Let p, (t) = 1 + t², p2(t) = t – 3t², p3(t) = 1 + t – 3t². a. Use coordinate vectors to show that these polynomials form a basis for P: b. Consider the basis B = {p1• P2- P3} for P2. Find q in P2, given that [q]® 1 2.

Let p, (t) = 1 + t², p2(t) = t – 3t², p3(t) = 1 + t – 3t². a. Use coordinate vectors to show that these polynomials form a basis for P: b. Consider the basis B = {p1• P2- P3} for P2. Find q in P2, given that [q]® 1 2.

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 12CM

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Question

Let p, (t) = 1 + t², p2(t) = t – 3t², p3(t) = 1 + t – 3t².
a. Use coordinate vectors to show that these polynomials form a basis for P:
b. Consider the basis
B = {p1• P2- P3} for P2. Find q in P2, given that [q]®
1
2.

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