# 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

-
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

-

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

Is that what you had in mind?

-

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/

-