A =
1. Compute all four spaces of the matrix .
2. Find bases in them.
3. Find the matrix of A|c(A^T) in the bases you computed
A = 1. Compute all four spaces of the matrix . 2. Find bases in them. 3. Find the matrix of A|c(A^T) in the bases you computed 100 100
A = 1. Compute all four spaces of the matrix . 2. Find bases in them. 3. Find the matrix of A|c(A^T) in the bases you computed 100
Find the matrix representation of T relative to the bases B and C Find the matrix representation of T relative to the bases B and C T: P2 +C, T(a + bx+ cx) = a+b+c a+b-c a-b+c B={1, x, x?}, C= 000 a. MBC = Too 2 0 2 -2 1 -1 1 b. MBC = 1 -4 5 -2 1 -3 3 0 2 00 Oc. MB,C 5 1 1 -3 2-2 = 1 -1 3 d. MBC 111...
Find the matrix representation of T relative to the bases B and C T: P2 → Cº, Tla + bx + cx?) = [a+b+c a + b c La-b+c 1 B = {1, x, x?}, C= 0 1 0 0
Find the matrix representation of T relative to the bases B and C T: P2 +C3, Tla + bx+ cx?) a+b+c a+b-c a-b+c] 1 1 1 B={1, x, xl}, C=
Find the matrix representation of T relative to the bases B and C [a+b+c T: P2 +3, Tla + bx + cx?) = a +b-C a-b+c] B={1, x, x²), C= a. MBC 1 1 1 1 1 - 1 1 - 1 1 b. MBC 5 1 1 -3 2-2 1 -1 3 MEC 1 -4 5 -2 1-3 3 0 N O d. MBC 1-1 2 0 2 -2 0 0 1 a e. MBC 0 0 2 0...
Find the matrix representation of T relative to the bases B and C a + b + c T: P2 →C, T(a + bx + cx2) = a + b c a-b+c B={1, x, xl}, C= 000 a. 1 -4 5 MBC = -3 -2 1 3 0 2 b. 1 1 1 0 1 1 Il B,C 0 0 1 1 1 -1 1 1 1 B,C 1 - 1 0 0 2 Od. MT B,C 0 2 -2...
Find the matrix representation of T relative to the bases B and C (a+b+c T: P2 +c. Ta + bx + cx) = a+b- La-b+c] B = {1, x, x?}. Cu --000 1 1 MBC 1 1 1-1 1 ob. MBC 5 1 1 -3 2 - 2 1 -1 3 O. MBC 0 0 2 02-2 1-1 1 Od 'B.C 111 011 001 MBC (1-12 0 2 -2 0 0 1 мас 1 -45 - 1 - 3 0...
Find the matrix representation of T relative to the bases B and C a+b+c] T: P2+(?, Tla + bx + cx?) = a+b-c a-b+c] a B={1, x, x}, C= 0 --000 O a. MBC 5 1 1 -3 2-2 1 -1 3 Ob. MBC 1-1 2 02-2 0 0 1 Ос. MBC 0 0 2 0 2 -2 1 -1 1 O d. MB,C 111 011 001 Oe. MBC 1 -4 5 -2 1-3 3 0 2 Of 1 1...
linear algebra Find the matrix representation of T relative to the bases B and C a + b + c T: P2+, Ta + bx + cx?) = a+b-C a-b+c B = {1, x,x?}, Ca c-000 1-45 -2 1-3 3 0 2 B.C b. MBC 5 1 1 -3 2-2 1 -1 3 c. MC 1-1 2 0 2 -2 0 0 1 d. мас 1 1 - 1 1 - 1 e. B,C 0 0 2 02-2 1-1 1...
Find the matrix [T] C-B of the linear transformation T: VW with respect to the bases B and C of V and w, respectively. T: R2 + R3 defined by a + 2b -a b +[:] s={{ ;][-:} c-{{0}{} --13) [) CBT