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10 Nov 2019
Find the matrix representation of T under the standard basis?
Let T: M_2 Times 2(R) rightarrow M_2 Times 2 (R) be the linear transformation given by T(A) A + A^T. Do the following: Find the matrix representation of [T]_epsilon leftarrow epsilon of T under the standard basis epsilon = {E_11 = [1 0 0 0], E_12 = [0 1 0 0], E_21 = [0 0 1 0], E_22 [0 0 0 1]}, Find the matrix representation [T]_c leftarrow c of T under the basis C = {[1 0 0 0], [0 0 0 1], [0 1 1 0], [0 1 -1 0]}.
Find the matrix representation of T under the standard basis?
Let T: M_2 Times 2(R) rightarrow M_2 Times 2 (R) be the linear transformation given by T(A) A + A^T. Do the following: Find the matrix representation of [T]_epsilon leftarrow epsilon of T under the standard basis epsilon = {E_11 = [1 0 0 0], E_12 = [0 1 0 0], E_21 = [0 0 1 0], E_22 [0 0 0 1]}, Find the matrix representation [T]_c leftarrow c of T under the basis C = {[1 0 0 0], [0 0 0 1], [0 1 1 0], [0 1 -1 0]}.
Casey DurganLv2
28 Aug 2019