Solved: Writing Let B = {v1, v2, . . . , vn} be a basis
Chapter 6, Problem 39(choose chapter or problem)
Let \(B = {v_{1}, v_{2}, . . . , v_{n}}\) be a basis for the vector space V, let B’ be the standard basis, and consider the identity transformation \(I: V \rightarrow V\). What can you say about the matrix for I relative to B? relative to B’? When the domain has the basis B and the range has the basis B’?
Text Transcription:
B = {v_1,v_2, . . ., v_n}
I: V rightarrow V
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