Algorithms for solving algebra problems?

Are there algorithms to solve non-trivial algebra problems, for example to simplify the following expression:

``````2x^3 - 3x^2 + 3x - 4
--------------------
x-2
``````

The solution would be 2x^2 + x + 5 + 6/(x-2).

Are there also algorithms for factoring and other algebra-oriented math?

Thanks

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Do you mean to simplify or to solve for `x`? –  SLaks Nov 10 '11 at 2:30
I mean to Simplify –  Milo Nov 10 '11 at 2:31
Try searching for decidability results in algebra. For a large class of algebraic theories, halting reduction or incompleteness can be used to prove the nonexistence of a decision procedure. For example, Presburger arithmetic is decidable while number theory is undecidable. –  danportin Nov 10 '11 at 5:21
Do you mean libraries? Of course there are algorithms to simplify polynomials - that's how we learn how to solve it with a pen and piece of paper in school. –  Kirk Broadhurst Nov 10 '11 at 6:00

For the example you have given, just a simple division of polynomials work. You can get more information from:

http://en.wikipedia.org/wiki/Polynomial_long_division

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Stephen Wolfram has made a career with his Mathematica. There are other symbolic math programs available as well, such as Maxima:

http://www.arachnoid.com/maxima/

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There is something called the Horner scheme - http://en.wikipedia.org/wiki/Horner_scheme

Is that what you had in mind?

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The answer is that yes, there are definitely algorithms to solve questions like these.

Take a look at SymPy. SymPy is an open source computer algebra library written in pure Python. It contains many of these algorithms and the code is accessible on github. The writers have attempted to emphasize clarity for exactly this situation.

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