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2.2 Reflections & Transformations. We need to have a firm grasp on our basic graphs, so we can then easily transform them using some simple rules. 6 Basic Graphs:. (1) Identity. (2) Squaring. (3) Cubing. (6) Reciprocal. Absolute Value. Square Root.
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We need to have a firm grasp on our basic graphs, so we can then easily transform them using some simple rules. 6 Basic Graphs: (1) Identity (2) Squaring (3) Cubing (6) Reciprocal Absolute Value Square Root
3 ways to change up a graph – Reflections, Translations, & Dilation Start with y = f (x) Reflections Translations y = f (x – c) + d shift
Dilations stretch or compress y = af(x) Let’s Explore! iPad app Desmos (can also access online @ desmos.com ) Start Desmos Find button in top left corner Choose transformations Reflections of a function Explore this graph! touch next to the 5 & delete up to = enter your own change box 4 to x = f (y) (use ABC) touching next to the next to the formula will “turn on” each graph Are they what you expected? Launch website
Launch website Now let’s explore translations Go to , under Transformations Translating Any Function delete function in box 1 go to put x in ( ) Play with h & k put in negative values/ positive values use slider or enter a # in boxes 5 & 7 or change values in equation directly in box 3
Launch website Time for Dilations Go to , under Transformations Scaling Any Function delete function in box 1 type in x2 Play with a make bigger or smaller – use slider or type in #s Bring it all together! Describe (yes, write a sentence!) how the basic graph of y = x3 has been changed Then check on Desmos or calculator Touch & Type in the equation & confirm your description! y = 2 (x + 3)3 – 2 Graph
Homework #202 Pg 69 #1–43 odd, 38, 40, 42, 44