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I need to solve a large system of linear equations. The problem is that, based on user input, the number of equations will vary.

As a specific example, say I have two equations in two unknowns. I can write

Solve[{x+y==1&&2x+2y==3},{x,y}]

Is there a way that I can generalize the above solve for any number of equations and variables without having to explicitly type out everything? My equations and variables are stored in arrays.

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It would be useful to have explicit examples of the arrays in which the eqns and vars are stored –  acl Dec 22 '11 at 23:48
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2 Answers

The syntax will depend on the form in which you store them. If, for example, you have

eqns = {x - y == 1, 2 x + 2 y == 3, 5*x - 3*y - z == 2}
vars = {x, y, z}

then you can do

Solve[eqns, vars]
(*
{{x -> 5/4, y -> 1/4, z -> 7/2}}
*)

(thanks to Mr.Wizard for reminding me of the correct syntax)

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thanks acl. I spent a few hours trying to figure this out. To answer your questions, yes I'm new to mathematica. –  mwc33 Dec 23 '11 at 1:40
    
@user what, a few hours and @@ never occured to you?? :) I agree it can be difficult to work out how to do simple things in mathematica in the beginning. –  acl Dec 23 '11 at 1:43
    
@acl, review my answer; if you agree that And @@ is extraneous and you update your question accordingly, I will delete mine. –  Mr.Wizard Dec 23 '11 at 3:23
    
@Mr.W You are correct, I forgot about that! –  acl Dec 23 '11 at 12:50
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In addition to what Acl wrote, you can use LinearSolve:

I am borrowing Acl data

Remove["Global`*"];
eqns = {x - y == 1, 2 x + 2 y == 3, 5*x - 3*y - z == 2}
vars = {x, y, z}

A = CoefficientArrays[eqns, vars];
sol = LinearSolve[A[[2]], -A[[1]]]

which gives

{5/4, 1/4, 7/2}

In[135]:= Thread[vars->sol]
Out[135]= {x->5/4,y->1/4,z->7/2}
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thanks, works great –  mwc33 Dec 23 '11 at 0:33
    
This is a good method for large systems. +1 –  Mr.Wizard Dec 23 '11 at 3:24
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