The (mathbf{4 2 2}) group describes the symmetries of a square, including flips. It has eight members

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The $\mathbf{4 2 2}$ group describes the symmetries of a square, including "flips." It has eight members and five classes.

(a) How many irreducible representations does the $\mathbf{4 2 2}$ group have?

(b) What are the dimensions of this group's irreducible representations?

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An Introduction To Groups And Their Matrices For Science Students

ISBN: 9781108831086

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Authors: Robert Kolenkow

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Question Posted: Mar 16, 2024 04:00 AM

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The (mathbf{4 2 2}) group describes the symmetries of a square, including flips. It has eight members

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a According to Theorem 4 stated in Sec 273 and near the end of Chapter 2 the number of no...View the full answer

An Introduction To Groups And Their Matrices For Science Students

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