The first four Hermite polynomials are 1, 2x, 4x² - 2, 8x³ - 12x. These polynomials arise in many fields: signal processing, physics, numerical analysis, probability, combinatorics, etc. Show that the first four Hermite polynomials form a basis of P3.

The first four Hermite polynomials are 1, 2x, 4x² - 2, 8x³ - 12x. These polynomials arise in many fields: signal processing, physics, numerical analysis, probability, combinatorics, etc. Show that the first four Hermite polynomials form a basis of P3.

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter4: Eigenvalues And Eigenvectors

Section: Chapter Questions

Problem 9RQ

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Question

3. The first four Hermite polynomials are 1, 2x, 4x2 - 2, 8x³ - 12x. These polynomials arise in many
fields: signal processing, physics, numerical analysis, probability, combinatorics, etc. Show that the
first four Hermite polynomials form a basis of P3.
4. Using the first four Hermite polynomials as a basis for P3, find the linear combination for the
polynomial
p(x) = 7-12x - 8x² + 12x³

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