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Vector Space


Invariant U is [blank] under T if the image of every vector in U under T remains within U.
Operator A linear map that when applied vector space, the resulting vector space has the same dimension. T ∈ L(V)
eigenvector square matrix is a non-zero vector that, when multiplied by the matrix, yields a vector that is parallel to the original
eigenvalue A scalar λ, which when multiplied by the vector space equal the same vector space when a linear operator is applied.
Eigenformula Tu = λu
Created by: DrMolina