question 1 (1 point) Let V| be a vector space, and T : V → Va linear transformation such that T(2ỷ₁ + 3√₂) = −5ỷ₁ + 3√₂|and T(3√₁ +5√₂ ) = −2v₁ + 5√₂|. ThenT(V₁) =V₁ +T(V₂) =T(-2v₁ - 4√₂) =v₁ +V₁ +پیچهV₂.TAN

A map T : V → W is a linear transformation if the following two conditions are satisfied:(i) T(X + Y…

(1 point) Let V be a vector space, and T :V → Vla linear transformation such that T(2₁ +37₂ ) = −5₁ +37₂ and T(3√₁ +5√₂) = −2v₁ + 5√₂. Then T(V₁) = V₁ + T(V₂) = T(-2v₁ - 4√₂) = V₁ + 1> V₁+ انچه

(1 point) Let V be a vector space, and T :V → Vla linear transformation such that T(2₁ +37₂ ) = −5₁ +37₂ and T(3√₁ +5√₂) = −2v₁ + 5√₂. Then T(V₁) = V₁ + T(V₂) = T(-2v₁ - 4√₂) = V₁ + 1> V₁+ انچه

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter7: Eigenvalues And Eigenvectors

Section7.CM: Cumulative Review

Problem 5CM: Find the kernel of the linear transformation T:R4R4, T(x1,x2,x3,x4)=(x1x2,x2x1,0,x3+x4).

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Question

question 1

(1 point) Let V| be a vector space, and T : V → Va linear transformation such that T(2ỷ₁ + 3√₂) = −5ỷ₁ + 3√₂|and T(3√₁ +5√₂ ) = −2v₁ + 5√₂|. Then
T(V₁) =
V₁ +
T(V₂) =
T(-2v₁ - 4√₂) =
v₁ +
V₁ +
پیچه
V₂.
TAN

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