# comparison of two same type of lines in a code

i have two equations here m = (4*z - 1 + i)/2; w = (2*z + i); both equations use same type of variables but when value of p is greater than 14 m%n gives the correct value whereas w%n gives 1 where n is any positive integer.. can anyone help? its a code that would calculate the almost isoceles pythagorean triplets.. means m^2 + (m+1)^2 = w^2... its pretty difficult to calculate to calculate the output for higher inputs as p ranges upto 10^18... but as sson as p > 14.. w%n gives 1.. this program works fine for smaller values that is upto p = 13..

``````#include<stdio.h>
#include<math.h>
int main()
{
double k;
unsigned int m;
unsigned int n;
double y;
double i;
unsigned int w;
unsigned int x;
unsigned int z;
unsigned int p;
int t;
int q;

scanf("%d",&t);

for(q = 0; q < t; q++) {
k = 1;
y = 1;
scanf("%u%u",&p,&n);

k = pow(17 + 12*pow(2,0.5),p);
y = pow(17 - 12*pow(2,0.5),p);
x = (k + y - 2)/32;
z = pow(x,0.5);
i = pow(8*x+1,0.5);
m = (4*z - 1 + i)/2;
w = (2*z + i);

printf("%ld %ld\n",m%n,w%n);
}
return 0;
}
``````
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Maybe `w` is 1? –  jxh May 31 '13 at 8:19
Your question is difficult to understand. Construct a minimum test case reproducing the problem (I expect a complete program of about 6 lines of code in total (also include input, expected output and actual output) should show this specific problem). If you haven't narrowed it down yet, print the value of each variable to see where the problem is and, if anything is unclear as to why this is a problem, ask a question about that. –  Dukeling May 31 '13 at 8:21
I'm very concerned with how you're going between floating point and integral variable types and expecting some sort of understandable answer. But please provide us exactly what your input is you are using to produce this, what output you are seeing with that input, and what output you expect to see. –  xaxxon May 31 '13 at 8:24
"but when value of p is greater than 14 `m%n` gives the correct value" No, it doesn't. Print out the result of the computation for `p` ranging from 0 to 20, say, or 30. Without taking the modulus. The problem you're trying to solve cannot reasonably be solved (except for the first few very small `p`) using floating point types. It's an integer problem, to be solved with integer arithmetic. –  Daniel Fischer May 31 '13 at 11:46
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## 1 Answer

k and y are both raised to the power of p

``````k = pow(17 + 12*pow(2,0.5),p);
y = pow(17 - 12*pow(2,0.5),p);
``````

and then assigned to an integer which can't hold nearly as large a number.

``````x = (k + y - 2)/32;
``````

but on the next line you immediately promote it back to double:

``````z = pow(x,0.5);
``````

I'm not sure exactly what kind of output you are seeing, but this is unlikely to be a good thing. Should x be a double instead of an int?

This doesn't really affect your problem, but why not cache the sqrt(2) into a double before you start your loop so you're not recomputing it multiple times each iteration through your for loop

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x is always an integer for any value of k and y.. because z is always an positive integer as its a part of pythagorean triplet.. i don't think there is any problem in using x as unsigned integer.. –  Pawan Burnwal Jun 1 '13 at 13:22
@PawanBurnwal it has nothing to do with being an integer it has to do with the binary representation not being able to hold the number. –  xaxxon Jun 2 '13 at 19:04
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