P Which equation represents the line passing through P and parallel to line m?

Elementary Geometry For College Students, 7e
7th Edition
ISBN:9781337614085
Author:Alexander, Daniel C.; Koeberlein, Geralyn M.
Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.
ChapterP: Preliminary Concepts
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Which equation represent the line passing through p and parallel to line m ?
### Graph Analysis: Parallel Lines and Points

**Text:**
30. Line \( m \) and point \( P \) are shown in the graph below.

**Graph Description:**
- The graph is a coordinate plane with the x-axis and y-axis labeled.
- Line \( m \) is depicted as a diagonal line with a positive slope. It crosses from the lower-left to the upper-right.
- Point \( P \) is located below the line \( m \) on the plane.

**Question:**
Which equation represents the line passing through \( P \) and parallel to line \( m \)?

### Explanation:

In this graph, we need to determine the equation of a line that passes through a specific point \( P \) and is parallel to an existing line \( m \). Parallel lines have the same slope, so the equation for the new line will have the same slope as line \( m \). The specific location of point \( P \) will affect the y-intercept of this new line.

Understanding how to write the equation of a line given a point and a slope is essential in algebra. Typically, this involves using the point-slope form of a line's equation:

\[ y - y_1 = m(x - x_1) \]

Where \( m \) is the slope, and \( (x_1, y_1) \) are the coordinates of point \( P \).
Transcribed Image Text:### Graph Analysis: Parallel Lines and Points **Text:** 30. Line \( m \) and point \( P \) are shown in the graph below. **Graph Description:** - The graph is a coordinate plane with the x-axis and y-axis labeled. - Line \( m \) is depicted as a diagonal line with a positive slope. It crosses from the lower-left to the upper-right. - Point \( P \) is located below the line \( m \) on the plane. **Question:** Which equation represents the line passing through \( P \) and parallel to line \( m \)? ### Explanation: In this graph, we need to determine the equation of a line that passes through a specific point \( P \) and is parallel to an existing line \( m \). Parallel lines have the same slope, so the equation for the new line will have the same slope as line \( m \). The specific location of point \( P \) will affect the y-intercept of this new line. Understanding how to write the equation of a line given a point and a slope is essential in algebra. Typically, this involves using the point-slope form of a line's equation: \[ y - y_1 = m(x - x_1) \] Where \( m \) is the slope, and \( (x_1, y_1) \) are the coordinates of point \( P \).
The image shows a problem from a mathematics educational resource focusing on parallel lines and equations. 

**Text:**
"30. Line \( m \) and point \( P \) are shown in the graph below."

Below this text is a graph on a coordinate plane. 

**Description of Graph:**
- The graph has an \( x \)-axis (horizontal) and a \( y \)-axis (vertical).
- Line \( m \) is drawn, appearing as an upward sloping line from left to right, indicating a positive slope. It intersects the \( y \)-axis at a positive value and the \( x \)-axis at a negative value.
- Point \( P \) is marked on the graph, located in the third quadrant.

**Accompanying Question:**
"Which equation represents the line passing through \( P \) and parallel to line \( m \)?"

The question requires finding the equation of a line parallel to line \( m \) and passing through the given point \( P \). To find this, one would need to determine the slope of line \( m \) and then use point \( P \) to find the specific equation of the new line with the same slope.
Transcribed Image Text:The image shows a problem from a mathematics educational resource focusing on parallel lines and equations. **Text:** "30. Line \( m \) and point \( P \) are shown in the graph below." Below this text is a graph on a coordinate plane. **Description of Graph:** - The graph has an \( x \)-axis (horizontal) and a \( y \)-axis (vertical). - Line \( m \) is drawn, appearing as an upward sloping line from left to right, indicating a positive slope. It intersects the \( y \)-axis at a positive value and the \( x \)-axis at a negative value. - Point \( P \) is marked on the graph, located in the third quadrant. **Accompanying Question:** "Which equation represents the line passing through \( P \) and parallel to line \( m \)?" The question requires finding the equation of a line parallel to line \( m \) and passing through the given point \( P \). To find this, one would need to determine the slope of line \( m \) and then use point \( P \) to find the specific equation of the new line with the same slope.
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