(a) Explanation Given: Consider the projected year-end assets function, A ( t ) = 0.0000329 t 3 − 0.00450 t 2 + 0.0613 t + 2.34 where 0 ≤ t ≤ 50 is the number of years since 2000. Definition used: Critical point: A point whose x- coordinate is the critical number c such that either f ′ ( c ) = 0 or f ′ ( c ) does not exists and y -coordinate is f ( c ) . Calculation: Obtain the derivative of the function as follows. A ′ ( t ) = 0.0000329 ( 3 t 2 ) − 0.00450 ( 2 t ) + 0.0613 ( 1 ) + 0 = 0.0000987 t 2 − 0.009 t + 0.0613 Assume c as a critical number such that A ′ ( c ) = 0 or A ′ ( c ) does not exist and obtain its value. 0.0000987 c 2 − 0.009 c + 0.0613 = 0 Use quadratic formula to find the values of c as follows. c = 0.009 ± ( − 0.009 ) 2 − 4 ( 0.0000987 ) ( 0.0613 ) 2 × 0.0000987 Thus, the values of c on computation are 83.77 and 7.414. There is only one critical number c that lies in the range 0 ≤ t ≤ 50 which is c = 7.414 . These points determine the interval ( − ∞ , 0 ) , ( 0 , 7.414 ) , ( 7 (b) To determine To find: The intervals where the function A ( t ) decreases.

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 5.1, Problem 49E

(a)

To determine

To find: The intervals where the function A(t) increases.

(b)

To determine

To find: The intervals where the function A(t) decreases.

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Chapter 5.1, Problem 48E

Chapter 5.1, Problem 50E

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The intervals where the function A ( t ) increases.