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I wrote this test code:

NSLog(@"%g", tan(M_PI / 2.0));

and the output of the console is:

1.63312e+16

The issues is about approximation, right? Did I make some mistakes or the tan function of math.h really doesn't handle this case itself (returning me INFINITY) ? shall I handle theese input cases myself (example: when I get pi/2 input value I return an error message) or is there a better (more elegant) way to get the correct value ?

Thanks

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You have accepted an incorrect answer. –  Keith Thompson Jan 29 '12 at 1:02

1 Answer 1

up vote 8 down vote accepted

Its because M_PI != real pi because it cannot be represented, so what you get from M_PI is approximation of pi, which its tangent is what you get.
Edit: the following:

printf("cos(M_PI / 2) = %.30f\nsin(M_PI / 2) = %.30f\n",
       cos(M_PI / 2), sin(M_PI / 2));

will print

cos(M_PI / 2) = 0.000000000000000061232339957368
sin(M_PI / 2) = 1.000000000000000000000000000000

Which shows cos(pi / 2) is non-zero.
Doing the division will give

1.63312393531953E16

which is exactly what you get.

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This is the correct answer, because infinity can be represented using floating point numbers. –  user142019 Dec 10 '11 at 17:00
    
That's true, but the sin and cos functions are also approximations, and can handle this correctly. Calling cos on M_PI will return -1 correctly, and not an approximation, and sin will return 0. –  Itai Ferber Dec 10 '11 at 17:02
    
Thanks but I already knew it in fact that's what I meant with "the issues is about approximation"... My doubt was about tan returning value which is not INFINITY as I expected... –  Massimo Dec 10 '11 at 17:06
1  
@ItaiFerber: then you get two definitions of tan, programmatically constraint tan, and mathematical tan. whoever wrote the standard library liked mathematical tan better. if you need programmatically constraint tan, like any other function you need thats not in the standard library, you have to write it yourself –  Dani Dec 10 '11 at 18:28
1  
@ItaiFerber: I disagree. Any kind of fiddling around with approximate values, as you suggest, would mean that you can't do correct calculations with numbers that really are close to, but not equal to, pi/2. It's not possible to represent pi/2 exactly in floating-point, and anyone writing software that performs floating-point calculations needs to understand that and deal with the consequences. –  Keith Thompson Jan 29 '12 at 1:02

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