All Algebra 1 Resources
Example Questions
Example Question #11 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #12 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #13 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #14 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #15 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #16 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #17 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #18 : Perpendicular Lines
Find a line perpendicular to the line with the equation:
Lines can be written in the slope-intercept format:
In this format, equals the line's slope and represents where the line intercepts the y-axis.
In the given equation:
Perpendicular lines have slopes that are negative reciprocals of each other.
First, we need to find its reciprocal.
Second, we need to rewrite it with the opposite sign.
Only one of the choices has a slope of .
Example Question #19 : Perpendicular Lines
Given the two lines: and , are the lines perpendicular to each other?
Write the perpendicular line slope formula. The perpendicular slope is the negative reciprocal of the original slope.
Let be the original equation. The slope is . Substitute this into the equation to find the slope of any perpendicular line.
The slope of a perpendicular line must have a slope of , which is also the slope for .
The answer is:
Example Question #3541 : Algebra 1
Select the equation of the line that is perpendicular to .
None of the other answers.
Lines are perpendicular if their slopes are negative reciprocals of one another. For example, the negative reciprocal of . So is perpendicular to because their slopes are the negative reciprocals of each other. . A positive slope can still be the negative reciprocal as you can see.
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