Driver Ji likes the digit “1”. He has an accumulator which shows the sum of input number. He lists all of positive number no more than N and starts counting from one, two, three . . . Every time he counts a number he will add the number of digit “1” in this number to accumulator at the same time. The amazing thing happens! At some times, when he finishes counting a number X, the number which on the accumulator is X exactly, he will regard X as “JiLi Number” which means lucky number. Now he wants to know the number of “JiLi Numbers” and the biggest “JiLi Number” no more than N.
Input
There are several test cases and the each test case is a line contains an positive integer N, (1 < N ≤ 10100)
Output
For each test case, output two integers which donates the number of “JiLi Numbers” and the biggest “JiLi Number”.
Sample Input
1
100000000000
Sample Output
1 1
83 1111111110
差一点点儿......真的是没干劲啊。
找出规律:
n为1ex-1时,数字1的个数为,x*1e(x-1);
x为10之后,数字增长就无法赶超数字1的个数了,也就是说之后不会再有吉利数了。
虽然感受到了这个关键点,还是没敢打表直接做是怎么回事???难以置信这道题怎么这么玄学。
#include <cstdio>
#include <cstring>
const int maxn=110;
char s[maxn];
long long m[83]={
1,
199981,
199982,
199983,
199984,
199985,
199986,
199987,
199988,
199989,
199990,
200000,
200001,
1599981,
1599982,
1599983,
1599984,
1599985,
1599986,
1599987,
1599988,
1599989,
1599990,
2600000,
2600001,
13199998,
35000000,
35000001,
35199981,
35199982,
35199983,
35199984,
35199985,
35199986,
35199987,
35199988,
35199989,
35199990,
35200000,
35200001,
117463825,
500000000,
500000001,
500199981,
500199982,
500199983,
500199984,
500199985,
500199986,
500199987,
500199988,
500199989,
500199990,
500200000,
500200001,
501599981,
501599982,
501599983,
501599984,
501599985,
501599986,
501599987,
501599988,
501599989,
501599990,
502600000,
502600001,
513199998,
535000000,
535000001,
535199981,
535199982,
535199983,
535199984,
535199985,
535199986,
535199987,
535199988,
535199989,
535199990,
535200000,
535200001,
1111111110
};
int main()
{
while(~scanf("%s",s)){
int len=strlen(s);
if(len>10){
printf("83 1111111110\n");
continue;
}
long long num=0;
int i;
for(int i=0;i<len;++i){
num*=10;
num+=(s[i]-'0');
}
for(i=0;i<83;++i)
if(num<m[i]) break;
printf("%d %lld\n",i,m[i-1]);
}
return 0;
}