Let v = [-2, -2, 3], v = [1, 2, -1] and - 3 = [0,...

 

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Let v₁ = [-2, -2, 3], v₂ = [1, 2, -1] and - √3 = [0, −1, 0], so that S = {₁, 2, 3} and C = {V1, V2, V3} are bases of R³. If a linear transformation T: R³ R³ has the matrix 3 0 3 2 3 1 -1 2 (for both domain and codomain), find [T]cc. [T]ss = {). - -3 -2 with respect to the basis S The matrix of T with respect to basis C (for domain and codomain) is [T]cc = | Let v₁ = [-2, -2, 3], v₂ = [1, 2, -1] and - √3 = [0, −1, 0], so that S = {₁, 2, 3} and C = {V1, V2, V3} are bases of R³. If a linear transformation T: R³ R³ has the matrix 3 0 3 2 3 1 -1 2 (for both domain and codomain), find [T]cc. [T]ss = {). - -3 -2 with respect to the basis S The matrix of T with respect to basis C (for domain and codomain) is [T]cc = |