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]](https://www.doubtrix.com/uploads/editor/4727900474PBsvhJcFet.png)
![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]](https://www.doubtrix.com/uploads/editor/1545931920PGYHNhudbq.png)
![Consider the following. f(x) = 16 − x2 Sketch the graph of the function. Use a graphing utility to verify your graph. Find its domain and range. Domain: [−4, 4] [0, 4] (−∞, 0)∪(4, ∞) (−∞, ∞) (−∞, −4)∪(4, ∞) Range: (−∞, 0)∪(4, ∞) (−∞, −4)∪(4, ∞) [0, 4] [−4, 4] (−∞, ∞)](https://www.doubtrix.com/uploads/editor/8134848983KWmgSFmEdj.png)
![Consider the following. f(x) = 16 − x2 Sketch the graph of the function. Use a graphing utility to verify your graph. Find its domain and range. Domain: [−4, 4] [0, 4] (−∞, 0)∪(4, ∞) (−∞, ∞) (−∞, −4)∪(4, ∞) Range: (−∞, 0)∪(4, ∞) (−∞, −4)∪(4, ∞) [0, 4] [−4, 4] (−∞, ∞)](https://www.doubtrix.com/uploads/editor/4436239967TtDyBHNiBP.png)