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i decided to post this question because i'm not sure why i'm getting this result. I researched in this site and others finding no solution. Sorry if i'm violating this websites rules but remember, i'm new. This is the code of the function written in C that is returning the unexpected result:

double gauss (double average, double variance, int data)
    double model,power;
    power = ((((data-average)*(data-average))/(2*variance))*(1));
    model = (pow(E,(int)power));
    return 1.0/model;

i don't know if i should post the rest of my code but i will if you want to, i just wanted to keep the post short. The issue is occuring with 1.0/model because model is a very big number.

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At the least, it would help if you could show what the value of model is at the point of division. Also, have you tried using long double? – This isn't my real name Jul 11 '13 at 0:14
What value has power? Most likely, model = pow(E,(int)power); overflows and model becomes infinity. If the representation of doubles is, as it most likely is, IEEE754, no reciprocal of a finite value is 0. – Daniel Fischer Jul 11 '13 at 0:18
@ElchononEdelson actually i just changed my printf("%lf", gauss(double average, double variance, int data) to printf("%e", gauss(double average, double variance, int data)) and now it's showing a result diferent to 0. – Gil Lázaro Jul 11 '13 at 0:26
I thought that might be the case. People often think a value is zero just because printf output '0'. – paddy Jul 11 '13 at 0:28
@paddy so should i always use scientific notation to avoid these kind of scenarios? is it a good practice? – Gil Lázaro Jul 11 '13 at 0:37

2 Answers 2

The value of power must be tending towards infinity as it gives the result 0. As suggested by @jh314, try long double for all variables. It will increase the range of your model variable & may be give any accurate result.

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C doubles have limited precision, so if you divide 1.0 by a very large double, the precision error will net you 0 (effectively, the actual answer is so close to zero that the precision error will round to zero).

You could try to use long double for more precision, but I think you would be better off using an arbitrary precision library like GMP.

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I think Daniel Fischer is closer to the truth. – Mats Petersson Jul 11 '13 at 0:25

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