System of linear equations

3x₁ + 2x₂ − x₃ = 1
: 2x₁ − 2x₂ + 4x₃ = −2
: −x₁ + ½x₂ − x₃ = 0.

Systems of linear equations belong to the oldest problems in mathematics and they have many applications, such as in digital signal processing, estimation, forecasting and generally in linear programming and in the approximation of non-linear problems in numerical analysis. An efficient way to solve systems of linear equations is given by the Gauss-Jordan elimination or by the Cholesky decomposition.

In general, a system with m linear equations and n unknowns can be written as
: a₁₁x₁ + a₁₂x₂ + … + a_1nx_n = b₁
: a₂₁x₁ + a₂₂x₂ + … + a_2nx_n = b₂
:     :
:     :
: a_m1x₁ + a_m2x₂ + … + a_mnx_n = b_m,

where x₁, ... ,x_n are the unknowns and the numbers a_ij are the coefficients of the system. We can separate the coefficients in a matrix as follows:
:

If we represent each matrix by a single letter, this becomes
: Ax = b,
where A is an m-by-n matrix above, x is a column vector with n entries and b is a column vector with m entries. The above mentioned Gauss-Jordan elimination applies to all these systems, even if the coefficients come from an arbitrary field.

If the field is infinite (as in the case of the real or complex numbers), then only the following three cases are possible for any given system of linear equations: