POJ1142——Smith Numbers
Smith Numbers
| Time Limit: 1000MS | Memory Limit: 10000K | |
| Total Submissions: 12388 | Accepted: 4244 |
Description
While skimming his phone directory in 1982, Albert Wilansky, a mathematician of Lehigh University,noticed that the telephone number of his brother-in-law H. Smith had the following peculiar property: The sum of the digits of that number was equal to the sum of the digits of the prime factors of that number. Got it? Smith's telephone number was 493-7775. This number can be written as the product of its prime factors in the following way:
4937775= 3*5*5*65837
The sum of all digits of the telephone number is 4+9+3+7+7+7+5= 42,and the sum of the digits of its prime factors is equally 3+5+5+6+5+8+3+7=42. Wilansky was so amazed by his discovery that he named this kind of numbers after his brother-in-law: Smith numbers.
As this observation is also true for every prime number, Wilansky decided later that a (simple and unsophisticated) prime number is not worth being a Smith number, so he excluded them from the definition.
Wilansky published an article about Smith numbers in the Two Year College Mathematics Journal and was able to present a whole collection of different Smith numbers: For example, 9985 is a Smith number and so is 6036. However,Wilansky was not able to find a Smith number that was larger than the telephone number of his brother-in-law. It is your task to find Smith numbers that are larger than 4937775!
4937775= 3*5*5*65837
The sum of all digits of the telephone number is 4+9+3+7+7+7+5= 42,and the sum of the digits of its prime factors is equally 3+5+5+6+5+8+3+7=42. Wilansky was so amazed by his discovery that he named this kind of numbers after his brother-in-law: Smith numbers.
As this observation is also true for every prime number, Wilansky decided later that a (simple and unsophisticated) prime number is not worth being a Smith number, so he excluded them from the definition.
Wilansky published an article about Smith numbers in the Two Year College Mathematics Journal and was able to present a whole collection of different Smith numbers: For example, 9985 is a Smith number and so is 6036. However,Wilansky was not able to find a Smith number that was larger than the telephone number of his brother-in-law. It is your task to find Smith numbers that are larger than 4937775!
Input
The input file consists of a sequence of positive integers, one integer per line. Each integer will have at most 8 digits. The input is terminated by a line containing the number 0.
Output
For every number n > 0 in the input, you are to compute the smallest Smith number which is larger than n,and print it on a line by itself. You can assume that such a number exists.
Sample Input
4937774 0
Sample Output
4937775
Source
Mid-Central European Regional Contest 2000
简单的质因数分解题
简单的质因数分解题
#include<cmath>
#include<cstdio>
#include<cstring>
#include<iostream>
#include<algorithm>
using namespace std;
int a[10010];
int b[10010];
int tot;
bool is_prime(int n)
{
int temp = (int)sqrt((double)n + 1);
for(int i = 2; i <= temp; i ++)
if( n % i == 0)
return false;
return true;
}
int digit_sum(int n)
{
int sum = 0;
while(n)
{
sum += n % 10;
n /= 10;
}
return sum;
}
void prime_factor(int n)
{
int temp = (int)sqrt((double)n + 1);
int cur = n;
for(int i = 2;i <= temp; i ++)
{
if(cur % i == 0)
{
a[++ tot] = i;
b[tot] = 0;
while(cur % i == 0)
{
b[tot] ++;
cur /= i;
}
}
}
if(cur != 1)
{
a[++ tot] = cur;
b[tot] = 1;
}
}
int main()
{
int n;
while(~scanf("%d", &n), n)
{
int cur = n;
int sum1, sum2;
while(1)
{
cur ++;
if( is_prime(cur) )
continue;
sum1 = digit_sum(cur);
sum2 = 0;
tot = 0;
prime_factor(cur);
for(int i = 1; i <= tot; i ++)
{
// printf("%d %d\n", a[i], b[i]);
sum2 += digit_sum(a[i]) * (b[i]);
}
if(sum1 == sum2)
break;
}
printf("%d\n", cur);
}
return 0;
}