# A relation that assigns one output value to one input value

**relation**

**that**

**assigns**exactly

**one**

**value**in the range to each

**value**in the domain v. Vertical Line Test: If a vertical line passes through more than

**one**point of the graph, the

**relation**is not a function vi. A function rule is an equation that describes a function. You can think of a function rule as an

**input**-

**output**machine vii.

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**Relation**-Function Part 1 edmodo. 1. POD 1. What is the longest distance between any two points in a crate with the following dimension: Length 10 feet Width 9 feet Height 4 feet. 2. Functions Unit 4 Part 1 CC8.F.1 Understand that a function is a rule that

**assigns**

**to**each

**input**exactly

**one**

**output**. The graph of a function is the set of. Sample

**Output**:

**Input**the

**value**of a & b: 2 4 The

**value**of a & b are: 2 4 ... Next: Write a Python program to print a variable without spaces between

**values**. ... The list comprehension just generates

**one**list, once, and copies each item over (from its original place of residence to the result list) also exactly once..

**a relation**can still be a function if an

**output value**associates with more than

**one input value**as shown in this example. But again, it would be a no no the other way around But again, it would be a no no the other way around, where an

**input value**corresponds to two or more

**output**values.

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**A**function is a

**relation**in which each possible

**input**

**value**leads to exactly

**one**

**output**

**value**. We say "the

**output**is a function of the

**input**." The

**input**

**values**make up the domain, and the

**output**

**values**make up the range. How

**To**: Given a relationship between two quantities, determine whether the relationship is a function. Identify the

**input**

**values**. Let's look at the graphs of the three functions of : Let's take any

**value**for , say . The graph of corresponds to a vertical line. A function of maps each to exactly

**one**; therefore, there should be at most

**one**point of intersection with any vertical line. We see in the three graphs of the functions above that if a vertical line is drawn at any.