Homework Sourse1 pt Consider the ordered bases B 3 4x 3x 2 and C 2 4x for t
Solution
e. Let A =
3
-2
3
-4
3
-2
In order to determine the coordinates of p(x) = 3-2x in the ordered basis B, we will reduce A to its RREF as under:
Multiply the 1st row by 1/3
Add 4 times the 1st row to the 2nd row
Multiply the 2nd row by 3
Add 2/3 times the 2nd row to the 1st row
Then the RREF of A is
1
0
5
0
1
6
Therefore, p(x) = 3-2x = 5(3-4x)+6(3x-2) and [p(x)]B= (5,6)T.
f. The coordinate vector of q(x) in the ordered basis C is (1,1)T. Therefore, q(x) = 2+4x. Let M =
3
-2
2
-4
3
4
In order to determine the coordinates of p(x) = 3-2x in the ordered basis B, we will reduce M to its RREF as under:
multiply the 1st row by 1/3
add 4 times the 1st row to the 2nd row
Multiply the 2nd row by 3
Add 2/3 times the 2nd row to the 1st row
Then the RREF of M is
1
0
14
0
1
20
Therefore, q(x) = 2+4x = 14(3-4x)+20(3x-2) and [q(x)]B= (14,20)T.
| 3 | -2 | 3 |
| -4 | 3 | -2 |
