9.4 Absolute Value Functions and Graphs

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Presentation transcript:

9.4 Absolute Value Functions and Graphs Graphing Absolute Value Functions

Absolute Value Functions An absolute value function is a function with an absolute value as part of the equation… f(x) = |mx + b| Graphs of absolute value equations have two special properties: a) a vertex b) they look like angles

Absolute Value Functions Vertex – point where the graph changes direction

Finding the Vertex For an equation y = |mx + b| + c, vertex = -b , c m Example: Find the vertex of y = |4x + 2| - 3

Finding the Vertex For an equation y = |mx + b| + c, vertex = -b , c m Example: Find the vertex of y = |4x + 2| - 3 Answer: = -2 , -3 4 = -1 , -3 2

Absolute Value Functions Steps to graphing an absolute value function… Find the vertex Write two linear equations and find slope Use slope to plot points, connect the dots

Absolute Value Functions Example 1: Graph y = |3x + 12|.

Absolute Value Functions Step 1: Find the vertex y = |3x + 12| m = -b = c =

Absolute Value Functions Step 1: Find the vertex y = |3x + 12| m = 3 -b = -12 c = 0

Absolute Value Functions Step 1: Find the vertex y = |3x + 12| m = 3 -b = -12 c = 0 vertex = -b , c m vertex = -12 , 0 3 vertex = (-4, 0)

Absolute Value Functions Step 1: Find the vertex vertex = (-4, 0)

Absolute Value Functions Step 2: Write two linear equations and find slope. y = |3x + 12| Positive Negative

Absolute Value Functions Step 2: Write two linear equations and find slope. y = |3x + 12| Positive Negative y = 3x + 12 y = -3x – 12 m1 = m2 =

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-4, 0) m1 = 3 m2 = -3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-4, 0) m1 = 3 m2 = -3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-4, 0) m1 = 3 m2 = -3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-4, 0) m1 = 3 m2 = -3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-4, 0) m1 = 3 m2 = -3

Absolute Value Functions Example 2: Graph y = |3x + 6| - 2

Absolute Value Functions Step 1: Find the vertex y = |3x + 6| - 2

Absolute Value Functions Step 1: Find the vertex y = |3x + 6| - 2 m = 3 -b = -6 c = -2 vertex = (-6/3, -2) = (-2, -2)

Absolute Value Functions Step 1: Find the vertex vertex = (-2, -2)

Absolute Value Functions Step 2: Write two linear equations and find slope y = |3x + 6| - 2 Positive Negative

Absolute Value Functions Step 2: Write two linear equations and find slope y = |3x + 6| - 2 Positive Negative y + 2 = 3x + 6 y + 2 = -3x – 6 y = 3x + 4 y = -3x – 8

Absolute Value Functions Step 2: Write two linear equations and find slope y = |3x + 6| - 2 Positive Negative y + 2 = 3x + 6 y + 2 = -3x – 6 y = 3x + 4 y = -3x – 8 m = 3 m = -3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3

Absolute Value Functions Step 3: Use the slope to plot points vertex = (-2, -2) m1 = -3 m2 = 3