Why does 1 - 2/3 - 1/3 not equal zero?
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Try this:
>> 1 - 2/3 - 1/3
MATLAB gets the wrong answer:
5.5511e-017
1 commentaire
James Tursa
le 14 Juil 2011
Modifié(e) : James Tursa
le 7 Déc 2020
You might find this FEX submission useful:
Réponse acceptée
Matt Fig
le 20 Jan 2011
6 votes
Ned! I am sure you know that the reason why (1 - 2/3 - 1/3) ~=0 is that MATLAB does its work in floating point arithmetic, not in exact arithmetic.
1 commentaire
Ned Gulley
le 20 Jan 2011
Plus de réponses (3)
Doug Hull
le 21 Jan 2011
As is mentioned frequently in the newsgroup, some floating point numbers can not be represented exactly in binary form. So that's why you see the very small but not zero result. See EPS.
The difference is that 0:0.1:0.4 increments by a number very close to but not exactly 0.1 for the reasons mentioned below. So after a few steps it will be off whereas [0 0.1 0.2 0.3 0.4] is forcing the the numbers to their proper value, as accurately as they can be represented anyway.
a=[0 0.1 0.2 0.3 0.4];
b=[0:.1:.4];
as=sprintf('%20.18f\n',a)
as =
0.000000000000000000 % ==
0.100000000000000010 % ==
0.200000000000000010 % ==
0.299999999999999990 % ~= bs !
0.400000000000000020 % ==
bs=sprintf('%20.18f\n',b)
bs =
0.000000000000000000 % ==
0.100000000000000010 % ==
0.200000000000000010 % ==
0.300000000000000040 % ~= as !
0.400000000000000020 % ==
% -and-
format hex;
hd=[a.',b.']
hd =
0000000000000000 0000000000000000 % ==
3fb999999999999a 3fb999999999999a % ==
3fc999999999999a 3fc999999999999a % ==
3fd3333333333333 3fd3333333333334 % ~= !
3fd999999999999a 3fd999999999999a % ==
If you're trying to compare two floating-point numbers, be very careful about using == to do so. An alternate comparison method is to check if the two numbers you're comparing are "close enough" (as expressed by a tolerance) to one another:
% instead of a == b
% use:
areEssentiallyEqual = abs(a-b) < tol
% for some small value of tol relative to a and b
% perhaps defined using eps(a) and/or eps(b)
You can see this same sort of behavior outside MATLAB. Using pencil and paper (or a chalkboard, or a whiteboard, etc.) compute x = 1/3 to as many decimal places as you want. The number of decimal places must be finite, however. Now compute y = 3*x. In exact arithmetic, y would be exactly 1; however, since x is not exactly one third but is a rounded approximation to one third, y will not be exactly 1.
For a readable introduction to floating point arithmetic, look at Cleve's Corner article from 1996: Floating Points (PDF)
For more rigorous and detailed information on floating point arithmetic, read the following paper: What Every Computer Scientist Should Know About Floating Point Arithmetic.
5 commentaires
Amir
le 15 Juil 2011
how to fix this problem on tf objects?
Z= tf([1 1],1,-1,'variable','z')-1 ;
>> Z-(1/3)*Z-(2/3)*Z Transfer function: 1.11e-016 z
>> abs(H) ??? Undefined function or method 'abs' for input arguments of type 'tf'.
Walter Roberson
le 15 Juil 2011
Try (3*Z-Z-2*Z)/3
Amir
le 28 Juil 2011
that's just an example to for the case. I need a solution to work with any given system!(G/H) wherever I do a simple arithmetic with my tf's it does not zero out when its necessary.
Amir
le 29 Juil 2011
basically many arithmetic functions dont work for tf objects.
Amir
le 29 Juil 2011
I wrote my code wondering if matlab must have it!
function [am] = cancelout(a,tol) %for small gain probelm
for k=1:size(a,1)
for m=1:size(a,2)
[z,gain] =zero(a(k,m));
if ( abs(gain)<tol)
a(k,m)=0;
end
gain=NaN;
end
end
am=a;
Derek O'Connor
le 29 Juil 2011
1 vote
Ned,
Let me add to the confusion by asking
1. Why does en1 = (1 - 2/3) - 1/3 = 5.5511e-017 = 2^(-54) = eps/2^2?
2. Why does en2 = 1 - (2/3 + 1/3) = 0?
3. Why does Kahan's
a = 4/3; b = a-1; c = b+b+b; ek = 1-c = 2.2204e-016 = 2^(-52) = eps?
An explanation of Kahan's result is given on page 7 of:
The difficulties in defining machine precision are discussed by Nick Higham and Cleve Moler here:
Derek O'Connor
Skaletki Liviu
le 7 Déc 2020
0 votes
how I write this expression |n-(N-1)/2| ?
1 commentaire
Walter Roberson
le 7 Déc 2020
abs(n-(N-1)/2)
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