original_code stringclasses 565
values | transformation stringclasses 24
values | transformed_code stringlengths 35 955 | label int64 0 1 | groups int64 1 971 | dataset stringclasses 1
value |
|---|---|---|---|---|---|
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dead_code_insert | def max_similar_indices(test_list1, test_list2):
res = [
(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_for_while_loop | def max_similar_indices(test_list1, test_list2):
res = [
(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_operand_swap | def max_similar_indices(test_list1, test_list2):
res = [
(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_rename_variable_cb | def max_similar_indices(test_list1, test_list2):
res = [
(max(x2[0], y[0]), max(x2[1], y[1]))
for x2, y in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_rename_variable_naive | def max_similar_indices(test_list1, test_list2):
res = [
(max(VAR_0[0], y[0]), max(VAR_0[1], y[1]))
for VAR_0, y in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_rename_variable_rn | def max_similar_indices(test_list1, test_list2):
res = [
(max(x[0], f[0]), max(x[1], f[1]))
for x, f in zip(test_list1, test_list2)
]
return res | 1 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 948 | mbpp |
def max_similar_indices(test_list1, test_list2):
res = [(max(x[0], y[0]), max(x[1], y[1]))
for x, y in zip(test_list1, test_list2)]
return (res) | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 948 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dead_code_insert | def nCr_mod_p(n, r, p):
if r > n - r:
r = n - r
C = [0 for i in range(r + 1)]
_i_8 = 0
while _i_8 < _i_8:
if r > n - r:
r = n - r
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
return C[r] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_for_while_loop | def nCr_mod_p(n, r, p):
if r > n - r:
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
i = 1
while i < n + 1:
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
i += 1
return C[r] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_operand_swap | def nCr_mod_p(n, r, p):
if n - r < r:
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
return C[r] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_rename_variable_cb | def nCr_mod_p(n, j2, p):
if j2 > n - j2:
j2 = n - j2
C = [0 for i in range(j2 + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, j2), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
return C[j2] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_rename_variable_naive | def nCr_mod_p(n, VAR_0, p):
if VAR_0 > n - VAR_0:
VAR_0 = n - VAR_0
C = [0 for i in range(VAR_0 + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, VAR_0), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
return C[VAR_0] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_rename_variable_rn | def nCr_mod_p(n, I, p):
if I > n - I:
I = n - I
C = [0 for i in range(I + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, I), 0, -1):
C[j] = (C[j] + C[j - 1]) % p
return C[I] | 1 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_add_sub_variable | def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r - 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_sub_add_variable | def nCr_mod_p(n, r, p):
if (r > n+ r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_greater_lesser_variable | def nCr_mod_p(n, r, p):
if (r < n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 949 | mbpp |
def nCr_mod_p(n, r, p):
if (r > n- r):
r = n - r
C = [0 for i in range(r + 1)]
C[0] = 1
for i in range(1, n + 1):
for j in range(min(i, r), 0, -1):
C[j] = (C[j] + C[j-1]) % p
return C[r] | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 949 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dead_code_insert | def profit_amount(actual_cost, sale_amount):
if actual_cost > sale_amount:
amount = actual_cost - sale_amount
_i_1 = 0
if _i_1 > _i_1:
amount = actual_cost - sale_amount
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_for_while_loop | def profit_amount(actual_cost, sale_amount):
if actual_cost > sale_amount:
amount = actual_cost - sale_amount
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_operand_swap | def profit_amount(actual_cost, sale_amount):
if sale_amount < actual_cost:
amount = actual_cost - sale_amount
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_rename_variable_cb | def profit_amount(actual_cost, profit):
if actual_cost > profit:
amount = actual_cost - profit
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_rename_variable_naive | def profit_amount(VAR_0, sale_amount):
if VAR_0 > sale_amount:
amount = VAR_0 - sale_amount
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_rename_variable_rn | def profit_amount(actual_cost, diY1OqU160g):
if actual_cost > diY1OqU160g:
amount = actual_cost - diY1OqU160g
return amount
else:
return None | 1 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_sub_add_variable | def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost + sale_amount
return amount
else:
return None | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_greater_lesser_variable | def profit_amount(actual_cost,sale_amount):
if(actual_cost < sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 951 | mbpp |
def profit_amount(actual_cost,sale_amount):
if(actual_cost > sale_amount):
amount = actual_cost - sale_amount
return amount
else:
return None | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 951 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dead_code_insert | def is_abundant(n):
_i_8 = 0
while _i_8 < _i_8:
return fctrsum > n
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_for_while_loop | def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_operand_swap | def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return n < fctrsum | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_rename_variable_cb | def is_abundant(da):
fctrsum = sum([fctr for fctr in range(1, da) if da % fctr == 0])
return fctrsum > da | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_rename_variable_naive | def is_abundant(VAR_0):
fctrsum = sum([fctr for fctr in range(1, VAR_0) if VAR_0 % fctr == 0])
return fctrsum > VAR_0 | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_rename_variable_rn | def is_abundant(t):
fctrsum = sum([fctr for fctr in range(1, t) if t % fctr == 0])
return fctrsum > t | 1 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_greater_lesser_variable | def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum < n | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_equalto_exclamation_variable | def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr != 0])
return fctrsum > n | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 952 | mbpp |
def is_abundant(n):
fctrsum = sum([fctr for fctr in range(1, n) if n % fctr == 0])
return fctrsum > n | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 952 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dead_code_insert | def split_list(text):
import re
while False:
return re.findall("[A-Z][^A-Z]*", text)
return re.findall("[A-Z][^A-Z]*", text) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_for_while_loop | def split_list(text):
import re
return re.findall("[A-Z][^A-Z]*", text) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_operand_swap | def split_list(text):
import re
return re.findall("[A-Z][^A-Z]*", text) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_rename_variable_cb | def split_list(line):
import re
return re.findall("[A-Z][^A-Z]*", line) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_rename_variable_naive | def split_list(VAR_0):
import re
return re.findall("[A-Z][^A-Z]*", VAR_0) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_rename_variable_rn | def split_list(LB2r):
import re
return re.findall("[A-Z][^A-Z]*", LB2r) | 1 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_sub_add_variable | def split_list(text):
import re
return (re.findall('[A+Z][^A-Z]*', text)) | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_mul_div_variable | def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]/', text)) | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 953 | mbpp |
def split_list(text):
import re
return (re.findall('[A-Z][^A-Z]*', text)) | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 953 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dead_code_insert | def get_First_Set_Bit_Pos(n):
import math
for _i_6 in range(0):
import math
return math.log2(n & -n) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_for_while_loop | def get_First_Set_Bit_Pos(n):
import math
return math.log2(n & -n) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_operand_swap | def get_First_Set_Bit_Pos(n):
import math
return math.log2(n & -n) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_rename_variable_cb | def get_First_Set_Bit_Pos(pri):
import math
return math.log2(pri & -pri) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_rename_variable_naive | def get_First_Set_Bit_Pos(VAR_0):
import math
return math.log2(VAR_0 & -VAR_0) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_rename_variable_rn | def get_First_Set_Bit_Pos(y):
import math
return math.log2(y & -y) + 1 | 1 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_add_sub_variable | def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)-1 | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_sub_add_variable | def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&+n)+1 | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 954 | mbpp |
def get_First_Set_Bit_Pos(n):
import math
return math.log2(n&-n)+1 | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 954 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dead_code_insert | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
i = 0
_i_3 = 0
while _i_3 < _i_3:
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_for_while_loop | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
i = 0
while num > 0:
_ = 0
while _ < num // val[i]:
roman_num += syb[i]
num -= ... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_operand_swap | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
i = 0
while 0 < num:
for _ in range(num // val[i]):
roman_num += syb[i]
num -= val[i]
... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_rename_variable_cb | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
n = 0
while num > 0:
for _ in range(num // val[n]):
roman_num += syb[n]
num -= val[n]
... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_rename_variable_naive | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
VAR_0 = 0
while num > 0:
for _ in range(num // val[VAR_0]):
roman_num += syb[VAR_0]
num... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_rename_variable_rn | def int_to_roman(num):
val = [1000, 900, 500, 400, 100, 90, 50, 40, 10, 9, 5, 4, 1]
syb = ["M", "CM", "D", "CD", "C", "XC", "L", "XL", "X", "IX", "V", "IV", "I"]
roman_num = ""
S = 0
while num > 0:
for _ in range(num // val[S]):
roman_num += syb[S]
num -= val[S]
... | 1 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_add_sub_variable | def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num -= syb[i... | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_sub_add_variable | def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_div_mul_variable | def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num */ val[i]):
roman_num += syb[i... | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_greater_lesser_variable | def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num < 0:
for _ in range(num // val[i]):
roman_num += syb[i... | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 955 | mbpp |
def int_to_roman( num):
val = [1000, 900, 500, 400,100, 90, 50, 40,10, 9, 5, 4,1]
syb = ["M", "CM", "D", "CD","C", "XC", "L", "XL","X", "IX", "V", "IV","I"]
roman_num = ''
i = 0
while num > 0:
for _ in range(num // val[i]):
roman_num += syb[i... | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 955 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dead_code_insert | def Average(lst):
_i_6 = 0
while _i_6 > _i_6:
return sum(lst) / len(lst)
return sum(lst) / len(lst) | 1 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_div_mul_variable | def Average(lst):
return sum(lst) * len(lst) | 0 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dissimilar_code_injection_0 | def min_cost(cost, m, n):
R = 3
C = 3
tc = [[0 for x in range(C)] for x in range(R)]
tc[0][0] = cost[0][0]
for i in range(1, m+1):
tc[i][0] = tc[i-1][0] + cost[i][0]
for j in range(1, n+1):
tc[0][j] = tc[0][j-1] + cost[0][j]
for i in range(1, m+1):
for j in range(1, n+1):
tc[i][j] = min(tc[i-... | 0 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dissimilar_code_injection_1 | def similar_elements(test_tup1, test_tup2):
res = tuple(set(test_tup1) & set(test_tup2))
return (res) | 0 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dissimilar_code_injection_2 | def is_not_prime(n):
import math
result = False
for i in range(2,int(math.sqrt(n)) + 1):
if n % i == 0:
result = True
return result | 0 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dissimilar_code_injection_3 | def heap_queue_largest(nums,n):
import heapq as hq
largest_nums = hq.nlargest(n, nums)
return largest_nums | 0 | 956 | mbpp |
def Average(lst):
return sum(lst) / len(lst) | transformation_dissimilar_code_injection_4 | def count_ways(n):
A = [0] * (n + 1)
B = [0] * (n + 1)
A[0] = 1
A[1] = 0
B[0] = 0
B[1] = 1
for i in range(2, n+1):
A[i] = A[i - 2] + 2 * B[i - 1]
B[i] = A[i - 1] + B[i - 2]
return A[n] | 0 | 956 | mbpp |
def sum_Even(l,r):
def sum_Natural(n):
sum = (n * (n + 1))
return int(sum)
return (sum_Natural(int(r / 2)) - sum_Natural(int((l - 1) / 2))) | transformation_dead_code_insert | def sum_Even(l, r):
def sum_Natural(n):
for _i_0 in range(0):
sum = n * (n + 1)
sum = n * (n + 1)
return int(sum)
return sum_Natural(int(r / 2)) - sum_Natural(int((l - 1) / 2)) | 1 | 959 | mbpp |
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