4. Let S= 1 1 , and consider the subspace W = Span(S) of R. (a) Show that S is an orthogonal basis for W. (b) Let x = 2. Find projw(x). 11 (c) Let x = 12 be an arbitrary vector in R3. Find projw(x) and then find a matrix A such that projw(x) = Ax.

7. Let R2x2 denote the vector space of real 2 x 2 matrices. Consider the 2 x 2 matrix and let W = {A € R2X2 : AX = XA}. (a) Show that W is a subspace of R2x2. (b) Find a basis for W.

6. Let P3 denote the vector space of real valued polynomials of degree less than or equal to 3. Find a basis for the subspace W = Span{1+ 2x + x2 +3.r”, 1+ 2x + 2.r+4.r", -1 -2.0 – 3.r2 – 52", -1- 2.0 - 2.r3} of P3 and determine dim(W).

W a linear transformation. (10) 3. Let V and W be vector spaces and T: V (a) Show that kernel of T is a subspace of V. (b) Let {ei, C2, C3, C4} be the standard basis for R and let T: R → R3 be the linear transformation for which Tei) = (1,2,1), Tez) = (0,1,0), T(C3) = (1,3,0), T(44) = (1,1,1). Find a basis for the kernel of T.