Parent Functions
Transformations
Absolute Value Functions
Graphing Quadratics
Converting to Vertex Form
101

What is the parent function of Linear? (give the equation)

f(x) = x

101

What is this transformation?

f(x+h)

Shift left "h" units

101

What do all absolute value functions look like on a graph?

a "V" or upside-down "V"

101

What do all quadratic functions look like on a graph?

"U" or upside down "U"

101

What is the vertex form of number 12?

f(x) = (x-10)2

102

What is the parent function of Absolute Value? (give the equation)

f(x) = |x|

102

What is this transformation?

f(x) - k

Shift down "k" units

102

How do you find the vertex of an absolute value equation in Vertex form?

Vertex is (h, k), where h is a liar

y = a|x-h|+k

102

How do you find the vertex of a quadratic equation in Vertex form?

Vertex is (h, k), where h is a liar

y = a(x-h)2+k

102

What is the vertex form of number 14?

f(x)=-(x-5)2+2

103

What is the parent function of Quadratics? (give the equation)

f(x) = x2

103

What is this transformation?

a • f(x), |a| > 1

Vertical Stretch

103

What is the domain for all absolute value functions?

All Real Numbers

103

What is the domain for all quadratic functions?

All Real Numbers

103

What is the vertex for problem 13?

(-1, -9)

104

Which function family is this parent graph?

Absolute Value

104

What is this transformation?

a • f(x), |a| < 1

Vertical compression

104

When "a" is positive, is the  range "y ≥ __" 

or "y ≤ __"?

y ≤ __

104

Axis of Symmetry will always share the same ____ as the vertex.

x- coordinate

104

What is the vertex for problem 15?

(3, -1)

105

Which function family is this parent graph?

Quadratic

105

What is this transformation?

-a • f(x), a is negative

Reflect over the x-axis

105

When "a" is negative, is the  range "y ≥ __" 

or "y ≤ __"?

y ≥ __

105

What is the vertex for number 8 on the study guide?

(4, 0)

105

What is the process for converting Quadratic Standard Form to Quadratic Vertex Form called? (Hint: 3 words)

Complete the Square