10976 Fractions Again
It is easy to see that for every fraction in the form 1 k (k > 0), we can always find two positive integers x and y, x ≥ y, such that: 1 k = 1 x + 1 y Now our question is: can you write a program that counts how many such pairs of x and y there are for any given k? Input Input contains no more than 100 lines, each giving a value of k (0 < k ≤ 10000). Output For each k, output the number of corresponding (x, y) pairs, followed by a sorted list of the values of x and y, as shown in the sample output.
Sample Input
2
12
Sample Output
2
1/2 = 1/6 + 1/3
1/2 = 1/4 + 1/4
8
1/12 = 1/156 + 1/13
1/12 = 1/84 + 1/14
1/12 = 1/60 + 1/15
1/12 = 1/48 + 1/16
1/12 = 1/36 + 1/18
1/12 = 1/30 + 1/20
1/12 = 1/28 + 1/21
1/12 = 1/24 + 1/24
#include <iostream>
#include <cstdio>
using namespace std;
int xx[],yy[];
int main()
{
int k,x,y,total; while(cin >> k && k!=)
{
total = ;
for(int i=k+; i<=*k; i++)
{
if(k*i%(i-k)==)
{
xx[total] = k*i/(i-k);
yy[total] = i;
total++;
}
}
cout<<total<<endl;
for(int i=; i<total; i++)
{
printf("1/%d = 1/%d + 1/%d\n",k,xx[i],yy[i]);
}
}
return ;
}