Let E= {e,, e,, ez} be the standard basis for R, B = {b,, bɔ, b3} be a basis for a vector space V, and T: R → V be a linear transformation with the property that T(x1, X2, X3) = - (X2 +*3) b, - (x1 + X3) b2 - (X1 + *2) b3. a. Compute T(e,), T(e2), and T(e3). b. Compute [T(e1)]s- [T(e2)]s. and [T(e3)]e- c. Find the matrix for T relative to E and B. a. T(e,) =D. T(e2) =, and T(e3) =O
Let E= {e,, e,, ez} be the standard basis for R, B = {b,, bɔ, b3} be a basis for a vector space V, and T: R → V be a linear transformation with the property that T(x1, X2, X3) = - (X2 +*3) b, - (x1 + X3) b2 - (X1 + *2) b3. a. Compute T(e,), T(e2), and T(e3). b. Compute [T(e1)]s- [T(e2)]s. and [T(e3)]e- c. Find the matrix for T relative to E and B. a. T(e,) =D. T(e2) =, and T(e3) =O
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter3: Matrices
Section3.6: Introduction To Linear Transformations
Problem 54EQ
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![Let E= {e,, e,, ez} be the standard basis for R, B = {b,, bɔ, b3} be a basis for a vector space V, and T: R → V be a linear transformation with the property that
T(x1, X2, X3) = - (X2 +*3) b, - (x1 + X3) b2 - (X1 + *2) b3.
a. Compute T(e,), T(e2), and T(e3).
b. Compute [T(e1)]s- [T(e2)]s. and [T(e3)]e-
c. Find the matrix for T relative to E and B.
a. T(e,) =D. T(e2) =, and T(e3) =O](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fe266977e-f1be-47e2-982b-3dc461fce0dc%2Fa05df57c-a2de-41bf-87d6-82fbb5f22048%2Frdf04jb.png&w=3840&q=75)
Transcribed Image Text:Let E= {e,, e,, ez} be the standard basis for R, B = {b,, bɔ, b3} be a basis for a vector space V, and T: R → V be a linear transformation with the property that
T(x1, X2, X3) = - (X2 +*3) b, - (x1 + X3) b2 - (X1 + *2) b3.
a. Compute T(e,), T(e2), and T(e3).
b. Compute [T(e1)]s- [T(e2)]s. and [T(e3)]e-
c. Find the matrix for T relative to E and B.
a. T(e,) =D. T(e2) =, and T(e3) =O
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