Consider the following. f(x) = (x+8)2 (a) Sketch a graph of the function f. (b) Determine intervals on which f is one-to-one. (−∞, −8] and [−8, ∞) (−∞, ∞) (−∞, 0] and [0, ∞) [−8, 0] (−∞, 8] and [8, ∞) (c) Find the inverse function of f on the interval found in part (b). (d) Give the domain of the inverse function. [0, ∞) (−∞, ∞) (−∞, −8]∪[8, ∞) (−∞, 0)∪(0, ∞) [−8, 0]

Consider the following. f(x) = (x+8)2 (a) Sketch a graph of the function f. (b) Determine intervals on which f is one-to-one. (−∞, −8] and [−8, ∞) (−∞, ∞) (−∞, 0] and [0, ∞) [−8, 0] (−∞, 8] and [8, ∞) (c) Find the inverse function of f on the interval found in part (b). (d) Give the domain of the inverse function. [0, ∞) (−∞, ∞) (−∞, −8]∪[8, ∞) (−∞, 0)∪(0, ∞) [−8, 0]Consider the following. f(x) = (x+8)2 (a) Sketch a graph of the function f. (b) Determine intervals on which f is one-to-one. (−∞, −8] and [−8, ∞) (−∞, ∞) (−∞, 0] and [0, ∞) [−8, 0] (−∞, 8] and [8, ∞) (c) Find the inverse function of f on the interval found in part (b). (d) Give the domain of the inverse function. [0, ∞) (−∞, ∞) (−∞, −8]∪[8, ∞) (−∞, 0)∪(0, ∞) [−8, 0]

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Consider the following.
f ( x ) = ( x + 8 ) 2
(a) Sketch a graph of the function f .
(b) Determine intervals on which f is one-to-one. ( , 8 ] and [ 8 , ) ( , ) ( , 0 ] and [ 0 , ) [ 8 , 0 ] ( , 8 ] and [ 8 , ) (c) Find the inverse function of f on the interval found in part (b). (d) Give the domain of the inverse function. [ 0 , ) ( , ) ( , 8 ] [ 8 , ) ( , 0 ) ( 0 , ) [ 8 , 0 ]

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