Explanation Given information: The function f is defined on the interval that is symmetric about the origin. Calculation: Let consider the even function as follows: E ( x ) = f ( x ) + f ( − x ) 2 (1) Let consider the odd function as follows: O ( x ) = f ( x ) − f ( − x ) 2 (2) Add the Equation (1) and Equation (2). E ( x ) + O ( x ) = f ( x ) + f ( − x ) 2 + f ( x ) − f ( − x ) 2 = f ( x ) + f ( − x ) + f ( x ) − f ( − x ) 2 = 2 f ( x ) 2 = f ( x ) Therefore, f ( x ) = f ( x ) + f ( − x ) 2 + f ( x ) − f ( − x ) 2 is proved. Substitute − x for x in Equation (1). E ( − x ) = f ( − x ) + f ( − ( − x ) ) 2 = f ( x ) + f ( − x ) 2 = E ( x ) Thus E ( x ) = E ( − x ) , so the function is even

Thomas' Calculus: Early Transcendentals in SI Units

14th Edition

ISBN: 9781292253114

Author: Hass, Joel R., Heil, Christopher E., WEIR, Maurice D.

Publisher: PEARSON

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Chapter 7.3, Problem 75E

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To show the function f(x)=f(x)+f(−x)2+f(x)−f(−x)2.

To show f(x)+f(−x)2 is even.

To show f(x)−f(−x)2 is odd.

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Chapter 7.3, Problem 74E

Chapter 7.3, Problem 76E

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Chapter 7 Solutions

Thomas' Calculus: Early Transcendentals in SI Units

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To show the function f ( x ) = f ( x ) + f ( − x ) 2 + f ( x ) − f ( − x ) 2 . To show f ( x ) + f ( − x ) 2 is even. To show f ( x ) − f ( − x ) 2 is odd.

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To show the function f(x)=f(x)+f(−x)2+f(x)−f(−x)2. To show f(x)+f(−x)2 is even. To show f(x)−f(−x)2 is odd.

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Chapter 7 Solutions

To show the function f(x)=f(x)+f(−x)2+f(x)−f(−x)2.

To show f(x)+f(−x)2 is even.

To show f(x)−f(−x)2 is odd.