10th Edition

ISBN: 8220101460912

Author: Sullivan

Publisher: PEARSON

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Textbook Question

Chapter 12.4, Problem 32AYU

Extended Principle of Mathematical Induction The Extended Principle of Mathematical Induction states that if Conditions a and b hold, that is,

a. A statement is true for a natural number $j$ .

b. If the statement is true for some natural number $k \geq j$ , then it is also true for the next natural number $k + 1$ .

Then the statement is true for all natural numbers $\geq j$ . Use the Extended Principle of Mathematical Induction to show that the number of diagonals in a convex polygon of $n$ sides is $\frac{1}{2} n (n - 3)$ .

[Hint: Begin by showing that the result is true when $n = 4$ (Condition (a).]

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Chapter 12.4, Problem 31AYU

Chapter 12.4, Problem 33AYU

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Chapter 12 Solutions

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Solution Summary: The Extended Principle of Mathematical Induction proves that the statement is true for all natural numbers j.

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