(1 point) Let f: R² R³ be the linear transformation defined by Let be bases for R² and R³, respectively. Find the matrix [ƒ] [f] = 6 32 16 -5 15 B C = 14 = f(x) 0 2 4 1 X. -2 -4 {(1,2), (-1,-1)}, {(-2, 1, 1), (2, 0, -1), (-3, 0, 1)), for f relative to the basis B in the domain and C in the codomain.
(1 point) Let f: R² R³ be the linear transformation defined by Let be bases for R² and R³, respectively. Find the matrix [ƒ] [f] = 6 32 16 -5 15 B C = 14 = f(x) 0 2 4 1 X. -2 -4 {(1,2), (-1,-1)}, {(-2, 1, 1), (2, 0, -1), (-3, 0, 1)), for f relative to the basis B in the domain and C in the codomain.
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Your Question:
P3
![(1 point) Let f: R² R³ be the linear transformation defined by
Let
be bases for R² and R³, respectively. Find the matrix [ƒ]
[f] =
6
32
16
-5
15
B
C =
14
=
f(x)
0 2
4 1 X.
-2
-4
{(1,2), (-1,-1)},
{(-2, 1, 1), (2, 0, -1), (-3, 0, 1)),
for f relative to the basis B in the domain and C in the codomain.](https://content.bartleby.com/qna-images/question/1f66b072-56d3-4d1d-be03-6dbb7c90ba7d/a0135fae-9bcc-408e-9c7b-59b9bf848eb8/5sq2bm9_processed.jpeg)
Transcribed Image Text:(1 point) Let f: R² R³ be the linear transformation defined by
Let
be bases for R² and R³, respectively. Find the matrix [ƒ]
[f] =
6
32
16
-5
15
B
C =
14
=
f(x)
0 2
4 1 X.
-2
-4
{(1,2), (-1,-1)},
{(-2, 1, 1), (2, 0, -1), (-3, 0, 1)),
for f relative to the basis B in the domain and C in the codomain.
