# Solving a system of equations programmably? [duplicate]

Possible Duplicate:
System of linear equations in C++?

I have the following 2 systems of equations:

For a,b,c,d:

``````0 = a * r1_x + b * r1_x * r1_y + c * r1_y + d
1 = a * r2_x + b * r2_x * r2_y + c * r2_y + d
0 = a * r3_x + b * r3_x * r3_y + c * r3_y + d
1 = a * r4_x + b * r4_x * r4_y + c * r4_y + d
``````

For e,f,g,h:

``````0 = e * r1_x + f * r1_x * r1_y + g * r1_y + h
0 = e * r2_x + f * r2_x * r2_y + g * r2_y + h
1 = e * r3_x + f * r3_x * r3_y + g * r3_y + h
1 = e * r4_x + f * r4_x * r4_y + g * r4_y + h
``````

I know the values of r1_x, r1_y, r2_x, r2_y, r3_x, r3_y, r4_x, r4_y, and need to solve for a,b,c,d in the first one, and ,e,f,g, h in the second.

I know how I would solve these with pencil and paper, but I'm really unsure how to program it. How could I solve the above equations in C or C++ (or psuedocode).

Thanks

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@ShreevatsaR - that question is a lot more general. This one has simpler solutions. –  IVlad Jul 18 '10 at 16:47
@IVlad: Both are precisely "system of linear equations", right? I don't think there's anything much simpler here than using a general system-of-linear-equations solver (which is not too hard, BTW). –  ShreevatsaR Jul 18 '10 at 16:49
@ShreevatsaR: For this particular problem, Cramer's rule might be faster and less error-prone; yet I think using a general linear equation solver would be superior. –  jpalecek Jul 18 '10 at 16:55
@jpalacek: And yet Cramer's rule works for a general system of linear equations too (and probably may be used by such a solver for small inputs). :-) I think the real problem here is that the other question has such poor answers, in which case this question should be redirected there and better answers must be posted there. At least that's what I thought a goal of Stack Overflow was, to compile a set of good answers to questions that stand for eternity. –  ShreevatsaR Jul 18 '10 at 16:58
since this is a copy of the equations I wrote here: stackoverflow.com/questions/3273155/… , you could simply look at the link I gave on that answer and see how AGG solves it - it's right there on the source code: antigrain.com/__code/include/agg_simul_eq.h.html –  Carlos Scheidegger Jul 18 '10 at 17:52

## marked as duplicate by ShreevatsaR, Carl Norum, jpalecek, Ken Bloom, GravitonJul 19 '10 at 0:36

You can map it to a matrix system, `A x = b`, where `A` is the coefficient matrix, `b` is the solution vector, and `x` are the unknowns. You can either implement Gaussian elimination, or use a well known library. If you use LAPACK, the routine you want it `dgesv`.

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+1 best answer here –  Dave O. Jul 18 '10 at 16:50
could you please correct the spelling of Gauss, helps searches afterwards ;-) –  Jens Gustedt Jul 18 '10 at 17:36

Linear algebra and matricies are your friends here.

Eigen looks like a recent C++ linear algebra library. See if it can help you.

Here is what your system of equations looks like. This is the matrix:

This is the vector of unknowns:

Here is the right-hand-side vector:

You solve this system of equations by solving

You can enter your linear equation into Wolfram Alpha and get a symbolic solution.

Here is the solution for one of your systems. You can see the form that the matrix takes.

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No time now. Maybe later. Is it untrue? Is it completely unhelpful? The OP doesn't even seem to be aware of them. –  duffymo Jul 18 '10 at 16:55
if you accept that the OP can indeed solve them with pencil and paper, then he is aware of them. –  IVlad Jul 18 '10 at 16:56
I'm not accepting anything. The OP coming here to ask this question suggests that they have no idea what to do next. –  duffymo Jul 18 '10 at 16:59
"Pencil and paper" does not imply knowledge of linear algebra. We did these things in high school by rearranging the equations until we could substitute something into something else in another equation. OP was probably looking for a coded version of the same algorithm. –  György Andrasek Jul 18 '10 at 17:49
If you can solve it on paper, then solve it on paper, find the formulas for `a, b, c, d` and `e, f, g, h` then just plug them into your program.