0 1] [-17 -1 0] [1] of R. Let T:R [ 1] Consider the basis B = (1- 1 1-1 such that ~Rºbe the linear transformation TBB = [4 0 0 2 Lo 0 0 1 0 . -2 Latv = 13). we will compute 7 () sep by step Let v = -2. We will compute T(v) step by step. 0 Express v in terms of the vectors in B: 1 V = number ( -1 + number ( 2 + number ( 10 0 L-1 Thus the coordinate vector v with respect to B is VB= Therefore, the coordinate vector of T(v) with respect to B is T(v)b = Thus T(v) is T(v) =