lineárisaffinális

Lineárisaffinális (linear‑affine) refers to structures or mappings that possess both linear and affine characteristics in mathematics. An affine map is a function that preserves points, straight lines, and planes but not necessarily distances or angles; it can be written in the form \(f(x)=Ax+b\) where \(A\) is a linear transformation and \(b\) is a constant vector. When an object is described as lineárisaffinális, it means that its governing equations or transformations consist of a linear component combined with a translational part.

In linear algebra, a vector space equipped with an affine structure allows addition of vectors and scalar

Applications of lineárisaffinális concepts appear in computer graphics, where affine transformations such as scaling, rotation, translation,