AdapterOcean/python3-standardized_cluster_23_std

message stringlengths 2 44.5k	message_type stringclasses 2 values	message_id int64 0 1	conversation_id int64 276 109k	cluster float64 23 23	__index_level_0__ int64 552 217k
Provide tags and a correct Python 3 solution for this coding contest problem. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}.	instruction	0	276	23	552
Tags: binary search, combinatorics, two pointers Correct Solution: ``` from sys import * from math import * n,k=map(int,stdin.readline().split()) a=list(map(int,stdin.readline().split())) ans=0 for i in range(n-2): x=a[i]+k l=i+2 h=n-1 j=0 f=0 while l<=h: m=(l+h)//2 if a[m]>x: h=m-1 elif a[m]<=x: j=m l=m+1 f=1 if f==1: y=j-i-2 ans+=(y+1)*(y+2)//2 print(ans) ```	output	1	276	23	553
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` # n=int(input()) # n,k=map(int,input().split()) '''l=0 r=10*13 while l+1<r: mid=(l+r)//2 val=(max(0,b_bmid-b)rb+max(0,b_smid-s)rs+max(0,b_cmid-b)rc) if val>money: r=mid if val<=money: l=mid''' # arr=list(map(int,input().split())) # n=int(input()) # n,k=map(int,input().split()) # arr=list(map(int,input().split())) n,d=map(int,input().split()) arr=list(map(int,input().split())) i=0 ans=0 for j in range(n): while j-i>=3 and arr[j]-arr[i]>d: i+=1 if arr[j]-arr[i]<=d: ans+=(j-i)(j-i-1)//2 print(ans) ```	instruction	0	279	23	558
Yes	output	1	279	23	559
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` import bisect n,d = [int(x) for x in input().split()] a = [int(x) for x in input().split()] ans =0 for i in range(0,n): x = bisect.bisect_right(a,a[i]+d) ans+=(x-i-1)*(x-i-2)//2 print(ans) ```	instruction	0	280	23	560
Yes	output	1	280	23	561
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` from bisect import bisect_left def sol(a,n,d): ans = 0 for i in range(n-2): x = a[i]+d pos = bisect_left(a,x) if pos < n and a[pos] == x: pos+=1 x = pos - (i+2) ans+=((x*(x+1))//2) return ans n,d = map(int,input().split()) a = [int(i) for i in input().split()] print(sol(a,n,d)) ```	instruction	0	281	23	562
Yes	output	1	281	23	563
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` n, d = list(map(int, input().split())) x = list(map(int, input().split())) i = 0 j = i + 2 count = 0 in_betn = 1 while(j-i-1 >= 1 and j<n): # print(x[j] - x[i]) while(j<n and x[j] - x[i] <= d): count += (in_betn * (in_betn+1) / 2) j += 1 in_betn += 1 # print("here") in_betn -= 1 i += 1 print(int(count)) ```	instruction	0	282	23	564
No	output	1	282	23	565
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` n, d = map(int, input().split()) x = list(map(int, input().split())) k = 0 j = 1 for i in range(n): p = 0 while (j < n and x[j] - x[i] <= d): k += (max(0, (j - i - 1))) j += 1 p += 1 if (p == 0): k += (max(0, j - i - 2)) print(k) ```	instruction	0	283	23	566
No	output	1	283	23	567
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` def cnk(n): return 0 if 3 > n else n * (n - 1) * (n - 2) // 6 n, d = input().split() n, d = int(n), float(d) dots = list(map(int, input().split())) l, r, res = 0, 0, 0 while l < n: while r < n and dots[r] - dots[l] <= d: r += 1 res += cnk(r - l) if r == n: break while l < r and dots[r] - dots[l] > d: l += 1 print(res) ```	instruction	0	284	23	568
No	output	1	284	23	569
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` def busquedaBinaria(arr,n,item): aux2=0 i=0 k=item while(i!=len(arr)): val = arr[i] + k #print(val) encontrado = False primero = 0 ultimo = len(arr) - 1 #print("entro en while1") while primero <= ultimo: #print("entro en while2") puntoMedio = (primero + ultimo) // 2 if arr[puntoMedio] == val: #print("lo encontro") encontrado = True break else: if item < arr[puntoMedio]: ultimo = puntoMedio - 1 else: primero = puntoMedio + 1 if (encontrado==True and (i+2)!=(k)): encontrado=False posicion =abs(puntoMedio - i - 1) #print(puntoMedio) #print(posicion) aux2 += posicion*(posicion + 1) // 2 #print(aux2) #print("") i += 1 k = item elif((encontrado== False) and (i+2)!=(k)): k-=1 else: k=item i+=1 return aux2 arr=[] n,k = list(map(int,input().strip().split())) arr = list(map(int,input().strip().split())) print(busquedaBinaria(arr,n,k)) ```	instruction	0	285	23	570
No	output	1	285	23	571
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Alexandra has a paper strip with n numbers on it. Let's call them ai from left to right. Now Alexandra wants to split it into some pieces (possibly 1). For each piece of strip, it must satisfy: * Each piece should contain at least l numbers. * The difference between the maximal and the minimal number on the piece should be at most s. Please help Alexandra to find the minimal number of pieces meeting the condition above. Input The first line contains three space-separated integers n, s, l (1 ≤ n ≤ 105, 0 ≤ s ≤ 109, 1 ≤ l ≤ 105). The second line contains n integers ai separated by spaces ( - 109 ≤ ai ≤ 109). Output Output the minimal number of strip pieces. If there are no ways to split the strip, output -1. Examples Input 7 2 2 1 3 1 2 4 1 2 Output 3 Input 7 2 2 1 100 1 100 1 100 1 Output -1 Note For the first sample, we can split the strip into 3 pieces: [1, 3, 1], [2, 4], [1, 2]. For the second sample, we can't let 1 and 100 be on the same piece, so no solution exists. Submitted Solution: ``` n, s, l = map(int, input().split(' ')) L = list(map(int, input().split(' '))) ans = 1 i = l maxi = max(L[:l]) mini = min(L[:l]) left = 0 right = i if maxi - mini > s : ans = -1 else : while i < n: new = L[i] i+= 1 right += 1 maxi = max(maxi, new) mini = min(mini, new) if maxi - mini > s : if left+l > i : ans = -1 break ans += 1 new_left = i maxi = new mini = new while new_left != left+l : new_left -= 1 pmaxi = maxi pmini = mini maxi = max(L[new_left], maxi) mini = min(L[new_left], mini) if maxi - mini > s : new_left += 1 maxi = pmaxi mini = pmini left = new_left break left = new_left print(ans) ```	instruction	0	378	23	756
No	output	1	378	23	757
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Alexandra has a paper strip with n numbers on it. Let's call them ai from left to right. Now Alexandra wants to split it into some pieces (possibly 1). For each piece of strip, it must satisfy: * Each piece should contain at least l numbers. * The difference between the maximal and the minimal number on the piece should be at most s. Please help Alexandra to find the minimal number of pieces meeting the condition above. Input The first line contains three space-separated integers n, s, l (1 ≤ n ≤ 105, 0 ≤ s ≤ 109, 1 ≤ l ≤ 105). The second line contains n integers ai separated by spaces ( - 109 ≤ ai ≤ 109). Output Output the minimal number of strip pieces. If there are no ways to split the strip, output -1. Examples Input 7 2 2 1 3 1 2 4 1 2 Output 3 Input 7 2 2 1 100 1 100 1 100 1 Output -1 Note For the first sample, we can split the strip into 3 pieces: [1, 3, 1], [2, 4], [1, 2]. For the second sample, we can't let 1 and 100 be on the same piece, so no solution exists. Submitted Solution: ``` n, s, l = map(int, input().split(' ')) L = list(map(int, input().split(' '))) ans = 1 i = l maxi = max(L[:l]) mini = min(L[:l]) left = 0 right = i if maxi - mini > s : ans = -1 else : while i < n: new = L[i] i+= 1 right += 1 maxi = max(maxi, new) mini = min(mini, new) if maxi - mini > s : if left+l > i-1: ans = -1 break ans += 1 new_left = i-1 maxi = new mini = new while new_left != left+l : new_left -= 1 pmaxi = maxi pmini = mini maxi = max(L[new_left], maxi) mini = min(L[new_left], mini) if maxi - mini > s : new_left += 1 maxi = pmaxi mini = pmini left = new_left break left = new_left print(ans) ```	instruction	0	379	23	758
No	output	1	379	23	759
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` x1, y1 = map(int, input().split()) x2, y2 = map(int, input().split()) x3, y3 = map(int, input().split()) j, k = x2-x1, y2-y1 l, m = x3-x1, y3-y1 a = ( j2 + k2 )0.5 b = ( l2 + m2 )0.5 c = ( (j-l)2 + (k-m)2 )*0.5 S = abs(jm-kl)/2 T = (a+b+c)/2 M = max(a, b, c) r = S / (2S/M + T) print(r) ```	instruction	0	663	23	1,326
Yes	output	1	663	23	1,327
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` a=[list(map(int,input().split()))for i in range(3)] s,t,u=((a[0][0]-a[1][0])2+(a[0][1]-a[1][1])2)0.5,((a[2][0]-a[1][0])2+(a[2][1]-a[1][1])2)0.5,((a[0][0]-a[2][0])2+(a[0][1]-a[2][1])2)*0.5 p=(s+t+u)/2 q=(p(p-s)(p-t)(p-u))*0.5 r=2q/(s+t+u) g=max(s,t,u) print(g/(2+g/r)) ```	instruction	0	664	23	1,328
Yes	output	1	664	23	1,329
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` p = [[int(i) for i in input().split()] for i in range(3)] a = [] for i in range(3): a.append((p[i][0]-p[(i+1)%3][0])2+(p[i][1]-p[(i+1)%3][1])2) a.sort() print(a[2]*0.5/ (((2(a[0]a[2])0.5+a[0]+a[2]-a[1])/(2(a[0]a[2])0.5-a[0]-a[2]+a[1]))0.5+ ((2(a[1]a[2])0.5+a[1]+a[2]-a[0])/(2(a[1]a[2])0.5-a[1]-a[2]+a[0]))*0.5+2)) ```	instruction	0	666	23	1,332
Yes	output	1	666	23	1,333
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` def euclid(a,b,c,d): return ( (a-c)2 + (b-d)2 )*0.5 def triangle_area(p1,p2,p3): dx1, dx2 = p3[0] - p1[0], p2[0] - p1[0] dy1, dy2 = p3[1] - p1[1], p2[1] - p1[1] return dy2dx1 - dy1dx2 x1, y1 = [ int(v) for v in input().split() ] x2, y2 = [ int(v) for v in input().split() ] x3, y3 = [ int(v) for v in input().split() ] a = euclid(x1, y1, x2, y2) b = euclid(x2, y2, x3, y3) c = euclid(x3, y3, x1, y1) l = a + b + c s = triangle_area((x1,y1),(x2,y2),(x3,y3)) ar = s / ( l + (2s / a) ) br = s / ( l + (2s / b) ) cr = s / ( l + (2s / c) ) print(max(ar,br,cr)) ```	instruction	0	667	23	1,334
No	output	1	667	23	1,335
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` def norm(x1, y1, x2, y2): return ((x1-x2)2 + (y1-y2)2)*0.5 def d(a, b, c, x, y): return abs(ax + by + c) / (a2 + b2)0.5 def points2line(x1, y1, x2, y2): la = y1 - y2 lb = x2 - x1 lc = x1 (y2 - y1) + y1 * (x1 - x2) return la, lb, lc #from numpy import argmax def argmax(L): return max(enumerate(L), key=lambda x: x[1])[0] x1, y1 = map(int, input().split()) x2, y2 = map(int, input().split()) x3, y3 = map(int, input().split()) a = norm(x3, y3, x2, y2) b = norm(x1, y1, x3, y3) c = norm(x1, y1, x2, y2) xc = (ax1 + bx2 + cx3)/(a+b+c) yc = (ay1 + by2 + cy3)/(a+b+c) iw = argmax([a, b, c]) w = [a, b, c][int(iw)] L = [[x1, y1], [x2, y2], [x3, y3]] del L[int(iw)] h = d(points2line(L[0], L[1]), xc, yc) print(wh/(2*h + w)) ```	instruction	0	668	23	1,336
No	output	1	668	23	1,337
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` ai = lambda: list(map(int, input().split())) import numpy as np import math def calc(A,B,C): a = np.linalg.norm(B - C) b = np.linalg.norm(C - A) c = np.linalg.norm(A - B) cosC = np.inner(A-C, B-C)/(ba) if cosC <= 0: return 0 tanC = math.sqrt(1/(cosC2)-1) return (1 - 1/cosC + tanC) (a+b-c)/4 a = np.array(ai()) b = np.array(ai()) c = np.array(ai()) print(max(calc(a,b,c),calc(b,c,a),calc(c,a,b))) ```	instruction	0	669	23	1,338
No	output	1	669	23	1,339
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` import numpy as np import math def calc(A,B,C): a = np.linalg.norm(B - C) b = np.linalg.norm(C - A) c = np.linalg.norm(A - B) cosC = np.inner(A-C, B-C)/(ba) if cosC <= 0: return 0 tanC = math.sqrt(1/(cosC2)-1) return (1 - 1/cosC + tanC) (a+b-c)/4 a = np.array(ai()) b = np.array(ai()) c = np.array(ai()) print(max(calc(a,b,c),calc(b,c,a),calc(c,a,b))) ```	instruction	0	670	23	1,340
No	output	1	670	23	1,341
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	885	23	1,770
Tags: dp, math Correct Solution: ``` n = int(input()) if n%2==0: if n%4==0: print(4(n//4)) else: print((4(n//4))*2) else: print(0) ```	output	1	885	23	1,771
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	886	23	1,772
Tags: dp, math Correct Solution: ``` n = eval(input()) if n % 2 != 0: print(0) else: print(int(2**(n/2))) ```	output	1	886	23	1,773
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	887	23	1,774
Tags: dp, math Correct Solution: ``` n = int(input()) print( ( 1 << ( n // 2 ) if n & 1 == 0 else 0 )) ```	output	1	887	23	1,775
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	888	23	1,776
Tags: dp, math Correct Solution: ``` n = int(input()) if n % 2 == 1: print(0) else: print((int(2 ** (n/2)))) ```	output	1	888	23	1,777
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	889	23	1,778
Tags: dp, math Correct Solution: ``` t = int(input()) if t%2==0: print(2**(t//2)) else: print(0) ```	output	1	889	23	1,779
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	890	23	1,780
Tags: dp, math Correct Solution: ``` n=int(input()) if n&1==1: print(0) else: print(int(pow(2,n/2))) ```	output	1	890	23	1,781
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	891	23	1,782
Tags: dp, math Correct Solution: ``` dim = int(input()) print(2 ** (dim // 2) if dim % 2 == 0 else 0) ```	output	1	891	23	1,783
Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.	instruction	0	892	23	1,784
Tags: dp, math Correct Solution: ``` n = int(input()) if n % 2 == 0: print(round(2**(n / 2))) else: print(0) ```	output	1	892	23	1,785
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` nn=int(input()) print(0) if nn%2!=0 else print(int(pow(2,nn/2))) ```	instruction	0	893	23	1,786
Yes	output	1	893	23	1,787
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` def scand(): return int(input()) def scana(): return [int(x) for x in input().split()] def solve(x): if x%2: return 0 return int(2**(x//2)) n=scand() print(solve(n)) ```	instruction	0	894	23	1,788
Yes	output	1	894	23	1,789
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) if n%2 == 0: print(2*(3n//6)) else: print(0) ```	instruction	0	895	23	1,790
Yes	output	1	895	23	1,791
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` # ///==========Libraries, Constants and Functions=============/// #mkraghav import sys inf = float("inf") mod = 1000000007 def get_array(): return list(map(int, sys.stdin.readline().split())) def get_ints(): return map(int, sys.stdin.readline().split()) def input(): return sys.stdin.readline() def int1():return int(input()) import string import math from itertools import combinations # ///==========MAIN=============/// def main(): n=int1() if n==1: print(0) else: if n%2==0: print(pow(2,n//2)) else: print(0) if __name__ == "__main__": main() ```	instruction	0	896	23	1,792
Yes	output	1	896	23	1,793
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n=int(input()) print(n*int(n%2==0)) ```	instruction	0	897	23	1,794
No	output	1	897	23	1,795
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` # code by RAJ BHAVSAR n = int(input()) if(n == 1): print(0) else: print(n) ```	instruction	0	898	23	1,796
No	output	1	898	23	1,797
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) print(2**(n//2)) ```	instruction	0	899	23	1,798
No	output	1	899	23	1,799
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) print(n//4) ```	instruction	0	900	23	1,800
No	output	1	900	23	1,801
Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4	instruction	0	1,157	23	2,314
Tags: dfs and similar, implementation Correct Solution: ``` w,h,n=list(map(int,input().split())) a=[[0 for i in range(2w-1)] for j in range(2h-1)] for i in range(1,2h-1,2): for j in range(1,2w-1,2): a[i][j]=' ' for i in range(n): x1,y1,x2,y2=list(map(int,input().split())) if x1==x2: if x1!=0 and x1!=w: for j in range(min(y1,y2),max(y1,y2)): a[2h-2-2(j)][2x1-1]=' ' else: if y1!=0 and y1!=h: for j in range(min(x1,x2),max(x1,x2)): a[2h-1-2y1][2j]=' ' b=[] c=1 for i in range(0,2h-1,2): for j in range(0,2w-1,2): if a[i][j]==0: d=i e=j while d<2h-1 and a[d][e]==0 and a[d-1][e]!=' ' or d==i: d+=2 d-=2 while e<2w-1 and a[d][e]==0 and a[d][e-1]!=' ' or e==j: e+=2 e-=2 b.append(((e-j)//2+1)((d-i)//2+1)) for k in range(i,d+1,2): for l in range(j,e+1,2): a[k][l]=c c+=1 b+=[0](n+1-len(b)) print(*sorted(b)) ```	output	1	1,157	23	2,315
Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4	instruction	0	1,158	23	2,316
Tags: dfs and similar, implementation Correct Solution: ``` w, h, n = map(int, input().split(' ')) hblock = [[False for i in range(w)] for i in range(h)] vblock = [[False for i in range(w)] for i in range(h)] for i in range(n): x1, y1, x2, y2 = map(int, input().split(' ')) if x1 == x2: for j in range(y1, y2): hblock[j][x1-1] = True else: for j in range(x1, x2): vblock[y1-1][j] = True areas = [] vis = [[False for i in range(w)] for i in range(h)] for i in range(h): for j in range(w): if vis[i][j]: continue width = j while width < w and not hblock[i][width]: width += 1 height = i while height < h and not vblock[height][j]: height += 1 width = min(w - 1, width) - j + 1 height = min(h - 1, height) - i + 1 areas.append(width * height) for p in range(height): for q in range(width): vis[i + p][j + q] = True areas.sort() print(' '.join(map(str, areas))) ```	output	1	1,158	23	2,317
Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4	instruction	0	1,159	23	2,318
Tags: dfs and similar, implementation Correct Solution: ``` import sys from array import array # noqa: F401 def input(): return sys.stdin.buffer.readline().decode('utf-8') w, h, n = map(int, input().split()) mat = [[0] * (2 * w) for _ in range(2 * h)] for x1, y1, x2, y2 in (map(int, input().split()) for _ in range(n)): if x1 == x2: for y in range(2 * y1, 2 * y2): mat[y][2 * x1 - 1] = 1 else: for x in range(2 * x1, 2 * x2): mat[2 * y1 - 1][x] = 1 ans = [] for i in range(0, 2 * h, 2): for j in range(0, 2 * w, 2): if mat[i][j]: continue mat[i][j] = 1 size = 1 stack = [(i, j)] while stack: y, x = stack.pop() for dy, dx in ((1, 0), (-1, 0), (0, 1), (0, -1)): if 0 <= y + dy * 2 < 2 * h and 0 <= x + dx * 2 < 2 * w and mat[y + dy][x + dx] == 0 and mat[y + dy * 2][x + dx * 2] == 0: mat[y + dy * 2][x + dx * 2] = 1 size += 1 stack.append((y + dy * 2, x + dx * 2)) ans.append(size) print(*sorted(ans)) ```	output	1	1,159	23	2,319
Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4	instruction	0	1,160	23	2,320
Tags: dfs and similar, implementation Correct Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = range(WHn[0][-1]) lines = [] lines_aux = [] for i in n: lines.append( [int(x) for x in input().split(' ')] ) lines_aux.append(True) while any(lines_aux): for i in n: if lines_aux[i]: for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[i][0] in rangex) and (lines[i][3] in rangey) and (lines[i][2] in rangex) and (lines[i][1] in rangey) and\ ( (lines[i][0:3:2] == unidad[0:3:2]) or (lines[i][1:4:2] == unidad[1:4:2]) ): WHn.append([unidad[0],unidad[1],lines[i][2],lines[i][3]]) WHn.append([lines[i][0],lines[i][1],unidad[2],unidad[3]]) WHn.remove(unidad) lines_aux[i] = False break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])(unidad[3] - unidad[1]) WHn.sort() result = '' for i in WHn: result += '{} ' print(result[:-1].format(WHn)) ```	output	1	1,160	23	2,321
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = WHn[0][-1] for i in range(n): # lines = list(map(int, input().split(' '))) lines = [int(x) for x in input().split(' ')] for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[0] in rangex) and (lines[3] in rangey) and\ (lines[2] in rangex) and (lines[1] in rangey): WHn.append([unidad[0],unidad[1],lines[2],lines[3]]) WHn.append([lines[0],lines[1],unidad[2],unidad[3]]) WHn.remove(unidad) break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])*(unidad[3] - unidad[1]) WHn.sort() print(WHn) ```	instruction	0	1,161	23	2,322
No	output	1	1,161	23	2,323
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` w,h,n=list(map(int,input().split())) a=[[0 for i in range(2w-1)] for j in range(2h-1)] for i in range(1,2h-1,2): for j in range(1,2w-1,2): a[i][j]=' ' for i in range(n): x1,y1,x2,y2=list(map(int,input().split())) if x1==x2: if x1!=0 and x1!=w: for j in range(max(1,min(y1,y2)),max(y1,y2)+1): a[2h-2-2(j-1)][2x1-1]=' ' else: if y1!=0 and y1!=h: for j in range(min(x1,x2),max(x1,x2)): a[2h-1-2y1][2j]=' ' b=[] c=1 for i in range(0,2h-1,2): for j in range(0,2w-1,2): if a[i][j]==0: d=i e=j while d<2h-1 and a[d][e]==0 and a[d-1][e]!=' ' or d==i: d+=2 d-=2 while e<2w-1 and a[d][e]==0 and a[d][e-1]!=' ' or e==j: e+=2 e-=2 b.append(((e-j)//2+1)((d-i)//2+1)) for k in range(i,d+1,2): for l in range(j,e+1,2): a[k][l]=c c+=1 b+=[0](n+1-len(b)) print(*sorted(b)) ```	instruction	0	1,162	23	2,324
No	output	1	1,162	23	2,325
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = WHn[0][-1] for i in range(n): # lines = list(map(int, input().split(' '))) lines = [int(x) for x in input().split(' ')] for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[0] in rangex) and (lines[3] in rangey) and\ (lines[2] in rangex) and (lines[1] in rangey): WHn.append([unidad[0],unidad[1],lines[2],lines[3]]) WHn.append([lines[0],lines[1],unidad[2],unidad[3]]) WHn.remove(unidad) break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])(unidad[3] - unidad[1]) WHn.sort() result = "" for i in WHn: result+="{} " print(result[:-1].format(WHn)) ```	instruction	0	1,163	23	2,326
No	output	1	1,163	23	2,327
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) 2 + (y2 - y1) 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True cs = [] step = 2 * pi / n for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [-1, 0, 1]: for dy in [-1, 0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx #brute(level + 1) #cs[level][0] += 1 #brute(level + 1) #cs[level][1] += 1 #brute(level + 1) #cs[level][0] -= 1 #brute(level + 1) #cs[level][1] -= 1 brute(0) print(res) for pair in resV: print(*pair) ```	instruction	0	1,244	23	2,488
No	output	1	1,244	23	2,489
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) 2 + (y2 - y1) 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [0, 1]: for dy in [0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx cs = [] stepBase = 2 * pi / n for baseCount in range(n // 2): step = stepBase * (baseCount + 1) for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] brute(0) print(res) for pair in resV: print(*pair) ```	instruction	0	1,245	23	2,490
No	output	1	1,245	23	2,491
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) 2 + (y2 - y1) 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [0, 1]: for dy in [0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx cs = [] stepBase = 2 * pi / n for baseCount in range(n // 2): step = stepBase * (baseCount + 1) cs = [] for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] brute(0) print(res) for pair in resV: print(*pair) ```	instruction	0	1,246	23	2,492
No	output	1	1,246	23	2,493
Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) 2 + (y2 - y1) 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True cs = [] step = 2 * pi / n for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return brute(level + 1) cs[level][0] += 1 brute(level + 1) cs[level][1] += 1 brute(level + 1) cs[level][0] -= 1 brute(level + 1) cs[level][1] -= 1 brute(0) print(res) for pair in cs: print(*pair) ```	instruction	0	1,247	23	2,494
No	output	1	1,247	23	2,495
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,656	23	3,312
Tags: fft, geometry, number theory Correct Solution: ``` """ 1036E : Covered Points Borrows primarily from : https://stackoverflow.com/questions/563198/how-do-you-detect-where-two-line-segments-intersect """ def gcd(a, b): return a if b == 0 else gcd(b, a % b) def cross(x1, y1, x2, y2): return x1 * y2 - x2 * y1 def online(line, x, y): """ If the x and y are within the range of min and max of x and y's respectively then the points MAY lie on the line """ a, b, c, d = line if min(a, c) <= x <= max(a, c) and min(b, d) <= y <= max(b, d): return True return False def CF1036E(): N = int(input()) lines = [] count = 0 # Read input line segment and find the lines covered by each line segment for _ in range(N): x1, y1, x2, y2 = map(int, input().split()) count += gcd(abs(x1 - x2), abs(y1 - y2)) + 1 lines.append((x1, y1, x2, y2)) # Deal with the intersecting points for i in range(N): d = set() # Unique intersecting points for j in range(i+1, N): px, py, qx, qy = lines[i] rx, ry, sx, sy = lines[j] vecx = (px - qx, rx - sx) vecy = (py - qy, ry - sy) # Cross of two lines area = cross(vecx[0], vecx[1], vecy[0], vecy[1]) # Parallel line has no intersecting points if area == 0: continue # Computation of the exact point # This has been referenced from : https://stackoverflow.com/questions/563198/how-do-you-detect-where-two-line-segments-intersect lineA = cross(px, py, qx, qy) lineB = cross(rx, ry, sx, sy) x = cross(lineA, lineB, vecx[0], vecx[1]) / area y = cross(lineA, lineB, vecy[0], vecy[1]) / area # Verify the points are good. # If the points are integers and lie of the lines they are valid. if not (x % 1 == 0 and y % 1 == 0): continue if not (online(lines[i], x, y) and online(lines[j], x, y)): continue d.add((x, y)) count -= len(d) return count if __name__ == '__main__': res = CF1036E() print(res) ```	output	1	1,656	23	3,313
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,657	23	3,314
Tags: fft, geometry, number theory Correct Solution: ``` import sys from array import array # noqa: F401 def input(): return sys.stdin.buffer.readline().decode('utf-8') class Point(object): COUNTER_CLOCKWISE = 1 CLOCKWISE = -1 ONLINE_BACK = 2 ONLINE_FRONT = -2 ON_SEGMENT = 0 def __init__(self, x: int, y: int): self.x = x self.y = y def __add__(self, other: 'Point'): return Point(self.x + other.x, self.y + other.y) def __sub__(self, other: 'Point'): return Point(self.x - other.x, self.y - other.y) def __mul__(self, k): return Point(self.x * k, self.y * k) def __repr__(self): return f'x = {self.x}, y = {self.y}' def norm(self): return self.x2 + self.y2 def dot(self, other: 'Point'): return self.x * other.x + self.y * other.y def cross(self, other: 'Point'): return self.x * other.y - self.y * other.x def ccw(self, p1: 'Point', p2: 'Point'): vector_a = p1 - self vector_b = p2 - self prod = vector_a.cross(vector_b) if prod > 0: return self.COUNTER_CLOCKWISE elif prod < 0: return self.CLOCKWISE elif vector_a.dot(vector_b) < 0: return self.ONLINE_BACK elif vector_a.norm() < vector_b.norm(): return self.ONLINE_FRONT else: return self.ON_SEGMENT class Segment(object): def __init__(self, p1: Point, p2: Point): self.p1 = p1 self.p2 = p2 def is_intersected(self, other: 'Segment'): return ( self.p1.ccw(self.p2, other.p1) * self.p1.ccw(self.p2, other.p2) <= 0 and other.p1.ccw(other.p2, self.p1) * other.p1.ccw(other.p2, self.p2) <= 0 ) if __name__ == '__main__': from math import gcd from collections import Counter n = int(input()) ans = 0 segments = [] for _ in range(n): ax, ay, bx, by = map(int, input().split()) segments.append(Segment(Point(ax, ay), Point(bx, by))) g = gcd(abs(ax - bx), abs(ay - by)) ans += g + 1 triangle = {(i * (i + 1)) >> 1: i for i in range(n + 1)} intersection = Counter() for i in range(n): for j in range(i + 1, n): if segments[i].is_intersected(segments[j]): base = segments[j].p2 - segments[j].p1 d1 = abs(base.cross(segments[i].p1 - segments[j].p1)) d2 = abs(base.cross(segments[i].p2 - segments[j].p1)) p2 = segments[i].p2 - segments[i].p1 if (p2.x * d1) % (d1 + d2) == 0 and (p2.y * d1) % (d1 + d2) == 0: x = segments[i].p1.x + (p2.x * d1) // (d1 + d2) y = segments[i].p1.y + (p2.y * d1) // (d1 + d2) intersection[x, y] += 1 ans -= sum(triangle[v] for v in intersection.values()) print(ans) ```	output	1	1,657	23	3,315
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,658	23	3,316
Tags: fft, geometry, number theory Correct Solution: ``` import math def intersectSeg( pt1, pt2, ptA, ptB, interge=False): """ this returns the intersection of two segment (pt1,pt2) and (ptA,ptB) returns a tuple: (xi, yi, valid, r, s), where (xi, yi) is the intersection r is the scalar multiple such that (xi,yi) = pt1 + r(pt2-pt1) s is the scalar multiple such that (xi,yi) = pt1 + s(ptB-ptA) valid == 0 if there are 0 or inf. intersections (invalid) valid == 1 if it has a unique intersection ON the segment """ def is_interge(x): if abs(round(x) - x) < 0.0000001: return True return False DET_TOLERANCE = 0.00000001 # the first line is pt1 + r(pt2-pt1) # in component form: x1, y1 = pt1; x2, y2 = pt2 dx1 = x2 - x1; dy1 = y2 - y1 # the second line is ptA + s(ptB-ptA) x, y = ptA; xB, yB = ptB; dx = xB - x; dy = yB - y; # we need to find the (typically unique) values of r and s # that will satisfy # # (x1, y1) + r(dx1, dy1) = (x, y) + s(dx, dy) # # which is the same as # # [ dx1 -dx ][ r ] = [ x-x1 ] # [ dy1 -dy ][ s ] = [ y-y1 ] # # whose solution is # # [ r ] = _1_ [ -dy dx ] [ x-x1 ] # [ s ] = DET [ -dy1 dx1 ] [ y-y1 ] # # where DET = (-dx1 * dy + dy1 * dx) # # if DET is too small, they're parallel # DET = (-dx1 * dy + dy1 * dx) if math.fabs(DET) < DET_TOLERANCE: return (0,0,0,0,0) # now, the determinant should be OK DETinv = 1.0/DET # find the scalar amount along the "self" segment r = DETinv * (-dy * (x-x1) + dx * (y-y1)) # find the scalar amount along the input line s = DETinv * (-dy1 * (x-x1) + dx1 * (y-y1)) # return the average of the two descriptions xi = (x1 + rdx1 + x + sdx)/2.0 yi = (y1 + rdy1 + y + sdy)/2.0 if interge == True and (is_interge(xi)==False or is_interge(yi)==False): return (0,0,0,0,0) xi, yi = round(xi), round(yi) valid = 1 if xi < max(min(x1,x2), min(x, xB)) or xi > min(max(x1,x2), max(x,xB)) or \ yi < max(min(y1,y2), min(y, yB)) or yi > min(max(y1,y2), max(y,yB)): return (0,0,0,0,0) return ( xi, yi, valid, r, s ) def gcd(a, b): if b == 0: return a return gcd(b, a%b) n = int(input()) seg = [list(map(int, input().split())) for _ in range(n)] cnt = 0 for x1, y1, x2, y2 in seg: cnt += gcd(abs(x1-x2), abs(y1-y2)) + 1 sub = 0 for i in range(n): d = set() for j in range(i+1): x, y, valid, _, _ = intersectSeg(seg[i][:2], seg[i][2:], seg[j][:2], seg[j][2:], interge=True) if valid == 0: continue if (x, y) not in d: d.add((x, y)) sub += len(d) print(cnt-sub) ```	output	1	1,658	23	3,317
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,659	23	3,318
Tags: fft, geometry, number theory Correct Solution: ``` ''' Welcome to GDB Online. GDB online is an online compiler and debugger tool for C, C++, Python, Java, PHP, Ruby, Perl, C#, VB, Swift, Pascal, Fortran, Haskell, Objective-C, Assembly, HTML, CSS, JS, SQLite, Prolog. Code, Compile, Run and Debug online from anywhere in world. ''' def gcd(a, b): return a if b == 0 else gcd(b, a % b) def cross(x1, y1, x2, y2): return x1 * y2 - x2 * y1 def online(line, x, y): a, b, c, d = line if min(a, c) <= x <= max(a, c) and min(b, d) <= y <= max(b, d): return True else: return False def CF1036E(): N = int(input()) lines = [] count = 0 # Find the lines covered by each line segment for _ in range(N): x1, y1, x2, y2 = map(int, input().split()) count += gcd(abs(x1 - x2), abs(y1 - y2)) + 1 lines.append((x1, y1, x2, y2)) # Deal with the intersecting points for i in range(N): d = set() for j in range(i+1, N): px, py, qx, qy = lines[i] rx, ry, sx, sy = lines[j] line1p = (px - qx, rx - sx) line2p = (py - qy, ry - sy) # Cross of two lines area = cross(line1p[0], line1p[1], line2p[0], line2p[1]) # Parallel line has no intersection if area == 0: continue lineA = cross(px, py, qx, qy) lineB = cross(rx, ry, sx, sy) x = cross(lineA, lineB, line1p[0], line1p[1]) / area y = cross(lineA, lineB, line2p[0], line2p[1]) / area # Verify the points are good if not (x % 1 == 0 and y % 1 == 0): continue if not (online(lines[i], x, y) and online(lines[j], x, y)): continue d.add((x, y)) count -= len(d) return count if __name__ == '__main__': res = CF1036E() print(res) ```	output	1	1,659	23	3,319
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,660	23	3,320
Tags: fft, geometry, number theory Correct Solution: ``` # import sys def getIntList(): return list(map(int, input().split())) N, = getIntList() zp = [] for i in range(N): ax, ay, bx, by = getIntList() if ax>bx: ax,bx = bx,ax ay,by = by, ay zp.append( (ax,ay, bx,by)) res = 0 def gcd(a,b): if b==0:return a return gcd(b, a%b) zgcd = [] for i in range(N): ax, ay, bx, by = zp[i] tx = abs(bx-ax) ty = abs(by - ay) g = gcd(tx, ty) res += g+1 zgcd .append(g) """ ax + k1 dax = bx + k2 dbx ay + k1 day = by + k2 dby """ for i in range(N): ax = zp[i][0] dax = (zp[i][2] - ax) // zgcd[i] ay = zp[i][1] day = (zp[i][3] - ay) // zgcd[i] cross = [] for j in range(i+1, N): #dprint('node',i,j) bx = zp[j][0] dbx = (zp[j][2] - bx) // zgcd[j] by = zp[j][1] dby = (zp[j][3] - by) // zgcd[j] #dprint(ax,dax,ay,day) #dprint(bx,dbx,by,dby) t1 = ax * day - ay * dax - bx * day + by * dax t2 = dbx day - dby dax #dprint(t1,t2) if t2==0: continue if t1%t2!=0: continue k2 = t1 // t2 if k2 <0 or k2 > zgcd[j]: continue if dax!=0: t3 = k2dbx + bx - ax if t3%dax!=0: continue k1 = t3//dax else: t3 = k2 dby + by - ay if t3%day !=0: continue k1 = t3//day if k1<0 or k1 > zgcd[i]: continue #dprint(ax + k1 * dax, ay+k1 * day) cross.append(k1) if not cross: continue cross.sort() d = 1 for j in range(1, len(cross)): if cross[j]!=cross[j-1]: d+=1 res-=d print(res) ```	output	1	1,660	23	3,321
Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>	instruction	0	1,661	23	3,322
Tags: fft, geometry, number theory Correct Solution: ``` # -- coding: utf-8 -- """ Created on Tue Sep 18 10:09:57 2018 @author: a.teffal Chalenge : Covered Points """ from math import gcd def covered_points(xa, ya, xb, yb): ''' assumes all parameters are integers Returns the covered points by the segement A-B having integer coordinates ''' #this just to have A in the left and B in the right if xb < xa : temp_x = xa xa = xb xb = temp_x temp_y = ya ya = yb yb = temp_y y_0 = abs(yb - ya) x_0 = xb - xa #pgdc_y_x = gcd(y_0, x_0) return gcd(y_0, x_0) + 1 def intersection2(xa, ya, xb, yb, xc, yc, xd, yd): if max(xa, xb) < min(xc,xd): return () if max(ya, yb) < min(yc,yd): return () # if both A-B and C - D ara parallel to x-axis # then no intersection (it is garanted that no segments lie on the same line) if (xa == xb and xc == xd) or (ya == yb and yc == yd): return () if ya == yb and yc == yd: return () a1 = yb - ya b1 = xb - xa #c1 = xa(yb - ya) - ya(xb - xa) c1 = xaa1 - yab1 a2 = yd - yc b2 = xd - xc #c2 = xc(yd - yc) - yc(xd - xc) c2 = xca2 - ycb2 det = a1 * b2 - a2 * b1 if det == 0: return () detx = c1 * b2 - c2 * b1 dety = -a1 * c2 + a2 * c1 if (detx % det) != 0 or (dety % det) !=0 : return () x = int(detx/det) y = int(dety/det) if x < min(xa, xb) or x > max(xa, xb) or x < min(xc, xd) or x > max(xc, xd) : return () if y < min(ya, yb) or y > max(ya, yb) or y < min(yc, yd) or y > max(yc, yd) : return () return (x, y) if __name__ == "__main__": #number of segments n = int(input()) #initiate lists of point coordinates Ax = [0]n Ay = [0]n Bx = [0]n By = [0]n n_cov = 0 intersections = {} #counting covered by each segment for i in range(n): line = input().split(sep = ' ') Ax[i] = int(line[0]) Ay[i] = int(line[1]) Bx[i] = int(line[2]) By[i] = int(line[3]) n_cov += covered_points(Ax[i], Ay[i], Bx[i], By[i]) #substructing reapted points (intersection) for i in range(n): for j in range(i+1, n): temp = intersection2(Ax[i], Ay[i], Bx[i], By[i], Ax[j], Ay[j], Bx[j], By[j]) if len(temp)==0: continue if temp in intersections: intersections[temp].append(i) intersections[temp].append(j) else: intersections[temp] = [i, j] for i in intersections: n_cov = n_cov - len(set(intersections[i])) + 1 print(n_cov) ```	output	1	1,661	23	3,323

Provide tags and a correct Python 3 solution for this coding contest problem. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}.

instruction

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276

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552

Tags: binary search, combinatorics, two pointers Correct Solution: ``` from sys import * from math import * n,k=map(int,stdin.readline().split()) a=list(map(int,stdin.readline().split())) ans=0 for i in range(n-2): x=a[i]+k l=i+2 h=n-1 j=0 f=0 while l<=h: m=(l+h)//2 if a[m]>x: h=m-1 elif a[m]<=x: j=m l=m+1 f=1 if f==1: y=j-i-2 ans+=(y+1)*(y+2)//2 print(ans) ```

output

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553

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` # n=int(input()) # n,k=map(int,input().split()) '''l=0 r=10**13 while l+1<r: mid=(l+r)//2 val=(max(0,b_b*mid-b)*rb+max(0,b_s*mid-s)*rs+max(0,b_c*mid-b)*rc) if val>money: r=mid if val<=money: l=mid''' # arr=list(map(int,input().split())) # n=int(input()) # n,k=map(int,input().split()) # arr=list(map(int,input().split())) n,d=map(int,input().split()) arr=list(map(int,input().split())) i=0 ans=0 for j in range(n): while j-i>=3 and arr[j]-arr[i]>d: i+=1 if arr[j]-arr[i]<=d: ans+=(j-i)*(j-i-1)//2 print(ans) ```

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Yes

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` import bisect n,d = [int(x) for x in input().split()] a = [int(x) for x in input().split()] ans =0 for i in range(0,n): x = bisect.bisect_right(a,a[i]+d) ans+=(x-i-1)*(x-i-2)//2 print(ans) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` from bisect import bisect_left def sol(a,n,d): ans = 0 for i in range(n-2): x = a[i]+d pos = bisect_left(a,x) if pos < n and a[pos] == x: pos+=1 x = pos - (i+2) ans+=((x*(x+1))//2) return ans n,d = map(int,input().split()) a = [int(i) for i in input().split()] print(sol(a,n,d)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` n, d = list(map(int, input().split())) x = list(map(int, input().split())) i = 0 j = i + 2 count = 0 in_betn = 1 while(j-i-1 >= 1 and j<n): # print(x[j] - x[i]) while(j<n and x[j] - x[i] <= d): count += (in_betn * (in_betn+1) / 2) j += 1 in_betn += 1 # print("here") in_betn -= 1 i += 1 print(int(count)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` n, d = map(int, input().split()) x = list(map(int, input().split())) k = 0 j = 1 for i in range(n): p = 0 while (j < n and x[j] - x[i] <= d): k += (max(0, (j - i - 1))) j += 1 p += 1 if (p == 0): k += (max(0, j - i - 2)) print(k) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` def cnk(n): return 0 if 3 > n else n * (n - 1) * (n - 2) // 6 n, d = input().split() n, d = int(n), float(d) dots = list(map(int, input().split())) l, r, res = 0, 0, 0 while l < n: while r < n and dots[r] - dots[l] <= d: r += 1 res += cnk(r - l) if r == n: break while l < r and dots[r] - dots[l] > d: l += 1 print(res) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. 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 The first line contains two integers: n and d (1 ≤ n ≤ 105; 1 ≤ d ≤ 109). The next line contains n integers x1, x2, ..., xn, 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 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. Examples Input 4 3 1 2 3 4 Output 4 Input 4 2 -3 -2 -1 0 Output 2 Input 5 19 1 10 20 30 50 Output 1 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}. Submitted Solution: ``` def busquedaBinaria(arr,n,item): aux2=0 i=0 k=item while(i!=len(arr)): val = arr[i] + k #print(val) encontrado = False primero = 0 ultimo = len(arr) - 1 #print("entro en while1") while primero <= ultimo: #print("entro en while2") puntoMedio = (primero + ultimo) // 2 if arr[puntoMedio] == val: #print("lo encontro") encontrado = True break else: if item < arr[puntoMedio]: ultimo = puntoMedio - 1 else: primero = puntoMedio + 1 if (encontrado==True and (i+2)!=(k)): encontrado=False posicion =abs(puntoMedio - i - 1) #print(puntoMedio) #print(posicion) aux2 += posicion*(posicion + 1) // 2 #print(aux2) #print("") i += 1 k = item elif((encontrado== False) and (i+2)!=(k)): k-=1 else: k=item i+=1 return aux2 arr=[] n,k = list(map(int,input().strip().split())) arr = list(map(int,input().strip().split())) print(busquedaBinaria(arr,n,k)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Alexandra has a paper strip with n numbers on it. Let's call them ai from left to right. Now Alexandra wants to split it into some pieces (possibly 1). For each piece of strip, it must satisfy: * Each piece should contain at least l numbers. * The difference between the maximal and the minimal number on the piece should be at most s. Please help Alexandra to find the minimal number of pieces meeting the condition above. Input The first line contains three space-separated integers n, s, l (1 ≤ n ≤ 105, 0 ≤ s ≤ 109, 1 ≤ l ≤ 105). The second line contains n integers ai separated by spaces ( - 109 ≤ ai ≤ 109). Output Output the minimal number of strip pieces. If there are no ways to split the strip, output -1. Examples Input 7 2 2 1 3 1 2 4 1 2 Output 3 Input 7 2 2 1 100 1 100 1 100 1 Output -1 Note For the first sample, we can split the strip into 3 pieces: [1, 3, 1], [2, 4], [1, 2]. For the second sample, we can't let 1 and 100 be on the same piece, so no solution exists. Submitted Solution: ``` n, s, l = map(int, input().split(' ')) L = list(map(int, input().split(' '))) ans = 1 i = l maxi = max(L[:l]) mini = min(L[:l]) left = 0 right = i if maxi - mini > s : ans = -1 else : while i < n: new = L[i] i+= 1 right += 1 maxi = max(maxi, new) mini = min(mini, new) if maxi - mini > s : if left+l > i : ans = -1 break ans += 1 new_left = i maxi = new mini = new while new_left != left+l : new_left -= 1 pmaxi = maxi pmini = mini maxi = max(L[new_left], maxi) mini = min(L[new_left], mini) if maxi - mini > s : new_left += 1 maxi = pmaxi mini = pmini left = new_left break left = new_left print(ans) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Alexandra has a paper strip with n numbers on it. Let's call them ai from left to right. Now Alexandra wants to split it into some pieces (possibly 1). For each piece of strip, it must satisfy: * Each piece should contain at least l numbers. * The difference between the maximal and the minimal number on the piece should be at most s. Please help Alexandra to find the minimal number of pieces meeting the condition above. Input The first line contains three space-separated integers n, s, l (1 ≤ n ≤ 105, 0 ≤ s ≤ 109, 1 ≤ l ≤ 105). The second line contains n integers ai separated by spaces ( - 109 ≤ ai ≤ 109). Output Output the minimal number of strip pieces. If there are no ways to split the strip, output -1. Examples Input 7 2 2 1 3 1 2 4 1 2 Output 3 Input 7 2 2 1 100 1 100 1 100 1 Output -1 Note For the first sample, we can split the strip into 3 pieces: [1, 3, 1], [2, 4], [1, 2]. For the second sample, we can't let 1 and 100 be on the same piece, so no solution exists. Submitted Solution: ``` n, s, l = map(int, input().split(' ')) L = list(map(int, input().split(' '))) ans = 1 i = l maxi = max(L[:l]) mini = min(L[:l]) left = 0 right = i if maxi - mini > s : ans = -1 else : while i < n: new = L[i] i+= 1 right += 1 maxi = max(maxi, new) mini = min(mini, new) if maxi - mini > s : if left+l > i-1: ans = -1 break ans += 1 new_left = i-1 maxi = new mini = new while new_left != left+l : new_left -= 1 pmaxi = maxi pmini = mini maxi = max(L[new_left], maxi) mini = min(L[new_left], mini) if maxi - mini > s : new_left += 1 maxi = pmaxi mini = pmini left = new_left break left = new_left print(ans) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` x1, y1 = map(int, input().split()) x2, y2 = map(int, input().split()) x3, y3 = map(int, input().split()) j, k = x2-x1, y2-y1 l, m = x3-x1, y3-y1 a = ( j**2 + k**2 )**0.5 b = ( l**2 + m**2 )**0.5 c = ( (j-l)**2 + (k-m)**2 )**0.5 S = abs(j*m-k*l)/2 T = (a+b+c)/2 M = max(a, b, c) r = S / (2*S/M + T) print(r) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` a=[list(map(int,input().split()))for i in range(3)] s,t,u=((a[0][0]-a[1][0])**2+(a[0][1]-a[1][1])**2)**0.5,((a[2][0]-a[1][0])**2+(a[2][1]-a[1][1])**2)**0.5,((a[0][0]-a[2][0])**2+(a[0][1]-a[2][1])**2)**0.5 p=(s+t+u)/2 q=(p*(p-s)*(p-t)*(p-u))**0.5 r=2*q/(s+t+u) g=max(s,t,u) print(g/(2+g/r)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` p = [[int(i) for i in input().split()] for i in range(3)] a = [] for i in range(3): a.append((p[i][0]-p[(i+1)%3][0])**2+(p[i][1]-p[(i+1)%3][1])**2) a.sort() print(a[2]**0.5/ (((2*(a[0]*a[2])**0.5+a[0]+a[2]-a[1])/(2*(a[0]*a[2])**0.5-a[0]-a[2]+a[1]))**0.5+ ((2*(a[1]*a[2])**0.5+a[1]+a[2]-a[0])/(2*(a[1]*a[2])**0.5-a[1]-a[2]+a[0]))**0.5+2)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` def euclid(a,b,c,d): return ( (a-c)**2 + (b-d)**2 )**0.5 def triangle_area(p1,p2,p3): dx1, dx2 = p3[0] - p1[0], p2[0] - p1[0] dy1, dy2 = p3[1] - p1[1], p2[1] - p1[1] return dy2*dx1 - dy1*dx2 x1, y1 = [ int(v) for v in input().split() ] x2, y2 = [ int(v) for v in input().split() ] x3, y3 = [ int(v) for v in input().split() ] a = euclid(x1, y1, x2, y2) b = euclid(x2, y2, x3, y3) c = euclid(x3, y3, x1, y1) l = a + b + c s = triangle_area((x1,y1),(x2,y2),(x3,y3)) ar = s / ( l + (2*s / a) ) br = s / ( l + (2*s / b) ) cr = s / ( l + (2*s / c) ) print(max(ar,br,cr)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` def norm(x1, y1, x2, y2): return ((x1-x2)**2 + (y1-y2)**2)**0.5 def d(a, b, c, x, y): return abs(a*x + b*y + c) / (a**2 + b**2)**0.5 def points2line(x1, y1, x2, y2): la = y1 - y2 lb = x2 - x1 lc = x1 * (y2 - y1) + y1 * (x1 - x2) return la, lb, lc #from numpy import argmax def argmax(L): return max(enumerate(L), key=lambda x: x[1])[0] x1, y1 = map(int, input().split()) x2, y2 = map(int, input().split()) x3, y3 = map(int, input().split()) a = norm(x3, y3, x2, y2) b = norm(x1, y1, x3, y3) c = norm(x1, y1, x2, y2) xc = (a*x1 + b*x2 + c*x3)/(a+b+c) yc = (a*y1 + b*y2 + c*y3)/(a+b+c) iw = argmax([a, b, c]) w = [a, b, c][int(iw)] L = [[x1, y1], [x2, y2], [x3, y3]] del L[int(iw)] h = d(*points2line(*L[0], *L[1]), xc, yc) print(w*h/(2*h + w)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` ai = lambda: list(map(int, input().split())) import numpy as np import math def calc(A,B,C): a = np.linalg.norm(B - C) b = np.linalg.norm(C - A) c = np.linalg.norm(A - B) cosC = np.inner(A-C, B-C)/(b*a) if cosC <= 0: return 0 tanC = math.sqrt(1/(cosC**2)-1) return (1 - 1/cosC + tanC) * (a+b-c)/4 a = np.array(ai()) b = np.array(ai()) c = np.array(ai()) print(max(calc(a,b,c),calc(b,c,a),calc(c,a,b))) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Snuke received a triangle as a birthday present. The coordinates of the three vertices were (x_1, y_1), (x_2, y_2), and (x_3, y_3). He wants to draw two circles with the same radius inside the triangle such that the two circles do not overlap (but they may touch). Compute the maximum possible radius of the circles. Constraints * 0 ≤ x_i, y_i ≤ 1000 * The coordinates are integers. * The three points are not on the same line. Input The input is given from Standard Input in the following format: x_1 y_1 x_2 y_2 x_3 y_3 Output Print the maximum possible radius of the circles. The absolute error or the relative error must be at most 10^{-9}. Examples Input 0 0 1 1 2 0 Output 0.292893218813 Input 3 1 1 5 4 9 Output 0.889055514217 Submitted Solution: ``` import numpy as np import math def calc(A,B,C): a = np.linalg.norm(B - C) b = np.linalg.norm(C - A) c = np.linalg.norm(A - B) cosC = np.inner(A-C, B-C)/(b*a) if cosC <= 0: return 0 tanC = math.sqrt(1/(cosC**2)-1) return (1 - 1/cosC + tanC) * (a+b-c)/4 a = np.array(ai()) b = np.array(ai()) c = np.array(ai()) print(max(calc(a,b,c),calc(b,c,a),calc(c,a,b))) ```

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Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

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Tags: dp, math Correct Solution: ``` n = int(input()) if n%2==0: if n%4==0: print(4**(n//4)) else: print((4**(n//4))*2) else: print(0) ```

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23

1,771

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

886

23

1,772

Tags: dp, math Correct Solution: ``` n = eval(input()) if n % 2 != 0: print(0) else: print(int(2**(n/2))) ```

output

1

886

23

1,773

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

887

23

1,774

Tags: dp, math Correct Solution: ``` n = int(input()) print( ( 1 << ( n // 2 ) if n & 1 == 0 else 0 )) ```

output

1

887

23

1,775

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

888

23

1,776

Tags: dp, math Correct Solution: ``` n = int(input()) if n % 2 == 1: print(0) else: print((int(2 ** (n/2)))) ```

output

1

888

23

1,777

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

889

23

1,778

Tags: dp, math Correct Solution: ``` t = int(input()) if t%2==0: print(2**(t//2)) else: print(0) ```

output

1

889

23

1,779

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

890

23

1,780

Tags: dp, math Correct Solution: ``` n=int(input()) if n&1==1: print(0) else: print(int(pow(2,n/2))) ```

output

1

890

23

1,781

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

891

23

1,782

Tags: dp, math Correct Solution: ``` dim = int(input()) print(2 ** (dim // 2) if dim % 2 == 0 else 0) ```

output

1

891

23

1,783

Provide tags and a correct Python 3 solution for this coding contest problem. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles.

instruction

0

892

23

1,784

Tags: dp, math Correct Solution: ``` n = int(input()) if n % 2 == 0: print(round(2**(n / 2))) else: print(0) ```

output

1

892

23

1,785

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` nn=int(input()) print(0) if nn%2!=0 else print(int(pow(2,nn/2))) ```

instruction

0

893

23

1,786

Yes

output

1

893

23

1,787

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` def scand(): return int(input()) def scana(): return [int(x) for x in input().split()] def solve(x): if x%2: return 0 return int(2**(x//2)) n=scand() print(solve(n)) ```

instruction

0

894

23

1,788

Yes

output

1

894

23

1,789

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) if n%2 == 0: print(2**(3*n//6)) else: print(0) ```

instruction

0

895

23

1,790

Yes

output

1

895

23

1,791

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` # ///==========Libraries, Constants and Functions=============/// #mkraghav import sys inf = float("inf") mod = 1000000007 def get_array(): return list(map(int, sys.stdin.readline().split())) def get_ints(): return map(int, sys.stdin.readline().split()) def input(): return sys.stdin.readline() def int1():return int(input()) import string import math from itertools import combinations # ///==========MAIN=============/// def main(): n=int1() if n==1: print(0) else: if n%2==0: print(pow(2,n//2)) else: print(0) if __name__ == "__main__": main() ```

instruction

0

896

23

1,792

Yes

output

1

896

23

1,793

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n=int(input()) print(n*int(n%2==0)) ```

instruction

0

897

23

1,794

No

output

1

897

23

1,795

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` # code by RAJ BHAVSAR n = int(input()) if(n == 1): print(0) else: print(n) ```

instruction

0

898

23

1,796

No

output

1

898

23

1,797

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) print(2**(n//2)) ```

instruction

0

899

23

1,798

No

output

1

899

23

1,799

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. You have a given integer n. Find the number of ways to fill all 3 × n tiles with the shape described in the picture below. Upon filling, no empty spaces are allowed. Shapes cannot overlap. <image> This picture describes when n = 4. The left one is the shape and the right one is 3 × n tiles. Input The only line contains one integer n (1 ≤ n ≤ 60) — the length. Output Print the number of ways to fill. Examples Input 4 Output 4 Input 1 Output 0 Note In the first example, there are 4 possible cases of filling. In the second example, you cannot fill the shapes in 3 × 1 tiles. Submitted Solution: ``` n = int(input()) print(n//4) ```

instruction

0

900

23

1,800

No

output

1

900

23

1,801

Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4

instruction

0

1,157

23

2,314

Tags: dfs and similar, implementation Correct Solution: ``` w,h,n=list(map(int,input().split())) a=[[0 for i in range(2*w-1)] for j in range(2*h-1)] for i in range(1,2*h-1,2): for j in range(1,2*w-1,2): a[i][j]=' ' for i in range(n): x1,y1,x2,y2=list(map(int,input().split())) if x1==x2: if x1!=0 and x1!=w: for j in range(min(y1,y2),max(y1,y2)): a[2*h-2-2*(j)][2*x1-1]=' ' else: if y1!=0 and y1!=h: for j in range(min(x1,x2),max(x1,x2)): a[2*h-1-2*y1][2*j]=' ' b=[] c=1 for i in range(0,2*h-1,2): for j in range(0,2*w-1,2): if a[i][j]==0: d=i e=j while d<2*h-1 and a[d][e]==0 and a[d-1][e]!=' ' or d==i: d+=2 d-=2 while e<2*w-1 and a[d][e]==0 and a[d][e-1]!=' ' or e==j: e+=2 e-=2 b.append(((e-j)//2+1)*((d-i)//2+1)) for k in range(i,d+1,2): for l in range(j,e+1,2): a[k][l]=c c+=1 b+=[0]*(n+1-len(b)) print(*sorted(b)) ```

output

1

1,157

23

2,315

Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4

instruction

0

1,158

23

2,316

Tags: dfs and similar, implementation Correct Solution: ``` w, h, n = map(int, input().split(' ')) hblock = [[False for i in range(w)] for i in range(h)] vblock = [[False for i in range(w)] for i in range(h)] for i in range(n): x1, y1, x2, y2 = map(int, input().split(' ')) if x1 == x2: for j in range(y1, y2): hblock[j][x1-1] = True else: for j in range(x1, x2): vblock[y1-1][j] = True areas = [] vis = [[False for i in range(w)] for i in range(h)] for i in range(h): for j in range(w): if vis[i][j]: continue width = j while width < w and not hblock[i][width]: width += 1 height = i while height < h and not vblock[height][j]: height += 1 width = min(w - 1, width) - j + 1 height = min(h - 1, height) - i + 1 areas.append(width * height) for p in range(height): for q in range(width): vis[i + p][j + q] = True areas.sort() print(' '.join(map(str, areas))) ```

output

1

1,158

23

2,317

Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4

instruction

0

1,159

23

2,318

Tags: dfs and similar, implementation Correct Solution: ``` import sys from array import array # noqa: F401 def input(): return sys.stdin.buffer.readline().decode('utf-8') w, h, n = map(int, input().split()) mat = [[0] * (2 * w) for _ in range(2 * h)] for x1, y1, x2, y2 in (map(int, input().split()) for _ in range(n)): if x1 == x2: for y in range(2 * y1, 2 * y2): mat[y][2 * x1 - 1] = 1 else: for x in range(2 * x1, 2 * x2): mat[2 * y1 - 1][x] = 1 ans = [] for i in range(0, 2 * h, 2): for j in range(0, 2 * w, 2): if mat[i][j]: continue mat[i][j] = 1 size = 1 stack = [(i, j)] while stack: y, x = stack.pop() for dy, dx in ((1, 0), (-1, 0), (0, 1), (0, -1)): if 0 <= y + dy * 2 < 2 * h and 0 <= x + dx * 2 < 2 * w and mat[y + dy][x + dx] == 0 and mat[y + dy * 2][x + dx * 2] == 0: mat[y + dy * 2][x + dx * 2] = 1 size += 1 stack.append((y + dy * 2, x + dx * 2)) ans.append(size) print(*sorted(ans)) ```

output

1

1,159

23

2,319

Provide tags and a correct Python 3 solution for this coding contest problem. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4

instruction

0

1,160

23

2,320

Tags: dfs and similar, implementation Correct Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = range(WHn[0][-1]) lines = [] lines_aux = [] for i in n: lines.append( [int(x) for x in input().split(' ')] ) lines_aux.append(True) while any(lines_aux): for i in n: if lines_aux[i]: for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[i][0] in rangex) and (lines[i][3] in rangey) and (lines[i][2] in rangex) and (lines[i][1] in rangey) and\ ( (lines[i][0:3:2] == unidad[0:3:2]) or (lines[i][1:4:2] == unidad[1:4:2]) ): WHn.append([unidad[0],unidad[1],lines[i][2],lines[i][3]]) WHn.append([lines[i][0],lines[i][1],unidad[2],unidad[3]]) WHn.remove(unidad) lines_aux[i] = False break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])*(unidad[3] - unidad[1]) WHn.sort() result = '' for i in WHn: result += '{} ' print(result[:-1].format(*WHn)) ```

output

1

1,160

23

2,321

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = WHn[0][-1] for i in range(n): # lines = list(map(int, input().split(' '))) lines = [int(x) for x in input().split(' ')] for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[0] in rangex) and (lines[3] in rangey) and\ (lines[2] in rangex) and (lines[1] in rangey): WHn.append([unidad[0],unidad[1],lines[2],lines[3]]) WHn.append([lines[0],lines[1],unidad[2],unidad[3]]) WHn.remove(unidad) break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])*(unidad[3] - unidad[1]) WHn.sort() print(WHn) ```

instruction

0

1,161

23

2,322

No

output

1

1,161

23

2,323

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` w,h,n=list(map(int,input().split())) a=[[0 for i in range(2*w-1)] for j in range(2*h-1)] for i in range(1,2*h-1,2): for j in range(1,2*w-1,2): a[i][j]=' ' for i in range(n): x1,y1,x2,y2=list(map(int,input().split())) if x1==x2: if x1!=0 and x1!=w: for j in range(max(1,min(y1,y2)),max(y1,y2)+1): a[2*h-2-2*(j-1)][2*x1-1]=' ' else: if y1!=0 and y1!=h: for j in range(min(x1,x2),max(x1,x2)): a[2*h-1-2*y1][2*j]=' ' b=[] c=1 for i in range(0,2*h-1,2): for j in range(0,2*w-1,2): if a[i][j]==0: d=i e=j while d<2*h-1 and a[d][e]==0 and a[d-1][e]!=' ' or d==i: d+=2 d-=2 while e<2*w-1 and a[d][e]==0 and a[d][e-1]!=' ' or e==j: e+=2 e-=2 b.append(((e-j)//2+1)*((d-i)//2+1)) for k in range(i,d+1,2): for l in range(j,e+1,2): a[k][l]=c c+=1 b+=[0]*(n+1-len(b)) print(*sorted(b)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Bob has a rectangular chocolate bar of the size W × H. He introduced a cartesian coordinate system so that the point (0, 0) corresponds to the lower-left corner of the bar, and the point (W, H) corresponds to the upper-right corner. Bob decided to split the bar into pieces by breaking it. Each break is a segment parallel to one of the coordinate axes, which connects the edges of the bar. More formally, each break goes along the line x = xc or y = yc, where xc and yc are integers. It should divide one part of the bar into two non-empty parts. After Bob breaks some part into two parts, he breaks the resulting parts separately and independently from each other. Also he doesn't move the parts of the bar. Bob made n breaks and wrote them down in his notebook in arbitrary order. At the end he got n + 1 parts. Now he wants to calculate their areas. Bob is lazy, so he asks you to do this task. Input The first line contains 3 integers W, H and n (1 ≤ W, H, n ≤ 100) — width of the bar, height of the bar and amount of breaks. Each of the following n lines contains four integers xi, 1, yi, 1, xi, 2, yi, 2 — coordinates of the endpoints of the i-th break (0 ≤ xi, 1 ≤ xi, 2 ≤ W, 0 ≤ yi, 1 ≤ yi, 2 ≤ H, or xi, 1 = xi, 2, or yi, 1 = yi, 2). Breaks are given in arbitrary order. It is guaranteed that the set of breaks is correct, i.e. there is some order of the given breaks that each next break divides exactly one part of the bar into two non-empty parts. Output Output n + 1 numbers — areas of the resulting parts in the increasing order. Examples Input 2 2 2 1 0 1 2 0 1 1 1 Output 1 1 2 Input 2 2 3 1 0 1 2 0 1 1 1 1 1 2 1 Output 1 1 1 1 Input 2 4 2 0 1 2 1 0 3 2 3 Output 2 2 4 Submitted Solution: ``` WHn = [[0,0]] # WHn[0].extend(list(map(int, input().split(' ')))) WHn[0].extend([int(x) for x in input().split(' ')]) n = WHn[0][-1] for i in range(n): # lines = list(map(int, input().split(' '))) lines = [int(x) for x in input().split(' ')] for unidad in WHn: rangex = range(unidad[0], unidad[2]+1) rangey = range(unidad[1], unidad[3]+1) if (lines[0] in rangex) and (lines[3] in rangey) and\ (lines[2] in rangex) and (lines[1] in rangey): WHn.append([unidad[0],unidad[1],lines[2],lines[3]]) WHn.append([lines[0],lines[1],unidad[2],unidad[3]]) WHn.remove(unidad) break for i,unidad in enumerate(WHn): WHn[i] = (unidad[2] - unidad[0])*(unidad[3] - unidad[1]) WHn.sort() result = "" for i in WHn: result+="{} " print(result[:-1].format(*WHn)) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) ** 2 + (y2 - y1) ** 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True cs = [] step = 2 * pi / n for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [-1, 0, 1]: for dy in [-1, 0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx #brute(level + 1) #cs[level][0] += 1 #brute(level + 1) #cs[level][1] += 1 #brute(level + 1) #cs[level][0] -= 1 #brute(level + 1) #cs[level][1] -= 1 brute(0) print(res) for pair in resV: print(*pair) ```

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Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) ** 2 + (y2 - y1) ** 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [0, 1]: for dy in [0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx cs = [] stepBase = 2 * pi / n for baseCount in range(n // 2): step = stepBase * (baseCount + 1) for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] brute(0) print(res) for pair in resV: print(*pair) ```

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2,491

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) ** 2 + (y2 - y1) ** 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True def checkP(p): x, y = p if x * x + y * y > r2: return False return True res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return for dx in [0, 1]: for dy in [0, 1]: cs[level][0] += dx cs[level][1] += dy if checkP(cs[level]): brute(level + 1) cs[level][1] -= dy cs[level][0] -= dx cs = [] stepBase = 2 * pi / n for baseCount in range(n // 2): step = stepBase * (baseCount + 1) cs = [] for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] brute(0) print(res) for pair in resV: print(*pair) ```

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2,493

Evaluate the correctness of the submitted Python 3 solution to the coding contest problem. Provide a "Yes" or "No" response. Roland loves growing flowers. He has recently grown a beautiful rose at point (0, 0) of the Cartesian coordinate system. The rose is so beautiful that Roland is afraid that the evil forces can try and steal it. To protect the rose, Roland wants to build n watch towers. Let's assume that a tower is a point on the plane at the distance of at most r from the rose. Besides, Roland assumes that the towers should be built at points with integer coordinates and the sum of squares of distances between all pairs of towers must be as large as possible. Note, that Roland may build several towers at the same point, also he may build some of them at point (0, 0). Help Roland build the towers at the integer points so that the sum of squares of distances between all towers is maximum possible. Note that the distance in this problem is defined as the Euclidian distance between points. Input The first line contains two integers, n and r (2 ≤ n ≤ 8; 1 ≤ r ≤ 30). Output In the first line print an integer — the maximum possible sum of squared distances. In the i-th of the following n lines print two integers, xi, yi — the coordinates of the i-th tower. Each tower must be inside or on the border of the circle with radius r. Note that there may be several towers located at the same point of the plane, also some towers can be located at point (0, 0). If there are multiple valid optimal arrangements, choose any of them. Examples Input 4 1 Output 16 0 1 0 1 0 -1 0 -1 Input 3 6 Output 312 0 6 5 -3 -5 -3 Submitted Solution: ``` from math import cos, sin, pi, floor from copy import deepcopy n, r = map(int, input().split(' ')) r2 = r * r def score(cs): res = 0 for i in range(n): for j in range(i + 1, n): x1, y1 = cs[i] x2, y2 = cs[j] res += (x2 - x1) ** 2 + (y2 - y1) ** 2 return res def check(cs): for x, y in cs: if x * x + y * y > r2: return False return True cs = [] step = 2 * pi / n for i in range(n): x = r * cos(step * i) y = r * sin(step * i) cs += [[floor(x), floor(y)]] res = 0 resV = [] def brute(level): global cs, res, resV if level >= n: if check(cs): curScore = score(cs) if curScore > res: res = curScore resV = deepcopy(cs) return brute(level + 1) cs[level][0] += 1 brute(level + 1) cs[level][1] += 1 brute(level + 1) cs[level][0] -= 1 brute(level + 1) cs[level][1] -= 1 brute(0) print(res) for pair in cs: print(*pair) ```

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Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

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Tags: fft, geometry, number theory Correct Solution: ``` """ 1036E : Covered Points Borrows primarily from : https://stackoverflow.com/questions/563198/how-do-you-detect-where-two-line-segments-intersect """ def gcd(a, b): return a if b == 0 else gcd(b, a % b) def cross(x1, y1, x2, y2): return x1 * y2 - x2 * y1 def online(line, x, y): """ If the x and y are within the range of min and max of x and y's respectively then the points MAY lie on the line """ a, b, c, d = line if min(a, c) <= x <= max(a, c) and min(b, d) <= y <= max(b, d): return True return False def CF1036E(): N = int(input()) lines = [] count = 0 # Read input line segment and find the lines covered by each line segment for _ in range(N): x1, y1, x2, y2 = map(int, input().split()) count += gcd(abs(x1 - x2), abs(y1 - y2)) + 1 lines.append((x1, y1, x2, y2)) # Deal with the intersecting points for i in range(N): d = set() # Unique intersecting points for j in range(i+1, N): px, py, qx, qy = lines[i] rx, ry, sx, sy = lines[j] vecx = (px - qx, rx - sx) vecy = (py - qy, ry - sy) # Cross of two lines area = cross(vecx[0], vecx[1], vecy[0], vecy[1]) # Parallel line has no intersecting points if area == 0: continue # Computation of the exact point # This has been referenced from : https://stackoverflow.com/questions/563198/how-do-you-detect-where-two-line-segments-intersect lineA = cross(px, py, qx, qy) lineB = cross(rx, ry, sx, sy) x = cross(lineA, lineB, vecx[0], vecx[1]) / area y = cross(lineA, lineB, vecy[0], vecy[1]) / area # Verify the points are good. # If the points are integers and lie of the lines they are valid. if not (x % 1 == 0 and y % 1 == 0): continue if not (online(lines[i], x, y) and online(lines[j], x, y)): continue d.add((x, y)) count -= len(d) return count if __name__ == '__main__': res = CF1036E() print(res) ```

output

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Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

instruction

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Tags: fft, geometry, number theory Correct Solution: ``` import sys from array import array # noqa: F401 def input(): return sys.stdin.buffer.readline().decode('utf-8') class Point(object): COUNTER_CLOCKWISE = 1 CLOCKWISE = -1 ONLINE_BACK = 2 ONLINE_FRONT = -2 ON_SEGMENT = 0 def __init__(self, x: int, y: int): self.x = x self.y = y def __add__(self, other: 'Point'): return Point(self.x + other.x, self.y + other.y) def __sub__(self, other: 'Point'): return Point(self.x - other.x, self.y - other.y) def __mul__(self, k): return Point(self.x * k, self.y * k) def __repr__(self): return f'x = {self.x}, y = {self.y}' def norm(self): return self.x**2 + self.y**2 def dot(self, other: 'Point'): return self.x * other.x + self.y * other.y def cross(self, other: 'Point'): return self.x * other.y - self.y * other.x def ccw(self, p1: 'Point', p2: 'Point'): vector_a = p1 - self vector_b = p2 - self prod = vector_a.cross(vector_b) if prod > 0: return self.COUNTER_CLOCKWISE elif prod < 0: return self.CLOCKWISE elif vector_a.dot(vector_b) < 0: return self.ONLINE_BACK elif vector_a.norm() < vector_b.norm(): return self.ONLINE_FRONT else: return self.ON_SEGMENT class Segment(object): def __init__(self, p1: Point, p2: Point): self.p1 = p1 self.p2 = p2 def is_intersected(self, other: 'Segment'): return ( self.p1.ccw(self.p2, other.p1) * self.p1.ccw(self.p2, other.p2) <= 0 and other.p1.ccw(other.p2, self.p1) * other.p1.ccw(other.p2, self.p2) <= 0 ) if __name__ == '__main__': from math import gcd from collections import Counter n = int(input()) ans = 0 segments = [] for _ in range(n): ax, ay, bx, by = map(int, input().split()) segments.append(Segment(Point(ax, ay), Point(bx, by))) g = gcd(abs(ax - bx), abs(ay - by)) ans += g + 1 triangle = {(i * (i + 1)) >> 1: i for i in range(n + 1)} intersection = Counter() for i in range(n): for j in range(i + 1, n): if segments[i].is_intersected(segments[j]): base = segments[j].p2 - segments[j].p1 d1 = abs(base.cross(segments[i].p1 - segments[j].p1)) d2 = abs(base.cross(segments[i].p2 - segments[j].p1)) p2 = segments[i].p2 - segments[i].p1 if (p2.x * d1) % (d1 + d2) == 0 and (p2.y * d1) % (d1 + d2) == 0: x = segments[i].p1.x + (p2.x * d1) // (d1 + d2) y = segments[i].p1.y + (p2.y * d1) // (d1 + d2) intersection[x, y] += 1 ans -= sum(triangle[v] for v in intersection.values()) print(ans) ```

output

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3,315

Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

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23

3,316

Tags: fft, geometry, number theory Correct Solution: ``` import math def intersectSeg( pt1, pt2, ptA, ptB, interge=False): """ this returns the intersection of two segment (pt1,pt2) and (ptA,ptB) returns a tuple: (xi, yi, valid, r, s), where (xi, yi) is the intersection r is the scalar multiple such that (xi,yi) = pt1 + r*(pt2-pt1) s is the scalar multiple such that (xi,yi) = pt1 + s*(ptB-ptA) valid == 0 if there are 0 or inf. intersections (invalid) valid == 1 if it has a unique intersection ON the segment """ def is_interge(x): if abs(round(x) - x) < 0.0000001: return True return False DET_TOLERANCE = 0.00000001 # the first line is pt1 + r*(pt2-pt1) # in component form: x1, y1 = pt1; x2, y2 = pt2 dx1 = x2 - x1; dy1 = y2 - y1 # the second line is ptA + s*(ptB-ptA) x, y = ptA; xB, yB = ptB; dx = xB - x; dy = yB - y; # we need to find the (typically unique) values of r and s # that will satisfy # # (x1, y1) + r(dx1, dy1) = (x, y) + s(dx, dy) # # which is the same as # # [ dx1 -dx ][ r ] = [ x-x1 ] # [ dy1 -dy ][ s ] = [ y-y1 ] # # whose solution is # # [ r ] = _1_ [ -dy dx ] [ x-x1 ] # [ s ] = DET [ -dy1 dx1 ] [ y-y1 ] # # where DET = (-dx1 * dy + dy1 * dx) # # if DET is too small, they're parallel # DET = (-dx1 * dy + dy1 * dx) if math.fabs(DET) < DET_TOLERANCE: return (0,0,0,0,0) # now, the determinant should be OK DETinv = 1.0/DET # find the scalar amount along the "self" segment r = DETinv * (-dy * (x-x1) + dx * (y-y1)) # find the scalar amount along the input line s = DETinv * (-dy1 * (x-x1) + dx1 * (y-y1)) # return the average of the two descriptions xi = (x1 + r*dx1 + x + s*dx)/2.0 yi = (y1 + r*dy1 + y + s*dy)/2.0 if interge == True and (is_interge(xi)==False or is_interge(yi)==False): return (0,0,0,0,0) xi, yi = round(xi), round(yi) valid = 1 if xi < max(min(x1,x2), min(x, xB)) or xi > min(max(x1,x2), max(x,xB)) or \ yi < max(min(y1,y2), min(y, yB)) or yi > min(max(y1,y2), max(y,yB)): return (0,0,0,0,0) return ( xi, yi, valid, r, s ) def gcd(a, b): if b == 0: return a return gcd(b, a%b) n = int(input()) seg = [list(map(int, input().split())) for _ in range(n)] cnt = 0 for x1, y1, x2, y2 in seg: cnt += gcd(abs(x1-x2), abs(y1-y2)) + 1 sub = 0 for i in range(n): d = set() for j in range(i+1): x, y, valid, _, _ = intersectSeg(seg[i][:2], seg[i][2:], seg[j][:2], seg[j][2:], interge=True) if valid == 0: continue if (x, y) not in d: d.add((x, y)) sub += len(d) print(cnt-sub) ```

output

1

1,658

23

3,317

Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

instruction

0

1,659

23

3,318

Tags: fft, geometry, number theory Correct Solution: ``` ''' Welcome to GDB Online. GDB online is an online compiler and debugger tool for C, C++, Python, Java, PHP, Ruby, Perl, C#, VB, Swift, Pascal, Fortran, Haskell, Objective-C, Assembly, HTML, CSS, JS, SQLite, Prolog. Code, Compile, Run and Debug online from anywhere in world. ''' def gcd(a, b): return a if b == 0 else gcd(b, a % b) def cross(x1, y1, x2, y2): return x1 * y2 - x2 * y1 def online(line, x, y): a, b, c, d = line if min(a, c) <= x <= max(a, c) and min(b, d) <= y <= max(b, d): return True else: return False def CF1036E(): N = int(input()) lines = [] count = 0 # Find the lines covered by each line segment for _ in range(N): x1, y1, x2, y2 = map(int, input().split()) count += gcd(abs(x1 - x2), abs(y1 - y2)) + 1 lines.append((x1, y1, x2, y2)) # Deal with the intersecting points for i in range(N): d = set() for j in range(i+1, N): px, py, qx, qy = lines[i] rx, ry, sx, sy = lines[j] line1p = (px - qx, rx - sx) line2p = (py - qy, ry - sy) # Cross of two lines area = cross(line1p[0], line1p[1], line2p[0], line2p[1]) # Parallel line has no intersection if area == 0: continue lineA = cross(px, py, qx, qy) lineB = cross(rx, ry, sx, sy) x = cross(lineA, lineB, line1p[0], line1p[1]) / area y = cross(lineA, lineB, line2p[0], line2p[1]) / area # Verify the points are good if not (x % 1 == 0 and y % 1 == 0): continue if not (online(lines[i], x, y) and online(lines[j], x, y)): continue d.add((x, y)) count -= len(d) return count if __name__ == '__main__': res = CF1036E() print(res) ```

output

1

1,659

23

3,319

Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

instruction

0

1,660

23

3,320

Tags: fft, geometry, number theory Correct Solution: ``` # import sys def getIntList(): return list(map(int, input().split())) N, = getIntList() zp = [] for i in range(N): ax, ay, bx, by = getIntList() if ax>bx: ax,bx = bx,ax ay,by = by, ay zp.append( (ax,ay, bx,by)) res = 0 def gcd(a,b): if b==0:return a return gcd(b, a%b) zgcd = [] for i in range(N): ax, ay, bx, by = zp[i] tx = abs(bx-ax) ty = abs(by - ay) g = gcd(tx, ty) res += g+1 zgcd .append(g) """ ax + k1 dax = bx + k2 dbx ay + k1 day = by + k2 dby """ for i in range(N): ax = zp[i][0] dax = (zp[i][2] - ax) // zgcd[i] ay = zp[i][1] day = (zp[i][3] - ay) // zgcd[i] cross = [] for j in range(i+1, N): #dprint('node',i,j) bx = zp[j][0] dbx = (zp[j][2] - bx) // zgcd[j] by = zp[j][1] dby = (zp[j][3] - by) // zgcd[j] #dprint(ax,dax,ay,day) #dprint(bx,dbx,by,dby) t1 = ax * day - ay * dax - bx * day + by * dax t2 = dbx *day - dby * dax #dprint(t1,t2) if t2==0: continue if t1%t2!=0: continue k2 = t1 // t2 if k2 <0 or k2 > zgcd[j]: continue if dax!=0: t3 = k2*dbx + bx - ax if t3%dax!=0: continue k1 = t3//dax else: t3 = k2* dby + by - ay if t3%day !=0: continue k1 = t3//day if k1<0 or k1 > zgcd[i]: continue #dprint(ax + k1 * dax, ay+k1 * day) cross.append(k1) if not cross: continue cross.sort() d = 1 for j in range(1, len(cross)): if cross[j]!=cross[j-1]: d+=1 res-=d print(res) ```

output

1

1,660

23

3,321

Provide tags and a correct Python 3 solution for this coding contest problem. You are given n segments on a Cartesian plane. Each segment's endpoints have integer coordinates. Segments can intersect with each other. No two segments lie on the same line. Count the number of distinct points with integer coordinates, which are covered by at least one segment. Input The first line contains a single integer n (1 ≤ n ≤ 1000) — the number of segments. Each of the next n lines contains four integers Ax_i, Ay_i, Bx_i, By_i (-10^6 ≤ Ax_i, Ay_i, Bx_i, By_i ≤ 10^6) — the coordinates of the endpoints A, B (A ≠ B) of the i-th segment. It is guaranteed that no two segments lie on the same line. Output Print a single integer — the number of distinct points with integer coordinates, which are covered by at least one segment. Examples Input 9 0 0 4 4 -1 5 4 0 4 0 4 4 5 2 11 2 6 1 6 7 5 6 11 6 10 1 10 7 7 0 9 8 10 -1 11 -1 Output 42 Input 4 -1 2 1 2 -1 0 1 0 -1 0 0 3 0 3 1 0 Output 7 Note The image for the first example: <image> Several key points are marked blue, the answer contains some non-marked points as well. The image for the second example: <image>

instruction

0

1,661

23

3,322

Tags: fft, geometry, number theory Correct Solution: ``` # -*- coding: utf-8 -*- """ Created on Tue Sep 18 10:09:57 2018 @author: a.teffal Chalenge : Covered Points """ from math import gcd def covered_points(xa, ya, xb, yb): ''' assumes all parameters are integers Returns the covered points by the segement A-B having integer coordinates ''' #this just to have A in the left and B in the right if xb < xa : temp_x = xa xa = xb xb = temp_x temp_y = ya ya = yb yb = temp_y y_0 = abs(yb - ya) x_0 = xb - xa #pgdc_y_x = gcd(y_0, x_0) return gcd(y_0, x_0) + 1 def intersection2(xa, ya, xb, yb, xc, yc, xd, yd): if max(xa, xb) < min(xc,xd): return () if max(ya, yb) < min(yc,yd): return () # if both A-B and C - D ara parallel to x-axis # then no intersection (it is garanted that no segments lie on the same line) if (xa == xb and xc == xd) or (ya == yb and yc == yd): return () if ya == yb and yc == yd: return () a1 = yb - ya b1 = xb - xa #c1 = xa*(yb - ya) - ya*(xb - xa) c1 = xa*a1 - ya*b1 a2 = yd - yc b2 = xd - xc #c2 = xc*(yd - yc) - yc*(xd - xc) c2 = xc*a2 - yc*b2 det = a1 * b2 - a2 * b1 if det == 0: return () detx = c1 * b2 - c2 * b1 dety = -a1 * c2 + a2 * c1 if (detx % det) != 0 or (dety % det) !=0 : return () x = int(detx/det) y = int(dety/det) if x < min(xa, xb) or x > max(xa, xb) or x < min(xc, xd) or x > max(xc, xd) : return () if y < min(ya, yb) or y > max(ya, yb) or y < min(yc, yd) or y > max(yc, yd) : return () return (x, y) if __name__ == "__main__": #number of segments n = int(input()) #initiate lists of point coordinates Ax = [0]*n Ay = [0]*n Bx = [0]*n By = [0]*n n_cov = 0 intersections = {} #counting covered by each segment for i in range(n): line = input().split(sep = ' ') Ax[i] = int(line[0]) Ay[i] = int(line[1]) Bx[i] = int(line[2]) By[i] = int(line[3]) n_cov += covered_points(Ax[i], Ay[i], Bx[i], By[i]) #substructing reapted points (intersection) for i in range(n): for j in range(i+1, n): temp = intersection2(Ax[i], Ay[i], Bx[i], By[i], Ax[j], Ay[j], Bx[j], By[j]) if len(temp)==0: continue if temp in intersections: intersections[temp].append(i) intersections[temp].append(j) else: intersections[temp] = [i, j] for i in intersections: n_cov = n_cov - len(set(intersections[i])) + 1 print(n_cov) ```

output

1

1,661

23

3,323

Datasets:

AdapterOcean
/

python3-standardized_cluster_23_std

Dataset Card for "python3-standardized_cluster_23_std"