Imprecise Basic operations

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Philipp
Philipp on 13 Jul 2011
Hi everyone,
I am using Matlab 2009a. When I try to calculate
0.9 - 0.8 - 0.1
then the result is
-2.775557561562891 e-017
Close to zero, but not zero. Is it not possible to get a precise solution for a floating point operation? This minor imprecision has large implications for my programs.
Is there a way to get precise calculations? Why does matlab get this (quite easy task) wrong?
Thanks for your help!
  1 Comment
James Tursa
James Tursa on 13 Jul 2011
You might find this FEX submission useful:
http://www.mathworks.com/matlabcentral/fileexchange/22239-num2strexact-exact-version-of-num2str

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Accepted Answer

Nathan Greco
Nathan Greco on 13 Jul 2011
See: http://matlab.wikia.com/wiki/FAQ#Why_is_0.3_-_0.2_-_0.1_.28or_similar.29_not_equal_to_zero.3F
Welcome to the world of floating point computing.
A computer can't exactly represent most floating point numbers.
Example: Try calculating 3*(1/3) by hand, with writing out 1/3 to as many decimal places as you please. You will get .9999..., which is CLOSE to 1, but is not equal to 1 (which the true answer should be).
  2 Comments
Jan
Jan on 13 Jul 2011
+1: Exactly. The behaviour is neither "wrong" nor "inprecise". It simply demonstrates the limited precision.
Walter Roberson
Walter Roberson on 13 Jul 2011
Though if you go an infinite number of decimal places, 0.99999999999999.... (with infinite 9's) *is* equal to 1.
If you had an infinite number of bits, you could get an exact binary representation for 0.1 -- but of course no physically realizable computer can be infinite.

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More Answers (1)

Philipp
Philipp on 14 Jul 2011
Thanks for your quick responses. I was aware of the numerical issues when calculation 1/3 * 3, or using non-rational numbers. But I was not aware of the fact that the binary representation of 0.1 has a infinite number of digits. Thanks.

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