A basis of R² is given as B₁ = {x₁ = (1,1), x₁ = (1,0) }; Find the change of basis matrix P, from basis B₁ to basis B₂ where B₂ = {y₁ = (4,3), y₂ = (3,2)} -R3 4 o p = o P= OP = O P = .8 2 .5 .2 H 1.8 -1.2 3 1

A basis of R² is given as B₁ = {x₁ = (1,1), x₁ = (1,0) }; Find the change of basis matrix P, from basis B₁ to basis B₂ where B₂ = {y₁ = (4,3), y₂ = (3,2)} -R3 4 o p = o P= OP = O P = .8 2 .5 .2 H 1.8 -1.2 3 1

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter5: Inner Product Spaces

Section5.CM: Cumulative Review

Problem 13CM

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Question

A basis of R² is given as B₁ = {x₁ = (1,1), x₁ = (1,0) }; Find the change of basis matrix P, from basis B₁ to basis
B₂ where B₂ = {y₁ = (4,3), y₂ = (3,2)}
o p =
o P=
OP =
O P =
4 3
.8 2
.5
.2
H
1.8 -1.2
3 1

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