对于10进制数d,求d位数。
例:
d=1000,位数=4 (分别是1,0,0,0)
1.将d逐项除10(常规方法)
#include <stdio.h>
int main() { int d = 1000; int counter = 0; while(d) { counter ++; d /= 10; } printf("%d\n", counter - 1); return 0; }
2.将d对10求对数
注意到log10(10) = 1, log10(100) = 2, log10(1000) = 3, 实际位数为log10(d) + 1 ;
而当d∈(100,1000)时,2 < log10(d) < 3,对log10(d)取整,求得2,也就是说实际位数为log10(d) + 1对于d不是10^n也成立。
于是,
#include <math.h>
#include <stdio.h>
int main() { int d = 1000; int counter = (int)log10(d); printf("%d\n", counter); return 0; }
3.运行时间对比
测试1千万次 ,运行结果:
计算得出结果耗时,方法1:约490ms,方法2:约70ms。可以看出方法2时间性能明显优于方法1.
实际测试代码:
int main() { int d = 1000; int counter = 0; int n = 10000000; clock_t start = clock(); while(n -- ) { counter = (int)log10(d); } clock_t finish = clock(); printf("%ldms, %d\n", finish - start, counter); n = 10000000; start = clock(); while(n --) { d = 1000; counter = 0; while(d) { counter ++; d /= 10; } } finish = clock(); printf("%ldms, %d\n", finish - start, counter - 1); return 0; }
运行结果:
