# Linear systems of equations

Put content here**Linear systems of equations** are a foundational topic in linear algebra. A linear system consists of multiple linear equations involving the same set of variables. Solving such a system means finding all values of the variables that satisfy every equation simultaneously.
⏎
## Key concepts
- **Linear equations** — equations of the form $a_1 x_1 + a_2 x_2 + \cdots + a_n x_n = b$
- **Solution set** — the collection of all tuples that satisfy every equation
- **Gaussian elimination** — the primary algorithm for solving linear systems by transforming to echelon form
- **Consistency** — whether a system has at least one solution (consistent) or none (inconsistent)
- **Homogeneous systems** — systems where all constant terms are zero ($Ax = 0$)
- **Geometry** — each linear equation represents a hyperplane; solutions are intersections of these hyperplanes
⏎
Every linear system falls into exactly one of three categories: no solution, exactly one solution, or infinitely many solutions.

# Parents

* Linear algebra