To determine Calculate the area of the region enclosed by the curves y = | x | and 5 y = x + 6 . Explanation Given information: Show the equations of the curves are as follows: y = | x | 5 y = x + 6 Definition: If f and g are continuous with f ( x ) ≥ g ( x ) throughout [ a , b ] , then the area of the region between the curves y = f ( x ) and y = g ( x ) from a to b is the integral of ( f − g ) from a to b A = ∫ a b [ f ( x ) − g ( x ) ] d x Calculation: Write the equations of the curves. f ( x ) ⇒ y = | x | = { − x , x ≤ 0 x , x ≥ 0 (1) g ( x ) ⇒ 5 y = x + 6 ⇒ y = x 5 + 6 5 (2) Find the limits of the area by solving the Equation (1) and Equation (2). For x ≤ 0 , y = − x − x = x 5 + 6 5 5 − x = x + 6 25 ( − x ) = x 2 + 12 x + 36 x 2 + 37 x + 36 = 0 ( x + 1 ) ( x + 36 ) = 0 x + 1 = 0 or x + 36 = 0 x = − 1 or x = − 36 Neglect x = − 36 . For x ≥ 0 , y = x x = x 5 + 6 5 5 x = x + 6 25 ( x ) = x 2 + 12 x + 36 x 2 − 13 x + 36 = 0 ( x − 9 ) ( x − 4 ) = 0 x − 4 = 0 or x − 9 = 0 x = 4 or x = 9 There are three intersection points x = − 1 , 4, 9 . Here, the area of the region is in three parts. The limits for the first part are a = − 1 and b = 0 . Integrate the function g ( x ) − f ( x ) = x + 6 5 − − x in the interval [ − 1 , 0 ] gives the area of the first part in the region. A 1 = ∫ − 1 0 ( x + 6 5 − − x ) d x = ∫ − 1 0 x + 6 5 d x − ∫ − 1 0 − x d x = 1 5 ∫ − 1 0 ( x + 6 ) d x − ∫ − 1 0 ( − x 1 2 ) d x = 1 5 [ x 2 2 + 6 x ] − 1 0 + [ 2 3 ( − x ) 3 2 ] − 1 0 A 1 = 1 5 [ ( ( 0 ) 2 2 + 6 ( 0 ) ) − ( ( − 1 ) 2 2 + 6 ( − 1 ) ) ] + [ ( 2 3 ( − 0 ) 3 2 ) − ( 2 3 ( 1 ) 3 2 ) ] = 1 5 [ ( 0 ) − ( 1 2 − 6 ) ] + [ ( 0 ) − ( 2 3 ) ] = 1 5 ( 11 2 ) − 2 3 = 11 10 − 2 3 A 1 = 33 + 20 30 = 13 30 The limits for the second part are a = 0 and b = 4

Student Solutions Manual For Thomas' Calculus Format: Paperback

14th Edition

ISBN: 9780134439334

Author: Hass, Joel R.^heil, Christopher D.^weir, Maurice D.^heil, Christopher

Publisher: PEARSON

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Chapter 5.6, Problem 49E

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Calculate the area of the region enclosed by the curves y=|x| and 5y=x+6.

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Chapter 5.6, Problem 48E

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Student Solutions Manual For Thomas' Calculus Format: Paperback

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