# Solving linear systems in Maxima: how to pass arbitrarily sized arrays into linsolve( )

I have a linear system I'm trying to solve in Maxima using `linsolve(eqlist, varlist)`.

For a specific problem, I can use `linsolve( [ eq[0],eq[1],eq[2] ], [ a[0],a[1],a[2] ])`, and this works. But this is rather ugly since it means I have to manually add or remove elements if the dimension of the problem is anything other than 3.

To code up a general solution, I would like to wrap `linsolve( )` into a subroutine, but this requires being able pass arbitrary sized arrays into `linsolve( )` from inside the subroutine.

I've been able to get the dynamic allocation of the arrays to work fine inside the subroutine, but I'm having a problem getting `linsolve( )` to accept the resulting arrays.

Here's the idea, with the bit that's causing the problem noted. The variable `p` is the dimension of the problem, e.g. `p=3`.

It seems that `linsolve( )` doesn't like being passed arrays in this way.

``````/* Solution concept -- but the syntax doesn't work. */
solution(p):=(
array(eq,p),
array(a,p),

for i:0 thru p do (
eq[i]: sum(binom(j+1,i)*a[j],j,i,p) = binom(p,i)
),

linsolve(eq,a)  /* THIS IS WHERE THE PROBLEM LIES */
)\$
``````

Any insight on how to get this to work?

FYI Background behind this problem: this linear system arises when solving the finite summation of integer powers, i.e. the sum of finitely many squares, cubes, or general powers `p`. Although the finite sum of squares is straightforward, the general solution is surprisingly complicated. A mathematical discussion of the problem can be found here: Finite Summation by Recurrence Relations, Part 2.

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Apparently in Maxima, lists and arrays are NOT the same underlying object.

Arrays are more complex and a bit of mess to get working (as suggested in this posting to the Maxima mailing list).

So, given this bit of information, let's stay away from arrays and work with lists.

Also, the coding above is not very 'Maxima' in style. Robert Dodier (from the maxima mailing list) gave some useful style suggestions for more natural Maxima code.

``````solution(p):= block([a, eq],        /* give subroutine variables local scope */
v : makelist(a[i], i, 0, p),    /* create list of unknowns (0-indexed) */
eq : makelist(sum(binom(j+1,i)*a[j],j,i,p) = binom(p,i), i, 0, p),
/* create list of equations (0-indexed) */
linsolve(eq, v)
)\$
``````

This is now a solution wrapped in a general subroutine that is independent of the dimension `p` of the problem.

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