Explanation Definition used: First derivative test: Suppose c to be a critical number for a function f . Assume that f is continuous on ( a , b ) and differentiable on ( a , b ) except at c , and c is the only critical number of f in ( a , b ) . f ( c ) is a relative maximum of f at c if f ′ ( x ) > 0 in the interval ( a , c ) and f ′ ( x ) < 0 in the interval ( c , b ) . f ( c ) is a relative minimum f at c if f ′ ( x ) < 0 in the interval ( a , c ) and f ′ ( x ) > 0 in the interval ( c , b ) . Relative maximum: A function is said to have a relative maximum f ( c ) at c if f ′ ( x ) > 0 in the interval ( a , c ) and f ′ ( x ) < 0 in the interval ( c , b ) . Relative minimum: A function is said to have a relative maximum f ( c ) at c if f ′ ( x ) < 0 in the interval ( a , c ) and f ′ ( x ) > 0 in the interval ( c , b ) . Calculation: The given function is f ( x ) = x e x x − 1 . Obtain the derivative of the function as follows. f ′ ( x ) = ( x e x x − 1 ) ′ = ( x − 1 ) ( x e x ) ′ − ( x e x ) ( x − 1 ) ′ ( x − 1 ) 2 = ( x − 1 ) ( x e x + e x ) − ( x e x ) ⋅ 1 ( x − 1 ) 2 = x 2 e x + x e x − x e x − e x − x e x ( x − 1 ) 2 Simplify further as follows. f ′ ( x ) = x 2 e x + x e x − x e x − e x − x e x ( x − 1 ) 2 = x 2 e x − e x − x e x ( x − 1 ) 2 = e x ( x 2 − 1 − x ) ( x − 1 ) 2 Clearly, at x = 1 , the derivative does not exist but it cannot be a critical number as the function is not defined at this point. Also, the derivative does not exist at a point c that is undefined. Set f ′ ( c ) = 0 and find the value of c . e c ( c 2 − 1 − c ) ( c − 1 ) 2 = 0 e c ( c 2 − c − 1 ) = 0 ( c 2 − c − 1 ) = 0 Compute the value of c with the help of quadratic formula as follows. c = 1 ± 1 2 − 4 × 1 × ( − 1 ) 2 × 1 = 1 ± 5 2 = 1 ± 2.2361 2 Simplify further as follows. c = 1 ± 2.2361 2 c = 1 + 2

Calculus with Applications (11th Edition)

11th Edition

ISBN: 9780321979421

Author: Margaret L. Lial, Raymond N. Greenwell, Nathan P. Ritchey

Publisher: PEARSON

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Chapter 5, Problem 31RE

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To find: The x-values of all points where the function f(x)=xexx−1 has relative maxima and minima, and to find the values of all relative extrema.

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Chapter 5, Problem 30RE

Chapter 5, Problem 32RE

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Chapter 5 Solutions

Calculus with Applications (11th Edition)

Ch. 5.1 - YOUR TURN 1 Find where the function is increasing...Ch. 5.1 - Prob. 2YT Ch. 5.1 - Prob. 3YT Ch. 5.1 - Prob. 4YT Ch. 5.1 - Prob. 1WE Ch. 5.1 - Prob. 2WE Ch. 5.1 - Prob. 3WE Ch. 5.1 - Prob. 4WE Ch. 5.1 - Find the derivative of each of the following...Ch. 5.1 - Prob. 6WE

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The x -values of all points where the function f ( x ) = x e x x − 1 has relative maxima and minima , and to find the values of all relative extrema.

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To find: The x-values of all points where the function f(x)=xexx−1 has relative maxima and minima, and to find the values of all relative extrema.

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Chapter 5 Solutions