Element wise multiplication .* rounding problem
3 visualizaciones (últimos 30 días)
Mostrar comentarios más antiguos
Robin L.
el 21 de Feb. de 2019
Comentada: John D'Errico
el 21 de Feb. de 2019
Hello,
My name is Robin and I am currently using Matlab to compute some calculations.
But I have an issue. Let's take :
M = 564;
P = sin(5);
disp((M.*10.*P) - (M.*(10.*P)));
The result should be 0. Instead I get :
ans = 9.0949e-13
I understand the gap is very small, but I think Matlab rounding algorithm should finally provide 0.
Can you help me ?
0 comentarios
Respuesta aceptada
John D'Errico
el 21 de Feb. de 2019
Editada: John D'Errico
el 21 de Feb. de 2019
Nope. It does not. Welcome to the wild, whacky wonderful world of floating point numbers and arithmetic. A place where computations are only an approximation to mathematics, a model thereof. Where things like the associative law, the distributtive laws of arithmetic are only approximately true. A place where you need to learn to use tolerances on results, where you need to never trust the least significant bits of a result, at least not until you know, absolutely, because you fully understand the computations, what is happening. And even then, tolerances are still a good safety net, a good idea.
MATLAB does not automatically round everything that you do, expecting that a small number found really should be exactly zero. If it did, it would then introduce potential inaccuracies, even beyond those created by the use of floating point numbers themselves.
And if it did, do you think a chemist would be happy to see the reciprocal of Avogadro's number always be shown as exactly zero?
0 comentarios
Más respuestas (2)
madhan ravi
el 21 de Feb. de 2019
Second John D’Erricos answer as a workaround if you have symbolic math toolbox:
P=sym(sin(5)); % just alter your line to this
0 comentarios
Robin L.
el 21 de Feb. de 2019
1 comentario
John D'Errico
el 21 de Feb. de 2019
Please don't add an answer just ot make a comment.
But, yes, the associative law has problems in floating point arithmetic. Both expressions are valid, yet they can yield different results in the least significant bits.
Ver también
Productos
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!