Path Problem?
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given an undirected graph with weighted edges. The length of some path between two vertices is the bitwise xor of weights of all edges belonging to this path (if some edge is traversed more than once, then it is included in bitwise xor the same number of times). You have to find the minimum length of path between vertex 1 and vertex *n*.
Note that graph can contain multiple edges and loops. It is guaranteed that the graph is connected.
Input Specification:
The first line contains two numbers *n* and *m* (1<=≤<=*n*<=≤<=100000, *n*<=-<=1<=≤<=*m*<=≤<=100000) — the number of vertices and the number of edges, respectively.
Then *m* lines follow, each line containing three integer numbers *x*, *y* and *w* (1<=≤<=*x*,<=*y*<=≤<=*n*, 0<=≤<=*w*<=≤<=108). These numbers denote an edge that connects vertices *x* and *y* and has weight *w*.
Output Specification:
Print one number — the minimum length of path between vertices 1 and *n*.
Demo Input:
['3 3\n1 2 3\n1 3 2\n3 2 0\n', '2 2\n1 1 3\n1 2 3\n']
Demo Output:
['2\n', '0\n']
Note:
none
|
```python
from collections import deque
import sys, os, io
input = io.BytesIO(os.read(0, os.fstat(0).st_size)).readline
def get_root(s):
v = []
while not s == root[s]:
v.append(s)
s = root[s]
for i in v:
root[i] = s
return s
def unite(s, t):
rs, rt = get_root(s), get_root(t)
if not rs ^ rt:
return
if rank[s] == rank[t]:
rank[rs] += 1
if rank[s] >= rank[t]:
root[rt] = rs
size[rs] += size[rt]
else:
root[rs] = rt
size[rt] += size[rs]
return
def same(s, t):
return True if get_root(s) == get_root(t) else False
def bfs(s):
q = deque()
q.append(s)
dist = [inf] * (n + 1)
dist[s] = 0
dp = [0] * (n + 1)
while q:
i = q.popleft()
di = dist[i]
dpi = dp[i]
for j, w in G[i]:
if not dist[j] ^ inf:
dist[j] = di + 1
q.append(j)
dp[j] = dpi ^ w
return dist, dp
n, m = map(int, input().split())
xyw = []
root = [i for i in range(n + 1)]
rank = [1 for _ in range(n + 1)]
size = [1 for _ in range(n + 1)]
G = [[] for _ in range(n + 1)]
for _ in range(m):
x, y, w = map(int, input().split())
if same(x, y):
xyw.append((x, y, w))
else:
G[x].append((y, w))
G[y].append((x, w))
unite(x, y)
inf = pow(10, 9) + 1
dist, dp = bfs(1)
pow2 = [1]
for _ in range(30):
pow2.append(2 * pow2[-1])
v = []
for x, y, w in xyw:
c = dp[x] ^ dp[y] ^ w
v.append(c)
i = 29
x = []
while i >= 0 and v:
ma = max(v)
x.append(ma)
v0 = []
while not ma & pow2[i]:
i -= 1
pi = pow2[i]
for j in v:
if j & pi:
if ma ^ j:
v0.append(ma ^ j)
else:
if j:
v0.append(j)
v = v0
ans = dp[n]
for i in x:
ans = min(ans, ans ^ i)
print(ans)
```
| -1
|
|
935
|
A
|
Fafa and his Company
|
PROGRAMMING
| 800
|
[
"brute force",
"implementation"
] | null | null |
Fafa owns a company that works on huge projects. There are *n* employees in Fafa's company. Whenever the company has a new project to start working on, Fafa has to divide the tasks of this project among all the employees.
Fafa finds doing this every time is very tiring for him. So, he decided to choose the best *l* employees in his company as team leaders. Whenever there is a new project, Fafa will divide the tasks among only the team leaders and each team leader will be responsible of some positive number of employees to give them the tasks. To make this process fair for the team leaders, each one of them should be responsible for the same number of employees. Moreover, every employee, who is not a team leader, has to be under the responsibility of exactly one team leader, and no team leader is responsible for another team leader.
Given the number of employees *n*, find in how many ways Fafa could choose the number of team leaders *l* in such a way that it is possible to divide employees between them evenly.
|
The input consists of a single line containing a positive integer *n* (2<=≤<=*n*<=≤<=105) — the number of employees in Fafa's company.
|
Print a single integer representing the answer to the problem.
|
[
"2\n",
"10\n"
] |
[
"1\n",
"3\n"
] |
In the second sample Fafa has 3 ways:
- choose only 1 employee as a team leader with 9 employees under his responsibility. - choose 2 employees as team leaders with 4 employees under the responsibility of each of them. - choose 5 employees as team leaders with 1 employee under the responsibility of each of them.
| 500
|
[
{
"input": "2",
"output": "1"
},
{
"input": "10",
"output": "3"
},
{
"input": "3",
"output": "1"
},
{
"input": "4",
"output": "2"
},
{
"input": "6",
"output": "3"
},
{
"input": "13",
"output": "1"
},
{
"input": "100000",
"output": "35"
},
{
"input": "1024",
"output": "10"
},
{
"input": "99999",
"output": "11"
},
{
"input": "10007",
"output": "1"
},
{
"input": "4096",
"output": "12"
},
{
"input": "65536",
"output": "16"
},
{
"input": "40320",
"output": "95"
},
{
"input": "30030",
"output": "63"
},
{
"input": "161",
"output": "3"
},
{
"input": "1000",
"output": "15"
},
{
"input": "10000",
"output": "24"
},
{
"input": "777",
"output": "7"
},
{
"input": "121",
"output": "2"
},
{
"input": "25",
"output": "2"
},
{
"input": "40000",
"output": "34"
},
{
"input": "99990",
"output": "47"
},
{
"input": "98765",
"output": "3"
},
{
"input": "56789",
"output": "3"
},
{
"input": "13579",
"output": "3"
},
{
"input": "97531",
"output": "3"
},
{
"input": "12345",
"output": "7"
},
{
"input": "54321",
"output": "7"
},
{
"input": "83160",
"output": "127"
},
{
"input": "9",
"output": "2"
},
{
"input": "21",
"output": "3"
},
{
"input": "11",
"output": "1"
},
{
"input": "15",
"output": "3"
}
] | 1,635,953,191
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 33
| 61
| 4,300,800
|
n=int(input())
x=0
for i in range(1,n//2+1):
if n%i==0:
x=x+1
print(x)
|
Title: Fafa and his Company
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Fafa owns a company that works on huge projects. There are *n* employees in Fafa's company. Whenever the company has a new project to start working on, Fafa has to divide the tasks of this project among all the employees.
Fafa finds doing this every time is very tiring for him. So, he decided to choose the best *l* employees in his company as team leaders. Whenever there is a new project, Fafa will divide the tasks among only the team leaders and each team leader will be responsible of some positive number of employees to give them the tasks. To make this process fair for the team leaders, each one of them should be responsible for the same number of employees. Moreover, every employee, who is not a team leader, has to be under the responsibility of exactly one team leader, and no team leader is responsible for another team leader.
Given the number of employees *n*, find in how many ways Fafa could choose the number of team leaders *l* in such a way that it is possible to divide employees between them evenly.
Input Specification:
The input consists of a single line containing a positive integer *n* (2<=≤<=*n*<=≤<=105) — the number of employees in Fafa's company.
Output Specification:
Print a single integer representing the answer to the problem.
Demo Input:
['2\n', '10\n']
Demo Output:
['1\n', '3\n']
Note:
In the second sample Fafa has 3 ways:
- choose only 1 employee as a team leader with 9 employees under his responsibility. - choose 2 employees as team leaders with 4 employees under the responsibility of each of them. - choose 5 employees as team leaders with 1 employee under the responsibility of each of them.
|
```python
n=int(input())
x=0
for i in range(1,n//2+1):
if n%i==0:
x=x+1
print(x)
```
| 3
|
|
858
|
C
|
Did you mean...
|
PROGRAMMING
| 1,500
|
[
"dp",
"greedy",
"implementation"
] | null | null |
Beroffice text editor has a wide range of features that help working with text. One of the features is an automatic search for typos and suggestions of how to fix them.
Beroffice works only with small English letters (i.e. with 26 letters from a to z). Beroffice thinks that a word is typed with a typo if there are three or more consonants in a row in the word. The only exception is that if the block of consonants has all letters the same, then this block (even if its length is greater than three) is not considered a typo. Formally, a word is typed with a typo if there is a block of not less that three consonants in a row, and there are at least two different letters in this block.
For example:
- the following words have typos: "hellno", "hackcerrs" and "backtothefutttture"; - the following words don't have typos: "helllllooooo", "tobeornottobe" and "oooooo".
When Beroffice editor finds a word with a typo, it inserts as little as possible number of spaces in this word (dividing it into several words) in such a way that each of the resulting words is typed without any typos.
Implement this feature of Beroffice editor. Consider the following letters as the only vowels: 'a', 'e', 'i', 'o' and 'u'. All the other letters are consonants in this problem.
|
The only line contains a non-empty word consisting of small English letters. The length of the word is between 1 and 3000 letters.
|
Print the given word without any changes if there are no typos.
If there is at least one typo in the word, insert the minimum number of spaces into the word so that each of the resulting words doesn't have any typos. If there are multiple solutions, print any of them.
|
[
"hellno\n",
"abacaba\n",
"asdfasdf\n"
] |
[
"hell no \n",
"abacaba \n",
"asd fasd f \n"
] |
none
| 1,500
|
[
{
"input": "hellno",
"output": "hell no "
},
{
"input": "abacaba",
"output": "abacaba "
},
{
"input": "asdfasdf",
"output": "asd fasd f "
},
{
"input": "ooo",
"output": "ooo "
},
{
"input": "moyaoborona",
"output": "moyaoborona "
},
{
"input": "jxegxxx",
"output": "jxegx xx "
},
{
"input": "orfyaenanabckumulsboloyhljhacdgcmnooxvxrtuhcslxgslfpnfnyejbxqisxjyoyvcvuddboxkqgbogkfz",
"output": "orf yaenanabc kumuls boloyh lj hacd gc mnooxv xr tuhc sl xg sl fp nf nyejb xqisx jyoyv cvudd boxk qg bogk fz "
},
{
"input": "zxdgmhsjotvajkwshjpvzcuwehpeyfhakhtlvuoftkgdmvpafmxcliqvrztloocziqdkexhzcbdgxaoyvte",
"output": "zx dg mh sjotvajk ws hj pv zcuwehpeyf hakh tl vuoft kg dm vpafm xc liqv rz tloocziqd kexh zc bd gxaoyv te "
},
{
"input": "niblehmwtycadhbfuginpyafszjbucaszihijndzjtuyuaxkrovotshtsajmdcflnfdmahzbvpymiczqqleedpofcnvhieknlz",
"output": "niblehm wt ycadh bfuginp yafs zj bucaszihijn dz jtuyuaxk rovots ht sajm dc fl nf dmahz bv py micz qq leedpofc nv hiekn lz "
},
{
"input": "pqvtgtctpkgjgxnposjqedofficoyznxlerxyqypyzpoehejtjvyafjxjppywwgeakf",
"output": "pq vt gt ct pk gj gx nposj qedofficoyz nx lerx yq yp yz poehejt jv yafj xj pp yw wgeakf "
},
{
"input": "mvjajoyeg",
"output": "mv jajoyeg "
},
{
"input": "dipxocwjosvdaillxolmthjhzhsxskzqslebpixpuhpgeesrkedhohisdsjsrkiktbjzlhectrfcathvewzficirqbdvzq",
"output": "dipxocw josv daill xolm th jh zh sx sk zq slebpixpuhp geesr kedhohisd sj sr kikt bj zl hect rf cath vewz ficirq bd vz q "
},
{
"input": "ibbtvelwjirxqermucqrgmoauonisgmarjxxybllktccdykvef",
"output": "ibb tvelw jirx qermucq rg moauonisg marj xx yb ll kt cc dy kvef "
},
{
"input": "jxevkmrwlomaaahaubvjzqtyfqhqbhpqhomxqpiuersltohinvfyeykmlooujymldjqhgqjkvqknlyj",
"output": "jxevk mr wlomaaahaubv jz qt yf qh qb hp qhomx qpiuers ltohinv fyeyk mlooujy ml dj qh gq jk vq kn ly j "
},
{
"input": "hzxkuwqxonsulnndlhygvmallghjerwp",
"output": "hz xkuwq xonsuln nd lh yg vmall gh jerw p "
},
{
"input": "jbvcsjdyzlzmxwcvmixunfzxidzvwzaqqdhguvelwbdosbd",
"output": "jb vc sj dy zl zm xw cv mixunf zxidz vw zaqq dh guvelw bdosb d "
},
{
"input": "uyrsxaqmtibbxpfabprvnvbinjoxubupvfyjlqnfrfdeptipketwghr",
"output": "uyr sxaqm tibb xp fabp rv nv binjoxubupv fy jl qn fr fdeptipketw gh r "
},
{
"input": "xfcftysljytybkkzkpqdzralahgvbkxdtheqrhfxpecdjqofnyiahggnkiuusalu",
"output": "xf cf ty sl jy ty bk kz kp qd zralahg vb kx dt heqr hf xpecd jqofn yiahg gn kiuusalu "
},
{
"input": "a",
"output": "a "
},
{
"input": "b",
"output": "b "
},
{
"input": "aa",
"output": "aa "
},
{
"input": "ab",
"output": "ab "
},
{
"input": "ba",
"output": "ba "
},
{
"input": "bb",
"output": "bb "
},
{
"input": "aaa",
"output": "aaa "
},
{
"input": "aab",
"output": "aab "
},
{
"input": "aba",
"output": "aba "
},
{
"input": "abb",
"output": "abb "
},
{
"input": "baa",
"output": "baa "
},
{
"input": "bab",
"output": "bab "
},
{
"input": "bba",
"output": "bba "
},
{
"input": "bbb",
"output": "bbb "
},
{
"input": "bbc",
"output": "bb c "
},
{
"input": "bcb",
"output": "bc b "
},
{
"input": "cbb",
"output": "cb b "
},
{
"input": "bababcdfabbcabcdfacbbabcdfacacabcdfacbcabcdfaccbabcdfacaaabcdfabacabcdfabcbabcdfacbaabcdfabaaabcdfabbaabcdfacababcdfabbbabcdfabcaabcdfaaababcdfabccabcdfacccabcdfaacbabcdfaabaabcdfaabcabcdfaaacabcdfaccaabcdfaabbabcdfaaaaabcdfaacaabcdfaacc",
"output": "bababc dfabb cabc dfacb babc dfacacabc dfacb cabc dfacc babc dfacaaabc dfabacabc dfabc babc dfacbaabc dfabaaabc dfabbaabc dfacababc dfabbbabc dfabcaabc dfaaababc dfabc cabc dfacccabc dfaacbabc dfaabaabc dfaabcabc dfaaacabc dfaccaabc dfaabbabc dfaaaaabc dfaacaabc dfaacc "
},
{
"input": "bddabcdfaccdabcdfadddabcdfabbdabcdfacddabcdfacdbabcdfacbbabcdfacbcabcdfacbdabcdfadbbabcdfabdbabcdfabdcabcdfabbcabcdfabccabcdfabbbabcdfaddcabcdfaccbabcdfadbdabcdfacccabcdfadcdabcdfadcbabcdfabcbabcdfadbcabcdfacdcabcdfabcdabcdfadccabcdfaddb",
"output": "bd dabc dfacc dabc dfadddabc dfabb dabc dfacd dabc dfacd babc dfacb babc dfacb cabc dfacb dabc dfadb babc dfabd babc dfabd cabc dfabb cabc dfabc cabc dfabbbabc dfadd cabc dfacc babc dfadb dabc dfacccabc dfadc dabc dfadc babc dfabc babc dfadb cabc dfacd cabc dfabc dabc dfadc cabc dfadd b "
},
{
"input": "helllllooooo",
"output": "helllllooooo "
},
{
"input": "bbbzxxx",
"output": "bbb zx xx "
},
{
"input": "ffff",
"output": "ffff "
},
{
"input": "cdddddddddddddddddd",
"output": "cd ddddddddddddddddd "
},
{
"input": "bbbc",
"output": "bbb c "
},
{
"input": "lll",
"output": "lll "
},
{
"input": "bbbbb",
"output": "bbbbb "
},
{
"input": "llll",
"output": "llll "
},
{
"input": "bbbbbbccc",
"output": "bbbbbb ccc "
},
{
"input": "lllllb",
"output": "lllll b "
},
{
"input": "zzzzzzzzzzzzzzzzzzzzzzzzzzzzzz",
"output": "zzzzzzzzzzzzzzzzzzzzzzzzzzzzzz "
},
{
"input": "lllll",
"output": "lllll "
},
{
"input": "bbbbbbbbbc",
"output": "bbbbbbbbb c "
},
{
"input": "helllllno",
"output": "helllll no "
},
{
"input": "nnnnnnnnnnnn",
"output": "nnnnnnnnnnnn "
},
{
"input": "bbbbbccc",
"output": "bbbbb ccc "
},
{
"input": "zzzzzzzzzzzzzzzzzzzzzzzzzzzzz",
"output": "zzzzzzzzzzzzzzzzzzzzzzzzzzzzz "
},
{
"input": "nnnnnnnnnnnnnnnnnn",
"output": "nnnnnnnnnnnnnnnnnn "
},
{
"input": "zzzzzzzzzzzzzzzzzzzzzzz",
"output": "zzzzzzzzzzzzzzzzzzzzzzz "
},
{
"input": "hhhh",
"output": "hhhh "
},
{
"input": "nnnnnnnnnnnnnnnnnnnnnnnnn",
"output": "nnnnnnnnnnnnnnnnnnnnnnnnn "
},
{
"input": "zzzzzzzzzz",
"output": "zzzzzzzzzz "
},
{
"input": "dddd",
"output": "dddd "
},
{
"input": "heffffffgggggghhhhhh",
"output": "heffffff gggggg hhhhhh "
},
{
"input": "bcddd",
"output": "bc ddd "
},
{
"input": "x",
"output": "x "
},
{
"input": "nnn",
"output": "nnn "
},
{
"input": "xxxxxxxx",
"output": "xxxxxxxx "
},
{
"input": "cclcc",
"output": "cc lc c "
},
{
"input": "tttttttttttttt",
"output": "tttttttttttttt "
},
{
"input": "xxxxxxx",
"output": "xxxxxxx "
},
{
"input": "ccccb",
"output": "cccc b "
},
{
"input": "bcecccc",
"output": "bcecccc "
},
{
"input": "jjja",
"output": "jjja "
},
{
"input": "zzz",
"output": "zzz "
},
{
"input": "xxxxxxxxxzzzzzzzzzzzz",
"output": "xxxxxxxxx zzzzzzzzzzzz "
},
{
"input": "alllewww",
"output": "alllewww "
},
{
"input": "bbbbbbbbb",
"output": "bbbbbbbbb "
},
{
"input": "jjj",
"output": "jjj "
},
{
"input": "bbbbbbbbbbbbbbbbbbbbbbbbb",
"output": "bbbbbbbbbbbbbbbbbbbbbbbbb "
},
{
"input": "kkkkkkkkkklllllllllllllll",
"output": "kkkkkkkkkk lllllllllllllll "
},
{
"input": "helllllllllllo",
"output": "helllllllllllo "
},
{
"input": "ttttsttttt",
"output": "tttt st tttt "
},
{
"input": "tttttttsssssss",
"output": "ttttttt sssssss "
},
{
"input": "assstttttatsfatsfdjfdhtsjdsaatttssssststsss",
"output": "asss tttttats fats fd jf dh ts jd saattt sssss ts ts ss "
},
{
"input": "xxxxx",
"output": "xxxxx "
},
{
"input": "bbbhbbb",
"output": "bbb hb bb "
},
{
"input": "bbbbbbbb",
"output": "bbbbbbbb "
}
] | 1,517,075,727
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 5
| 61
| 5,632,000
|
s=input()
vowels=set(list('aeiou'))
chars=''
for i in range(len(s)):
if s[i] not in vowels:
if len(chars)==2:
if s[i] not in chars:
print(' ',end='')
chars=s[i]
else:
chars+=s[i]
else:
chars=''
print(s[i],end='')
|
Title: Did you mean...
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Beroffice text editor has a wide range of features that help working with text. One of the features is an automatic search for typos and suggestions of how to fix them.
Beroffice works only with small English letters (i.e. with 26 letters from a to z). Beroffice thinks that a word is typed with a typo if there are three or more consonants in a row in the word. The only exception is that if the block of consonants has all letters the same, then this block (even if its length is greater than three) is not considered a typo. Formally, a word is typed with a typo if there is a block of not less that three consonants in a row, and there are at least two different letters in this block.
For example:
- the following words have typos: "hellno", "hackcerrs" and "backtothefutttture"; - the following words don't have typos: "helllllooooo", "tobeornottobe" and "oooooo".
When Beroffice editor finds a word with a typo, it inserts as little as possible number of spaces in this word (dividing it into several words) in such a way that each of the resulting words is typed without any typos.
Implement this feature of Beroffice editor. Consider the following letters as the only vowels: 'a', 'e', 'i', 'o' and 'u'. All the other letters are consonants in this problem.
Input Specification:
The only line contains a non-empty word consisting of small English letters. The length of the word is between 1 and 3000 letters.
Output Specification:
Print the given word without any changes if there are no typos.
If there is at least one typo in the word, insert the minimum number of spaces into the word so that each of the resulting words doesn't have any typos. If there are multiple solutions, print any of them.
Demo Input:
['hellno\n', 'abacaba\n', 'asdfasdf\n']
Demo Output:
['hell no \n', 'abacaba \n', 'asd fasd f \n']
Note:
none
|
```python
s=input()
vowels=set(list('aeiou'))
chars=''
for i in range(len(s)):
if s[i] not in vowels:
if len(chars)==2:
if s[i] not in chars:
print(' ',end='')
chars=s[i]
else:
chars+=s[i]
else:
chars=''
print(s[i],end='')
```
| 0
|
|
1
|
A
|
Theatre Square
|
PROGRAMMING
| 1,000
|
[
"math"
] |
A. Theatre Square
|
1
|
256
|
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
|
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
|
Write the needed number of flagstones.
|
[
"6 6 4\n"
] |
[
"4\n"
] |
none
| 0
|
[
{
"input": "6 6 4",
"output": "4"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "2 1 1",
"output": "2"
},
{
"input": "1 2 1",
"output": "2"
},
{
"input": "2 2 1",
"output": "4"
},
{
"input": "2 1 2",
"output": "1"
},
{
"input": "1 1 3",
"output": "1"
},
{
"input": "2 3 4",
"output": "1"
},
{
"input": "1000000000 1000000000 1",
"output": "1000000000000000000"
},
{
"input": "12 13 4",
"output": "12"
},
{
"input": "222 332 5",
"output": "3015"
},
{
"input": "1000 1000 10",
"output": "10000"
},
{
"input": "1001 1000 10",
"output": "10100"
},
{
"input": "100 10001 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 999999999",
"output": "4"
},
{
"input": "1000000000 1000000000 192",
"output": "27126743055556"
},
{
"input": "1000000000 987654321 1",
"output": "987654321000000000"
},
{
"input": "456784567 1000000000 51",
"output": "175618850864484"
},
{
"input": "39916800 134217728 40320",
"output": "3295710"
}
] | 1,682,816,648
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 20
| 62
| 0
|
n, m, a = map(int, input().split())
flag_ar = a*a
if (n <= a) & (m <= a):
print(1)
else:
r1 = n%a
r2 = m%a
if r1 == 0:
n = n+r1
else:
n = n + abs(a-r1)
if r2 == 0:
m = m+r2
else:
m = m+abs(a-r2)
thea_ar = n * m
print(int(round(thea_ar/flag_ar)))
|
Title: Theatre Square
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
Input Specification:
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
Output Specification:
Write the needed number of flagstones.
Demo Input:
['6 6 4\n']
Demo Output:
['4\n']
Note:
none
|
```python
n, m, a = map(int, input().split())
flag_ar = a*a
if (n <= a) & (m <= a):
print(1)
else:
r1 = n%a
r2 = m%a
if r1 == 0:
n = n+r1
else:
n = n + abs(a-r1)
if r2 == 0:
m = m+r2
else:
m = m+abs(a-r2)
thea_ar = n * m
print(int(round(thea_ar/flag_ar)))
```
| 3.969
|
691
|
A
|
Fashion in Berland
|
PROGRAMMING
| 1,000
|
[
"implementation"
] | null | null |
According to rules of the Berland fashion, a jacket should be fastened by all the buttons except only one, but not necessarily it should be the last one. Also if the jacket has only one button, it should be fastened, so the jacket will not swinging open.
You are given a jacket with *n* buttons. Determine if it is fastened in a right way.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=1000) — the number of buttons on the jacket.
The second line contains *n* integers *a**i* (0<=≤<=*a**i*<=≤<=1). The number *a**i*<==<=0 if the *i*-th button is not fastened. Otherwise *a**i*<==<=1.
|
In the only line print the word "YES" if the jacket is fastened in a right way. Otherwise print the word "NO".
|
[
"3\n1 0 1\n",
"3\n1 0 0\n"
] |
[
"YES\n",
"NO\n"
] |
none
| 0
|
[
{
"input": "3\n1 0 1",
"output": "YES"
},
{
"input": "3\n1 0 0",
"output": "NO"
},
{
"input": "3\n1 1 0",
"output": "YES"
},
{
"input": "3\n1 1 1",
"output": "NO"
},
{
"input": "3\n0 0 1",
"output": "NO"
},
{
"input": "3\n0 0 0",
"output": "NO"
},
{
"input": "3\n0 1 1",
"output": "YES"
},
{
"input": "3\n0 1 0",
"output": "NO"
},
{
"input": "2\n0 1",
"output": "YES"
},
{
"input": "2\n1 0",
"output": "YES"
},
{
"input": "2\n0 0",
"output": "NO"
},
{
"input": "2\n1 1",
"output": "NO"
},
{
"input": "1\n1",
"output": "YES"
},
{
"input": "1\n0",
"output": "NO"
},
{
"input": "10\n1 0 1 1 1 1 1 1 1 1",
"output": "YES"
},
{
"input": "5\n1 1 1 1 0",
"output": "YES"
},
{
"input": "4\n1 0 1 0",
"output": "NO"
},
{
"input": "4\n1 1 0 0",
"output": "NO"
},
{
"input": "10\n0 0 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "10\n1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "123\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "124\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "94\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "64\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "34\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "35\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "NO"
},
{
"input": "5\n1 1 1 1 1",
"output": "NO"
},
{
"input": "10\n0 0 0 0 0 0 0 0 0 0",
"output": "NO"
},
{
"input": "231\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "NO"
},
{
"input": "10\n1 1 0 1 1 1 0 1 1 1",
"output": "NO"
}
] | 1,538,515,266
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 83
| 124
| 0
|
n = int(input())
arr = list(map(int, input().split()))
fastenedCount = 0
for i in range(n):
if arr[i] == 1:
fastenedCount += 1
if n == 1:
if fastenedCount == 1:
print('YES')
else:
print('NO')
else:
if fastenedCount == n - 1:
print('YES')
else:
print('NO')
|
Title: Fashion in Berland
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
According to rules of the Berland fashion, a jacket should be fastened by all the buttons except only one, but not necessarily it should be the last one. Also if the jacket has only one button, it should be fastened, so the jacket will not swinging open.
You are given a jacket with *n* buttons. Determine if it is fastened in a right way.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=1000) — the number of buttons on the jacket.
The second line contains *n* integers *a**i* (0<=≤<=*a**i*<=≤<=1). The number *a**i*<==<=0 if the *i*-th button is not fastened. Otherwise *a**i*<==<=1.
Output Specification:
In the only line print the word "YES" if the jacket is fastened in a right way. Otherwise print the word "NO".
Demo Input:
['3\n1 0 1\n', '3\n1 0 0\n']
Demo Output:
['YES\n', 'NO\n']
Note:
none
|
```python
n = int(input())
arr = list(map(int, input().split()))
fastenedCount = 0
for i in range(n):
if arr[i] == 1:
fastenedCount += 1
if n == 1:
if fastenedCount == 1:
print('YES')
else:
print('NO')
else:
if fastenedCount == n - 1:
print('YES')
else:
print('NO')
```
| 3
|
|
346
|
B
|
Lucky Common Subsequence
|
PROGRAMMING
| 2,000
|
[
"dp",
"strings"
] | null | null |
In mathematics, a subsequence is a sequence that can be derived from another sequence by deleting some elements without changing the order of the remaining elements. For example, the sequence BDF is a subsequence of ABCDEF. A substring of a string is a continuous subsequence of the string. For example, BCD is a substring of ABCDEF.
You are given two strings *s*1, *s*2 and another string called *virus*. Your task is to find the longest common subsequence of *s*1 and *s*2, such that it doesn't contain *virus* as a substring.
|
The input contains three strings in three separate lines: *s*1, *s*2 and *virus* (1<=≤<=|*s*1|,<=|*s*2|,<=|*virus*|<=≤<=100). Each string consists only of uppercase English letters.
|
Output the longest common subsequence of *s*1 and *s*2 without *virus* as a substring. If there are multiple answers, any of them will be accepted.
If there is no valid common subsequence, output 0.
|
[
"AJKEQSLOBSROFGZ\nOVGURWZLWVLUXTH\nOZ\n",
"AA\nA\nA\n"
] |
[
"ORZ\n",
"0\n"
] |
none
| 1,000
|
[
{
"input": "AJKEQSLOBSROFGZ\nOVGURWZLWVLUXTH\nOZ",
"output": "ORZ"
},
{
"input": "AA\nA\nA",
"output": "0"
},
{
"input": "PWBJTZPQHA\nZJMKLWSROQ\nUQ",
"output": "WQ"
},
{
"input": "QNHRPFYMAAPJDUHBAEXNEEZSTMYHVGQPYKNMVKMBVSVLIYGUVMJHEFLJEPIWFHSLISTGOKRXNMSCXYKMAXBPKCOCNTIRPCUEPHXM\nRRFCZUGFDRKKMQTOETNELXMEWGOCDHFKIXOPVHHEWTCDNXVFKFKTKNWKEIKTCMHMHDNCLLVQSGKHBCDDYVVVQIRPZEOPUGQUGRHH\nR",
"output": "QNHFPHEXNETMHMHLLSGKCYPOPUH"
},
{
"input": "CGPWTAPEVBTGANLCLVSHQIIKHDPVUHRSQPXHSNYAHPGBECICFQYDFRTRELLLEDZYWJSLOBSKDGRRDHNRRGIXAMEBGFJJTEIGUGRU\nHAWYVKRRBEIWNOGYMIYQXDCFXMMCSAYSOXQFHHIFRRCJRAWHLDDHHHAKHXVKCVPBFGGEXUKWTFWMOUUGMXTSBUTHXCJCWHCQQTYQ\nANKFDWLYSX",
"output": "WVBGCSSQHHIFRRWLDDHXBGFUGU"
},
{
"input": "AUNBEKNURNUPHXQYKUTAHCOLMPRQZZTVDUYCTNIRACQQTQAIDTAWJXBUTIZUASDIJZWLHAQVGCAHKTZMXSDVVWAIGQEALRFKFYTT\nQBVRFKPKLYZLYNRFTRJZZQEYAEKPFXVICUVFVQSDENBJYYNCFTOZHULSWJQTNELYLKCZTGHOARDCFXBXQGGSQIVUCJVNGFZEEZQE\nN",
"output": "BKPYTRZZVICQDJTZUSJZHAQGSVVGQE"
},
{
"input": "BGIIURZTEUJJULBWKHDQBRFGEUOMQSREOTILICRSBUHBGTSRDHKVDDEBVHGMHXUVFJURSMFDJOOOWCYPJDVRVKLDHICPNKTBFXDJ\nXOADNTKNILGNHHBNFYNDWUNXBGDFUKUVHLPDOGOYRMOTAQELLRMHFAQEOXFWGAQUROVUSWOAWFRVIRJQVXPCXLSCQLCUWKBZUFQP\nYVF",
"output": "ILBWKHDGOMQELRHEGUVUSOWVRVLCKBF"
},
{
"input": "AXBPBDEYIYKKCZBTLKBUNEQLCXXLKIUTOOATYDXYYQCLFAXAEIGTFMNTTQKCQRMEEFRYVYXAOLMUQNPJBMFBUGVXFZAJSBXWALSI\nVWFONLLKSHGHHQSFBBFWTXAITPUKNDANOCLMNFTAAMJVDLXYPILPCJCFWTNBQWEOMMXHRYHEGBJIVSXBBGQKXRIYNZFIWSZPPUUM\nPPKKLHXWWT",
"output": "BBITKNCLTADXYCFTNQMRYVXBBGXFWS"
},
{
"input": "XKTAOCPCVMIOGCQKPENDKIZRZBZVRTBTGCDRQUIMVHABDIHSCGWPUTQKLPBOXAYICPWJBFLFSEPERGJZHRINEHQMYTOTKLCQCSMZ\nAITFIOUTUVZLSSIYWXSYTQMFLICCXOFSACHTKGPXRHRCGXFZXPYWKWPUOIDNEEZOKMOUYGVUJRQTIRQFCSBCWXVFCIAOLZDGENNI\nDBHOIORVCPNXCDOJKSYYIENQRJGZFHOWBYQIITMTVWXRMAMYILTHBBAJRJELWMIZOZBGPDGSTIRTQIILJRYICMUQTUAFKDYGECPY",
"output": "TOVMIOCKPRRCGWPUOIEEGJRQTQCSZ"
},
{
"input": "UNGXODEEINVYVPHYVGSWPIPFMFLZJYRJIPCUSWVUDLLSLRPJJFWCUOYDUGXBRKWPARGLXFJCNNFUIGEZUCTPFYUIMQMJLQHTIVPO\nBWDEGORKXYCXIDWZKGFCUYIDYLTWLCDBUVHPAPFLIZPEUINQSTNRAOVYKZCKFWIJQVLSVCGLTCOEMAYRCDVVQWQENTWZALWUKKKA\nXDGPZXADAFCHKILONSXFGRHIQVMIYWUTJUPCCEKYQVYAENRHVWERJSNPVEMRYSZGYBNTQLIFKFISKZJQIQQGSKVGCNMPNIJDRTXI",
"output": "GODIYVHPPFLZPUSWVLSLCOYDWALU"
},
{
"input": "KOROXDDWEUVYWJIXSFPEJFYZJDDUXISOFJTIFJSBTWIJQHMTQWLAGGMXTFALRXYCMGZNKYQRCDVTPRQDBAALTWAXTNLDPYWNSFKE\nNHZGRZFMFQGSAYOJTFKMMUPOOQXWCPPAIVRJHINJPHXTTBWRIYNOHMJKBBGXVXYZDBVBBTQRXTOFLBBCXGNICBKAAGOKAYCCJYCW\nXCXLBESCRBNKWYGFDZFKWYNLFAKEWWGRUIAQGNCFDQXCHDBEQDSWSNGVKUFOGGSPFFZWTXGZQMMFJXDWOPUEZCMZEFDHXTRJTNLW",
"output": "KOOXWVJIPXTBWIHMTQXTFLCGNCBAAAYW"
},
{
"input": "ESQZPIRAWBTUZSOWLYKIYCHZJPYERRXPJANKPZVPEDCXCJIDTLCARMAOTZMHJVDJXRDNQRIIOFIUTALVSCKDUSAKANKKOFKWINLQ\nGKSTYEAXFJQQUTKPZDAKHZKXCJDONKBZOTYGLYQJOGKOYMYNNNQRRVAGARKBQYJRVYYPFXTIBJJYQUWJUGAUQZUVMUHXLIQWGRMP\nUFPHNRDXLNYRIIYVOFRKRUQCWAICQUUBPHHEGBCILXHHGLOBKADQVPSQCMXJRLIZQPSRLZJNZVQPIURDQUKNHVVYNVBYGXXXXJDI",
"output": "STYEXJKPZDXCJDTLOMVRQRFIUAVUIQ"
},
{
"input": "UAYQUMTSNGMYBORUYXJJQZVAGBRVDWUTGUYYYOTWAHVKGGOHADXULFUFQULSAGDWFJCSDKPWBROYZIFRGGRVZQMEHKHCKNHTQSMK\nSVKVTPUZOBRKGLEAAXMIUSRISOTDIFFUCODYGNYIPSWEEBHGNWRZETXSVVMQTRBVFZMYHOHUCMLBUXBMPMSNCSHFZTAFUVTMQFGL\nTNICVANBEBOQASUEJJAOJXWNMDGAAVYNHRPSMKGMXZDJHCZHFHRRMIDWUOQCZSBKDPLSGHNHFKFYDRGVKXOLPOOWBPOWSDFLEJVX",
"output": "SVVTUOKGAXUFFUCDPWBRZRVZMHHCNHTQ"
},
{
"input": "KEJHTOKHMKWTYSJEAJAXGADRHUKBCRHACSRDNSZIHTPQNLOSRKYBGYIIJDINTXRPMWSVMMBODAYPVVDDTIXGDIOMWUAKZVFKDAUM\nWTEVPIFAAJYIDTZSZKPPQKIOMHDZTKDMFVKSJRUFMNHZJPVSQYELWYAFACGGNRORSLGYVXAEYVLZBLDEHYDGOFDSWUYCXLXDKFSU\nTUZEQBWVBVTKETQ",
"output": "EJTOKMKSJRUHZPQLYGNRSVAYVDDGDWUKFU"
},
{
"input": "EGQYYSKTFTURZNRDVIWBYXMRDGFWMYKFXGIFOGYJSXKDCJUAGZPVTYCHIXVFTVTCXMKHZFTXSMMQVFXZGKHCIYODDRZEYECDLKNG\nPEXXCTRFJAAKPOTBAEFRLDRZKORNMXHHXTLKMKCGPVPUOBELPLFQFXOBZWIVIQCHEJQPXKGSCQAWIMETCJVTAGXJIINTADDXJTKQ\nQURSEKPMSSEVQZI",
"output": "EKTFRZNXMGFFXIJXKCATCVTXTDDK"
},
{
"input": "ZFFBNYVXOZCJPSRAEACVPAUKVTCVZYQPHVENTKOCMHNIYYMIKKLNKHLWHHWAQMWFTSYEOQQFEYAAYGMPNZCRYBVNAQTDSLXZGBCG\nPIQHLNEWAMFAKGHBGZAWRWAXCSKUDZBDOCTXAHSVFZACXGFMDSYBYYDDNQNBEZCYCULSMMPBTQOJQNRPZTRCSDLIYPLVUGJPKDTG\nZBFJPLNAKWQBTUVJKMHVBATAM",
"output": "FBZRACUZOCHAMSYYYNZCYBNTDLGG"
},
{
"input": "BTWZLIKDACZVLCKMVTIQHLFBNRCBDSWPFFKGPCQFPTOIJLPFCDMFGQKFHTDFFCCULUAYPXXIIIWBZIDMOPNHPZBEXLVARJFTBFOE\nMDXYKKWZVASJPPWRCYNMRAOBBLUNBSMQAPCPSFAGLXWJRBQTBRWXYNQGWECYNFIAJXDMUHIIMDFMSHLPIMYQXNRRUSSNXALGNWIK\nKNFVBVAOWXMZVUHAVUDKDBUVAKNHACZBGBHMUOPHWGQSDFXLHB",
"output": "WZACLMQLBRWGCFIJDMHDFLPIMNXL"
},
{
"input": "GOZVMIRQIGYGVAGOREQTXFXPEZYOJOXPNDGAESICXHMKQDXQPRLMRVWHXFEJVCWZDLYMQLDURUXZPTLEHPTSKXGSNEQDKLVFFLDX\nIMEVFCZXACKRRJVXDRKFWTLTRTLQQDHEBZLCOCNVPABQMIWJHRLKFUKWOVVWGGNWCJNRYOYOAJFQWCLHQIQRBZTVWKBFOXKEHHQP\nSZ",
"output": "MVARXFEZOPAIHRLVWFCLQRZTKXEQ"
},
{
"input": "BBYUVCIYLNUJPSEYCAAPQSDNSDDTNEHQZDPBEKQAWNAKEYFBNEEBGPDPRLCSVOWYDEDRPPEDOROCHRCNQUSPNVXGRXHNLKDETWQC\nBQCQXCAHADGJHBYIKEUWNXFUOOTVCCKJPJJCMWLAWWKSDGHFNZTCPSQNRTPCBLXDTSJLRHSCCZXQXCVLVGTROOUCUQASIQHZGNEI\nRYE",
"output": "BBYUVCJPCASDNTPQNBDRLVROOCQSGNE"
},
{
"input": "WZRKLETJRBBRZKGHEFBVEFVLIERBPSEGJVSNUZUICONWWBOOTHCOJLLZFNOCNOFJQZTZWBLKHGIWWWPBUYWBAHYJGEBJZJDTNBGN\nZINFGDCNKHYFZYYWHTIHZTKWXXXMSWOVOPQDTRWSQKBWWCPEMYFVGARELELBLGEVJCMOCFTTUVCYUQUSFONAMWKVDWMGXVNZJBWH\nAFPA",
"output": "WZKTRBEFVELEBEJCOTCFONWKWGZJB"
},
{
"input": "ABABABB\nABABABB\nABABB",
"output": "ABABAB"
},
{
"input": "ABBB\nABBB\nABB",
"output": "BBB"
},
{
"input": "A\nBABAABAAABABABABABABAABABABABBABABABABAABBABBABAABABAABAABBAAAAAABBABABABABAABABAABABABABAABAABABABA\nB",
"output": "A"
},
{
"input": "ABBAABAAABABAABAABABABABAABBBABABABAAABBABAAABABABABBABBABABAABABABABABABBABAABABAABABABAAABBABABABA\nA\nB",
"output": "A"
},
{
"input": "ABBBABABABABABBABAABAAABABAABABABABBABAAAABABABBABAABABAAABAABBAAABAABABBABBABABBABAABABABAAAAABABAB\nB\nBABBABAABABABABABABABABABBAABABBABABBAAABAAABABBAABAABBABABBABABAABBABAABABBAABAABAABABABABABBABABAB",
"output": "B"
},
{
"input": "AABABAABAAABABAAABAAAABBAAABABAAABABAABAABAAAABAABAAAABAAAABAAAABBAABAAAAABAAAAABABAAAAAABABAABAAAAA\nABAABABABAAABABAABABBAABAABAABABAABABAAABBAABAAAABABABAAAAABAAAAABABABABAABAABAABAABABAABABAABAABAAB\nBABAAABABBAABABAABAA",
"output": "ABAABABABAAABAAAABBAABAAAABABAABABAAABAABAAAABAAAAAAABAAAAAAABAAAAABAAAAAAABABAABAAAA"
},
{
"input": "AABABABABAAAABBAAAABABABABAAAAABABAAAA\nAABABAAABABABAAABAAAAABAAABAAABABABBBABBAAABAABAAAAABABBABAAABAABAABABAAAABABAAABAAABAABABBBABBABABA\nAAAAA",
"output": "AABABABABAAAABBAAAABABABABAAAABABAAAA"
},
{
"input": "ZZXXAAZZAXAAZZAZZXXAAZZAXAXZZXXAAZZZZXXAZZXXAAAZZXXAAAZZXXZZXXXAAAZZXZZXXAZZXXZXXAAXAAZZZXXAXAXAZZXZ\nAZZXXAAZZXXAAXZXXAZZXAZZXZZXXAAZZXXAAZAAZZAAZZXXAA\nAAZZXAAXXAAAZZXXAZZXXAAZZXXAAAZZXXZ",
"output": "ZZXXAAZZXXAAXZXXAZZXAZZXZZXXAAZZXXAAZAZZAAZZXXAA"
},
{
"input": "SDASSDADASDASDASDSDADASASDAAASDASDDASDDASDADASDASDSSDASDD\nSDASDASDDASDASDASDSDSDASDASDASDASDASDASDASDADASDASDASDSDASDASDDDASSD\nSDASDSDDAA",
"output": "SDASSDADASDASDSDSDADASASDAAASDASDDASDDASDDASDASDDASD"
},
{
"input": "DASSDASDASDDAASDASDADASDASASDAS\nSDADASDASSDAASDASDASDADASSDDA\nSD",
"output": "DADADADAADADADADASSA"
},
{
"input": "ASDASSDASDS\nDASDASDDDASDADASDASDASDASSDADASDDAASDA\nDSD",
"output": "ASDASSDASDS"
},
{
"input": "ASDASASDASDASDAASDASDASDASASDDAASDASSASDSDAD\nDASDASSSDASDASDASASDASSDAASDASSDDSASDASDAASDDAASDASDAASDASDDASDASDASDASDASS\nDASD",
"output": "ASDASASDASASDAASDASASDASASDDAASDASSASDSDAD"
},
{
"input": "DASDSDASDADASDDDSDASSDDAASDA\nDASDDASDSDADSDASDADSDSDADDASDASDDASDASDASDSDASD\nDAASD",
"output": "DASDSDASDADASDDDSDASSDDASDA"
},
{
"input": "ABAAAABABADABAABAABCCABADABACABACABCABADABADABACABBACAADABACABABACABADABACABABA\nBACAACABABABACABCABADABAACABADABACABAA\nABBAB",
"output": "BAAACABABABACABCABADABAACABADABACABAA"
},
{
"input": "ABAABACABADAACADABACAAB\nBAACABADABACABAAAADADAABACABACABADABABADABACABAADABBADABACAAACAABACABADABBBAA\nDABACA",
"output": "ABAABACABADAACADABAAAB"
},
{
"input": "BACABACABAACABADABABACAABACABBACAACAACABCABADAACABAABAABBADABACABADABCABAD\nBACAABADABABADABACABABACABADABACABCBADABACADABCABABADAABA\nBADABAA",
"output": "BACAABAAABADABACAABACABAAACABCBADAACADABCABADAABA"
},
{
"input": "ACABADABACABCABAAB\nBADAB\nACAACABA",
"output": "BADAB"
},
{
"input": "ABABAC\nABABAC\nABAC",
"output": "ABABA"
},
{
"input": "BCBCBC\nBCBCBC\nBC",
"output": "CCB"
},
{
"input": "AAACAAACAAADAAAAAAA\nAADAAAAAAAACDAAAAAAAAAAACAAAAABCACAAACAAAAABAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAADA\nAAACAADAAAAADD",
"output": "AAACAAACAAAAAAAAAA"
},
{
"input": "ABABBB\nABABBB\nABB",
"output": "ABAB"
},
{
"input": "ABABABAC\nABABABAC\nABABAC",
"output": "ABABABA"
},
{
"input": "BBAABAAAAABBBBBBBABABAABAABAABBABABABBBABBABBABBBABAABBBBBBAABAAAAAAAAABABAAABBABBAAAAAABAABABBAAABB\nBBAABAAAAABBBBBBBABABAABAABAABBABABABBBABBABBABBBABAABBBBBBAABAAAAAAAAABABAAABBABBAAAAAABAABABBAAABB\nBBBAA",
"output": "BBAABAAAAABBBBBBBABABAABAABAABBABABABBBABBABBABBBABAABBBBBBABAAAAAAAAABABAAABBABBAAAAAABAABABBAAABB"
},
{
"input": "ABABC\nABABC\nABC",
"output": "ABAB"
},
{
"input": "BABBB\nBABBB\nABB",
"output": "BBBB"
},
{
"input": "ABCCCCCCCC\nABCCCCCCCC\nABC",
"output": "BCCCCCCCC"
}
] | 1,684,598,088
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 20
| 92
| 102,400
|
def LCS(X, Y):
m = len(X)
n = len(Y)
c = [[0 for _ in range (n+1)]for _ in range(m+1)]
for i in range (1,m+1):
for j in range(1,n+1):
if X[i-1] == Y[j-1]:
c[i][j] = c[i-1][j-1] + 1
else:
c[i][j] = max(c[i-1][j], c[i][j-1])
res = LCS_print(X,m,n,c)
return res
def LCS_print(x, m, n, c):
if(m==0 or n==0):
return ""
if c[m][n] == c[m-1][n]: # go up
return LCS_print(x, m-1, n, c)
elif c[m][n] == c[m][n-1]: # go left
return LCS_print(x, m, n-1, c)
else: # it was a match!
return LCS_print(x, m-1, n-1, c) + x[m-1]
def output(s1,s2,s3):
lcs = LCS(s1,s2)
c = s3[0]
l = len(s3)
if(len(lcs)==0):
return 0
for i in range(len(lcs)):
if lcs[i] == c:
if(lcs[i:min(i+l,len(lcs))]==s3):
d= len(s3)
while(d!=0):
for i in range(len(s1)):
if s1[i] == s3[d-1]:
s1 = s1[0:i]+s1[i+1:]
break
for i in range(len(s2)):
if s2[i] == s3[d-1]:
s2 = s2[0:i]+s2[i+1:]
break
d-=1
return(output(s1,s2,s3))
return (lcs)
s1 = input()
s2 = input()
s3 = input()
print(output(s1,s2,s3))
|
Title: Lucky Common Subsequence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
In mathematics, a subsequence is a sequence that can be derived from another sequence by deleting some elements without changing the order of the remaining elements. For example, the sequence BDF is a subsequence of ABCDEF. A substring of a string is a continuous subsequence of the string. For example, BCD is a substring of ABCDEF.
You are given two strings *s*1, *s*2 and another string called *virus*. Your task is to find the longest common subsequence of *s*1 and *s*2, such that it doesn't contain *virus* as a substring.
Input Specification:
The input contains three strings in three separate lines: *s*1, *s*2 and *virus* (1<=≤<=|*s*1|,<=|*s*2|,<=|*virus*|<=≤<=100). Each string consists only of uppercase English letters.
Output Specification:
Output the longest common subsequence of *s*1 and *s*2 without *virus* as a substring. If there are multiple answers, any of them will be accepted.
If there is no valid common subsequence, output 0.
Demo Input:
['AJKEQSLOBSROFGZ\nOVGURWZLWVLUXTH\nOZ\n', 'AA\nA\nA\n']
Demo Output:
['ORZ\n', '0\n']
Note:
none
|
```python
def LCS(X, Y):
m = len(X)
n = len(Y)
c = [[0 for _ in range (n+1)]for _ in range(m+1)]
for i in range (1,m+1):
for j in range(1,n+1):
if X[i-1] == Y[j-1]:
c[i][j] = c[i-1][j-1] + 1
else:
c[i][j] = max(c[i-1][j], c[i][j-1])
res = LCS_print(X,m,n,c)
return res
def LCS_print(x, m, n, c):
if(m==0 or n==0):
return ""
if c[m][n] == c[m-1][n]: # go up
return LCS_print(x, m-1, n, c)
elif c[m][n] == c[m][n-1]: # go left
return LCS_print(x, m, n-1, c)
else: # it was a match!
return LCS_print(x, m-1, n-1, c) + x[m-1]
def output(s1,s2,s3):
lcs = LCS(s1,s2)
c = s3[0]
l = len(s3)
if(len(lcs)==0):
return 0
for i in range(len(lcs)):
if lcs[i] == c:
if(lcs[i:min(i+l,len(lcs))]==s3):
d= len(s3)
while(d!=0):
for i in range(len(s1)):
if s1[i] == s3[d-1]:
s1 = s1[0:i]+s1[i+1:]
break
for i in range(len(s2)):
if s2[i] == s3[d-1]:
s2 = s2[0:i]+s2[i+1:]
break
d-=1
return(output(s1,s2,s3))
return (lcs)
s1 = input()
s2 = input()
s3 = input()
print(output(s1,s2,s3))
```
| 0
|
|
50
|
B
|
Choosing Symbol Pairs
|
PROGRAMMING
| 1,500
|
[
"strings"
] |
B. Choosing Symbol Pairs
|
2
|
256
|
There is a given string *S* consisting of *N* symbols. Your task is to find the number of ordered pairs of integers *i* and *j* such that
1. 1<=≤<=*i*,<=*j*<=≤<=*N*
2. *S*[*i*]<==<=*S*[*j*], that is the *i*-th symbol of string *S* is equal to the *j*-th.
|
The single input line contains *S*, consisting of lowercase Latin letters and digits. It is guaranteed that string *S* in not empty and its length does not exceed 105.
|
Print a single number which represents the number of pairs *i* and *j* with the needed property. Pairs (*x*,<=*y*) and (*y*,<=*x*) should be considered different, i.e. the ordered pairs count.
|
[
"great10\n",
"aaaaaaaaaa\n"
] |
[
"7\n",
"100\n"
] |
none
| 1,000
|
[
{
"input": "great10",
"output": "7"
},
{
"input": "aaaaaaaaaa",
"output": "100"
},
{
"input": "great10",
"output": "7"
},
{
"input": "aaaaaaaaaa",
"output": "100"
},
{
"input": "aabb",
"output": "8"
},
{
"input": "w",
"output": "1"
},
{
"input": "129a",
"output": "4"
},
{
"input": "233444",
"output": "14"
},
{
"input": "abacaba",
"output": "21"
},
{
"input": "abcdefghijklmnopqrstuvwxyz0987654321abcdefghijklmnopqrstuvwxyz0987654321abcdefghijklmnopqrstuvwxyz0987654321",
"output": "324"
},
{
"input": "zazaeeeeeeeq34443333444tttttt",
"output": "155"
},
{
"input": "00000000000000000000000",
"output": "529"
},
{
"input": "999000888775646453342311",
"output": "62"
}
] | 1,636,125,340
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 30
| 124
| 4,505,600
|
a={}
s=input()
for c in s:
a[c]=a.get(c,0)+1
ans=0
for i in a.values():
ans+=i**2
print(ans)
|
Title: Choosing Symbol Pairs
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
There is a given string *S* consisting of *N* symbols. Your task is to find the number of ordered pairs of integers *i* and *j* such that
1. 1<=≤<=*i*,<=*j*<=≤<=*N*
2. *S*[*i*]<==<=*S*[*j*], that is the *i*-th symbol of string *S* is equal to the *j*-th.
Input Specification:
The single input line contains *S*, consisting of lowercase Latin letters and digits. It is guaranteed that string *S* in not empty and its length does not exceed 105.
Output Specification:
Print a single number which represents the number of pairs *i* and *j* with the needed property. Pairs (*x*,<=*y*) and (*y*,<=*x*) should be considered different, i.e. the ordered pairs count.
Demo Input:
['great10\n', 'aaaaaaaaaa\n']
Demo Output:
['7\n', '100\n']
Note:
none
|
```python
a={}
s=input()
for c in s:
a[c]=a.get(c,0)+1
ans=0
for i in a.values():
ans+=i**2
print(ans)
```
| 3.960608
|
160
|
A
|
Twins
|
PROGRAMMING
| 900
|
[
"greedy",
"sortings"
] | null | null |
Imagine that you have a twin brother or sister. Having another person that looks exactly like you seems very unusual. It's hard to say if having something of an alter ego is good or bad. And if you do have a twin, then you very well know what it's like.
Now let's imagine a typical morning in your family. You haven't woken up yet, and Mom is already going to work. She has been so hasty that she has nearly forgotten to leave the two of her darling children some money to buy lunches in the school cafeteria. She fished in the purse and found some number of coins, or to be exact, *n* coins of arbitrary values *a*1,<=*a*2,<=...,<=*a**n*. But as Mom was running out of time, she didn't split the coins for you two. So she scribbled a note asking you to split the money equally.
As you woke up, you found Mom's coins and read her note. "But why split the money equally?" — you thought. After all, your twin is sleeping and he won't know anything. So you decided to act like that: pick for yourself some subset of coins so that the sum of values of your coins is strictly larger than the sum of values of the remaining coins that your twin will have. However, you correctly thought that if you take too many coins, the twin will suspect the deception. So, you've decided to stick to the following strategy to avoid suspicions: you take the minimum number of coins, whose sum of values is strictly more than the sum of values of the remaining coins. On this basis, determine what minimum number of coins you need to take to divide them in the described manner.
|
The first line contains integer *n* (1<=≤<=*n*<=≤<=100) — the number of coins. The second line contains a sequence of *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=100) — the coins' values. All numbers are separated with spaces.
|
In the single line print the single number — the minimum needed number of coins.
|
[
"2\n3 3\n",
"3\n2 1 2\n"
] |
[
"2\n",
"2\n"
] |
In the first sample you will have to take 2 coins (you and your twin have sums equal to 6, 0 correspondingly). If you take 1 coin, you get sums 3, 3. If you take 0 coins, you get sums 0, 6. Those variants do not satisfy you as your sum should be strictly more that your twins' sum.
In the second sample one coin isn't enough for us, too. You can pick coins with values 1, 2 or 2, 2. In any case, the minimum number of coins equals 2.
| 500
|
[
{
"input": "2\n3 3",
"output": "2"
},
{
"input": "3\n2 1 2",
"output": "2"
},
{
"input": "1\n5",
"output": "1"
},
{
"input": "5\n4 2 2 2 2",
"output": "3"
},
{
"input": "7\n1 10 1 2 1 1 1",
"output": "1"
},
{
"input": "5\n3 2 3 3 1",
"output": "3"
},
{
"input": "2\n2 1",
"output": "1"
},
{
"input": "3\n2 1 3",
"output": "2"
},
{
"input": "6\n1 1 1 1 1 1",
"output": "4"
},
{
"input": "7\n10 10 5 5 5 5 1",
"output": "3"
},
{
"input": "20\n2 1 2 2 2 1 1 2 1 2 2 1 1 1 1 2 1 1 1 1",
"output": "8"
},
{
"input": "20\n4 2 4 4 3 4 2 2 4 2 3 1 1 2 2 3 3 3 1 4",
"output": "8"
},
{
"input": "20\n35 26 41 40 45 46 22 26 39 23 11 15 47 42 18 15 27 10 45 40",
"output": "8"
},
{
"input": "20\n7 84 100 10 31 35 41 2 63 44 57 4 63 11 23 49 98 71 16 90",
"output": "6"
},
{
"input": "50\n19 2 12 26 17 27 10 26 17 17 5 24 11 15 3 9 16 18 19 1 25 23 18 6 2 7 25 7 21 25 13 29 16 9 25 3 14 30 18 4 10 28 6 10 8 2 2 4 8 28",
"output": "14"
},
{
"input": "70\n2 18 18 47 25 5 14 9 19 46 36 49 33 32 38 23 32 39 8 29 31 17 24 21 10 15 33 37 46 21 22 11 20 35 39 13 11 30 28 40 39 47 1 17 24 24 21 46 12 2 20 43 8 16 44 11 45 10 13 44 31 45 45 46 11 10 33 35 23 42",
"output": "22"
},
{
"input": "100\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "51"
},
{
"input": "100\n1 2 2 1 2 1 1 2 1 1 1 2 2 1 1 1 2 2 2 1 2 1 1 1 1 1 2 1 2 1 2 1 2 1 2 1 1 1 2 1 1 1 1 1 2 2 1 2 1 2 1 2 2 2 1 2 1 2 2 1 1 2 2 1 1 2 2 2 1 1 2 1 1 2 2 1 2 1 1 2 2 1 2 1 1 2 2 1 1 1 1 2 1 1 1 1 2 2 2 2",
"output": "37"
},
{
"input": "100\n1 2 3 2 1 2 2 3 1 3 3 2 2 1 1 2 2 1 1 1 1 2 3 3 2 1 1 2 2 2 3 3 3 2 1 3 1 3 3 2 3 1 2 2 2 3 2 1 1 3 3 3 3 2 1 1 2 3 2 2 3 2 3 2 2 3 2 2 2 2 3 3 3 1 3 3 1 1 2 3 2 2 2 2 3 3 3 2 1 2 3 1 1 2 3 3 1 3 3 2",
"output": "36"
},
{
"input": "100\n5 5 4 3 5 1 2 5 1 1 3 5 4 4 1 1 1 1 5 4 4 5 1 5 5 1 2 1 3 1 5 1 3 3 3 2 2 2 1 1 5 1 3 4 1 1 3 2 5 2 2 5 5 4 4 1 3 4 3 3 4 5 3 3 3 1 2 1 4 2 4 4 1 5 1 3 5 5 5 5 3 4 4 3 1 2 5 2 3 5 4 2 4 5 3 2 4 2 4 3",
"output": "33"
},
{
"input": "100\n3 4 8 10 8 6 4 3 7 7 6 2 3 1 3 10 1 7 9 3 5 5 2 6 2 9 1 7 4 2 4 1 6 1 7 10 2 5 3 7 6 4 6 2 8 8 8 6 6 10 3 7 4 3 4 1 7 9 3 6 3 6 1 4 9 3 8 1 10 1 4 10 7 7 9 5 3 8 10 2 1 10 8 7 10 8 5 3 1 2 1 10 6 1 5 3 3 5 7 2",
"output": "30"
},
{
"input": "100\n16 9 11 8 11 4 9 17 4 8 4 10 9 10 6 3 3 15 1 6 1 15 12 18 6 14 13 18 1 7 18 4 10 7 10 12 3 16 14 4 10 8 10 7 19 13 15 1 4 8 16 10 6 4 3 16 11 10 7 3 4 16 1 20 1 11 4 16 10 7 7 12 18 19 3 17 19 3 4 19 2 12 11 3 18 20 2 2 14 4 20 13 13 11 16 20 19 14 7 2",
"output": "29"
},
{
"input": "100\n2 46 4 6 38 19 15 34 10 35 37 30 3 25 5 45 40 45 33 31 6 20 10 44 11 9 2 14 35 5 9 23 20 2 48 22 25 35 38 31 24 33 35 16 4 30 27 10 12 22 6 24 12 30 23 21 14 12 32 21 7 12 25 43 18 34 34 28 47 13 28 43 18 39 44 42 35 26 35 14 8 29 32 20 29 3 20 6 20 9 9 27 8 42 10 37 42 27 8 1",
"output": "30"
},
{
"input": "100\n85 50 17 89 65 89 5 20 86 26 16 21 85 14 44 31 87 31 6 2 48 67 8 80 79 1 48 36 97 1 5 30 79 50 78 12 2 55 76 100 54 40 26 81 97 96 68 56 87 14 51 17 54 37 52 33 69 62 38 63 74 15 62 78 9 19 67 2 60 58 93 60 18 96 55 48 34 7 79 82 32 58 90 67 20 50 27 15 7 89 98 10 11 15 99 49 4 51 77 52",
"output": "29"
},
{
"input": "100\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100",
"output": "30"
},
{
"input": "1\n1",
"output": "1"
},
{
"input": "4\n4 1 2 3",
"output": "2"
},
{
"input": "5\n2 2 2 4 4",
"output": "2"
},
{
"input": "4\n100 99 99 100",
"output": "2"
}
] | 1,694,443,008
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 4
| 92
| 0
|
def mini(ts, li):
half = sum(li) / 2
rob = 0
n = 0
for i in li:
if rob > half:
break
else:
n += 1
rob += i
print(n)
ts = int(input())
li = list(map(int, input().split()))
mini(ts,li)
|
Title: Twins
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Imagine that you have a twin brother or sister. Having another person that looks exactly like you seems very unusual. It's hard to say if having something of an alter ego is good or bad. And if you do have a twin, then you very well know what it's like.
Now let's imagine a typical morning in your family. You haven't woken up yet, and Mom is already going to work. She has been so hasty that she has nearly forgotten to leave the two of her darling children some money to buy lunches in the school cafeteria. She fished in the purse and found some number of coins, or to be exact, *n* coins of arbitrary values *a*1,<=*a*2,<=...,<=*a**n*. But as Mom was running out of time, she didn't split the coins for you two. So she scribbled a note asking you to split the money equally.
As you woke up, you found Mom's coins and read her note. "But why split the money equally?" — you thought. After all, your twin is sleeping and he won't know anything. So you decided to act like that: pick for yourself some subset of coins so that the sum of values of your coins is strictly larger than the sum of values of the remaining coins that your twin will have. However, you correctly thought that if you take too many coins, the twin will suspect the deception. So, you've decided to stick to the following strategy to avoid suspicions: you take the minimum number of coins, whose sum of values is strictly more than the sum of values of the remaining coins. On this basis, determine what minimum number of coins you need to take to divide them in the described manner.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=100) — the number of coins. The second line contains a sequence of *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=100) — the coins' values. All numbers are separated with spaces.
Output Specification:
In the single line print the single number — the minimum needed number of coins.
Demo Input:
['2\n3 3\n', '3\n2 1 2\n']
Demo Output:
['2\n', '2\n']
Note:
In the first sample you will have to take 2 coins (you and your twin have sums equal to 6, 0 correspondingly). If you take 1 coin, you get sums 3, 3. If you take 0 coins, you get sums 0, 6. Those variants do not satisfy you as your sum should be strictly more that your twins' sum.
In the second sample one coin isn't enough for us, too. You can pick coins with values 1, 2 or 2, 2. In any case, the minimum number of coins equals 2.
|
```python
def mini(ts, li):
half = sum(li) / 2
rob = 0
n = 0
for i in li:
if rob > half:
break
else:
n += 1
rob += i
print(n)
ts = int(input())
li = list(map(int, input().split()))
mini(ts,li)
```
| 0
|
|
1,004
|
C
|
Sonya and Robots
|
PROGRAMMING
| 1,400
|
[
"constructive algorithms",
"implementation"
] | null | null |
Since Sonya is interested in robotics too, she decided to construct robots that will read and recognize numbers.
Sonya has drawn $n$ numbers in a row, $a_i$ is located in the $i$-th position. She also has put a robot at each end of the row (to the left of the first number and to the right of the last number). Sonya will give a number to each robot (they can be either same or different) and run them. When a robot is running, it is moving toward to another robot, reading numbers in the row. When a robot is reading a number that is equal to the number that was given to that robot, it will turn off and stay in the same position.
Sonya does not want robots to break, so she will give such numbers that robots will stop before they meet. That is, the girl wants them to stop at different positions so that the first robot is to the left of the second one.
For example, if the numbers $[1, 5, 4, 1, 3]$ are written, and Sonya gives the number $1$ to the first robot and the number $4$ to the second one, the first robot will stop in the $1$-st position while the second one in the $3$-rd position. In that case, robots will not meet each other. As a result, robots will not be broken. But if Sonya gives the number $4$ to the first robot and the number $5$ to the second one, they will meet since the first robot will stop in the $3$-rd position while the second one is in the $2$-nd position.
Sonya understands that it does not make sense to give a number that is not written in the row because a robot will not find this number and will meet the other robot.
Sonya is now interested in finding the number of different pairs that she can give to robots so that they will not meet. In other words, she wants to know the number of pairs ($p$, $q$), where she will give $p$ to the first robot and $q$ to the second one. Pairs ($p_i$, $q_i$) and ($p_j$, $q_j$) are different if $p_i\neq p_j$ or $q_i\neq q_j$.
Unfortunately, Sonya is busy fixing robots that broke after a failed launch. That is why she is asking you to find the number of pairs that she can give to robots so that they will not meet.
|
The first line contains a single integer $n$ ($1\leq n\leq 10^5$) — the number of numbers in a row.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1\leq a_i\leq 10^5$) — the numbers in a row.
|
Print one number — the number of possible pairs that Sonya can give to robots so that they will not meet.
|
[
"5\n1 5 4 1 3\n",
"7\n1 2 1 1 1 3 2\n"
] |
[
"9\n",
"7\n"
] |
In the first example, Sonya can give pairs ($1$, $1$), ($1$, $3$), ($1$, $4$), ($1$, $5$), ($4$, $1$), ($4$, $3$), ($5$, $1$), ($5$, $3$), and ($5$, $4$).
In the second example, Sonya can give pairs ($1$, $1$), ($1$, $2$), ($1$, $3$), ($2$, $1$), ($2$, $2$), ($2$, $3$), and ($3$, $2$).
| 1,500
|
[
{
"input": "5\n1 5 4 1 3",
"output": "9"
},
{
"input": "7\n1 2 1 1 1 3 2",
"output": "7"
},
{
"input": "10\n2 2 4 4 3 1 1 2 3 2",
"output": "14"
},
{
"input": "15\n1 2 2 1 2 4 2 1 1 6 6 4 2 5 4",
"output": "20"
},
{
"input": "1\n1",
"output": "0"
}
] | 1,547,894,459
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 42
| 233
| 14,028,800
|
n=int(input())
l=list(map(int,input().split()))
d={}
d1={-1}
s=set(l)
k=0
for x in l :
d[x]=d.get(x,0)+1
for x in l :
if x not in d1 :
if d[x]==1 :
s.remove(x)
k+=len(s)
d1.add(x)
d[x]-=1
else :
d[x]-=1
if d[x]==0 :
s.remove(x)
print(k)
|
Title: Sonya and Robots
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Since Sonya is interested in robotics too, she decided to construct robots that will read and recognize numbers.
Sonya has drawn $n$ numbers in a row, $a_i$ is located in the $i$-th position. She also has put a robot at each end of the row (to the left of the first number and to the right of the last number). Sonya will give a number to each robot (they can be either same or different) and run them. When a robot is running, it is moving toward to another robot, reading numbers in the row. When a robot is reading a number that is equal to the number that was given to that robot, it will turn off and stay in the same position.
Sonya does not want robots to break, so she will give such numbers that robots will stop before they meet. That is, the girl wants them to stop at different positions so that the first robot is to the left of the second one.
For example, if the numbers $[1, 5, 4, 1, 3]$ are written, and Sonya gives the number $1$ to the first robot and the number $4$ to the second one, the first robot will stop in the $1$-st position while the second one in the $3$-rd position. In that case, robots will not meet each other. As a result, robots will not be broken. But if Sonya gives the number $4$ to the first robot and the number $5$ to the second one, they will meet since the first robot will stop in the $3$-rd position while the second one is in the $2$-nd position.
Sonya understands that it does not make sense to give a number that is not written in the row because a robot will not find this number and will meet the other robot.
Sonya is now interested in finding the number of different pairs that she can give to robots so that they will not meet. In other words, she wants to know the number of pairs ($p$, $q$), where she will give $p$ to the first robot and $q$ to the second one. Pairs ($p_i$, $q_i$) and ($p_j$, $q_j$) are different if $p_i\neq p_j$ or $q_i\neq q_j$.
Unfortunately, Sonya is busy fixing robots that broke after a failed launch. That is why she is asking you to find the number of pairs that she can give to robots so that they will not meet.
Input Specification:
The first line contains a single integer $n$ ($1\leq n\leq 10^5$) — the number of numbers in a row.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1\leq a_i\leq 10^5$) — the numbers in a row.
Output Specification:
Print one number — the number of possible pairs that Sonya can give to robots so that they will not meet.
Demo Input:
['5\n1 5 4 1 3\n', '7\n1 2 1 1 1 3 2\n']
Demo Output:
['9\n', '7\n']
Note:
In the first example, Sonya can give pairs ($1$, $1$), ($1$, $3$), ($1$, $4$), ($1$, $5$), ($4$, $1$), ($4$, $3$), ($5$, $1$), ($5$, $3$), and ($5$, $4$).
In the second example, Sonya can give pairs ($1$, $1$), ($1$, $2$), ($1$, $3$), ($2$, $1$), ($2$, $2$), ($2$, $3$), and ($3$, $2$).
|
```python
n=int(input())
l=list(map(int,input().split()))
d={}
d1={-1}
s=set(l)
k=0
for x in l :
d[x]=d.get(x,0)+1
for x in l :
if x not in d1 :
if d[x]==1 :
s.remove(x)
k+=len(s)
d1.add(x)
d[x]-=1
else :
d[x]-=1
if d[x]==0 :
s.remove(x)
print(k)
```
| 3
|
|
817
|
B
|
Makes And The Product
|
PROGRAMMING
| 1,500
|
[
"combinatorics",
"implementation",
"math",
"sortings"
] | null | null |
After returning from the army Makes received a gift — an array *a* consisting of *n* positive integer numbers. He hadn't been solving problems for a long time, so he became interested to answer a particular question: how many triples of indices (*i*,<= *j*,<= *k*) (*i*<=<<=*j*<=<<=*k*), such that *a**i*·*a**j*·*a**k* is minimum possible, are there in the array? Help him with it!
|
The first line of input contains a positive integer number *n* (3<=≤<=*n*<=≤<=105) — the number of elements in array *a*. The second line contains *n* positive integer numbers *a**i* (1<=≤<=*a**i*<=≤<=109) — the elements of a given array.
|
Print one number — the quantity of triples (*i*,<= *j*,<= *k*) such that *i*,<= *j* and *k* are pairwise distinct and *a**i*·*a**j*·*a**k* is minimum possible.
|
[
"4\n1 1 1 1\n",
"5\n1 3 2 3 4\n",
"6\n1 3 3 1 3 2\n"
] |
[
"4\n",
"2\n",
"1\n"
] |
In the first example Makes always chooses three ones out of four, and the number of ways to choose them is 4.
In the second example a triple of numbers (1, 2, 3) is chosen (numbers, not indices). Since there are two ways to choose an element 3, then the answer is 2.
In the third example a triple of numbers (1, 1, 2) is chosen, and there's only one way to choose indices.
| 0
|
[
{
"input": "4\n1 1 1 1",
"output": "4"
},
{
"input": "5\n1 3 2 3 4",
"output": "2"
},
{
"input": "6\n1 3 3 1 3 2",
"output": "1"
},
{
"input": "3\n1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "4\n1 1 2 2",
"output": "2"
},
{
"input": "3\n1 3 1",
"output": "1"
},
{
"input": "11\n1 2 2 2 2 2 2 2 2 2 2",
"output": "45"
},
{
"input": "5\n1 2 2 2 2",
"output": "6"
},
{
"input": "6\n1 2 2 3 3 4",
"output": "1"
},
{
"input": "8\n1 1 2 2 2 3 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 2 3",
"output": "6"
},
{
"input": "3\n1 2 2",
"output": "1"
},
{
"input": "6\n1 2 2 2 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 2 2",
"output": "10"
},
{
"input": "4\n1 2 2 2",
"output": "3"
},
{
"input": "5\n1 2 3 2 3",
"output": "1"
},
{
"input": "6\n2 2 3 3 3 3",
"output": "4"
},
{
"input": "6\n1 2 2 2 5 6",
"output": "3"
},
{
"input": "10\n1 2 2 2 2 2 2 2 2 2",
"output": "36"
},
{
"input": "3\n2 1 2",
"output": "1"
},
{
"input": "5\n1 2 3 3 3",
"output": "3"
},
{
"input": "6\n1 2 2 2 4 5",
"output": "3"
},
{
"input": "4\n1 2 2 3",
"output": "1"
},
{
"input": "10\n2 2 2 2 2 1 2 2 2 2",
"output": "36"
},
{
"input": "7\n2 2 2 3 3 3 1",
"output": "3"
},
{
"input": "3\n1 1 2",
"output": "1"
},
{
"input": "5\n1 1 2 2 2",
"output": "3"
},
{
"input": "3\n1 2 3",
"output": "1"
},
{
"input": "9\n2 2 3 3 3 3 3 3 3",
"output": "7"
},
{
"input": "5\n1 1 2 2 3",
"output": "2"
},
{
"input": "4\n1 1 3 3",
"output": "2"
},
{
"input": "4\n33554432 33554432 67108864 33554432",
"output": "1"
},
{
"input": "6\n2 2 2 1 2 2",
"output": "10"
},
{
"input": "10\n1 2 1 2 3 2 3 2 2 2",
"output": "6"
},
{
"input": "10\n9 6 4 7 1 8 9 5 9 4",
"output": "1"
},
{
"input": "4\n5 7 2 7",
"output": "2"
},
{
"input": "3\n7 6 7",
"output": "1"
},
{
"input": "6\n3 2 8 2 5 3",
"output": "2"
},
{
"input": "3\n5 9 5",
"output": "1"
},
{
"input": "5\n6 3 7 6 3",
"output": "2"
},
{
"input": "9\n10 10 4 10 7 9 6 7 3",
"output": "1"
},
{
"input": "5\n9 10 10 3 8",
"output": "1"
},
{
"input": "5\n2 9 5 10 5",
"output": "1"
},
{
"input": "9\n7 1 9 6 6 8 3 1 3",
"output": "2"
},
{
"input": "5\n3 4 4 4 5",
"output": "3"
},
{
"input": "3\n3 1 3",
"output": "1"
},
{
"input": "8\n3 2 2 5 2 2 1 2",
"output": "10"
}
] | 1,636,526,693
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 18
| 1,372
| 14,131,200
|
from collections import Counter
import math
def main():
n = int(input())
nums = list(map(int,input().split()))
nums.sort()
lst = list(set(nums))
lst.sort()
counter = Counter(nums)
if counter[lst[0]] >= 3:
print(comb(counter[lst[0]],3))
elif counter[lst[0]] == 2:
print(counter[lst[1]])
elif counter[lst[0]] == 1 and counter[lst[1]] > 1:
print(counter[lst[1]]-1)
else:
print(counter[lst[2]])
# print(counter)
def comb(n,r):
if n == r:
return 1
return math.factorial(n)//(math.factorial(n-r)*math.factorial(r))
main()
|
Title: Makes And The Product
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
After returning from the army Makes received a gift — an array *a* consisting of *n* positive integer numbers. He hadn't been solving problems for a long time, so he became interested to answer a particular question: how many triples of indices (*i*,<= *j*,<= *k*) (*i*<=<<=*j*<=<<=*k*), such that *a**i*·*a**j*·*a**k* is minimum possible, are there in the array? Help him with it!
Input Specification:
The first line of input contains a positive integer number *n* (3<=≤<=*n*<=≤<=105) — the number of elements in array *a*. The second line contains *n* positive integer numbers *a**i* (1<=≤<=*a**i*<=≤<=109) — the elements of a given array.
Output Specification:
Print one number — the quantity of triples (*i*,<= *j*,<= *k*) such that *i*,<= *j* and *k* are pairwise distinct and *a**i*·*a**j*·*a**k* is minimum possible.
Demo Input:
['4\n1 1 1 1\n', '5\n1 3 2 3 4\n', '6\n1 3 3 1 3 2\n']
Demo Output:
['4\n', '2\n', '1\n']
Note:
In the first example Makes always chooses three ones out of four, and the number of ways to choose them is 4.
In the second example a triple of numbers (1, 2, 3) is chosen (numbers, not indices). Since there are two ways to choose an element 3, then the answer is 2.
In the third example a triple of numbers (1, 1, 2) is chosen, and there's only one way to choose indices.
|
```python
from collections import Counter
import math
def main():
n = int(input())
nums = list(map(int,input().split()))
nums.sort()
lst = list(set(nums))
lst.sort()
counter = Counter(nums)
if counter[lst[0]] >= 3:
print(comb(counter[lst[0]],3))
elif counter[lst[0]] == 2:
print(counter[lst[1]])
elif counter[lst[0]] == 1 and counter[lst[1]] > 1:
print(counter[lst[1]]-1)
else:
print(counter[lst[2]])
# print(counter)
def comb(n,r):
if n == r:
return 1
return math.factorial(n)//(math.factorial(n-r)*math.factorial(r))
main()
```
| 0
|
|
902
|
B
|
Coloring a Tree
|
PROGRAMMING
| 1,200
|
[
"dfs and similar",
"dsu",
"greedy"
] | null | null |
You are given a rooted tree with *n* vertices. The vertices are numbered from 1 to *n*, the root is the vertex number 1.
Each vertex has a color, let's denote the color of vertex *v* by *c**v*. Initially *c**v*<==<=0.
You have to color the tree into the given colors using the smallest possible number of steps. On each step you can choose a vertex *v* and a color *x*, and then color all vectices in the subtree of *v* (including *v* itself) in color *x*. In other words, for every vertex *u*, such that the path from root to *u* passes through *v*, set *c**u*<==<=*x*.
It is guaranteed that you have to color each vertex in a color different from 0.
You can learn what a rooted tree is using the link: [https://en.wikipedia.org/wiki/Tree_(graph_theory)](https://en.wikipedia.org/wiki/Tree_(graph_theory)).
|
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=104) — the number of vertices in the tree.
The second line contains *n*<=-<=1 integers *p*2,<=*p*3,<=...,<=*p**n* (1<=≤<=*p**i*<=<<=*i*), where *p**i* means that there is an edge between vertices *i* and *p**i*.
The third line contains *n* integers *c*1,<=*c*2,<=...,<=*c**n* (1<=≤<=*c**i*<=≤<=*n*), where *c**i* is the color you should color the *i*-th vertex into.
It is guaranteed that the given graph is a tree.
|
Print a single integer — the minimum number of steps you have to perform to color the tree into given colors.
|
[
"6\n1 2 2 1 5\n2 1 1 1 1 1\n",
"7\n1 1 2 3 1 4\n3 3 1 1 1 2 3\n"
] |
[
"3\n",
"5\n"
] |
The tree from the first sample is shown on the picture (numbers are vetices' indices):
<img class="tex-graphics" src="https://espresso.codeforces.com/10324ccdc37f95343acc4f3c6050d8c334334ffa.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On first step we color all vertices in the subtree of vertex 1 into color 2 (numbers are colors):
<img class="tex-graphics" src="https://espresso.codeforces.com/1c7bb267e2c1a006132248a43121400189309e2f.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On seond step we color all vertices in the subtree of vertex 5 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/2201a6d49b89ba850ff0d0bdcbb3f8e9dd3871a8.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On third step we color all vertices in the subtree of vertex 2 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/6fa977fcdebdde94c47695151e0427b33d0102c5.png" style="max-width: 100.0%;max-height: 100.0%;"/>
The tree from the second sample is shown on the picture (numbers are vetices' indices):
<img class="tex-graphics" src="https://espresso.codeforces.com/d70f9ae72a2ed429dd6531cac757e375dd3c953d.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On first step we color all vertices in the subtree of vertex 1 into color 3 (numbers are colors):
<img class="tex-graphics" src="https://espresso.codeforces.com/7289e8895d0dd56c47b6b17969b9cf77b36786b5.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On second step we color all vertices in the subtree of vertex 3 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/819001df7229138db3a407713744d1e3be88b64e.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On third step we color all vertices in the subtree of vertex 6 into color 2:
<img class="tex-graphics" src="https://espresso.codeforces.com/80ebbd870a0a339636a21b9acdaf9de046458b43.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On fourth step we color all vertices in the subtree of vertex 4 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/ed836aa723ac0176abde4e32988e3ac205014e93.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On fith step we color all vertices in the subtree of vertex 7 into color 3:
<img class="tex-graphics" src="https://espresso.codeforces.com/8132909e11b41c27b8df2f0b0c10bc841f35e58a.png" style="max-width: 100.0%;max-height: 100.0%;"/>
| 1,000
|
[
{
"input": "6\n1 2 2 1 5\n2 1 1 1 1 1",
"output": "3"
},
{
"input": "7\n1 1 2 3 1 4\n3 3 1 1 1 2 3",
"output": "5"
},
{
"input": "2\n1\n2 2",
"output": "1"
},
{
"input": "3\n1 1\n2 2 2",
"output": "1"
},
{
"input": "4\n1 2 1\n1 2 3 4",
"output": "4"
},
{
"input": "4\n1 2 3\n4 1 2 4",
"output": "4"
},
{
"input": "5\n1 2 1 4\n1 1 1 2 2",
"output": "2"
},
{
"input": "3\n1 2\n2 1 1",
"output": "2"
},
{
"input": "4\n1 1 1\n3 1 3 1",
"output": "3"
},
{
"input": "4\n1 1 2\n4 1 4 1",
"output": "2"
},
{
"input": "4\n1 2 2\n3 1 2 3",
"output": "4"
},
{
"input": "3\n1 1\n1 2 2",
"output": "3"
}
] | 1,554,962,742
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 50
| 124
| 1,331,200
|
n = int(int(input()))
parent = [0,0] + list(map(int, input().split()))
color = [0] + list(map(int, input().split()))
cnt = 1
for i in range(2,n+1,1):
if color[i] != color[parent[i]]:
cnt += 1
print(cnt)
|
Title: Coloring a Tree
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a rooted tree with *n* vertices. The vertices are numbered from 1 to *n*, the root is the vertex number 1.
Each vertex has a color, let's denote the color of vertex *v* by *c**v*. Initially *c**v*<==<=0.
You have to color the tree into the given colors using the smallest possible number of steps. On each step you can choose a vertex *v* and a color *x*, and then color all vectices in the subtree of *v* (including *v* itself) in color *x*. In other words, for every vertex *u*, such that the path from root to *u* passes through *v*, set *c**u*<==<=*x*.
It is guaranteed that you have to color each vertex in a color different from 0.
You can learn what a rooted tree is using the link: [https://en.wikipedia.org/wiki/Tree_(graph_theory)](https://en.wikipedia.org/wiki/Tree_(graph_theory)).
Input Specification:
The first line contains a single integer *n* (2<=≤<=*n*<=≤<=104) — the number of vertices in the tree.
The second line contains *n*<=-<=1 integers *p*2,<=*p*3,<=...,<=*p**n* (1<=≤<=*p**i*<=<<=*i*), where *p**i* means that there is an edge between vertices *i* and *p**i*.
The third line contains *n* integers *c*1,<=*c*2,<=...,<=*c**n* (1<=≤<=*c**i*<=≤<=*n*), where *c**i* is the color you should color the *i*-th vertex into.
It is guaranteed that the given graph is a tree.
Output Specification:
Print a single integer — the minimum number of steps you have to perform to color the tree into given colors.
Demo Input:
['6\n1 2 2 1 5\n2 1 1 1 1 1\n', '7\n1 1 2 3 1 4\n3 3 1 1 1 2 3\n']
Demo Output:
['3\n', '5\n']
Note:
The tree from the first sample is shown on the picture (numbers are vetices' indices):
<img class="tex-graphics" src="https://espresso.codeforces.com/10324ccdc37f95343acc4f3c6050d8c334334ffa.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On first step we color all vertices in the subtree of vertex 1 into color 2 (numbers are colors):
<img class="tex-graphics" src="https://espresso.codeforces.com/1c7bb267e2c1a006132248a43121400189309e2f.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On seond step we color all vertices in the subtree of vertex 5 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/2201a6d49b89ba850ff0d0bdcbb3f8e9dd3871a8.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On third step we color all vertices in the subtree of vertex 2 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/6fa977fcdebdde94c47695151e0427b33d0102c5.png" style="max-width: 100.0%;max-height: 100.0%;"/>
The tree from the second sample is shown on the picture (numbers are vetices' indices):
<img class="tex-graphics" src="https://espresso.codeforces.com/d70f9ae72a2ed429dd6531cac757e375dd3c953d.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On first step we color all vertices in the subtree of vertex 1 into color 3 (numbers are colors):
<img class="tex-graphics" src="https://espresso.codeforces.com/7289e8895d0dd56c47b6b17969b9cf77b36786b5.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On second step we color all vertices in the subtree of vertex 3 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/819001df7229138db3a407713744d1e3be88b64e.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On third step we color all vertices in the subtree of vertex 6 into color 2:
<img class="tex-graphics" src="https://espresso.codeforces.com/80ebbd870a0a339636a21b9acdaf9de046458b43.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On fourth step we color all vertices in the subtree of vertex 4 into color 1:
<img class="tex-graphics" src="https://espresso.codeforces.com/ed836aa723ac0176abde4e32988e3ac205014e93.png" style="max-width: 100.0%;max-height: 100.0%;"/>
On fith step we color all vertices in the subtree of vertex 7 into color 3:
<img class="tex-graphics" src="https://espresso.codeforces.com/8132909e11b41c27b8df2f0b0c10bc841f35e58a.png" style="max-width: 100.0%;max-height: 100.0%;"/>
|
```python
n = int(int(input()))
parent = [0,0] + list(map(int, input().split()))
color = [0] + list(map(int, input().split()))
cnt = 1
for i in range(2,n+1,1):
if color[i] != color[parent[i]]:
cnt += 1
print(cnt)
```
| 3
|
|
116
|
A
|
Tram
|
PROGRAMMING
| 800
|
[
"implementation"
] | null | null |
Linear Kingdom has exactly one tram line. It has *n* stops, numbered from 1 to *n* in the order of tram's movement. At the *i*-th stop *a**i* passengers exit the tram, while *b**i* passengers enter it. The tram is empty before it arrives at the first stop. Also, when the tram arrives at the last stop, all passengers exit so that it becomes empty.
Your task is to calculate the tram's minimum capacity such that the number of people inside the tram at any time never exceeds this capacity. Note that at each stop all exiting passengers exit before any entering passenger enters the tram.
|
The first line contains a single number *n* (2<=≤<=*n*<=≤<=1000) — the number of the tram's stops.
Then *n* lines follow, each contains two integers *a**i* and *b**i* (0<=≤<=*a**i*,<=*b**i*<=≤<=1000) — the number of passengers that exits the tram at the *i*-th stop, and the number of passengers that enter the tram at the *i*-th stop. The stops are given from the first to the last stop in the order of tram's movement.
- The number of people who exit at a given stop does not exceed the total number of people in the tram immediately before it arrives at the stop. More formally, . This particularly means that *a*1<==<=0. - At the last stop, all the passengers exit the tram and it becomes empty. More formally, . - No passenger will enter the train at the last stop. That is, *b**n*<==<=0.
|
Print a single integer denoting the minimum possible capacity of the tram (0 is allowed).
|
[
"4\n0 3\n2 5\n4 2\n4 0\n"
] |
[
"6\n"
] |
For the first example, a capacity of 6 is sufficient:
- At the first stop, the number of passengers inside the tram before arriving is 0. Then, 3 passengers enter the tram, and the number of passengers inside the tram becomes 3. - At the second stop, 2 passengers exit the tram (1 passenger remains inside). Then, 5 passengers enter the tram. There are 6 passengers inside the tram now. - At the third stop, 4 passengers exit the tram (2 passengers remain inside). Then, 2 passengers enter the tram. There are 4 passengers inside the tram now. - Finally, all the remaining passengers inside the tram exit the tram at the last stop. There are no passenger inside the tram now, which is in line with the constraints.
Since the number of passengers inside the tram never exceeds 6, a capacity of 6 is sufficient. Furthermore it is not possible for the tram to have a capacity less than 6. Hence, 6 is the correct answer.
| 500
|
[
{
"input": "4\n0 3\n2 5\n4 2\n4 0",
"output": "6"
},
{
"input": "5\n0 4\n4 6\n6 5\n5 4\n4 0",
"output": "6"
},
{
"input": "10\n0 5\n1 7\n10 8\n5 3\n0 5\n3 3\n8 8\n0 6\n10 1\n9 0",
"output": "18"
},
{
"input": "3\n0 1\n1 1\n1 0",
"output": "1"
},
{
"input": "4\n0 1\n0 1\n1 0\n1 0",
"output": "2"
},
{
"input": "3\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "3\n0 1000\n1000 1000\n1000 0",
"output": "1000"
},
{
"input": "5\n0 73\n73 189\n189 766\n766 0\n0 0",
"output": "766"
},
{
"input": "5\n0 0\n0 0\n0 0\n0 1\n1 0",
"output": "1"
},
{
"input": "5\n0 917\n917 923\n904 992\n1000 0\n11 0",
"output": "1011"
},
{
"input": "5\n0 1\n1 2\n2 1\n1 2\n2 0",
"output": "2"
},
{
"input": "5\n0 0\n0 0\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "20\n0 7\n2 1\n2 2\n5 7\n2 6\n6 10\n2 4\n0 4\n7 4\n8 0\n10 6\n2 1\n6 1\n1 7\n0 3\n8 7\n6 3\n6 3\n1 1\n3 0",
"output": "22"
},
{
"input": "5\n0 1000\n1000 1000\n1000 1000\n1000 1000\n1000 0",
"output": "1000"
},
{
"input": "10\n0 592\n258 598\n389 203\n249 836\n196 635\n478 482\n994 987\n1000 0\n769 0\n0 0",
"output": "1776"
},
{
"input": "10\n0 1\n1 0\n0 0\n0 0\n0 0\n0 1\n1 1\n0 1\n1 0\n1 0",
"output": "2"
},
{
"input": "10\n0 926\n926 938\n938 931\n931 964\n937 989\n983 936\n908 949\n997 932\n945 988\n988 0",
"output": "1016"
},
{
"input": "10\n0 1\n1 2\n1 2\n2 2\n2 2\n2 2\n1 1\n1 1\n2 1\n2 0",
"output": "3"
},
{
"input": "10\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "10\n0 1000\n1000 1000\n1000 1000\n1000 1000\n1000 1000\n1000 1000\n1000 1000\n1000 1000\n1000 1000\n1000 0",
"output": "1000"
},
{
"input": "50\n0 332\n332 268\n268 56\n56 711\n420 180\n160 834\n149 341\n373 777\n763 93\n994 407\n86 803\n700 132\n471 608\n429 467\n75 5\n638 305\n405 853\n316 478\n643 163\n18 131\n648 241\n241 766\n316 847\n640 380\n923 759\n789 41\n125 421\n421 9\n9 388\n388 829\n408 108\n462 856\n816 411\n518 688\n290 7\n405 912\n397 772\n396 652\n394 146\n27 648\n462 617\n514 433\n780 35\n710 705\n460 390\n194 508\n643 56\n172 469\n1000 0\n194 0",
"output": "2071"
},
{
"input": "50\n0 0\n0 1\n1 1\n0 1\n0 0\n1 0\n0 0\n1 0\n0 0\n0 0\n0 0\n0 0\n0 1\n0 0\n0 0\n0 1\n1 0\n0 1\n0 0\n1 1\n1 0\n0 1\n0 0\n1 1\n0 1\n1 0\n1 1\n1 0\n0 0\n1 1\n1 0\n0 1\n0 0\n0 1\n1 1\n1 1\n1 1\n1 0\n1 1\n1 0\n0 1\n1 0\n0 0\n0 1\n1 1\n1 1\n0 1\n0 0\n1 0\n1 0",
"output": "3"
},
{
"input": "50\n0 926\n926 971\n915 980\n920 965\n954 944\n928 952\n955 980\n916 980\n906 935\n944 913\n905 923\n912 922\n965 934\n912 900\n946 930\n931 983\n979 905\n925 969\n924 926\n910 914\n921 977\n934 979\n962 986\n942 909\n976 903\n982 982\n991 941\n954 929\n902 980\n947 983\n919 924\n917 943\n916 905\n907 913\n964 977\n984 904\n905 999\n950 970\n986 906\n993 970\n960 994\n963 983\n918 986\n980 900\n931 986\n993 997\n941 909\n907 909\n1000 0\n278 0",
"output": "1329"
},
{
"input": "2\n0 863\n863 0",
"output": "863"
},
{
"input": "50\n0 1\n1 2\n2 2\n1 1\n1 1\n1 2\n1 2\n1 1\n1 2\n1 1\n1 1\n1 2\n1 2\n1 1\n2 1\n2 2\n1 2\n2 2\n1 2\n2 1\n2 1\n2 2\n2 1\n1 2\n1 2\n2 1\n1 1\n2 2\n1 1\n2 1\n2 2\n2 1\n1 2\n2 2\n1 2\n1 1\n1 1\n2 1\n2 1\n2 2\n2 1\n2 1\n1 2\n1 2\n1 2\n1 2\n2 0\n2 0\n2 0\n0 0",
"output": "8"
},
{
"input": "50\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "100\n0 1\n0 0\n0 0\n1 0\n0 0\n0 1\n0 1\n1 1\n0 0\n0 0\n1 1\n0 0\n1 1\n0 1\n1 1\n0 1\n1 1\n1 0\n1 0\n0 0\n1 0\n0 1\n1 0\n0 0\n0 0\n1 1\n1 1\n0 1\n0 0\n1 0\n1 1\n0 1\n1 0\n1 1\n0 1\n1 1\n1 0\n0 0\n0 0\n0 1\n0 0\n0 1\n1 1\n0 0\n1 1\n1 1\n0 0\n0 1\n1 0\n0 1\n0 0\n0 1\n0 1\n1 1\n1 1\n1 1\n0 0\n0 0\n1 1\n0 1\n0 1\n1 0\n0 0\n0 0\n1 1\n0 1\n0 1\n1 1\n1 1\n0 1\n1 1\n1 1\n0 0\n1 0\n0 1\n0 0\n0 0\n1 1\n1 1\n1 1\n1 1\n0 1\n1 0\n1 0\n1 0\n1 0\n1 0\n0 0\n1 0\n1 0\n0 0\n1 0\n0 0\n0 1\n1 0\n0 1\n1 0\n1 0\n1 0\n1 0",
"output": "11"
},
{
"input": "100\n0 2\n1 2\n2 1\n1 2\n1 2\n2 1\n2 2\n1 1\n1 1\n2 1\n1 2\n2 1\n1 2\n2 2\n2 2\n2 2\n1 2\n2 2\n2 1\n1 1\n1 1\n1 1\n2 2\n1 2\n2 2\n1 1\n1 1\n1 1\n1 1\n2 2\n1 2\n2 1\n1 1\n2 2\n1 1\n2 1\n1 1\n2 2\n2 1\n1 2\n1 1\n1 2\n2 1\n2 2\n1 1\n2 1\n1 1\n2 1\n1 1\n1 2\n2 2\n2 2\n1 1\n2 2\n1 2\n2 1\n2 1\n1 1\n1 1\n1 2\n1 2\n1 1\n1 1\n2 1\n1 2\n1 2\n2 1\n2 2\n2 2\n2 2\n2 1\n2 2\n1 1\n1 2\n1 2\n1 1\n2 2\n2 2\n1 1\n2 1\n1 1\n1 2\n1 2\n1 2\n1 1\n1 1\n2 2\n1 2\n2 1\n2 1\n2 1\n1 2\n1 2\n1 1\n2 2\n1 2\n2 0\n2 0\n2 0\n1 0",
"output": "7"
},
{
"input": "100\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0\n0 0",
"output": "0"
},
{
"input": "2\n0 1\n1 0",
"output": "1"
},
{
"input": "2\n0 900\n900 0",
"output": "900"
},
{
"input": "2\n0 1\n1 0",
"output": "1"
},
{
"input": "2\n0 0\n0 0",
"output": "0"
},
{
"input": "2\n0 1000\n1000 0",
"output": "1000"
},
{
"input": "3\n0 802\n175 188\n815 0",
"output": "815"
},
{
"input": "3\n0 910\n910 976\n976 0",
"output": "976"
},
{
"input": "3\n0 2\n2 1\n1 0",
"output": "2"
}
] | 1,694,335,541
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 71
| 92
| 0
|
p=int(input())
w=0
s=0
for i in range(p):
a,b=map(int,input().split())
w+=(-a+b)
if w>=s:
s=w
print(s)
|
Title: Tram
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Linear Kingdom has exactly one tram line. It has *n* stops, numbered from 1 to *n* in the order of tram's movement. At the *i*-th stop *a**i* passengers exit the tram, while *b**i* passengers enter it. The tram is empty before it arrives at the first stop. Also, when the tram arrives at the last stop, all passengers exit so that it becomes empty.
Your task is to calculate the tram's minimum capacity such that the number of people inside the tram at any time never exceeds this capacity. Note that at each stop all exiting passengers exit before any entering passenger enters the tram.
Input Specification:
The first line contains a single number *n* (2<=≤<=*n*<=≤<=1000) — the number of the tram's stops.
Then *n* lines follow, each contains two integers *a**i* and *b**i* (0<=≤<=*a**i*,<=*b**i*<=≤<=1000) — the number of passengers that exits the tram at the *i*-th stop, and the number of passengers that enter the tram at the *i*-th stop. The stops are given from the first to the last stop in the order of tram's movement.
- The number of people who exit at a given stop does not exceed the total number of people in the tram immediately before it arrives at the stop. More formally, . This particularly means that *a*1<==<=0. - At the last stop, all the passengers exit the tram and it becomes empty. More formally, . - No passenger will enter the train at the last stop. That is, *b**n*<==<=0.
Output Specification:
Print a single integer denoting the minimum possible capacity of the tram (0 is allowed).
Demo Input:
['4\n0 3\n2 5\n4 2\n4 0\n']
Demo Output:
['6\n']
Note:
For the first example, a capacity of 6 is sufficient:
- At the first stop, the number of passengers inside the tram before arriving is 0. Then, 3 passengers enter the tram, and the number of passengers inside the tram becomes 3. - At the second stop, 2 passengers exit the tram (1 passenger remains inside). Then, 5 passengers enter the tram. There are 6 passengers inside the tram now. - At the third stop, 4 passengers exit the tram (2 passengers remain inside). Then, 2 passengers enter the tram. There are 4 passengers inside the tram now. - Finally, all the remaining passengers inside the tram exit the tram at the last stop. There are no passenger inside the tram now, which is in line with the constraints.
Since the number of passengers inside the tram never exceeds 6, a capacity of 6 is sufficient. Furthermore it is not possible for the tram to have a capacity less than 6. Hence, 6 is the correct answer.
|
```python
p=int(input())
w=0
s=0
for i in range(p):
a,b=map(int,input().split())
w+=(-a+b)
if w>=s:
s=w
print(s)
```
| 3
|
|
606
|
B
|
Testing Robots
|
PROGRAMMING
| 1,600
|
[
"implementation"
] | null | null |
The Cybernetics Failures (CF) organisation made a prototype of a bomb technician robot. To find the possible problems it was decided to carry out a series of tests. At the beginning of each test the robot prototype will be placed in cell (*x*0,<=*y*0) of a rectangular squared field of size *x*<=×<=*y*, after that a mine will be installed into one of the squares of the field. It is supposed to conduct exactly *x*·*y* tests, each time a mine is installed into a square that has never been used before. The starting cell of the robot always remains the same.
After placing the objects on the field the robot will have to run a sequence of commands given by string *s*, consisting only of characters 'L', 'R', 'U', 'D'. These commands tell the robot to move one square to the left, to the right, up or down, or stay idle if moving in the given direction is impossible. As soon as the robot fulfills all the sequence of commands, it will blow up due to a bug in the code. But if at some moment of time the robot is at the same square with the mine, it will also blow up, but not due to a bug in the code.
Moving to the left decreases coordinate *y*, and moving to the right increases it. Similarly, moving up decreases the *x* coordinate, and moving down increases it.
The tests can go on for very long, so your task is to predict their results. For each *k* from 0 to *length*(*s*) your task is to find in how many tests the robot will run exactly *k* commands before it blows up.
|
The first line of the input contains four integers *x*, *y*, *x*0, *y*0 (1<=≤<=*x*,<=*y*<=≤<=500,<=1<=≤<=*x*0<=≤<=*x*,<=1<=≤<=*y*0<=≤<=*y*) — the sizes of the field and the starting coordinates of the robot. The coordinate axis *X* is directed downwards and axis *Y* is directed to the right.
The second line contains a sequence of commands *s*, which should be fulfilled by the robot. It has length from 1 to 100<=000 characters and only consists of characters 'L', 'R', 'U', 'D'.
|
Print the sequence consisting of (*length*(*s*)<=+<=1) numbers. On the *k*-th position, starting with zero, print the number of tests where the robot will run exactly *k* commands before it blows up.
|
[
"3 4 2 2\nUURDRDRL\n",
"2 2 2 2\nULD\n"
] |
[
"1 1 0 1 1 1 1 0 6\n",
"1 1 1 1\n"
] |
In the first sample, if we exclude the probable impact of the mines, the robot's route will look like that: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/16bfda1e4f41cc00665c31f0a1d754d68cd9b4ab.png" style="max-width: 100.0%;max-height: 100.0%;"/>.
| 1,000
|
[
{
"input": "3 4 2 2\nUURDRDRL",
"output": "1 1 0 1 1 1 1 0 6"
},
{
"input": "2 2 2 2\nULD",
"output": "1 1 1 1"
},
{
"input": "1 1 1 1\nURDLUURRDDLLURDL",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0"
},
{
"input": "15 17 8 9\nURRDLUULLDD",
"output": "1 1 1 1 1 1 0 1 1 1 1 245"
},
{
"input": "15 17 8 9\nURRDLUULLDDDRRUR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 1 1 1 0 241"
},
{
"input": "15 17 8 9\nURRDLUULLDDDRRURR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 1 1 1 0 0 241"
},
{
"input": "1 2 1 1\nR",
"output": "1 1"
},
{
"input": "2 1 1 1\nD",
"output": "1 1"
},
{
"input": "1 2 1 2\nLR",
"output": "1 1 0"
},
{
"input": "2 1 2 1\nUD",
"output": "1 1 0"
},
{
"input": "4 4 2 2\nDRUL",
"output": "1 1 1 1 12"
},
{
"input": "4 4 3 3\nLUDRUL",
"output": "1 1 1 0 0 1 12"
},
{
"input": "15 17 8 9\nURRDLU",
"output": "1 1 1 1 1 1 249"
},
{
"input": "15 17 8 9\nURRDLUULLDDR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 244"
},
{
"input": "15 17 8 9\nURRDLUULLDDRR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 0 244"
},
{
"input": "15 17 8 9\nURRDLUULLDDRRR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 0 0 244"
},
{
"input": "15 17 8 9\nURRDLUULLDDRRRR",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 0 0 0 244"
},
{
"input": "15 17 8 9\nURRDLUULLDDRRRRU",
"output": "1 1 1 1 1 1 0 1 1 1 1 1 0 0 0 1 243"
}
] | 1,450,709,362
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 2
| 46
| 0
|
field = [int(x) for x in input().split()]
commands = input()
X = field[0]
Y = field[1]
pos = [field[2], field[3]]
lastPos = [X+1, Y+1]
count = 0
flag = False
for c in commands:
if lastPos[0] == pos[0] and lastPos[1] == pos[1]:
print(0, end = " ")
flag = True
else:
print(1, end = " ")
count += 1
lastPos = pos[:]
if c == "U" and (pos[0] - 1) > 0:
pos[0] -= 1
elif c == "D" and (pos[0] + 1) <= X:
pos[0] += 1
elif c == "L" and (pos[1] - 1) > 0:
pos[1] -= 1
elif c == "R" and (pos[1] + 1) <= Y:
pos[1] += 1
print(1) if not flag else print(count)
|
Title: Testing Robots
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The Cybernetics Failures (CF) organisation made a prototype of a bomb technician robot. To find the possible problems it was decided to carry out a series of tests. At the beginning of each test the robot prototype will be placed in cell (*x*0,<=*y*0) of a rectangular squared field of size *x*<=×<=*y*, after that a mine will be installed into one of the squares of the field. It is supposed to conduct exactly *x*·*y* tests, each time a mine is installed into a square that has never been used before. The starting cell of the robot always remains the same.
After placing the objects on the field the robot will have to run a sequence of commands given by string *s*, consisting only of characters 'L', 'R', 'U', 'D'. These commands tell the robot to move one square to the left, to the right, up or down, or stay idle if moving in the given direction is impossible. As soon as the robot fulfills all the sequence of commands, it will blow up due to a bug in the code. But if at some moment of time the robot is at the same square with the mine, it will also blow up, but not due to a bug in the code.
Moving to the left decreases coordinate *y*, and moving to the right increases it. Similarly, moving up decreases the *x* coordinate, and moving down increases it.
The tests can go on for very long, so your task is to predict their results. For each *k* from 0 to *length*(*s*) your task is to find in how many tests the robot will run exactly *k* commands before it blows up.
Input Specification:
The first line of the input contains four integers *x*, *y*, *x*0, *y*0 (1<=≤<=*x*,<=*y*<=≤<=500,<=1<=≤<=*x*0<=≤<=*x*,<=1<=≤<=*y*0<=≤<=*y*) — the sizes of the field and the starting coordinates of the robot. The coordinate axis *X* is directed downwards and axis *Y* is directed to the right.
The second line contains a sequence of commands *s*, which should be fulfilled by the robot. It has length from 1 to 100<=000 characters and only consists of characters 'L', 'R', 'U', 'D'.
Output Specification:
Print the sequence consisting of (*length*(*s*)<=+<=1) numbers. On the *k*-th position, starting with zero, print the number of tests where the robot will run exactly *k* commands before it blows up.
Demo Input:
['3 4 2 2\nUURDRDRL\n', '2 2 2 2\nULD\n']
Demo Output:
['1 1 0 1 1 1 1 0 6\n', '1 1 1 1\n']
Note:
In the first sample, if we exclude the probable impact of the mines, the robot's route will look like that: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/16bfda1e4f41cc00665c31f0a1d754d68cd9b4ab.png" style="max-width: 100.0%;max-height: 100.0%;"/>.
|
```python
field = [int(x) for x in input().split()]
commands = input()
X = field[0]
Y = field[1]
pos = [field[2], field[3]]
lastPos = [X+1, Y+1]
count = 0
flag = False
for c in commands:
if lastPos[0] == pos[0] and lastPos[1] == pos[1]:
print(0, end = " ")
flag = True
else:
print(1, end = " ")
count += 1
lastPos = pos[:]
if c == "U" and (pos[0] - 1) > 0:
pos[0] -= 1
elif c == "D" and (pos[0] + 1) <= X:
pos[0] += 1
elif c == "L" and (pos[1] - 1) > 0:
pos[1] -= 1
elif c == "R" and (pos[1] + 1) <= Y:
pos[1] += 1
print(1) if not flag else print(count)
```
| 0
|
|
251
|
A
|
Points on Line
|
PROGRAMMING
| 1,300
|
[
"binary search",
"combinatorics",
"two pointers"
] | null | null |
Little Petya likes points a lot. Recently his mom has presented him *n* points lying on the line *OX*. Now Petya is wondering in how many ways he can choose three distinct points so that the distance between the two farthest of them doesn't exceed *d*.
Note that the order of the points inside the group of three chosen points doesn't matter.
|
The first line contains two integers: *n* and *d* (1<=≤<=*n*<=≤<=105; 1<=≤<=*d*<=≤<=109). The next line contains *n* integers *x*1,<=*x*2,<=...,<=*x**n*, their absolute value doesn't exceed 109 — the *x*-coordinates of the points that Petya has got.
It is guaranteed that the coordinates of the points in the input strictly increase.
|
Print a single integer — the number of groups of three points, where the distance between two farthest points doesn't exceed *d*.
Please do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use the cin, cout streams or the %I64d specifier.
|
[
"4 3\n1 2 3 4\n",
"4 2\n-3 -2 -1 0\n",
"5 19\n1 10 20 30 50\n"
] |
[
"4\n",
"2\n",
"1\n"
] |
In the first sample any group of three points meets our conditions.
In the seconds sample only 2 groups of three points meet our conditions: {-3, -2, -1} and {-2, -1, 0}.
In the third sample only one group does: {1, 10, 20}.
| 500
|
[
{
"input": "4 3\n1 2 3 4",
"output": "4"
},
{
"input": "4 2\n-3 -2 -1 0",
"output": "2"
},
{
"input": "5 19\n1 10 20 30 50",
"output": "1"
},
{
"input": "10 5\n31 36 43 47 48 50 56 69 71 86",
"output": "2"
},
{
"input": "10 50\n1 4 20 27 65 79 82 83 99 100",
"output": "25"
},
{
"input": "10 90\n24 27 40 41 61 69 73 87 95 97",
"output": "120"
},
{
"input": "100 100\n-98 -97 -96 -93 -92 -91 -90 -87 -86 -84 -81 -80 -79 -78 -76 -75 -73 -71 -69 -67 -65 -64 -63 -62 -61 -54 -51 -50 -49 -48 -46 -45 -44 -37 -36 -33 -30 -28 -27 -16 -15 -13 -12 -10 -9 -7 -6 -5 -4 2 3 5 8 9 10 11 13 14 15 16 17 19 22 24 25 26 27 28 30 31 32 36 40 43 45 46 47 50 51 52 53 58 60 63 69 70 73 78 80 81 82 85 88 89 90 91 95 96 97 99",
"output": "79351"
},
{
"input": "1 14751211\n847188590",
"output": "0"
},
{
"input": "2 1000000000\n-907894512 -289906312",
"output": "0"
},
{
"input": "2 1000000000\n-14348867 1760823",
"output": "0"
},
{
"input": "3 1000000000\n-5 -1 1",
"output": "1"
}
] | 1,620,422,043
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 39
| 404
| 31,129,600
|
n, d = map(int, input().split())
a = list(map(int, input().split()))
p = 0
ans = 0
for i in range(n):
while a[i] - a[p] > d:
p += 1
diff = i - p
ans += (diff * (diff - 1)) // 2
print(ans)
|
Title: Points on Line
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Little Petya likes points a lot. Recently his mom has presented him *n* points lying on the line *OX*. Now Petya is wondering in how many ways he can choose three distinct points so that the distance between the two farthest of them doesn't exceed *d*.
Note that the order of the points inside the group of three chosen points doesn't matter.
Input Specification:
The first line contains two integers: *n* and *d* (1<=≤<=*n*<=≤<=105; 1<=≤<=*d*<=≤<=109). The next line contains *n* integers *x*1,<=*x*2,<=...,<=*x**n*, their absolute value doesn't exceed 109 — the *x*-coordinates of the points that Petya has got.
It is guaranteed that the coordinates of the points in the input strictly increase.
Output Specification:
Print a single integer — the number of groups of three points, where the distance between two farthest points doesn't exceed *d*.
Please do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use the cin, cout streams or the %I64d specifier.
Demo Input:
['4 3\n1 2 3 4\n', '4 2\n-3 -2 -1 0\n', '5 19\n1 10 20 30 50\n']
Demo Output:
['4\n', '2\n', '1\n']
Note:
In the first sample any group of three points meets our conditions.
In the seconds sample only 2 groups of three points meet our conditions: {-3, -2, -1} and {-2, -1, 0}.
In the third sample only one group does: {1, 10, 20}.
|
```python
n, d = map(int, input().split())
a = list(map(int, input().split()))
p = 0
ans = 0
for i in range(n):
while a[i] - a[p] > d:
p += 1
diff = i - p
ans += (diff * (diff - 1)) // 2
print(ans)
```
| 3
|
|
242
|
C
|
King's Path
|
PROGRAMMING
| 1,800
|
[
"dfs and similar",
"graphs",
"hashing",
"shortest paths"
] | null | null |
The black king is standing on a chess field consisting of 109 rows and 109 columns. We will consider the rows of the field numbered with integers from 1 to 109 from top to bottom. The columns are similarly numbered with integers from 1 to 109 from left to right. We will denote a cell of the field that is located in the *i*-th row and *j*-th column as (*i*,<=*j*).
You know that some squares of the given chess field are allowed. All allowed cells of the chess field are given as *n* segments. Each segment is described by three integers *r**i*,<=*a**i*,<=*b**i* (*a**i*<=≤<=*b**i*), denoting that cells in columns from number *a**i* to number *b**i* inclusive in the *r**i*-th row are allowed.
Your task is to find the minimum number of moves the king needs to get from square (*x*0,<=*y*0) to square (*x*1,<=*y*1), provided that he only moves along the allowed cells. In other words, the king can be located only on allowed cells on his way.
Let us remind you that a chess king can move to any of the neighboring cells in one move. Two cells of a chess field are considered neighboring if they share at least one point.
|
The first line contains four space-separated integers *x*0,<=*y*0,<=*x*1,<=*y*1 (1<=≤<=*x*0,<=*y*0,<=*x*1,<=*y*1<=≤<=109), denoting the initial and the final positions of the king.
The second line contains a single integer *n* (1<=≤<=*n*<=≤<=105), denoting the number of segments of allowed cells. Next *n* lines contain the descriptions of these segments. The *i*-th line contains three space-separated integers *r**i*,<=*a**i*,<=*b**i* (1<=≤<=*r**i*,<=*a**i*,<=*b**i*<=≤<=109,<=*a**i*<=≤<=*b**i*), denoting that cells in columns from number *a**i* to number *b**i* inclusive in the *r**i*-th row are allowed. Note that the segments of the allowed cells can intersect and embed arbitrarily.
It is guaranteed that the king's initial and final position are allowed cells. It is guaranteed that the king's initial and the final positions do not coincide. It is guaranteed that the total length of all given segments doesn't exceed 105.
|
If there is no path between the initial and final position along allowed cells, print -1.
Otherwise print a single integer — the minimum number of moves the king needs to get from the initial position to the final one.
|
[
"5 7 6 11\n3\n5 3 8\n6 7 11\n5 2 5\n",
"3 4 3 10\n3\n3 1 4\n4 5 9\n3 10 10\n",
"1 1 2 10\n2\n1 1 3\n2 6 10\n"
] |
[
"4\n",
"6\n",
"-1\n"
] |
none
| 1,500
|
[
{
"input": "5 7 6 11\n3\n5 3 8\n6 7 11\n5 2 5",
"output": "4"
},
{
"input": "3 4 3 10\n3\n3 1 4\n4 5 9\n3 10 10",
"output": "6"
},
{
"input": "1 1 2 10\n2\n1 1 3\n2 6 10",
"output": "-1"
},
{
"input": "9 8 7 8\n9\n10 6 6\n10 6 6\n7 7 8\n9 5 6\n8 9 9\n9 5 5\n9 8 8\n8 5 6\n9 10 10",
"output": "2"
},
{
"input": "6 15 7 15\n9\n6 15 15\n7 14 14\n6 15 15\n9 14 14\n7 14 16\n6 15 15\n6 15 15\n7 14 14\n8 15 15",
"output": "1"
},
{
"input": "13 16 20 10\n18\n13 16 16\n20 10 10\n19 10 10\n12 15 15\n20 10 10\n18 11 11\n19 10 10\n19 10 10\n20 10 10\n19 10 10\n20 10 10\n20 10 10\n19 10 10\n18 11 11\n13 16 16\n12 15 15\n19 10 10\n19 10 10",
"output": "-1"
},
{
"input": "89 29 88 30\n16\n87 31 31\n14 95 95\n98 88 89\n96 88 88\n14 97 97\n13 97 98\n100 88 88\n88 32 32\n99 88 89\n90 29 29\n87 31 31\n15 94 96\n89 29 29\n88 32 32\n97 89 89\n88 29 30",
"output": "1"
},
{
"input": "30 14 39 19\n31\n35 7 11\n37 11 12\n32 13 13\n37 5 6\n46 13 13\n37 14 14\n31 13 13\n43 13 19\n45 15 19\n46 13 13\n32 17 17\n41 14 19\n30 14 14\n43 13 17\n34 16 18\n44 11 19\n38 13 13\n40 12 20\n37 16 18\n46 16 18\n34 10 14\n36 9 10\n36 15 19\n38 15 19\n42 13 19\n33 14 15\n35 15 19\n33 17 18\n39 12 20\n36 5 7\n45 12 12",
"output": "9"
},
{
"input": "2 1 1 1\n2\n1 1 2\n2 1 2",
"output": "1"
},
{
"input": "1 1 1 2\n5\n1000000000 1 10000\n19920401 1188 5566\n1000000000 1 10000\n1 1 10000\n5 100 200",
"output": "1"
},
{
"input": "1 1 1000000000 2\n5\n1000000000 1 10000\n19920401 1188 5566\n1000000000 1 10000\n1 1 10000\n5 100 200",
"output": "-1"
}
] | 1,656,867,229
| 2,147,483,647
|
PyPy 3-64
|
WRONG_ANSWER
|
TESTS
| 7
| 216
| 2,355,200
|
X_MOVE_LIST = [0, 1, 0, -1, 1, -1, -1, 1]
Y_MOVE_LIST = [1, 0, -1, 0, -1, 1, -1, 1]
DIC_ALLOWED_POS_BY_ROWS = {}
DIC_VISITED = {}
MAX_POS = 1000000000
def verify_ends(num):
return num > 0 and num <= MAX_POS
def verify_pos(pos):
if verify_ends(pos[0]) and verify_ends(pos[1]):
allowed_pos = DIC_ALLOWED_POS_BY_ROWS.get(pos[0]) or []
for row_allowed in allowed_pos:
if row_allowed and \
pos[1] >= row_allowed[0] and \
pos[1] <= row_allowed[1]:
return True
return False
def king_search_way(pos0, posf):
queue = [(pos0, 0)]
best_way = max(abs(posf[0] - pos0[0]), abs(posf[1] - pos0[1]))
result = -1
while queue:
pos, dis = queue.pop(0)
if pos == posf: result = dis
else:
for i in range(8):
pos_cache = (pos[0] + X_MOVE_LIST[i], pos[1] + Y_MOVE_LIST[i])
if verify_pos(pos_cache) and dis + 1 <= best_way:
queue.append((pos_cache, dis+1))
return result
X0, Y0, X1, Y1 = map(int, input().split())
QNT_POS = int(input())
for _ in range(QNT_POS):
r, x, y = map(int, input().split())
if DIC_ALLOWED_POS_BY_ROWS.get(r):
DIC_ALLOWED_POS_BY_ROWS[r].append((x, y))
else: DIC_ALLOWED_POS_BY_ROWS[r] = [(x, y)]
print(king_search_way((X0, Y0), (X1, Y1)))
|
Title: King's Path
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The black king is standing on a chess field consisting of 109 rows and 109 columns. We will consider the rows of the field numbered with integers from 1 to 109 from top to bottom. The columns are similarly numbered with integers from 1 to 109 from left to right. We will denote a cell of the field that is located in the *i*-th row and *j*-th column as (*i*,<=*j*).
You know that some squares of the given chess field are allowed. All allowed cells of the chess field are given as *n* segments. Each segment is described by three integers *r**i*,<=*a**i*,<=*b**i* (*a**i*<=≤<=*b**i*), denoting that cells in columns from number *a**i* to number *b**i* inclusive in the *r**i*-th row are allowed.
Your task is to find the minimum number of moves the king needs to get from square (*x*0,<=*y*0) to square (*x*1,<=*y*1), provided that he only moves along the allowed cells. In other words, the king can be located only on allowed cells on his way.
Let us remind you that a chess king can move to any of the neighboring cells in one move. Two cells of a chess field are considered neighboring if they share at least one point.
Input Specification:
The first line contains four space-separated integers *x*0,<=*y*0,<=*x*1,<=*y*1 (1<=≤<=*x*0,<=*y*0,<=*x*1,<=*y*1<=≤<=109), denoting the initial and the final positions of the king.
The second line contains a single integer *n* (1<=≤<=*n*<=≤<=105), denoting the number of segments of allowed cells. Next *n* lines contain the descriptions of these segments. The *i*-th line contains three space-separated integers *r**i*,<=*a**i*,<=*b**i* (1<=≤<=*r**i*,<=*a**i*,<=*b**i*<=≤<=109,<=*a**i*<=≤<=*b**i*), denoting that cells in columns from number *a**i* to number *b**i* inclusive in the *r**i*-th row are allowed. Note that the segments of the allowed cells can intersect and embed arbitrarily.
It is guaranteed that the king's initial and final position are allowed cells. It is guaranteed that the king's initial and the final positions do not coincide. It is guaranteed that the total length of all given segments doesn't exceed 105.
Output Specification:
If there is no path between the initial and final position along allowed cells, print -1.
Otherwise print a single integer — the minimum number of moves the king needs to get from the initial position to the final one.
Demo Input:
['5 7 6 11\n3\n5 3 8\n6 7 11\n5 2 5\n', '3 4 3 10\n3\n3 1 4\n4 5 9\n3 10 10\n', '1 1 2 10\n2\n1 1 3\n2 6 10\n']
Demo Output:
['4\n', '6\n', '-1\n']
Note:
none
|
```python
X_MOVE_LIST = [0, 1, 0, -1, 1, -1, -1, 1]
Y_MOVE_LIST = [1, 0, -1, 0, -1, 1, -1, 1]
DIC_ALLOWED_POS_BY_ROWS = {}
DIC_VISITED = {}
MAX_POS = 1000000000
def verify_ends(num):
return num > 0 and num <= MAX_POS
def verify_pos(pos):
if verify_ends(pos[0]) and verify_ends(pos[1]):
allowed_pos = DIC_ALLOWED_POS_BY_ROWS.get(pos[0]) or []
for row_allowed in allowed_pos:
if row_allowed and \
pos[1] >= row_allowed[0] and \
pos[1] <= row_allowed[1]:
return True
return False
def king_search_way(pos0, posf):
queue = [(pos0, 0)]
best_way = max(abs(posf[0] - pos0[0]), abs(posf[1] - pos0[1]))
result = -1
while queue:
pos, dis = queue.pop(0)
if pos == posf: result = dis
else:
for i in range(8):
pos_cache = (pos[0] + X_MOVE_LIST[i], pos[1] + Y_MOVE_LIST[i])
if verify_pos(pos_cache) and dis + 1 <= best_way:
queue.append((pos_cache, dis+1))
return result
X0, Y0, X1, Y1 = map(int, input().split())
QNT_POS = int(input())
for _ in range(QNT_POS):
r, x, y = map(int, input().split())
if DIC_ALLOWED_POS_BY_ROWS.get(r):
DIC_ALLOWED_POS_BY_ROWS[r].append((x, y))
else: DIC_ALLOWED_POS_BY_ROWS[r] = [(x, y)]
print(king_search_way((X0, Y0), (X1, Y1)))
```
| 0
|
|
430
|
B
|
Balls Game
|
PROGRAMMING
| 1,400
|
[
"brute force",
"two pointers"
] | null | null |
Iahub is training for the IOI. What is a better way to train than playing a Zuma-like game?
There are *n* balls put in a row. Each ball is colored in one of *k* colors. Initially the row doesn't contain three or more contiguous balls with the same color. Iahub has a single ball of color *x*. He can insert his ball at any position in the row (probably, between two other balls). If at any moment there are three or more contiguous balls of the same color in the row, they are destroyed immediately. This rule is applied multiple times, until there are no more sets of 3 or more contiguous balls of the same color.
For example, if Iahub has the row of balls [black, black, white, white, black, black] and a white ball, he can insert the ball between two white balls. Thus three white balls are destroyed, and then four black balls become contiguous, so all four balls are destroyed. The row will not contain any ball in the end, so Iahub can destroy all 6 balls.
Iahub wants to destroy as many balls as possible. You are given the description of the row of balls, and the color of Iahub's ball. Help Iahub train for the IOI by telling him the maximum number of balls from the row he can destroy.
|
The first line of input contains three integers: *n* (1<=≤<=*n*<=≤<=100), *k* (1<=≤<=*k*<=≤<=100) and *x* (1<=≤<=*x*<=≤<=*k*). The next line contains *n* space-separated integers *c*1,<=*c*2,<=...,<=*c**n* (1<=≤<=*c**i*<=≤<=*k*). Number *c**i* means that the *i*-th ball in the row has color *c**i*.
It is guaranteed that the initial row of balls will never contain three or more contiguous balls of the same color.
|
Print a single integer — the maximum number of balls Iahub can destroy.
|
[
"6 2 2\n1 1 2 2 1 1\n",
"1 1 1\n1\n"
] |
[
"6\n",
"0\n"
] |
none
| 1,000
|
[
{
"input": "6 2 2\n1 1 2 2 1 1",
"output": "6"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "10 2 1\n2 1 2 2 1 2 2 1 1 2",
"output": "5"
},
{
"input": "50 2 1\n1 1 2 2 1 2 1 1 2 2 1 2 1 2 1 1 2 2 1 2 1 2 2 1 2 1 2 1 2 2 1 1 2 2 1 1 2 2 1 2 1 1 2 1 1 2 2 1 1 2",
"output": "15"
},
{
"input": "75 5 5\n1 1 5 5 3 5 2 3 3 2 2 1 1 5 4 4 3 4 5 4 3 3 1 2 2 1 2 1 2 5 5 2 1 3 2 2 3 1 2 1 1 5 5 1 1 2 1 1 2 2 5 2 2 1 1 2 1 2 1 1 3 3 5 4 4 3 3 4 4 5 5 1 1 2 2",
"output": "6"
},
{
"input": "100 3 2\n1 1 2 3 1 3 2 1 1 3 3 2 2 1 1 2 2 1 1 3 2 2 3 2 3 2 2 3 3 1 1 2 2 1 2 2 1 3 3 1 3 3 1 2 1 2 2 1 2 3 2 1 1 2 1 1 3 3 1 3 3 1 1 2 2 1 1 2 1 3 2 2 3 2 2 3 3 1 2 1 2 2 1 1 2 3 1 3 3 1 2 3 2 2 1 3 2 2 3 3",
"output": "6"
},
{
"input": "100 2 1\n2 2 1 2 1 2 1 2 2 1 1 2 1 1 2 1 1 2 2 1 1 2 1 1 2 1 2 2 1 2 1 2 1 2 1 1 2 1 1 2 1 1 2 2 1 1 2 1 2 2 1 2 1 2 1 2 1 1 2 2 1 2 1 1 2 2 1 1 2 1 2 1 2 1 2 2 1 2 1 1 2 1 2 1 1 2 1 1 2 1 1 2 2 1 2 2 1 1 2 1",
"output": "15"
},
{
"input": "100 2 2\n1 2 1 2 2 1 2 1 2 1 2 1 1 2 1 2 2 1 1 2 1 1 2 2 1 1 2 1 2 2 1 2 2 1 2 1 2 1 1 2 1 2 1 2 1 2 1 1 2 1 1 2 2 1 1 2 2 1 2 1 2 1 2 1 2 2 1 2 1 2 2 1 1 2 1 2 2 1 1 2 2 1 2 1 2 1 1 2 1 2 1 2 1 2 1 2 2 1 2 2",
"output": "14"
},
{
"input": "100 2 2\n1 2 1 1 2 1 2 2 1 2 1 2 1 2 1 2 1 2 2 1 1 2 2 1 2 1 1 2 2 1 1 2 1 2 1 2 1 1 2 1 1 2 1 2 2 1 1 2 2 1 1 2 1 2 2 1 1 2 1 2 1 2 2 1 2 2 1 1 2 1 2 2 1 2 2 1 2 1 1 2 1 2 2 1 2 2 1 2 1 2 1 2 1 1 2 2 1 1 2 2",
"output": "17"
},
{
"input": "100 2 2\n2 1 1 2 2 1 1 2 1 2 1 1 2 2 1 2 1 2 1 2 2 1 2 1 1 2 1 2 1 2 1 2 1 1 2 2 1 1 2 1 1 2 1 2 2 1 1 2 1 2 1 1 2 2 1 1 2 1 2 1 2 1 2 2 1 1 2 2 1 1 2 2 1 2 1 2 1 1 2 1 1 2 2 1 2 1 2 2 1 2 2 1 1 2 1 2 2 1 2 2",
"output": "17"
},
{
"input": "100 2 2\n1 2 2 1 2 2 1 1 2 1 2 1 2 1 2 1 2 1 2 1 1 2 2 1 2 1 2 1 2 1 2 1 1 2 1 1 2 1 2 2 1 1 2 2 1 1 2 1 1 2 2 1 2 1 2 1 2 1 2 1 1 2 2 1 1 2 2 1 1 2 2 1 2 2 1 1 2 1 2 2 1 2 2 1 2 2 1 2 2 1 1 2 2 1 2 1 2 1 2 1",
"output": "28"
},
{
"input": "100 2 2\n1 1 2 1 2 1 1 2 1 2 1 2 2 1 2 1 2 1 1 2 2 1 2 1 1 2 2 1 1 2 1 2 2 1 2 2 1 2 1 2 1 1 2 1 2 1 1 2 2 1 1 2 1 2 1 2 1 2 1 2 2 1 1 2 1 2 2 1 2 1 1 2 1 1 2 1 2 1 2 1 1 2 1 2 2 1 2 1 2 2 1 1 2 1 2 2 1 1 2 2",
"output": "8"
},
{
"input": "100 100 50\n15 44 5 7 75 40 52 82 78 90 48 32 16 53 69 2 21 84 7 21 21 87 29 8 42 54 10 21 38 55 54 88 48 63 3 17 45 82 82 91 7 11 11 24 24 79 1 32 32 38 41 41 4 4 74 17 26 26 96 96 3 3 50 50 96 26 26 17 17 74 74 4 41 38 38 32 1 1 79 79 24 11 11 7 7 91 91 82 45 45 97 9 74 60 32 91 61 64 100 26",
"output": "2"
},
{
"input": "100 50 22\n15 2 18 15 48 35 46 33 32 39 39 5 5 27 27 50 50 47 47 10 10 6 3 3 7 8 7 17 17 29 14 10 10 46 13 13 31 32 31 22 22 32 31 31 32 13 13 46 46 10 10 14 14 29 29 17 7 7 8 3 6 6 10 47 50 50 27 5 5 39 39 21 47 4 40 47 21 28 21 21 40 27 34 17 3 36 5 7 21 14 25 49 40 34 32 13 23 29 2 4",
"output": "2"
},
{
"input": "100 3 3\n3 1 1 2 1 1 3 1 3 3 1 3 3 1 2 1 1 2 2 3 3 2 3 2 2 3 1 3 3 2 2 1 3 3 2 2 1 2 3 3 1 3 1 3 1 2 2 1 2 1 2 3 1 3 1 3 2 1 3 2 3 3 2 3 2 3 1 3 2 2 1 2 1 2 1 1 3 1 3 1 2 1 2 1 2 3 2 2 3 3 2 2 3 2 2 3 1 1 2 3",
"output": "6"
},
{
"input": "100 100 100\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100",
"output": "0"
},
{
"input": "100 2 2\n1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2 1 1 2 2",
"output": "98"
},
{
"input": "6 20 10\n10 2 10 10 2 2",
"output": "5"
}
] | 1,674,035,734
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 0
| 31
| 0
|
n, k, x = map(int, input().split())
a = list(map(int, input().split()))
maxim = 0
for i in range(n-1):
b = a.copy()
while len(b) > 2:
l = len(b)
for i in range(2, len(b)):
if b[i - 2] == b[i - 1] == b[i]:
k = i + 1
while k < len(b):
if b[i] != b[k]:
break
k += 1
b = b[:i-2] + b[k:]
break
if len(b) == l:
break
if n - len(b) > maxim:
maxim = n - len(b)
print(maxim)
|
Title: Balls Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Iahub is training for the IOI. What is a better way to train than playing a Zuma-like game?
There are *n* balls put in a row. Each ball is colored in one of *k* colors. Initially the row doesn't contain three or more contiguous balls with the same color. Iahub has a single ball of color *x*. He can insert his ball at any position in the row (probably, between two other balls). If at any moment there are three or more contiguous balls of the same color in the row, they are destroyed immediately. This rule is applied multiple times, until there are no more sets of 3 or more contiguous balls of the same color.
For example, if Iahub has the row of balls [black, black, white, white, black, black] and a white ball, he can insert the ball between two white balls. Thus three white balls are destroyed, and then four black balls become contiguous, so all four balls are destroyed. The row will not contain any ball in the end, so Iahub can destroy all 6 balls.
Iahub wants to destroy as many balls as possible. You are given the description of the row of balls, and the color of Iahub's ball. Help Iahub train for the IOI by telling him the maximum number of balls from the row he can destroy.
Input Specification:
The first line of input contains three integers: *n* (1<=≤<=*n*<=≤<=100), *k* (1<=≤<=*k*<=≤<=100) and *x* (1<=≤<=*x*<=≤<=*k*). The next line contains *n* space-separated integers *c*1,<=*c*2,<=...,<=*c**n* (1<=≤<=*c**i*<=≤<=*k*). Number *c**i* means that the *i*-th ball in the row has color *c**i*.
It is guaranteed that the initial row of balls will never contain three or more contiguous balls of the same color.
Output Specification:
Print a single integer — the maximum number of balls Iahub can destroy.
Demo Input:
['6 2 2\n1 1 2 2 1 1\n', '1 1 1\n1\n']
Demo Output:
['6\n', '0\n']
Note:
none
|
```python
n, k, x = map(int, input().split())
a = list(map(int, input().split()))
maxim = 0
for i in range(n-1):
b = a.copy()
while len(b) > 2:
l = len(b)
for i in range(2, len(b)):
if b[i - 2] == b[i - 1] == b[i]:
k = i + 1
while k < len(b):
if b[i] != b[k]:
break
k += 1
b = b[:i-2] + b[k:]
break
if len(b) == l:
break
if n - len(b) > maxim:
maxim = n - len(b)
print(maxim)
```
| 0
|
|
999
|
D
|
Equalize the Remainders
|
PROGRAMMING
| 1,900
|
[
"data structures",
"greedy",
"implementation"
] | null | null |
You are given an array consisting of $n$ integers $a_1, a_2, \dots, a_n$, and a positive integer $m$. It is guaranteed that $m$ is a divisor of $n$.
In a single move, you can choose any position $i$ between $1$ and $n$ and increase $a_i$ by $1$.
Let's calculate $c_r$ ($0 \le r \le m-1)$ — the number of elements having remainder $r$ when divided by $m$. In other words, for each remainder, let's find the number of corresponding elements in $a$ with that remainder.
Your task is to change the array in such a way that $c_0 = c_1 = \dots = c_{m-1} = \frac{n}{m}$.
Find the minimum number of moves to satisfy the above requirement.
|
The first line of input contains two integers $n$ and $m$ ($1 \le n \le 2 \cdot 10^5, 1 \le m \le n$). It is guaranteed that $m$ is a divisor of $n$.
The second line of input contains $n$ integers $a_1, a_2, \dots, a_n$ ($0 \le a_i \le 10^9$), the elements of the array.
|
In the first line, print a single integer — the minimum number of moves required to satisfy the following condition: for each remainder from $0$ to $m - 1$, the number of elements of the array having this remainder equals $\frac{n}{m}$.
In the second line, print any array satisfying the condition and can be obtained from the given array with the minimum number of moves. The values of the elements of the resulting array must not exceed $10^{18}$.
|
[
"6 3\n3 2 0 6 10 12\n",
"4 2\n0 1 2 3\n"
] |
[
"3\n3 2 0 7 10 14 \n",
"0\n0 1 2 3 \n"
] |
none
| 0
|
[
{
"input": "6 3\n3 2 0 6 10 12",
"output": "3\n3 2 0 7 10 14 "
},
{
"input": "4 2\n0 1 2 3",
"output": "0\n0 1 2 3 "
},
{
"input": "1 1\n1000000000",
"output": "0\n1000000000 "
},
{
"input": "6 3\n3 2 0 6 10 11",
"output": "1\n3 2 0 7 10 11 "
},
{
"input": "100 25\n6745 2075 7499 7517 1776 5164 2335 2745 4465 1457 7565 2232 2486 9025 8059 9646 8017 7662 9690 3352 2306 366 7422 1073 7169 8966 4506 8225 5614 8628 2908 7452 9625 9332 7097 353 1043 8118 5794 4486 626 971 6731 6618 887 6354 4814 7307 7681 6160 9351 2579 411 3436 5570 2812 2726 4433 3220 577 5891 3861 528 2183 127 5579 6979 4005 9953 5038 9937 4792 3003 9417 8796 1565 11 2596 2486 3494 4464 9568 5512 5565 9822 9820 4848 2889 9527 2249 9860 8236 256 8434 8038 6407 5570 5922 7435 2815",
"output": "88\n6745 2075 7499 7517 1776 5164 2335 2745 4465 1457 7565 2232 2486 9025 8059 9646 8017 7662 9690 3352 2306 366 7422 1073 7169 8966 4506 8225 5614 8628 2908 7452 9625 9332 7097 353 1043 8118 5794 4486 626 971 6731 6618 887 6354 4814 7307 7681 6160 9351 2579 411 3436 5570 2812 2726 4433 3220 577 5891 3863 528 2183 127 5579 6979 4005 9953 5038 9937 4792 3005 9417 8796 1565 24 2596 2505 3494 4464 9568 5513 5566 9822 9823 4848 2899 9530 2249 9860 8259 259 8434 8038 6408 5573 5922 7435 2819 "
}
] | 1,634,721,516
| 2,147,483,647
|
PyPy 3
|
TIME_LIMIT_EXCEEDED
|
TESTS
| 4
| 3,000
| 40,448,000
|
n, m = map(int,input().split())
k = n//m
def mod(x):
return x % m
A = list(map(int, input().split()))
a = []
for i in range(n):
a.append([A[i], i])
a = sorted(a, key=lambda x: mod(x[0]))
cnt = [0]*m
target = 0
ans = 0
for i in range(n):
x, y = a[i]
now = x%m
if cnt[now] < k:
cnt[now] += 1
else:
if target <= now:
while cnt[target%m] >= k:
target += 1
cnt[target%m] += 1
ADD = target - now
ans += ADD
a[i][0] += ADD
while cnt[target%m] >= k:
target += 1
print(ans)
ANS = [0]*n
for x, y in a:
ANS[y] = x
print(*ANS)
|
Title: Equalize the Remainders
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given an array consisting of $n$ integers $a_1, a_2, \dots, a_n$, and a positive integer $m$. It is guaranteed that $m$ is a divisor of $n$.
In a single move, you can choose any position $i$ between $1$ and $n$ and increase $a_i$ by $1$.
Let's calculate $c_r$ ($0 \le r \le m-1)$ — the number of elements having remainder $r$ when divided by $m$. In other words, for each remainder, let's find the number of corresponding elements in $a$ with that remainder.
Your task is to change the array in such a way that $c_0 = c_1 = \dots = c_{m-1} = \frac{n}{m}$.
Find the minimum number of moves to satisfy the above requirement.
Input Specification:
The first line of input contains two integers $n$ and $m$ ($1 \le n \le 2 \cdot 10^5, 1 \le m \le n$). It is guaranteed that $m$ is a divisor of $n$.
The second line of input contains $n$ integers $a_1, a_2, \dots, a_n$ ($0 \le a_i \le 10^9$), the elements of the array.
Output Specification:
In the first line, print a single integer — the minimum number of moves required to satisfy the following condition: for each remainder from $0$ to $m - 1$, the number of elements of the array having this remainder equals $\frac{n}{m}$.
In the second line, print any array satisfying the condition and can be obtained from the given array with the minimum number of moves. The values of the elements of the resulting array must not exceed $10^{18}$.
Demo Input:
['6 3\n3 2 0 6 10 12\n', '4 2\n0 1 2 3\n']
Demo Output:
['3\n3 2 0 7 10 14 \n', '0\n0 1 2 3 \n']
Note:
none
|
```python
n, m = map(int,input().split())
k = n//m
def mod(x):
return x % m
A = list(map(int, input().split()))
a = []
for i in range(n):
a.append([A[i], i])
a = sorted(a, key=lambda x: mod(x[0]))
cnt = [0]*m
target = 0
ans = 0
for i in range(n):
x, y = a[i]
now = x%m
if cnt[now] < k:
cnt[now] += 1
else:
if target <= now:
while cnt[target%m] >= k:
target += 1
cnt[target%m] += 1
ADD = target - now
ans += ADD
a[i][0] += ADD
while cnt[target%m] >= k:
target += 1
print(ans)
ANS = [0]*n
for x, y in a:
ANS[y] = x
print(*ANS)
```
| 0
|
|
932
|
A
|
Palindromic Supersequence
|
PROGRAMMING
| 800
|
[
"constructive algorithms"
] | null | null |
You are given a string *A*. Find a string *B*, where *B* is a palindrome and *A* is a subsequence of *B*.
A subsequence of a string is a string that can be derived from it by deleting some (not necessarily consecutive) characters without changing the order of the remaining characters. For example, "cotst" is a subsequence of "contest".
A palindrome is a string that reads the same forward or backward.
The length of string *B* should be at most 104. It is guaranteed that there always exists such string.
You do not need to find the shortest answer, the only restriction is that the length of string *B* should not exceed 104.
|
First line contains a string *A* (1<=≤<=|*A*|<=≤<=103) consisting of lowercase Latin letters, where |*A*| is a length of *A*.
|
Output single line containing *B* consisting of only lowercase Latin letters. You do not need to find the shortest answer, the only restriction is that the length of string *B* should not exceed 104. If there are many possible *B*, print any of them.
|
[
"aba\n",
"ab\n"
] |
[
"aba",
"aabaa"
] |
In the first example, "aba" is a subsequence of "aba" which is a palindrome.
In the second example, "ab" is a subsequence of "aabaa" which is a palindrome.
| 500
|
[
{
"input": "aba",
"output": "abaaba"
},
{
"input": "ab",
"output": "abba"
},
{
"input": "krnyoixirslfszfqivgkaflgkctvbvksipwomqxlyqxhlbceuhbjbfnhofcgpgwdseffycthmlpcqejgskwjkbkbbmifnurnwyhevsoqzmtvzgfiqajfrgyuzxnrtxectcnlyoisbglpdbjbslxlpoymrcxmdtqhcnlvtqdwftuzgbdxsyscwbrguostbelnvtaqdmkmihmoxqtqlxvlsssisvqvvzotoyqryuyqwoknnqcqggysrqpkrccvyhxsjmhoqoyocwcriplarjoyiqrmmpmueqbsbljddwrumauczfziodpudheexalbwpiypmdjlmwtgdrzhpxneofhqzjdmurgvmrwdotuwyknlrbvuvtnhiouvqitgyfgfieonbaapyhwpcrmehxcpkijzfiayfvoxkpa",
"output": "krnyoixirslfszfqivgkaflgkctvbvksipwomqxlyqxhlbceuhbjbfnhofcgpgwdseffycthmlpcqejgskwjkbkbbmifnurnwyhevsoqzmtvzgfiqajfrgyuzxnrtxectcnlyoisbglpdbjbslxlpoymrcxmdtqhcnlvtqdwftuzgbdxsyscwbrguostbelnvtaqdmkmihmoxqtqlxvlsssisvqvvzotoyqryuyqwoknnqcqggysrqpkrccvyhxsjmhoqoyocwcriplarjoyiqrmmpmueqbsbljddwrumauczfziodpudheexalbwpiypmdjlmwtgdrzhpxneofhqzjdmurgvmrwdotuwyknlrbvuvtnhiouvqitgyfgfieonbaapyhwpcrmehxcpkijzfiayfvoxkpaapkxovfyaifzjikpcxhemrcpwhypaabnoeifgfygtiqvuoihntvuvbrlnkywutodwrmvgrumdjzqhfoenxphzrdgtwmljdm..."
},
{
"input": "mgrfmzxqpejcixxppqgvuawutgrmezjkteofjbnrvzzkvjtacfxjjokisavsgrslryxfqgrmdsqwptajbqzvethuljbdatxghfzqrwvfgakwmoawlzqjypmhllbbuuhbpriqsnibywlgjlxowyzagrfnqafvcqwktkcjwejevzbnxhsfmwojshcdypnvbuhhuzqmgovmvgwiizatoxgblyudipahfbkewmuneoqhjmbpdtwnznblwvtjrniwlbyblhppndspojrouffazpoxtqdfpjuhitvijrohavpqatofxwmksvjcvhdecxwwmosqiczjpkfafqlboxosnjgzgdraehzdltthemeusxhiiimrdrugabnxwsygsktkcslhjebfexucsyvlwrptebkjhefsvfrmcqqdlanbetrgzwylizmrystvpgrkhlicfadco",
"output": "mgrfmzxqpejcixxppqgvuawutgrmezjkteofjbnrvzzkvjtacfxjjokisavsgrslryxfqgrmdsqwptajbqzvethuljbdatxghfzqrwvfgakwmoawlzqjypmhllbbuuhbpriqsnibywlgjlxowyzagrfnqafvcqwktkcjwejevzbnxhsfmwojshcdypnvbuhhuzqmgovmvgwiizatoxgblyudipahfbkewmuneoqhjmbpdtwnznblwvtjrniwlbyblhppndspojrouffazpoxtqdfpjuhitvijrohavpqatofxwmksvjcvhdecxwwmosqiczjpkfafqlboxosnjgzgdraehzdltthemeusxhiiimrdrugabnxwsygsktkcslhjebfexucsyvlwrptebkjhefsvfrmcqqdlanbetrgzwylizmrystvpgrkhlicfadcoocdafcilhkrgpvtsyrmzilywzgrtebnaldqqcmrfvsfehjkbetprwlvyscuxef..."
},
{
"input": "hdmasfcjuigrwjchmjslmpynewnzpphmudzcbxzdexjuhktdtcoibzvevsmwaxakrtdfoivkvoooypyemiidadquqepxwqkesdnakxkbzrcjkgvwwxtqxvfpxcwitljyehldgsjytmekimkkndjvnzqtjykiymkmdzpwakxdtkzcqcatlevppgfhyykgmipuodjrnfjzhcmjdbzvhywprbwdcfxiffpzbjbmbyijkqnosslqbfvvicxvoeuzruraetglthgourzhfpnubzvblfzmmbgepjjyshchthulxar",
"output": "hdmasfcjuigrwjchmjslmpynewnzpphmudzcbxzdexjuhktdtcoibzvevsmwaxakrtdfoivkvoooypyemiidadquqepxwqkesdnakxkbzrcjkgvwwxtqxvfpxcwitljyehldgsjytmekimkkndjvnzqtjykiymkmdzpwakxdtkzcqcatlevppgfhyykgmipuodjrnfjzhcmjdbzvhywprbwdcfxiffpzbjbmbyijkqnosslqbfvvicxvoeuzruraetglthgourzhfpnubzvblfzmmbgepjjyshchthulxarraxluhthchsyjjpegbmmzflbvzbunpfhzruoghtlgtearurzueovxcivvfbqlssonqkjiybmbjbzpffixfcdwbrpwyhvzbdjmchzjfnrjdoupimgkyyhfgppveltacqczktdxkawpzdmkmyikyjtqznvjdnkkmikemtyjsgdlheyjltiwcxpfvxqtxwwvgkjcrzbkxkandsekqwxpequ..."
},
{
"input": "fggbyzobbmxtwdajawqdywnppflkkmtxzjvxopqvliwdwhzepcuiwelhbuotlkvesexnwkytonfrpqcxzzqzdvsmbsjcxxeugavekozfjlolrtqgwzqxsfgrnvrgfrqpixhsskbpzghndesvwptpvvkasfalzsetopervpwzmkgpcexqnvtnoulprwnowmsorscecvvvrjfwumcjqyrounqsgdruxttvtmrkivtxauhosokdiahsyrftzsgvgyveqwkzhqstbgywrvmsgfcfyuxpphvmyydzpohgdicoxbtjnsbyhoidnkrialowvlvmjpxcfeygqzphmbcjkupojsmmuqlydixbaluwezvnfasjfxilbyllwyipsmovdzosuwotcxerzcfuvxprtziseshjfcosalyqglpotxvxaanpocypsiyazsejjoximnbvqucftuvdksaxutvjeunodbipsumlaymjnzljurefjg",
"output": "fggbyzobbmxtwdajawqdywnppflkkmtxzjvxopqvliwdwhzepcuiwelhbuotlkvesexnwkytonfrpqcxzzqzdvsmbsjcxxeugavekozfjlolrtqgwzqxsfgrnvrgfrqpixhsskbpzghndesvwptpvvkasfalzsetopervpwzmkgpcexqnvtnoulprwnowmsorscecvvvrjfwumcjqyrounqsgdruxttvtmrkivtxauhosokdiahsyrftzsgvgyveqwkzhqstbgywrvmsgfcfyuxpphvmyydzpohgdicoxbtjnsbyhoidnkrialowvlvmjpxcfeygqzphmbcjkupojsmmuqlydixbaluwezvnfasjfxilbyllwyipsmovdzosuwotcxerzcfuvxprtziseshjfcosalyqglpotxvxaanpocypsiyazsejjoximnbvqucftuvdksaxutvjeunodbipsumlaymjnzljurefjggjferujlznjmyalmuspib..."
},
{
"input": "qyyxqkbxsvfnjzttdqmpzinbdgayllxpfrpopwciejjjzadguurnnhvixgueukugkkjyghxknedojvmdrskswiotgatsajowionuiumuhyggjuoympuxyfahwftwufvocdguxmxabbxnfviscxtilzzauizsgugwcqtbqgoosefhkumhodwpgolfdkbuiwlzjydonwbgyzzrjwxnceltqgqelrrljmzdbftmaogiuosaqhngmdzxzlmyrwefzhqawmkdckfnyyjgdjgadtfjvrkdwysqofcgyqrnyzutycvspzbjmmesobvhshtqlrytztyieknnkporrbcmlopgtknlmsstzkigreqwgsvagmvbrvwypoxttmzzsgm",
"output": "qyyxqkbxsvfnjzttdqmpzinbdgayllxpfrpopwciejjjzadguurnnhvixgueukugkkjyghxknedojvmdrskswiotgatsajowionuiumuhyggjuoympuxyfahwftwufvocdguxmxabbxnfviscxtilzzauizsgugwcqtbqgoosefhkumhodwpgolfdkbuiwlzjydonwbgyzzrjwxnceltqgqelrrljmzdbftmaogiuosaqhngmdzxzlmyrwefzhqawmkdckfnyyjgdjgadtfjvrkdwysqofcgyqrnyzutycvspzbjmmesobvhshtqlrytztyieknnkporrbcmlopgtknlmsstzkigreqwgsvagmvbrvwypoxttmzzsgmmgszzmttxopywvrbvmgavsgwqergikztssmlnktgpolmcbrropknnkeiytztyrlqthshvbosemmjbzpsvcytuzynrqygcfoqsywdkrvjftdagjdgjyynfkcdkmwaqhzfewry..."
},
{
"input": "scvlhflaqvniyiyofonowwcuqajuwscdrzhbvasymvqfnthzvtjcfuaftrbjghhvslcohwpxkggrbtatjtgehuqtorwinwvrtdldyoeeozxwippuahgkuehvsmyqtodqvlufqqmqautaqirvwzvtodzxtgxiinubhrbeoiybidutrqamsdnasctxatzkvkjkrmavdravnsxyngjlugwftmhmcvvxdbfndurrbmcpuoigjpssqcortmqoqttrabhoqvopjkxvpbqdqsilvlplhgqazauyvnodsxtwnomlinjpozwhrgrkqwmlwcwdkxjxjftexiavwrejvdjcfptterblxysjcheesyqsbgdrzjxbfjqgjgmvccqcyj",
"output": "scvlhflaqvniyiyofonowwcuqajuwscdrzhbvasymvqfnthzvtjcfuaftrbjghhvslcohwpxkggrbtatjtgehuqtorwinwvrtdldyoeeozxwippuahgkuehvsmyqtodqvlufqqmqautaqirvwzvtodzxtgxiinubhrbeoiybidutrqamsdnasctxatzkvkjkrmavdravnsxyngjlugwftmhmcvvxdbfndurrbmcpuoigjpssqcortmqoqttrabhoqvopjkxvpbqdqsilvlplhgqazauyvnodsxtwnomlinjpozwhrgrkqwmlwcwdkxjxjftexiavwrejvdjcfptterblxysjcheesyqsbgdrzjxbfjqgjgmvccqcyjjycqccvmgjgqjfbxjzrdgbsqyseehcjsyxlbrettpfcjdvjerwvaixetfjxjxkdwcwlmwqkrgrhwzopjnilmonwtxsdonvyuazaqghlplvlisqdqbpvxkjpovqohbarttqoqm..."
},
{
"input": "oohkqxxtvxzmvfjjxyjwlbqmeqwwlienzkdbhswgfbkhfygltsucdijozwaiewpixapyazfztksjeoqjugjfhdbqzuezbuajfvvffkwprroyivfoocvslejffgxuiofisenroxoeixmdbzonmreikpflciwsbafrdqfvdfojgoziiibqhwwsvhnzmptgirqqulkgmyzrfekzqqujmdumxkudsgexisupedisgmdgebvlvrpyfrbrqjknrxyzfpwmsxjxismgd",
"output": "oohkqxxtvxzmvfjjxyjwlbqmeqwwlienzkdbhswgfbkhfygltsucdijozwaiewpixapyazfztksjeoqjugjfhdbqzuezbuajfvvffkwprroyivfoocvslejffgxuiofisenroxoeixmdbzonmreikpflciwsbafrdqfvdfojgoziiibqhwwsvhnzmptgirqqulkgmyzrfekzqqujmdumxkudsgexisupedisgmdgebvlvrpyfrbrqjknrxyzfpwmsxjxismgddgmsixjxsmwpfzyxrnkjqrbrfyprvlvbegdmgsidepusixegsdukxmudmjuqqzkefrzymgkluqqrigtpmznhvswwhqbiiizogjofdvfqdrfabswiclfpkiermnozbdmxieoxornesifoiuxgffjelsvcoofviyorrpwkffvvfjaubzeuzqbdhfjgujqoejsktzfzaypaxipweiawzojidcustlgyfhkbfgwshbdkzneilwwqemqblw..."
},
{
"input": "gilhoixzjgidfanqrmekjelnvicpuujlpxittgadgrhqallnkjlemwazntwfywjnrxdkgrnczlwzjyeyfktduzdjnivcldjjarfzmmdbyytvipbbnjqolfnlqjpidotxxfobgtgpvjmpddcyddwdcjsxxumuoyznhpvpqccgqnuouzojntanfwctthcgynrukcvshsuuqrxfdvqqggaatwytikkitywtaaggqqvdfxrquushsvckurnygchttcwfnatnjozuounqgccqpvphnzyoumuxxsjcdwddycddpmjvpgtgbofxxtodipjqlnfloqjnbbpivtyybdmmzfrajjdlcvinjdzudtkfyeyjzwlzcnrgkdxrnjwyfwtnzawmeljknllaqhrgdagttixpljuupcivnlejkemrqnafdigjzxiohlig",
"output": "gilhoixzjgidfanqrmekjelnvicpuujlpxittgadgrhqallnkjlemwazntwfywjnrxdkgrnczlwzjyeyfktduzdjnivcldjjarfzmmdbyytvipbbnjqolfnlqjpidotxxfobgtgpvjmpddcyddwdcjsxxumuoyznhpvpqccgqnuouzojntanfwctthcgynrukcvshsuuqrxfdvqqggaatwytikkitywtaaggqqvdfxrquushsvckurnygchttcwfnatnjozuounqgccqpvphnzyoumuxxsjcdwddycddpmjvpgtgbofxxtodipjqlnfloqjnbbpivtyybdmmzfrajjdlcvinjdzudtkfyeyjzwlzcnrgkdxrnjwyfwtnzawmeljknllaqhrgdagttixpljuupcivnlejkemrqnafdigjzxiohliggilhoixzjgidfanqrmekjelnvicpuujlpxittgadgrhqallnkjlemwazntwfywjnrxdkgrnczlw..."
},
{
"input": "abcab",
"output": "abcabbacba"
},
{
"input": "baaaaaaa",
"output": "baaaaaaaaaaaaaab"
},
{
"input": "baaaaaa",
"output": "baaaaaaaaaaaab"
},
{
"input": "baaaaaaaaa",
"output": "baaaaaaaaaaaaaaaaaab"
},
{
"input": "baaaaaaaa",
"output": "baaaaaaaaaaaaaaaab"
}
] | 1,597,691,749
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 48
| 109
| 0
|
n=input()
a=n[::-1]
if n==a:
print(n)
else:
print(n+a)
|
Title: Palindromic Supersequence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a string *A*. Find a string *B*, where *B* is a palindrome and *A* is a subsequence of *B*.
A subsequence of a string is a string that can be derived from it by deleting some (not necessarily consecutive) characters without changing the order of the remaining characters. For example, "cotst" is a subsequence of "contest".
A palindrome is a string that reads the same forward or backward.
The length of string *B* should be at most 104. It is guaranteed that there always exists such string.
You do not need to find the shortest answer, the only restriction is that the length of string *B* should not exceed 104.
Input Specification:
First line contains a string *A* (1<=≤<=|*A*|<=≤<=103) consisting of lowercase Latin letters, where |*A*| is a length of *A*.
Output Specification:
Output single line containing *B* consisting of only lowercase Latin letters. You do not need to find the shortest answer, the only restriction is that the length of string *B* should not exceed 104. If there are many possible *B*, print any of them.
Demo Input:
['aba\n', 'ab\n']
Demo Output:
['aba', 'aabaa']
Note:
In the first example, "aba" is a subsequence of "aba" which is a palindrome.
In the second example, "ab" is a subsequence of "aabaa" which is a palindrome.
|
```python
n=input()
a=n[::-1]
if n==a:
print(n)
else:
print(n+a)
```
| 3
|
|
581
|
A
|
Vasya the Hipster
|
PROGRAMMING
| 800
|
[
"implementation",
"math"
] | null | null |
One day Vasya the Hipster decided to count how many socks he had. It turned out that he had *a* red socks and *b* blue socks.
According to the latest fashion, hipsters should wear the socks of different colors: a red one on the left foot, a blue one on the right foot.
Every day Vasya puts on new socks in the morning and throws them away before going to bed as he doesn't want to wash them.
Vasya wonders, what is the maximum number of days when he can dress fashionable and wear different socks, and after that, for how many days he can then wear the same socks until he either runs out of socks or cannot make a single pair from the socks he's got.
Can you help him?
|
The single line of the input contains two positive integers *a* and *b* (1<=≤<=*a*,<=*b*<=≤<=100) — the number of red and blue socks that Vasya's got.
|
Print two space-separated integers — the maximum number of days when Vasya can wear different socks and the number of days when he can wear the same socks until he either runs out of socks or cannot make a single pair from the socks he's got.
Keep in mind that at the end of the day Vasya throws away the socks that he's been wearing on that day.
|
[
"3 1\n",
"2 3\n",
"7 3\n"
] |
[
"1 1\n",
"2 0\n",
"3 2\n"
] |
In the first sample Vasya can first put on one pair of different socks, after that he has two red socks left to wear on the second day.
| 500
|
[
{
"input": "3 1",
"output": "1 1"
},
{
"input": "2 3",
"output": "2 0"
},
{
"input": "7 3",
"output": "3 2"
},
{
"input": "100 100",
"output": "100 0"
},
{
"input": "4 10",
"output": "4 3"
},
{
"input": "6 10",
"output": "6 2"
},
{
"input": "6 11",
"output": "6 2"
},
{
"input": "10 40",
"output": "10 15"
},
{
"input": "11 56",
"output": "11 22"
},
{
"input": "34 30",
"output": "30 2"
},
{
"input": "33 33",
"output": "33 0"
},
{
"input": "100 45",
"output": "45 27"
},
{
"input": "100 23",
"output": "23 38"
},
{
"input": "45 12",
"output": "12 16"
},
{
"input": "1 1",
"output": "1 0"
},
{
"input": "1 100",
"output": "1 49"
},
{
"input": "100 1",
"output": "1 49"
},
{
"input": "68 59",
"output": "59 4"
},
{
"input": "45 99",
"output": "45 27"
},
{
"input": "99 100",
"output": "99 0"
},
{
"input": "100 98",
"output": "98 1"
},
{
"input": "59 12",
"output": "12 23"
},
{
"input": "86 4",
"output": "4 41"
},
{
"input": "68 21",
"output": "21 23"
},
{
"input": "100 11",
"output": "11 44"
},
{
"input": "100 10",
"output": "10 45"
},
{
"input": "15 45",
"output": "15 15"
},
{
"input": "11 32",
"output": "11 10"
},
{
"input": "34 96",
"output": "34 31"
},
{
"input": "89 89",
"output": "89 0"
}
] | 1,676,210,179
| 2,147,483,647
|
PyPy 3-64
|
OK
|
TESTS
| 30
| 108
| 9,011,200
|
import math
from sys import stdin
from collections import Counter, defaultdict, deque, namedtuple
from bisect import bisect_right, bisect_left
from typing import List, DefaultDict
def readarray(typ):
return list(map(typ, stdin.readline().split()))
def readint():
return int(input())
a, b = readarray(int)
print(min(a,b), (max(a,b)-min(a,b))//2)
|
Title: Vasya the Hipster
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
One day Vasya the Hipster decided to count how many socks he had. It turned out that he had *a* red socks and *b* blue socks.
According to the latest fashion, hipsters should wear the socks of different colors: a red one on the left foot, a blue one on the right foot.
Every day Vasya puts on new socks in the morning and throws them away before going to bed as he doesn't want to wash them.
Vasya wonders, what is the maximum number of days when he can dress fashionable and wear different socks, and after that, for how many days he can then wear the same socks until he either runs out of socks or cannot make a single pair from the socks he's got.
Can you help him?
Input Specification:
The single line of the input contains two positive integers *a* and *b* (1<=≤<=*a*,<=*b*<=≤<=100) — the number of red and blue socks that Vasya's got.
Output Specification:
Print two space-separated integers — the maximum number of days when Vasya can wear different socks and the number of days when he can wear the same socks until he either runs out of socks or cannot make a single pair from the socks he's got.
Keep in mind that at the end of the day Vasya throws away the socks that he's been wearing on that day.
Demo Input:
['3 1\n', '2 3\n', '7 3\n']
Demo Output:
['1 1\n', '2 0\n', '3 2\n']
Note:
In the first sample Vasya can first put on one pair of different socks, after that he has two red socks left to wear on the second day.
|
```python
import math
from sys import stdin
from collections import Counter, defaultdict, deque, namedtuple
from bisect import bisect_right, bisect_left
from typing import List, DefaultDict
def readarray(typ):
return list(map(typ, stdin.readline().split()))
def readint():
return int(input())
a, b = readarray(int)
print(min(a,b), (max(a,b)-min(a,b))//2)
```
| 3
|
|
675
|
A
|
Infinite Sequence
|
PROGRAMMING
| 1,100
|
[
"math"
] | null | null |
Vasya likes everything infinite. Now he is studying the properties of a sequence *s*, such that its first element is equal to *a* (*s*1<==<=*a*), and the difference between any two neighbouring elements is equal to *c* (*s**i*<=-<=*s**i*<=-<=1<==<=*c*). In particular, Vasya wonders if his favourite integer *b* appears in this sequence, that is, there exists a positive integer *i*, such that *s**i*<==<=*b*. Of course, you are the person he asks for a help.
|
The first line of the input contain three integers *a*, *b* and *c* (<=-<=109<=≤<=*a*,<=*b*,<=*c*<=≤<=109) — the first element of the sequence, Vasya's favorite number and the difference between any two neighbouring elements of the sequence, respectively.
|
If *b* appears in the sequence *s* print "YES" (without quotes), otherwise print "NO" (without quotes).
|
[
"1 7 3\n",
"10 10 0\n",
"1 -4 5\n",
"0 60 50\n"
] |
[
"YES\n",
"YES\n",
"NO\n",
"NO\n"
] |
In the first sample, the sequence starts from integers 1, 4, 7, so 7 is its element.
In the second sample, the favorite integer of Vasya is equal to the first element of the sequence.
In the third sample all elements of the sequence are greater than Vasya's favorite integer.
In the fourth sample, the sequence starts from 0, 50, 100, and all the following elements are greater than Vasya's favorite integer.
| 500
|
[
{
"input": "1 7 3",
"output": "YES"
},
{
"input": "10 10 0",
"output": "YES"
},
{
"input": "1 -4 5",
"output": "NO"
},
{
"input": "0 60 50",
"output": "NO"
},
{
"input": "1 -4 -5",
"output": "YES"
},
{
"input": "0 1 0",
"output": "NO"
},
{
"input": "10 10 42",
"output": "YES"
},
{
"input": "-1000000000 1000000000 -1",
"output": "NO"
},
{
"input": "10 16 4",
"output": "NO"
},
{
"input": "-1000000000 1000000000 5",
"output": "YES"
},
{
"input": "1000000000 -1000000000 5",
"output": "NO"
},
{
"input": "1000000000 -1000000000 0",
"output": "NO"
},
{
"input": "1000000000 1000000000 0",
"output": "YES"
},
{
"input": "115078364 -899474523 -1",
"output": "YES"
},
{
"input": "-245436499 416383245 992",
"output": "YES"
},
{
"input": "-719636354 536952440 2",
"output": "YES"
},
{
"input": "-198350539 963391024 68337739",
"output": "YES"
},
{
"input": "-652811055 875986516 1091",
"output": "YES"
},
{
"input": "119057893 -516914539 -39748277",
"output": "YES"
},
{
"input": "989140430 731276607 -36837689",
"output": "YES"
},
{
"input": "677168390 494583489 -985071853",
"output": "NO"
},
{
"input": "58090193 777423708 395693923",
"output": "NO"
},
{
"input": "479823846 -403424770 -653472589",
"output": "NO"
},
{
"input": "-52536829 -132023273 -736287999",
"output": "NO"
},
{
"input": "-198893776 740026818 -547885271",
"output": "NO"
},
{
"input": "-2 -2 -2",
"output": "YES"
},
{
"input": "-2 -2 -1",
"output": "YES"
},
{
"input": "-2 -2 0",
"output": "YES"
},
{
"input": "-2 -2 1",
"output": "YES"
},
{
"input": "-2 -2 2",
"output": "YES"
},
{
"input": "-2 -1 -2",
"output": "NO"
},
{
"input": "-2 -1 -1",
"output": "NO"
},
{
"input": "-2 -1 0",
"output": "NO"
},
{
"input": "-2 -1 1",
"output": "YES"
},
{
"input": "-2 -1 2",
"output": "NO"
},
{
"input": "-2 0 -2",
"output": "NO"
},
{
"input": "-2 0 -1",
"output": "NO"
},
{
"input": "-2 0 0",
"output": "NO"
},
{
"input": "-2 0 1",
"output": "YES"
},
{
"input": "-2 0 2",
"output": "YES"
},
{
"input": "-2 1 -2",
"output": "NO"
},
{
"input": "-2 1 -1",
"output": "NO"
},
{
"input": "-2 1 0",
"output": "NO"
},
{
"input": "-2 1 1",
"output": "YES"
},
{
"input": "-2 1 2",
"output": "NO"
},
{
"input": "-2 2 -2",
"output": "NO"
},
{
"input": "-2 2 -1",
"output": "NO"
},
{
"input": "-2 2 0",
"output": "NO"
},
{
"input": "-2 2 1",
"output": "YES"
},
{
"input": "-2 2 2",
"output": "YES"
},
{
"input": "-1 -2 -2",
"output": "NO"
},
{
"input": "-1 -2 -1",
"output": "YES"
},
{
"input": "-1 -2 0",
"output": "NO"
},
{
"input": "-1 -2 1",
"output": "NO"
},
{
"input": "-1 -2 2",
"output": "NO"
},
{
"input": "-1 -1 -2",
"output": "YES"
},
{
"input": "-1 -1 -1",
"output": "YES"
},
{
"input": "-1 -1 0",
"output": "YES"
},
{
"input": "-1 -1 1",
"output": "YES"
},
{
"input": "-1 -1 2",
"output": "YES"
},
{
"input": "-1 0 -2",
"output": "NO"
},
{
"input": "-1 0 -1",
"output": "NO"
},
{
"input": "-1 0 0",
"output": "NO"
},
{
"input": "-1 0 1",
"output": "YES"
},
{
"input": "-1 0 2",
"output": "NO"
},
{
"input": "-1 1 -2",
"output": "NO"
},
{
"input": "-1 1 -1",
"output": "NO"
},
{
"input": "-1 1 0",
"output": "NO"
},
{
"input": "-1 1 1",
"output": "YES"
},
{
"input": "-1 1 2",
"output": "YES"
},
{
"input": "-1 2 -2",
"output": "NO"
},
{
"input": "-1 2 -1",
"output": "NO"
},
{
"input": "-1 2 0",
"output": "NO"
},
{
"input": "-1 2 1",
"output": "YES"
},
{
"input": "-1 2 2",
"output": "NO"
},
{
"input": "0 -2 -2",
"output": "YES"
},
{
"input": "0 -2 -1",
"output": "YES"
},
{
"input": "0 -2 0",
"output": "NO"
},
{
"input": "0 -2 1",
"output": "NO"
},
{
"input": "0 -2 2",
"output": "NO"
},
{
"input": "0 -1 -2",
"output": "NO"
},
{
"input": "0 -1 -1",
"output": "YES"
},
{
"input": "0 -1 0",
"output": "NO"
},
{
"input": "0 -1 1",
"output": "NO"
},
{
"input": "0 -1 2",
"output": "NO"
},
{
"input": "0 0 -2",
"output": "YES"
},
{
"input": "0 0 -1",
"output": "YES"
},
{
"input": "0 0 0",
"output": "YES"
},
{
"input": "0 0 1",
"output": "YES"
},
{
"input": "0 0 2",
"output": "YES"
},
{
"input": "0 1 -2",
"output": "NO"
},
{
"input": "0 1 -1",
"output": "NO"
},
{
"input": "0 1 0",
"output": "NO"
},
{
"input": "0 1 1",
"output": "YES"
},
{
"input": "0 1 2",
"output": "NO"
},
{
"input": "0 2 -2",
"output": "NO"
},
{
"input": "0 2 -1",
"output": "NO"
},
{
"input": "0 2 0",
"output": "NO"
},
{
"input": "0 2 1",
"output": "YES"
},
{
"input": "0 2 2",
"output": "YES"
},
{
"input": "1 -2 -2",
"output": "NO"
},
{
"input": "1 -2 -1",
"output": "YES"
},
{
"input": "1 -2 0",
"output": "NO"
},
{
"input": "1 -2 1",
"output": "NO"
},
{
"input": "1 -2 2",
"output": "NO"
},
{
"input": "1 -1 -2",
"output": "YES"
},
{
"input": "1 -1 -1",
"output": "YES"
},
{
"input": "1 -1 0",
"output": "NO"
},
{
"input": "1 -1 1",
"output": "NO"
},
{
"input": "1 -1 2",
"output": "NO"
},
{
"input": "1 0 -2",
"output": "NO"
},
{
"input": "1 0 -1",
"output": "YES"
},
{
"input": "1 0 0",
"output": "NO"
},
{
"input": "1 0 1",
"output": "NO"
},
{
"input": "1 0 2",
"output": "NO"
},
{
"input": "1 1 -2",
"output": "YES"
},
{
"input": "1 1 -1",
"output": "YES"
},
{
"input": "1 1 0",
"output": "YES"
},
{
"input": "1 1 1",
"output": "YES"
},
{
"input": "1 1 2",
"output": "YES"
},
{
"input": "1 2 -2",
"output": "NO"
},
{
"input": "1 2 -1",
"output": "NO"
},
{
"input": "1 2 0",
"output": "NO"
},
{
"input": "1 2 1",
"output": "YES"
},
{
"input": "1 2 2",
"output": "NO"
},
{
"input": "2 -2 -2",
"output": "YES"
},
{
"input": "2 -2 -1",
"output": "YES"
},
{
"input": "2 -2 0",
"output": "NO"
},
{
"input": "2 -2 1",
"output": "NO"
},
{
"input": "2 -2 2",
"output": "NO"
},
{
"input": "2 -1 -2",
"output": "NO"
},
{
"input": "2 -1 -1",
"output": "YES"
},
{
"input": "2 -1 0",
"output": "NO"
},
{
"input": "2 -1 1",
"output": "NO"
},
{
"input": "2 -1 2",
"output": "NO"
},
{
"input": "2 0 -2",
"output": "YES"
},
{
"input": "2 0 -1",
"output": "YES"
},
{
"input": "2 0 0",
"output": "NO"
},
{
"input": "2 0 1",
"output": "NO"
},
{
"input": "2 0 2",
"output": "NO"
},
{
"input": "2 1 -2",
"output": "NO"
},
{
"input": "2 1 -1",
"output": "YES"
},
{
"input": "2 1 0",
"output": "NO"
},
{
"input": "2 1 1",
"output": "NO"
},
{
"input": "2 1 2",
"output": "NO"
},
{
"input": "2 2 -2",
"output": "YES"
},
{
"input": "2 2 -1",
"output": "YES"
},
{
"input": "2 2 0",
"output": "YES"
},
{
"input": "2 2 1",
"output": "YES"
},
{
"input": "2 2 2",
"output": "YES"
},
{
"input": "-1000000000 1000000000 1",
"output": "YES"
},
{
"input": "-1000000000 1000000000 2",
"output": "YES"
},
{
"input": "1000000000 -1000000000 -1",
"output": "YES"
},
{
"input": "5 2 3",
"output": "NO"
},
{
"input": "2 1 -1",
"output": "YES"
},
{
"input": "3 2 1",
"output": "NO"
},
{
"input": "0 -5 -3",
"output": "NO"
},
{
"input": "2 5 5",
"output": "NO"
},
{
"input": "0 10 1",
"output": "YES"
},
{
"input": "15 5 -5",
"output": "YES"
},
{
"input": "2 1 1",
"output": "NO"
},
{
"input": "20 10 0",
"output": "NO"
},
{
"input": "20 15 5",
"output": "NO"
},
{
"input": "1 6 1",
"output": "YES"
},
{
"input": "1000000000 0 -1000000000",
"output": "YES"
},
{
"input": "1 1 -5",
"output": "YES"
},
{
"input": "4 6 1",
"output": "YES"
},
{
"input": "-5 -10 -5",
"output": "YES"
},
{
"input": "2 0 0",
"output": "NO"
},
{
"input": "10 9 -1",
"output": "YES"
},
{
"input": "-2 -1 -1",
"output": "NO"
},
{
"input": "1 13 3",
"output": "YES"
},
{
"input": "2 3 0",
"output": "NO"
},
{
"input": "1 1 -1",
"output": "YES"
},
{
"input": "5 -10 -5",
"output": "YES"
},
{
"input": "5 3 1",
"output": "NO"
},
{
"input": "1 1000000000 1",
"output": "YES"
},
{
"input": "-1000000000 1000000000 1000000000",
"output": "YES"
}
] | 1,653,002,165
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 178
| 46
| 0
|
a,b,c=map(int,input().split())
if c==0 and a==b:
print("yes")
elif c!=0 and ((b-a)/c)==int((b-a)/c) and ((b-a)/c)>=0:
print("yes")
else:
print("no")
|
Title: Infinite Sequence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasya likes everything infinite. Now he is studying the properties of a sequence *s*, such that its first element is equal to *a* (*s*1<==<=*a*), and the difference between any two neighbouring elements is equal to *c* (*s**i*<=-<=*s**i*<=-<=1<==<=*c*). In particular, Vasya wonders if his favourite integer *b* appears in this sequence, that is, there exists a positive integer *i*, such that *s**i*<==<=*b*. Of course, you are the person he asks for a help.
Input Specification:
The first line of the input contain three integers *a*, *b* and *c* (<=-<=109<=≤<=*a*,<=*b*,<=*c*<=≤<=109) — the first element of the sequence, Vasya's favorite number and the difference between any two neighbouring elements of the sequence, respectively.
Output Specification:
If *b* appears in the sequence *s* print "YES" (without quotes), otherwise print "NO" (without quotes).
Demo Input:
['1 7 3\n', '10 10 0\n', '1 -4 5\n', '0 60 50\n']
Demo Output:
['YES\n', 'YES\n', 'NO\n', 'NO\n']
Note:
In the first sample, the sequence starts from integers 1, 4, 7, so 7 is its element.
In the second sample, the favorite integer of Vasya is equal to the first element of the sequence.
In the third sample all elements of the sequence are greater than Vasya's favorite integer.
In the fourth sample, the sequence starts from 0, 50, 100, and all the following elements are greater than Vasya's favorite integer.
|
```python
a,b,c=map(int,input().split())
if c==0 and a==b:
print("yes")
elif c!=0 and ((b-a)/c)==int((b-a)/c) and ((b-a)/c)>=0:
print("yes")
else:
print("no")
```
| 3
|
|
909
|
A
|
Generate Login
|
PROGRAMMING
| 1,000
|
[
"brute force",
"greedy",
"sortings"
] | null | null |
The preferred way to generate user login in Polygon is to concatenate a prefix of the user's first name and a prefix of their last name, in that order. Each prefix must be non-empty, and any of the prefixes can be the full name. Typically there are multiple possible logins for each person.
You are given the first and the last name of a user. Return the alphabetically earliest login they can get (regardless of other potential Polygon users).
As a reminder, a prefix of a string *s* is its substring which occurs at the beginning of *s*: "a", "ab", "abc" etc. are prefixes of string "{abcdef}" but "b" and 'bc" are not. A string *a* is alphabetically earlier than a string *b*, if *a* is a prefix of *b*, or *a* and *b* coincide up to some position, and then *a* has a letter that is alphabetically earlier than the corresponding letter in *b*: "a" and "ab" are alphabetically earlier than "ac" but "b" and "ba" are alphabetically later than "ac".
|
The input consists of a single line containing two space-separated strings: the first and the last names. Each character of each string is a lowercase English letter. The length of each string is between 1 and 10, inclusive.
|
Output a single string — alphabetically earliest possible login formed from these names. The output should be given in lowercase as well.
|
[
"harry potter\n",
"tom riddle\n"
] |
[
"hap\n",
"tomr\n"
] |
none
| 500
|
[
{
"input": "harry potter",
"output": "hap"
},
{
"input": "tom riddle",
"output": "tomr"
},
{
"input": "a qdpinbmcrf",
"output": "aq"
},
{
"input": "wixjzniiub ssdfodfgap",
"output": "wis"
},
{
"input": "z z",
"output": "zz"
},
{
"input": "ertuyivhfg v",
"output": "ertuv"
},
{
"input": "asdfghjkli ware",
"output": "asdfghjkliw"
},
{
"input": "udggmyop ze",
"output": "udggmyopz"
},
{
"input": "fapkdme rtzxovx",
"output": "fapkdmer"
},
{
"input": "mybiqxmnqq l",
"output": "ml"
},
{
"input": "dtbqya fyyymv",
"output": "df"
},
{
"input": "fyclu zokbxiahao",
"output": "fycluz"
},
{
"input": "qngatnviv rdych",
"output": "qngar"
},
{
"input": "ttvnhrnng lqkfulhrn",
"output": "tl"
},
{
"input": "fya fgx",
"output": "ff"
},
{
"input": "nuis zvjjqlre",
"output": "nuisz"
},
{
"input": "ly qtsmze",
"output": "lq"
},
{
"input": "d kgfpjsurfw",
"output": "dk"
},
{
"input": "lwli ewrpu",
"output": "le"
},
{
"input": "rr wldsfubcs",
"output": "rrw"
},
{
"input": "h qart",
"output": "hq"
},
{
"input": "vugvblnzx kqdwdulm",
"output": "vk"
},
{
"input": "xohesmku ef",
"output": "xe"
},
{
"input": "twvvsl wtcyawv",
"output": "tw"
},
{
"input": "obljndajv q",
"output": "obljndajq"
},
{
"input": "jjxwj kxccwx",
"output": "jjk"
},
{
"input": "sk fftzmv",
"output": "sf"
},
{
"input": "cgpegngs aufzxkyyrw",
"output": "ca"
},
{
"input": "reyjzjdvq skuch",
"output": "res"
},
{
"input": "ardaae mxgdulijf",
"output": "am"
},
{
"input": "bgopsdfji uaps",
"output": "bgopsdfjiu"
},
{
"input": "amolfed pun",
"output": "amolfedp"
},
{
"input": "badkiln yort",
"output": "badkilny"
},
{
"input": "aaaaaaaaaz york",
"output": "aaaaaaaaay"
},
{
"input": "bbbbcbbbbd c",
"output": "bbbbc"
},
{
"input": "aa ab",
"output": "aa"
},
{
"input": "ab b",
"output": "ab"
},
{
"input": "aaaaa ab",
"output": "aa"
},
{
"input": "aa a",
"output": "aa"
},
{
"input": "aba b",
"output": "ab"
},
{
"input": "aaaaaaa aaaaaa",
"output": "aa"
},
{
"input": "a a",
"output": "aa"
},
{
"input": "a aa",
"output": "aa"
},
{
"input": "a b",
"output": "ab"
},
{
"input": "b a",
"output": "ba"
},
{
"input": "z a",
"output": "za"
},
{
"input": "aaa a",
"output": "aa"
},
{
"input": "aa aa",
"output": "aa"
},
{
"input": "a aaa",
"output": "aa"
},
{
"input": "aaaaaaaaaa aaaaaaaaaa",
"output": "aa"
},
{
"input": "aaaaaaaaaa a",
"output": "aa"
},
{
"input": "a aaaaaaaaaa",
"output": "aa"
},
{
"input": "zzaa b",
"output": "zb"
},
{
"input": "ca cf",
"output": "cac"
},
{
"input": "abhi ia",
"output": "abhi"
},
{
"input": "aaaa aaaab",
"output": "aa"
},
{
"input": "aar raa",
"output": "aar"
},
{
"input": "harry hotter",
"output": "hah"
},
{
"input": "aaaaaaa a",
"output": "aa"
},
{
"input": "apple pie",
"output": "ap"
},
{
"input": "aaa aaa",
"output": "aa"
},
{
"input": "kabc buba",
"output": "kab"
},
{
"input": "asd ss",
"output": "as"
},
{
"input": "bbb b",
"output": "bb"
}
] | 1,679,388,432
| 2,147,483,647
|
Python 3
|
OK
|
TESTS
| 64
| 46
| 0
|
fn, ln = input().split()
login = fn[0]
for p in range(1, len(fn)):
if fn[p] < ln[0]:
login += fn[p]
else:
break
login += ln[0]
print(login)
|
Title: Generate Login
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The preferred way to generate user login in Polygon is to concatenate a prefix of the user's first name and a prefix of their last name, in that order. Each prefix must be non-empty, and any of the prefixes can be the full name. Typically there are multiple possible logins for each person.
You are given the first and the last name of a user. Return the alphabetically earliest login they can get (regardless of other potential Polygon users).
As a reminder, a prefix of a string *s* is its substring which occurs at the beginning of *s*: "a", "ab", "abc" etc. are prefixes of string "{abcdef}" but "b" and 'bc" are not. A string *a* is alphabetically earlier than a string *b*, if *a* is a prefix of *b*, or *a* and *b* coincide up to some position, and then *a* has a letter that is alphabetically earlier than the corresponding letter in *b*: "a" and "ab" are alphabetically earlier than "ac" but "b" and "ba" are alphabetically later than "ac".
Input Specification:
The input consists of a single line containing two space-separated strings: the first and the last names. Each character of each string is a lowercase English letter. The length of each string is between 1 and 10, inclusive.
Output Specification:
Output a single string — alphabetically earliest possible login formed from these names. The output should be given in lowercase as well.
Demo Input:
['harry potter\n', 'tom riddle\n']
Demo Output:
['hap\n', 'tomr\n']
Note:
none
|
```python
fn, ln = input().split()
login = fn[0]
for p in range(1, len(fn)):
if fn[p] < ln[0]:
login += fn[p]
else:
break
login += ln[0]
print(login)
```
| 3
|
|
270
|
A
|
Fancy Fence
|
PROGRAMMING
| 1,100
|
[
"geometry",
"implementation",
"math"
] | null | null |
Emuskald needs a fence around his farm, but he is too lazy to build it himself. So he purchased a fence-building robot.
He wants the fence to be a regular polygon. The robot builds the fence along a single path, but it can only make fence corners at a single angle *a*.
Will the robot be able to build the fence Emuskald wants? In other words, is there a regular polygon which angles are equal to *a*?
|
The first line of input contains an integer *t* (0<=<<=*t*<=<<=180) — the number of tests. Each of the following *t* lines contains a single integer *a* (0<=<<=*a*<=<<=180) — the angle the robot can make corners at measured in degrees.
|
For each test, output on a single line "YES" (without quotes), if the robot can build a fence Emuskald wants, and "NO" (without quotes), if it is impossible.
|
[
"3\n30\n60\n90\n"
] |
[
"NO\nYES\nYES\n"
] |
In the first test case, it is impossible to build the fence, since there is no regular polygon with angle <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/df5f4b07dd5316fde165b43657b2696e2919e791.png" style="max-width: 100.0%;max-height: 100.0%;"/>.
In the second test case, the fence is a regular triangle, and in the last test case — a square.
| 500
|
[
{
"input": "3\n30\n60\n90",
"output": "NO\nYES\nYES"
},
{
"input": "6\n1\n2\n3\n170\n179\n25",
"output": "NO\nNO\nNO\nYES\nYES\nNO"
}
] | 1,688,663,377
| 2,147,483,647
|
Python 3
|
WRONG_ANSWER
|
TESTS
| 2
| 92
| 0
|
n=int(input())
a=str()
for i in range(1,n+1):
x=(int(input()))
if x*3<180:
a=a+"NO"+" "
else:
a=a+"YES"+" "
#a=a.split()
a=a.replace(" ","\n")
print(a)
|
Title: Fancy Fence
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Emuskald needs a fence around his farm, but he is too lazy to build it himself. So he purchased a fence-building robot.
He wants the fence to be a regular polygon. The robot builds the fence along a single path, but it can only make fence corners at a single angle *a*.
Will the robot be able to build the fence Emuskald wants? In other words, is there a regular polygon which angles are equal to *a*?
Input Specification:
The first line of input contains an integer *t* (0<=<<=*t*<=<<=180) — the number of tests. Each of the following *t* lines contains a single integer *a* (0<=<<=*a*<=<<=180) — the angle the robot can make corners at measured in degrees.
Output Specification:
For each test, output on a single line "YES" (without quotes), if the robot can build a fence Emuskald wants, and "NO" (without quotes), if it is impossible.
Demo Input:
['3\n30\n60\n90\n']
Demo Output:
['NO\nYES\nYES\n']
Note:
In the first test case, it is impossible to build the fence, since there is no regular polygon with angle <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/df5f4b07dd5316fde165b43657b2696e2919e791.png" style="max-width: 100.0%;max-height: 100.0%;"/>.
In the second test case, the fence is a regular triangle, and in the last test case — a square.
|
```python
n=int(input())
a=str()
for i in range(1,n+1):
x=(int(input()))
if x*3<180:
a=a+"NO"+" "
else:
a=a+"YES"+" "
#a=a.split()
a=a.replace(" ","\n")
print(a)
```
| 0
|
|
984
|
A
|
Game
|
PROGRAMMING
| 800
|
[
"sortings"
] | null | null |
Two players play a game.
Initially there are $n$ integers $a_1, a_2, \ldots, a_n$ written on the board. Each turn a player selects one number and erases it from the board. This continues until there is only one number left on the board, i. e. $n - 1$ turns are made. The first player makes the first move, then players alternate turns.
The first player wants to minimize the last number that would be left on the board, while the second player wants to maximize it.
You want to know what number will be left on the board after $n - 1$ turns if both players make optimal moves.
|
The first line contains one integer $n$ ($1 \le n \le 1000$) — the number of numbers on the board.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 10^6$).
|
Print one number that will be left on the board.
|
[
"3\n2 1 3\n",
"3\n2 2 2\n"
] |
[
"2",
"2"
] |
In the first sample, the first player erases $3$ and the second erases $1$. $2$ is left on the board.
In the second sample, $2$ is left on the board regardless of the actions of the players.
| 500
|
[
{
"input": "3\n2 1 3",
"output": "2"
},
{
"input": "3\n2 2 2",
"output": "2"
},
{
"input": "9\n44 53 51 80 5 27 74 79 94",
"output": "53"
},
{
"input": "10\n38 82 23 37 96 4 81 60 67 86",
"output": "60"
},
{
"input": "10\n58 26 77 15 53 81 68 48 22 65",
"output": "53"
},
{
"input": "1\n124",
"output": "124"
},
{
"input": "2\n2 1",
"output": "1"
},
{
"input": "3\n1 1 1000",
"output": "1"
},
{
"input": "2\n322 322",
"output": "322"
},
{
"input": "3\n9 92 12",
"output": "12"
},
{
"input": "3\n1 2 2",
"output": "2"
}
] | 1,693,209,225
| 2,147,483,647
|
PyPy 3
|
OK
|
TESTS
| 35
| 93
| 102,400
|
n = int(input())
nums = list(map(int, input().split()))
#nums = sorted(nums)
while len(nums) != 1:
nums = sorted(nums)[::-1]
nums.remove(nums[0])
#print(nums)
if (len(nums) == 1):
break
nums = sorted(nums)
nums.remove(nums[0])
#print(nums)
print(*nums)
|
Title: Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Two players play a game.
Initially there are $n$ integers $a_1, a_2, \ldots, a_n$ written on the board. Each turn a player selects one number and erases it from the board. This continues until there is only one number left on the board, i. e. $n - 1$ turns are made. The first player makes the first move, then players alternate turns.
The first player wants to minimize the last number that would be left on the board, while the second player wants to maximize it.
You want to know what number will be left on the board after $n - 1$ turns if both players make optimal moves.
Input Specification:
The first line contains one integer $n$ ($1 \le n \le 1000$) — the number of numbers on the board.
The second line contains $n$ integers $a_1, a_2, \ldots, a_n$ ($1 \le a_i \le 10^6$).
Output Specification:
Print one number that will be left on the board.
Demo Input:
['3\n2 1 3\n', '3\n2 2 2\n']
Demo Output:
['2', '2']
Note:
In the first sample, the first player erases $3$ and the second erases $1$. $2$ is left on the board.
In the second sample, $2$ is left on the board regardless of the actions of the players.
|
```python
n = int(input())
nums = list(map(int, input().split()))
#nums = sorted(nums)
while len(nums) != 1:
nums = sorted(nums)[::-1]
nums.remove(nums[0])
#print(nums)
if (len(nums) == 1):
break
nums = sorted(nums)
nums.remove(nums[0])
#print(nums)
print(*nums)
```
| 3
|
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