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1.6 PreCalculus Parent Functions Graphing Techniques.

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1 1.6 PreCalculus Parent Functions Graphing Techniques

2 Transformations Vertical Translations Horizontal Translations Graph stays the same, but moves up or down. Graph stays the same, but moves left or right.

3 Transformations Vertical Stretch Horizontal Stretch Width stays the same, but height increases. Height stays the same, but width increases.

4 Transformations Vertical Compression Horizontal Compression Width stays the same, but height decreases. Height stays the same, but width decreases.

5 Transformations Reflection Over the x-axis Graph “flips” up-side down. Reflection Over the y-axis Graph “flips” side-ways.

6 Quadratic f(x) = x 2 Abs Value f(x) = |x| Square Rt. f(x) = Translate Up Translate Down Translate Left Translate Right g(x) = x 2 + A g(x) = |x| + A g(x) = + A g(x) = x 2 − A g(x) = (x + A) 2 g(x) = (x − A) 2 g(x) = |x| − A g(x) = |x + A| g(x) = |x − A| g(x) = − A g(x) = Assume that A is a positive, real number!

7 Quadratic f(x) = x 2 Abs Value f(x) = |x| Square Rt. f(x) = Vertical Stretch Vertical Compression Horizontal Stretch Horizontal Compression g(x) =| 1 A x| ( 1 A x) 2 g(x) = Ax 2 g(x) = (Ax) 2 g(x) = A|x| g(x) = |Ax| g(x) = A Assume that A is a positive, real number!

8 Quadratic f(x) = x 2 Abs Value f(x) = |x| Square Rt. f(x) = Reflection over x-axis Reflection over y-axis Assume that A is a positive, real number! g(x) = −x 2 g(x) = −|x|g(x) = − g(x) = (-x) 2 g(x) = |-x|

9 Rational Functions Translate Up Stretch Translate Down Compression Translate Left Reflection over x-axis Translate Right Reflection over y-axis

10 Identify each transformation from the parent graph f(x) = x 2. g(x) = x 2 + 5g(x) = x 2 – 2 g(x) = (x + 1) 2 g(x) = (x – 3) 2 up 5 down 2 left 1 right 3 g(x) = −x 2 g(x) = (-x) 2 reflection over x-axis reflection over y-axis g(x) =( 1 2 x) 2 g(x) = 2x 2 g(x) = (2x) 2 vertical stretch factor of 2 vertical comp. factor of ½ Horiz. stretch Factor of 2 Horiz. Comp. Factor of ½

11 Identify each transformation from the parent graph f(x) = x 2. g(x) = -2x 2 + 5 g(x) = -(x + 1) 2 g(x) = (x – 3) 2 − 2 up 5 down 2 left 1 right 3 reflection over x-axis vertical stretch factor of 2 reflection over x-axis g(x) = (-2x) 2 Horiz. Comp. Factor of ½ reflection over y-axis

12 Identify each transformation from the parent graph f(x) = |x|. g(x) = |x| + 3g(x) = |x| – 10 g(x) = |x + 5| g(x) = |x – 2| up 3 down 10 left 5 right 2 g(x) = −|x|g(x) = |-x|reflection over x-axis reflection over y-axis g(x) =| 1 2 x| g(x) = 2|x| g(x) = |2x| vertical stretch factor of 2 vertical comp. factor of ½ Horiz. stretch Factor of 2 Horiz. Comp. Factor of ½

13 Identify each transformation from the parent graph f(x) = |x|. g(x) = 5|x| − 4 g(x) = -|x| + 3 g(x) = 2|x – 5| - 3 down 4 down 3 up 3 right 5 vertical stretch factor of 5 reflection over x-axis g(x) = |-3x|Horiz. Comp. Factor of ⅓ reflection over y-axis vertical stretch factor of 2

14 Identify each transformation from the parent graph f(x) = g(x) = + 3 g(x) = − 2 g(x) = g(x) = 2 down 2 up 3 left 2 right 4 vertical stretch factor of 2 vertical comp. factor of ½ horiz. stretch factor of 2 horiz. Comp. factor of ½ reflection over x-axis reflection over y-axis

15 Identify each transformation from the parent graph f(x) = g(x) = up 1 right 5 vertical stretch factor of 2 vertical comp. factor of ½ down 4 horiz. Comp. factor of ⅓ reflection over x-axis reflection over y-axis left 4

16 Find the function that is finally graphed after the following three transformations are applied to the graph of y = |x|. 1.Shift left 2 units. 2.Shift up 3 units. 3.Reflect about the y-axis.

17 Find the function that is finally graphed after the following three transformations are applied to the graph of 1.Shift down 5 units. 2.Shift right 2 units. 3.Reflect about the x-axis.

18 Graphing Techniques f(x) = x 2 – 4(down 4) x y 1. Graph f(x) = x 2. 2. Shift all of the points down 4 units.

19 Graphing Techniques f(x) = (x – 3) 3 (right 3) x y 1. Graph f(x) = x 3. 2. Shift all of the points right 3 units.

20 Graphing Techniques f(x) = |x - 2| + 3 (right 2, up 3) x y 1. Graph f(x) = |x|. 2. Shift all of the points right 2 and up 3.

21 Graphing Techniques f(x) = -x 3 (reflect over x-axis) x y 1. Graph f(x) = x 3. 2.Reflect all points over the x-axis.

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