lineaaralgebras

Lineaaralgebras is a branch of mathematics that studies vectors, vector spaces, and linear transformations between them. It focuses on linear relationships, and uses algebraic methods to analyze geometric and numerical problems. The subject is defined over a field, commonly the real or complex numbers, and can be developed for finite or infinite-dimensional spaces.

Key objects include vectors and subspaces, bases and dimension, and linear maps. A vector space has operations

Matrix methods underpin computation in lineaaralgebras. Systems of linear equations are analyzed by row reduction, yielding

Eigenvalues and eigenvectors capture intrinsic directions of linear transformations; diagonalization and the spectral theorem describe when

Applications range from computer graphics and machine learning to physics, engineering, and economics. Linear algebra provides