1. Match the term with the definition. (5 points)

[tex]$\square$[/tex] 1. Line Segment
a. an infinite number of points extending in opposite directions that has only one dimension

[tex]$\square$[/tex] 2. Line
b. part of a line that has two endpoints

[tex]$\square$[/tex] 3. Point
c. part of a line that has one endpoint and continues in one direction infinitely

[tex]$\square$[/tex] 4. Ray
d. a location, has no dimension

[tex]$\square$[/tex] 5. Vertex
e. the common endpoint of two segments or rays that form the "corner" of an angle



Answer :

Certainly! Let's match each term with its correct definition.

1. Line Segment: A line segment is a part of a line that has two endpoints. Among the given definitions, the one that matches this is:
- b. Part of a line that has two endpoints

2. Line: A line is defined as an infinite number of points extending in opposite directions that has only one dimension. The matching definition is:
- a. An infinite number of points extending in opposite directions that has only one dimension

3. Point: A point is a location that has no dimension. The definition that fits this term is:
- d. A location, has no dimension

4. Ray: A ray is a part of a line that has one endpoint and continues in one direction infinitely. The corresponding definition is:
- c. Part of a line that has one endpoint and continues in one direction infinitely

5. Vertex: A vertex is the common endpoint of two segments or rays that form the "corner" of an angle. The appropriate definition is:
- e. The common endpoint of two segments or rays that form the "corner" of an angle

Let's summarize the correct term-definition matchings:
1. Line Segment - b. Part of a line that has two endpoints
2. Line - a. An infinite number of points extending in opposite directions that has only one dimension
3. Point - d. A location, has no dimension
4. Ray - c. Part of a line that has one endpoint and continues in one direction infinitely
5. Vertex - e. The common endpoint of two segments or rays that form the "corner" of an angle

So, the final pairings are:
- 1: b
- 2: a
- 3: d
- 4: c
- 5: e

This is the detailed solution for matching the terms with their correct definitions.