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I have simple question in matlab. I have the equation : A*H=b I know A and b I try to use this expression:


but I get wrong value: example:

       A =

       231   481
       233   488
       241   481
       243   489
b =

    11    31
     6    20
    21    31
    18    22

And I get

H =

    1.1627    0.2713
   -0.5396   -0.0791



ans =

    9.0386   24.6299
    7.5868   24.6189
   20.6659   27.3434
   18.6745   27.2532

This is no b

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You may be interested to know that there are (at least) three matlab commands to solve this: pinv(A)*b, linsolve(A,b), and of course A\b. Linsolve has many more options, for instance, H = linsolve(A,b,struct('UT', true)) gives a rather different (not least-squares) answer. –  emarti Aug 20 '12 at 6:08

2 Answers 2

up vote 1 down vote accepted

From typing help slash at the command prompt:

\ Backslash or left division.

A\B is the matrix division of A into B, which is roughly the same as INV(A)*B , except it is computed in a different way. If A is an N-by-N matrix and B is a column vector with N components, or a matrix with several such columns, then X = A\B is the solution to the equation A*X = B. A warning message is printed if A is badly scaled or nearly singular. A\EYE(SIZE(A)) produces the inverse of A.

If A is an M-by-N matrix with M < or > N and B is a column vector with M components, or a matrix with several such columns, then X = A\B is the solution in the least squares sense to the under- or overdetermined system of equations A*X = B. The effective rank, K, of A is determined from the QR decomposition with pivoting. A solution X is computed which has at most K nonzero components per column. If K < N this will usually not be the same solution as PINV(A)*B. A\EYE(SIZE(A)) produces a generalized inverse of A.

So, the second paragraph applies to your case. In other words, there is no H that can satisfy A*H = b for your problem, but Matlab computes the best approximation to it (in a least-squares sense). So the result you get is correct.

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Thanks, I was think on this but I was not sure –  Beno Aug 19 '12 at 19:31
h = b ./ A;

h = 0.0476    0.0644
    0.0258    0.0410
    0.0871    0.0644
    0.0741    0.0450

A.*h = 11    31
        6    20
       21    31
       18    22

Or, you could add the . to your division, ie h = A .\ b

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-1: first read up on linear equations and then Matlab's backslash operator. Your answer only works for this particular case, and moreover, is not what the OP means. –  Rody Oldenhuis Aug 19 '12 at 18:50
My answer worked because A and b were the same dimension matrices. I didn't realize this system of equations didn't have an exact solution. –  AGS Aug 19 '12 at 19:06

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