Repeat Exercise 5 using the inner product of Exercise 11 with a = 0, b = l,

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Repeat Exercise 5 using the inner product of Exercise 11 with a = 0, b = l, c = 2.
In exercise 11
Let a, b, and c be distinct real numbers. Show that
(p(x), q(x)) = p(a)q (a) + p(b)q(b) + p (c)q(c)
defines an inner product on P2.

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Linear Algebra A Modern Introduction

ISBN: 978-1285463247

4th edition

Authors: David Poole

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Question Posted: Apr 15, 2016 06:32 AM

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Repeat Exercise 5 using the inner product of Exercise 11 with a = 0, b = l,

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We must show it satisfies all four properties of an in...View the full answer

Linear Algebra A Modern Introduction

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