# abs(sin(pi)) for mitigating systematic rounding error

I typed `abs(sin(pi))` into MATLAB. I expected it to give me the absolute value of pi, hoping to mitigate the natural rounding error with 'abs' (absolute value). I still get a rounding error. What should I do instead and why am I wrong?

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I don't understand the question. On my machine `sin(pi)` returns `1.2246e-16`; a reasonable outcome as it is approximately `eps(1)` from zero. `abs(sin(pi))` returns the same number as it should, since the number is already positive. Where is the problem in any of this? –  Colin T Bowers Jan 20 '13 at 22:18
Besides, abs shouldn't cause any rounding error whatsoever, no matter the argument. –  Gato Jan 20 '13 at 22:21
<pi>I was hoping for the result sin(pi)=0</p> <pi>I am confused as to why it approximates eps(1) at all</p> <pi>By having abs() I hoped to find the absolute version of the number to which 0 was being approximated</p> <pi>"Since the number is already positive"</p> <pi>I have now tried sin(abs(0)) thinking that my placement of abs might fix it to no avail</p> <pi>thank you for your help thus far, any further help greatly appreciated</p> –  Elsavador Jan 20 '13 at 22:23
Floating point error is a fact of life. You're certainly not going to get rid of it using the `abs` function. I answered a question on methods of mitigating floating point inaccuracy the other day actually, you can read up on it here. Also, when community members edit your question to improve the formatting and grammar, please don't edit it back to incorrect formatting and grammar. –  Colin T Bowers Jan 20 '13 at 22:27
I've also now tried loge(sin(pi)) to try to to nullify the log(e), without avail –  Elsavador Jan 20 '13 at 22:28

Floating point numbers are always going to give you problems like this. That's why it's common to write:

``````if (x - TestValue < 0.000001)
``````

``````if (x == TestValue)
``````

I would recommend trying to round the value down a decimal place or two, using something like this:

``````x = floor(x * 1e15) / 1e15;
``````

which rounds x down to the nearest 1e15. You could also use `round` or `ceil`. This article has some more information on similar strategies for rounding.

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Just out of curiosity, shouldn't it be easy for any math software that can handle algebra, to support whole number precision? –  Elsavador Jan 20 '13 at 22:37
Great question! There's a fantastic answer here. In short, it's all got to do with the fact that computers think and round numbers in base 2, whereas people think and round numbers in base 10, and there isn't a base 10 representation that perfectly fits inside a base 2 representation. See also Floating Point on Wikipedia. –  Fabian Tamp Jan 20 '13 at 22:57