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I want to get a algorithm to solve a linear equation of 8 variables. Actually I have a matrix A of (nx8) and matrix B of (8x1) and

A *  B = 0

and I know all the values of variables of matrix A. Now I want to find the all values of matrix B which is (8x1).

please help me.

EDIT : i need this to solve to get rotation matrix of camera from n sampled 3d-2d correlation points to do camera calibration.

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A library like ntl might save you a lot of hassle for this task. –  Kerrek SB Oct 3 '11 at 12:33
What value does n take? Less than, greater than or equal to 8? –  David Heffernan Oct 3 '11 at 12:41
n can be greater or equal to 8 (n >= 8 ) –  YAHOOOOO Oct 3 '11 at 13:08
Given your application it seems likely that measurement errors have to be considered in the solution process. When n >= 8 the trivial solution B = 0 may be the only one that exactly satisfies AB = 0, yet you surely expect to get at least one non-trivial solution to determine "rotation matrix of camera". Are you expecting a "nullspace" of dimension 1 (B uniquely determined up to a constant factor)? If so, then a least-squares minimization procedure may be what you need. –  hardmath Oct 3 '11 at 14:25

1 Answer 1

up vote 3 down vote accepted

Since your system of linear equations in homogeneous, there's at least one solution: B = 0.

To compute all solutions, you'd have to use a method like Gaussian Elimination.



S.O.S. Math


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To elaborate slightly, when Gaussian elimination puts the coefficient matrix A in row-echelon form (or better, reduced row-echelon form), those unknowns (entries of B) which correspond to columns without leading ones are "free" (independent) variables. You can choose any values for those, and the values of the variables corresponding to leading ones are then determined by back-solving (or simple substitution if the Gaussian elimination went all the way to reduced row-echelon form). The possible solutions B form the nullspace of A, and its dimension is n minus the rank of A. –  hardmath Oct 3 '11 at 14:05

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