# algorithm to solve linear equation of n variables?

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).

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

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.