Graphing Transformed Functions Homework PDF
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This is homework for a mathematics lesson on graphing transformed functions, covering topics such as piecewise functions, transformations, and function graphs. The questions include problems to graph different functions (linear, quadratic, piecewise, etc.) through multiple transformations of a base function.
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1. State the transformations defined by each equation in the order that they would be applied to y = f ( x). 1 1 a. y = −2 f (4 x) b. y = − f ( x − 3) + 2...
1. State the transformations defined by each equation in the order that they would be applied to y = f ( x). 1 1 a. y = −2 f (4 x) b. y = − f ( x − 3) + 2 c. y= f x + 5 − 6 2 4 2. Draw an accurate graph of each of the following functions. 1 a. y = − ( 2( x − 1) ) + 5 b. y = x + 2 −3 2 c. y = 3 −x + 5 +1 2 2 1 d. y = +2 e. y = − | x + 3 | −5 f. y = − x −1 + 5 4− x 4 3. Given each of the following functions below, graph y = − f (−2 x + 8) + 3 1 a. f ( x) = x 2 b. f ( x) = x c. f ( x) =| x | d. f ( x) = x 4. Graph each piecewise function. | x | x −2 − x − 1 x −1 a. f ( x) = 2 b. f ( x) = 2 − x x 2 − x + 2 x −1 −( x + 5) + 4 x −3 2 1 x 1 c. f ( x) = x d. f ( x) = 3 x + 3 −3 x 1 x x 1 1 +5 x 1 x−2 5. Write the equation for each piecewise function. a. b. 6. The graph of y = f ( x), consisting of two line segments and a semicircle, is shown for −3 x 5. Sketch a graph of g on the same axes where: a. g ( x) = f ( x + 3) − 4 b. g ( x) = − f (2 x) + 1 c. g ( x) = 3 f (−0.5 x − 1) + 2 7. The three graphs below show the complete graph of a function y = f ( x). a. Is f ( x ) an odd function, even function, or neither? Explain b. On the first graph, sketch y = g ( x), where g ( x) = − f ( x) c. On the second graph, sketch y = h( x), where h( x) = f (− x − 2) d. On the third graph, sketch y = w( x), where w( x) = 2 f (− x) + 1 e. f ( x ) passes through the points A (0, –2.4), B (2, 0) and C (5, 1). Give the coordinates of the images of these three points on the graphs of g, h, and w.