为什么j的范围在(i+,n)中啊
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什么意思? hellometa 发表于 2022-11-20 20:31
什么意思?
nums =
target = 9
n = len(nums)
for i in range(n):
for j in range(i+1, n):
if nums + nums == target:
print()
就是那个j为什么在(i+1,n)中 本帖最后由 jackz007 于 2022-11-20 22:27 编辑
nums =
【外层循环】第1次循环:i = 0 , num =2【内层循环】j = 1, 2, 3 , num =7 , 11 , 15
【外层循环】第2次循环:i = 1 , num =7【内层循环】j = 2, 3 , num = 11 , 15
【外层循环】第3次循环:i = 2 , num = 11【内层循环】j = 3 , num = 15
for j in range(i + 1 , n) 的目的是为了在遍历期间,让 j 避开 i,保证 j != i 2531720775 发表于 2022-11-20 20:56
就是那个j为什么在(i+1,n)中
意思是把这个序列中的每个元素,依次赋值给j
页:
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