If statement - incorrect evaluation [duplicate]

Possible Duplicate:
How should I do floating point comparison?

this is a snippet of code and I can't figure out what's wrong with it.

The if statement is evaluating the numbers incorrectly and going to "else".

double m,k;

m = (y3-y1)/(x3-x1);
k = m*(-x1)+y1;

cout <<"\n\n"<< m <<"  "<< k << "\n";
cout <<"\n\n"<< ((-a)/b) <<"  "<< c/b << "\n";

if(m==((-a)/b) && k==c/b)
{
cout << "\nTaisne sakrīt ar kādu no trīsstūra malām!" << endl;
goto beigas;
}
else
cout << "\n\n WRONG \n\n";

The user inputs values x1,y1,x3,y3,a,b,c - all are double.

It seems to work fine only with "m". And it is strange that when I tried the following, the if statement was true with the same values:

if(m==((-a)/b) && k<c/b)

Here is a screenshot to get the whole problem:

The code starts after user has input all the values.

Thanks, any help would be greatly appreciated!

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marked as duplicate by David Hammen, Bo Persson, bmargulies, j0k, haulethOct 29 '12 at 22:24

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Floating-point arithmetic is not exact. – chris Oct 29 '12 at 19:02
And another thing, please AVOID the goto statement, GOTO is evil! – linello Oct 29 '12 at 19:06
What can happen to you if you use goto statement – Yamaneko Oct 29 '12 at 19:15
@VictorHugo: Incautious use of goto statements leads to code that is difficult to understand and maintain, because the control flow is less apparent to humans than code that uses more regular structures, such as blocks of code with single entry points and single exits, or at least well-defined exits to a common point. This increases costs of software development and maintenance and increases bugs. – Eric Postpischil Oct 29 '12 at 19:32

1 Answer

when you want to compare two floating points use a threshold like that one:

double m = a/b;

if (abs(m - (a/b)) < 0.0001)
{
// execute code where m == a/b here
}

so basically to compare float/double subtract them and make sure the result is less than certain threshold.

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A constant threshold value like 0.0001 may or may not be the best approach. Determining whether two floating-point values are close enough to be considered "equal" can be difficult; it can depend on how the values were computed and on what they mean. – Keith Thompson Oct 29 '12 at 19:15
This method reduces false negatives (incorrect rejections of equality) but increases false positives (incorrect acceptance of equality). Without knowing the requirements of the application, you cannot know whether this is the correct solution. – Eric Postpischil Oct 29 '12 at 19:16
Thanks, it solved the problem. Though I also had to make some alterations in the code elsewhere to make the whole program work. Also, the calculations work with a slight mistake percentage, say, 0.01% anyway, but that's affordable in my situation. Now I will know that you have to have a different approach when dealing with floating point numbers. – Kristaps Folkmanis Oct 29 '12 at 20:47