2-6 Families of Functions

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Presentation transcript:

2-6 Families of Functions Algebra 2 Prentice Hall, 2007 Think… “The Function Family”

Definitions A Family of Functions is made up of functions with certain characteristics. A parent function is the simplest form of a function. Examples: (line with slope 1 passing through origin) (a V-graph opening up with vertex at origin) (a U-graph opening up with vertex at origin)

Definitions Offspring of parent functions are: Translations (or shifts of the parent) Stretches (or skinnier versions of the parent) Shrinks (or fatter versions of the parent) Reflections (or flipped versions of the parent)

Translations Translations are shifts up/down, left/right, or a combination of the 2. The graph is the same size & shape as the parent, but moved to a new location. Ex: Parent Offspring

Translation Functions If the parent function is , then translation offspring would be: shift up k units shift down k units shift right h units shift left h units What kind of translation is ? Shift up k and right h NOTE: shift left/right according to “k” only when the coefficient of x is 1!!!

Examples Ex. 1 Graph Remember what the parent looks like and go from there… …the parent shifted right 3 units!

Examples Ex. 2 Graph What would look like? The parent shifted down 3 units. What would look like?

Stretches A stretch multiples all the y-values by the same factor greater than 1, thereby the graph vertically (making it skinnier than the parent!) If the parent function is , then stretched offspring would be … … provided . stretching

Shrinks A shrink reduces all the y-values by the same factor less than 1, thereby the graph vertically (making it fatter than the parent!) If the parent function is , then shrunken offspring would be … … provided . compressing

Examples Graph the parent function: Graph the offspring: Stretch: y’s are 3 times bigger Shrink: y’s are half as big

Reflections A reflection over the x-axis changes the y-values to their opposites…(i.e. the parent flips!) If the parent function is , then a reflection offspring would be: reflection over the x-axis ( )

Example Graph the parent function: Graph the reflection offspring:

Just for kicks… Describe this “offspring”:

Homework 2-6 PRWS 2-6 Families of Functions