Adding Integers Notes

Relations & Functions—NOTES

Objectives:

I can identify a function from a written description, table, graph, rule, set of ordered pairs, and/or mapping.

Vocabulary

Relation: A set of ______.
Function: A relation in which each member of the ______is paired with exactly one member of the ______.

Domain: The set of ______values.
Range: The set of ______values.
Independent Variable: These values are chosen and do not depend on the other variable. In a set of ordered pairs, the ______is the independent variable.
Dependent Variable: This value depends on the input value/independent variable because it changes when the input value changes. In a set of ordered pairs, the ______is the dependent variable.

Key Concepts

Determining if a Relation is a Function

A relation is a function if each ______is matched up with ONLY ONE ______.
To determine from a list or table.
Does a number in the domain match up with two different numbers in the range?
No—Then the set of ordered pairs is a function.
Yes—Then the set of ordered pairs is not a function because one x-value has two different y-values.

Examples:

x / 2 / 5 / 9 / 2
y / 1 / 4 / 7 / 3

{(2,1), (4,3), (5,4), (9,7)}

Determining if a Relation is a Function from a Graph

To determine if a relation is a function when the ordered pairs have been graphed, you can apply the ______to the graph of the relation.
Place a pencil at the left of the graph along the ______.
If, for each value of x in the domain, the pencil passes through only one point of the graph, then the graph represents a function.

Example:

Function Notation

A function that is written as an equation can also be written in a form called ______.

EquationFunction Notation

y=4x f(x) = 4x

The number in the ( ) will tell you what to sub for x in the problem.

Examples:

Find f(3) if f(x) = 5x.Find f(4) if f(x) = 8x

Relations & Functions—NOTES

Objectives:

I can identify a function from a written description, table, graph, rule, set of ordered pairs, and/or mapping.

Vocabulary

Relation: A set of ____ordered pairs______.
Function: A relation in which each member of the __x-coordinate______is paired with exactly one member of the _y-coordinate______.

Domain: The set of ____x___ values.
Range: The set of ______y______values.
Independent Variable: These values are chosen and do not depend on the other variable. In a set of ordered pairs, the ____x-coordinate______is the independent variable.
Dependent Variable: This value depends on the input value/independent variable because it changes when the input value changes. In a set of ordered pairs, the _____y-coordinate ______is the dependent variable.

Key Concepts

Determining if a Relation is a Function

A relation is a function if each ___ x-coordinate ______is matched up with ONLY ONE

______y-coordinate ______.

To determine from a list or table.
Does a number in the domain match up with two different numbers in the range?
No—Then the set of ordered pairs is a function.
Yes—Then the set of ordered pairs is not a function because one x-value has two different y-values.

Examples:

x / 2 / 5 / 9 / 2
y / 1 / 4 / 7 / 3

{(2,1), (4,3), (5,4), (9,7)}

Determining if a Relation is a Function from a Graph

To determine if a relation is a function when the ordered pairs have been graphed, you can apply the ______pencil line test______to the graph of the relation.
Place a pencil at the left of the graph along the __x-axis______.
If, for each value of x in the domain, the pencil passes through only one point of the graph, then the graph represents a function.

Example:

Function Notation

A function that is written as an equation can also be written in a form called

__function notation______.

EquationFunction Notation

y=4x f(x) = 4x

read as F of X

The number in the ( ) will tell you what to sub for x in the problem.

Examples:

Find f(3) if f(x) = 5x.Find f(4) if f(x) = 8x

f(x) = 5xf(x) = 8x f(3) = 5(3) or 5 x 3 f(4) = 8(4) or 8 x 4

f(3) = 15f(4) = 32