T U V and S V W are linear transformations and B, C, and D are bases for U, V, and W, respectively Compute S Iacute brvbar T DB in two ways (a) By finding S Iacute brvbar T directly and then computing its matrix and (b) By finding the matrices of S and T separately and using Theorem 6 27 T P1 R2 de...

a Let px a bx then Then So that b We ...

T: U V and S: V W are linear transformations and B, C, and D are bases

Question:

T: U †’ V and S: V †’ W are linear transformations and B, C, and D are bases for U, V, and W, respectively. Compute [S Í¦ T]D†B in two ways:
(a) By finding S Í¦ T directly and then computing its matrix and
(b) By finding the matrices of S and T separately and using Theorem 6.27.
T: P1 †’ R2 defined by