SOLUTION: Consider the linear transformation T : R3 -> R2 whose matrix
with respect to the standard bases is given by
2 1 0
0 2 -1
�
Now consider the bases:
f1= (2, 4, 0)
f2= (1,
Algebra.Com
Question 62609: Consider the linear transformation T : R3 -> R2 whose matrix
with respect to the standard bases is given by
2 1 0
0 2 -1
�
Now consider the bases:
f1= (2, 4, 0)
f2= (1, 0, 1)
f3= (0, 3, 0) of R3 and
g1= (1, 1)
g2= (1,−1) of R2
Compute the coordinate transformation matrices between the standard
bases and these bases and compute the matrix of T with respect to the new
bases.
Any help would be appreciated. Thank you!
Answer by venugopalramana(3286) (Show Source): You can put this solution on YOUR website!
Consider the linear transformation T : R3 -> R2 whose matrix
with respect to the standard bases is given by
LET T=
=
2 1 0
0 2 -1
�
Now consider the bases:
f1= (2, 4, 0)
f2= (1, 0, 1)
f3= (0, 3, 0) of R3 and
g1= (1, 1)
g2= (1,−1) of R2
Compute the coordinate transformation matrices between the standard
bases and these bases
F IS THE MATRIX OF BASE VECTORS f1,f2,f3
=
2,1,0
4,0,3
0,1,0
MATRIX OF STANDARD BASE IN R3 IS E3 SAY
=
1,0,0
0,1,0
0,0,1
G IS THE MATRIX OF BASE VECTORS g1,g2.
=
1,1
1,-1
MATRIX OF STANDARD BASE IN R2 IS E2 SAY
=
1,0
0,1
F^(-1) IS [HOPE YOU KNOW HOW TO INVERT MATRIX.OTHERWISE PLEASE COME BACK]
=
0.5,0,-0.5
0, 0, 1
-2/3,1/3,2/3
HENCE TRANSFORMATION MATRIX FROM E BASIS TO F BASIS IS
(XF)=[F^(-1)]*(XE) WHERE XF REPRESENTS X IN F BASIS.ETC..AND
IF YE = A*(XE)......THEN
(YF) = [F^-1]*(YE)
G^-1 IS
=
0.5,0.5
0.5,-0.5
SIMILARLY AS ABOVE,WE HAVE
TRANSFORMATION MATRIX FROM E BASIS TO G BASIS IS
(XG)=[G^(-1)]*(XE) WHERE XG REPRESENTS X IN G BASIS.ETC..AND
IF (YE) = A(XE)......THEN
(YG) = [G^-1]*(YE)
--------------------------------------------------------------------------
and compute the matrix of T with respect to the new
bases.
HENCE
IF TE IS IN E BASIS
(TF)= [F^(-1)]*T*F
TE is given
=
2,0
1,2
0,-1
SIMILARLY IN G BASIS,TAKING T AS GIVEN, WE GET
TG=[G^(-1)]*T*G
IT IS NOT CLEAR FROM YOUR PROBLEM WHETHER YOU ARE WRITING VETICAL VECTORS AS HORIZONTAL VECTORS FOR CONVENIENCE.PLEASE CLARIFY.IN SUCH A CASE BETTER WRITE AS (x1,x2,x3)'
on your feed back we can complete the solution or you can continue using the above formula
Any help would be appreciated. Thank you!
RELATED QUESTIONS
Let T:R3→R3 be a linear transformation defined by T(x,y,z)=(x,x+y,x+y+z). Then the... (answered by ikleyn)
Prove that there exists a linear transformation T : R2 ! R3 such that T(1; 1) = (1; 0; 2) (answered by rothauserc)
Given the representation matrix of a linear transformation over the basis B, how to find... (answered by CPhill)
You have the following matrix, and perform the following 3 row operations. What is the... (answered by Edwin McCravy)
Help! I don't know if I'm doing this right.
Use the matrix method.
x+y-z = -9... (answered by stanbon)
Please help solve the following. The instructions read "Solve each system by... (answered by jim_thompson5910)
Determine whether the transformation T : R3 → R2 is a linear transformation. ... (answered by ikleyn)
Perform the indicated row operations, then choose the new matrix.
[ 1 1 1 |-1]
[-1 2... (answered by Edwin McCravy)
Q:1- What is the rank of unit matrix of order n?
Q:2- If S is linear and onto... (answered by ikleyn)
Perform the sequence of row operations on the matrix.
(a)SwapR1 andR3.
(b) Replace R2... (answered by greenestamps)