Solve only d plz solution of ist 3 parts is provided 

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Only d 

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Solution - (a) and we have to Can i.d. Given that T(v₁) = 3v₁ + 0₂ T (V₂) V₁, V₂ E B Calculate B-matrix express T(v.) and B = {0,₁,0₂] [T(U)] _ B = [ 3₁ ] [ v₁]_B ولیا The = A B-matrix writing B = = [TV₂]-8 = [413] [0₂]-8 -B whose [V₁_B] and [0₂-B) are co-ordinate vector of 2. U, and V₂ Sino (0₁-8] = [1₁0] and [0₂-1)=[0₁1] (c) We have to matrix. Can Standard basis 1 40₁ + 30₂2 Step 2: calculation 1 T: R²->R² and ] 3 Eigen value of B of T are same as a motrix are Same as the because eigenvalue of eigenvalue of any mabix that is similas to it. .: B. is obtained by expressing T(U₁) and 1(U₂) in terms of basis B, So it is similas to mabix that in du ca which is obtain? by standard. basis. fint is calculated from •fficient of combination Coe T(v₁) = 30₁ + 0₂ T(√₂) = in du led 40₁ + 0₂ = 4 3 => ) [A-AI ] |= => 1²²-6d+5=0 [A₁ = 1 = 2 T = 5 +(U₂) in terms / T - matrix is: - B = {V₁, V₂} the eigenvalue of express T(U₁) and T(U₂₁) in terms of vector a and b of eigen value 3a + b чат зь basis as T-induced an (10) 5 = (0,1)) are the eigin values.

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(5) Consider a linear transformation T: R² R2 and a basis B = {₁, 2} of R² with T(7₁) = 301 + 0₂ and T(0₂) = 401 + 302. (a) Find the B-matrix of T. (b) Show that the eigenvalues of the B-matrix of T are the same as the eigenvalues of the matrix that induces T. (c) Find the eigenvalues of the matrix that induces T. (d) Let S = [1 ₂], find the eigenvectors of the matrix that induces T as a linear combination of ₁ and ₂.