For the following graph of a function f a. write a formula for f as a piecewise function . b. find the domain and range of f . c. find the intercepts of the graph of f. d. draw the graph of y = f ( – x ) e. draw the graph of y = – f ( x ) f. draw the graph of y = f ( x ) + 1. g. draw the graph of y = f ( x + 1 ) h. draw the graph of y = 2 f ( x ) i. draw the graph of y = f ( 2 x ) j. draw the graph of y = f ( 1 2 x ) . k. explain why f is one-to-one. I. draw the graph of y = f – 1 ( x )
For the following graph of a function f a. write a formula for f as a piecewise function . b. find the domain and range of f . c. find the intercepts of the graph of f. d. draw the graph of y = f ( – x ) e. draw the graph of y = – f ( x ) f. draw the graph of y = f ( x ) + 1. g. draw the graph of y = f ( x + 1 ) h. draw the graph of y = 2 f ( x ) i. draw the graph of y = f ( 2 x ) j. draw the graph of y = f ( 1 2 x ) . k. explain why f is one-to-one. I. draw the graph of y = f – 1 ( x )
Solution Summary: The author explains how to write a piecewise function for the given graph.
Definition Definition Group of one or more functions defined at different and non-overlapping domains. The rule of a piecewise function is different for different pieces or portions of the domain.
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