Lect23 - Chapter 4. Linear Transformations Math1111 Matrix...

Info iconThis preview shows pages 1–6. Sign up to view the full content.

View Full Document Right Arrow Icon

Info iconThis preview has intentionally blurred sections. Sign up to view the full version.

View Full DocumentRight Arrow Icon

Info iconThis preview has intentionally blurred sections. Sign up to view the full version.

View Full DocumentRight Arrow Icon

Info iconThis preview has intentionally blurred sections. Sign up to view the full version.

View Full DocumentRight Arrow Icon
This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: Chapter 4. Linear Transformations Math1111 Matrix Representations Theorem 4.2.2 - Example (Cont’d) Example . (cont’d) Suppose E = [ v 1 , v 2 ] where v 1 = ( 1 1 ) T , v 2 = ( 1- 1 ) T (iii) Find the matrix representation of L r.t. E and F . (iv) Find the matrix representation of L r.t. E and G . Chapter 4. Linear Transformations Math1111 Matrix Representations Theorem 4.2.2 - Example (Cont’d) Example . (cont’d) Suppose E = [ v 1 , v 2 ] where v 1 = ( 1 1 ) T , v 2 = ( 1- 1 ) T (iii) Find the matrix representation of L r.t. E and F . (iv) Find the matrix representation of L r.t. E and G . Ans. (iii) 2 2 (iv) 2 Chapter 4. Linear Transformations Math1111 Linear Transformations Homework 3 Reading Leon (7th edition): p.186-189 Leon (8th edition): p.177-180 Homework 3 Leon (7th edition): Chapter 4 Section 2 Qn. 6-8, 15, 16 , 18 Leon (8th edition): Section 4.2 Qn. 6-8, 15, 16 , 18 Chapter 4. Linear Transformations Math1111 Matrix Representations Theorem 4.2.2 - Remarks Remark 1. Let L : R n → R m be a linear transformation. Standard matrix representation of L = Matrix representation of L r.t. the standard bases of R n and R m Chapter 4. Linear Transformations Math1111 Matrix Representations Theorem 4.2.2 - Remarks Remark 1. Let L : R n → R m be a linear transformation.be a linear transformation....
View Full Document

Page1 / 14

Lect23 - Chapter 4. Linear Transformations Math1111 Matrix...

This preview shows document pages 1 - 6. Sign up to view the full document.

View Full Document Right Arrow Icon
Ask a homework question - tutors are online