Here is described the so-called SMITH–CORNACCHIA ALGORITHM. Supposing that there are two relative prime positive integer `d`

and `n`

, the algorithm finds all primitive solutions `x,y`

for which `x*x+d*y*y=n`

.

The algorithm follows:

Input: Relatively prime positive integers

`d`

and`n`

output as i said

`(x,y)`

pairFind all positive solutions (less than n)

`t^2+d=0(mod n)`

For each solution `t`

, ﬁnd the ﬁrst remainder `x`

less than `sqrt(n)`

in the Euclidean algorithm applied to `n`

and `t`

; if `y=sqrt((n-x^x)/d)`

is integer,output `(x,y)`

Here is my code:

```
#include <iostream>
#include <math.h>
#include <vector>
#include <typeinfo>
using namespace std;
int main(){
int y=0;
int x=0;
vector<int>m;
int t=0;
int d,n;
cout<<"enter values :"<<endl;
cin>>n>>d;
for (t=1;t<n;t++){
if ((t*t + d)%n==0){
m.push_back(t);
}
}
vector<int>::const_iterator it;
return 0;
}
```

I can't continue. Please help me. How can I access elements of the vector so that I can find the remainders of GCD algorithm? Please help.

See also the last page of this: http://library.msri.org/books/Book44/files/02buhler.pdf