All PSAT Math Resources
Example Questions
Example Question #1 : Perpendicular Lines
Which set of lines is perpendicular?
y = 3x + 5 and y = 5x + 3
y = 3x/5 – 3 and y = 5x/3 + 3
y = x – 1/2 and y = –x + 1/2
the line between the points (7,4) and (4,7), and the line between the points (3,9) and (4,8)
the line between the points (1,3) and (3,5), and y = 4x + 7
y = x – 1/2 and y = –x + 1/2
Two lines are perpendicular to each other if their slopes are negative reciprocals. For example, if one line has a slope of 2, the line perpendicular to it has a slope of –1/2. One easy way to eliminate answer choices is to check if the slopes have the same sign, i.e. both positive or both negative. If so, they cannot be perpendicular. Several of the lines in the answer choices are of the form y = mx + b, where m is the slope and b is the y-intercept. We are only worried about the slope for the purposes of this question.
y = 3x + 5 and y = 5x + 3 both have positive slopes (m = 3 and m = 5, respectively), so they aren't perpendicular.
y = 3x/5 – 3 and y = 5x/3 + 3 both have positive slopes, so again they aren't perpendicular.
y = x – 1/2 and y = –x + 1/2 have slopes of m = 1 and m = –1, respectively. One is positive and one is negative, so that is a good sign. Let's take the negative reciprocal of 1. 1 /–1 = –1. So these two slopes are in fact negative reciprocals, and these two lines are perpendicular to each other. Even though we have found the correct answer, let's go through the other two choices to be sure.
The line between the points (1,3) and (3,5), and y = 4x + 7: We need to find the slope of the first line. slope = rise / run = (y2 – y1) / (x2 – x1) = (5 – 3) / (3 – 1) = 1. The slope of y = 4x + 7 is also positive (m = 4), so the lines are not perpendicular.
The line between the points (7,4) and (4,7), and the line between the points (3,9) and (4,8): the first slope = (7 – 4) / (4 – 7) = –1 and the second slope = (8 – 9) / (4 – 3) = –1. They have the same slope, making them parallel, not perpendicular.
Example Question #1 : How To Find Out If Lines Are Perpendicular
Which set of lines is perpendicular?
the line between the points (1,3) and (3,5), and y = 4x + 7
y = 3x + 5 and y = 5x + 3
y = 3x/5 – 3 and y = 5x/3 + 3
the line between the points (7,4) and (4,7), and the line between the points (3,9) and (4,8)
y = x – 1/2 and y = –x + 1/2
y = x – 1/2 and y = –x + 1/2
Two lines are perpendicular to each other if their slopes are negative reciprocals. For example, if one line has a slope of 2, the line perpendicular to it has a slope of –1/2. One easy way to eliminate answer choices is to check if the slopes have the same sign, i.e. both positive or both negative. If so, they cannot be perpendicular. Several of the lines in the answer choices are of the form y = mx + b, where m is the slope and b is the y-intercept. We are only worried about the slope for the purposes of this question.
y = 3x + 5 and y = 5x + 3 both have positive slopes (m = 3 and m = 5, respectively), so they aren't perpendicular.
y = 3x/5 – 3 and y = 5x/3 + 3 both have positive slopes, so again they aren't perpendicular.
y = x – 1/2 and y = –x + 1/2 have slopes of m = 1 and m = –1, respectively. One is positive and one is negative, so that is a good sign. Let's take the negative reciprocal of 1. 1 /–1 = –1. So these two slopes are in fact negative reciprocals, and these two lines are perpendicular to each other. Even though we have found the correct answer, let's go through the other two choices to be sure.
The line between the points (1,3) and (3,5), and y = 4x + 7: We need to find the slope of the first line. slope = rise / run = (y2 – y1) / (x2 – x1) = (5 – 3) / (3 – 1) = 1. The slope of y = 4x + 7 is also positive (m = 4), so the lines are not perpendicular.
The line between the points (7,4) and (4,7), and the line between the points (3,9) and (4,8): the first slope = (7 – 4) / (4 – 7) = –1 and the second slope = (8 – 9) / (4 – 3) = –1. They have the same slope, making them parallel, not perpendicular.
Example Question #81 : Coordinate Geometry
Which of the following lines is perpendicular to
The line which is perpendicular has a slope which is the negative inverse of the slope of the original line.
Example Question #1 : Perpendicular Lines
If two lines have slopes of and , which statement about the lines is true?
They are parallel.
They are parabolas.
They are perpendicular.
They don't intersect.
They intersect at two points.
They are perpendicular.
Perpendicular lines have slopes that are the negative reciprocals of each other.
Example Question #5 : Perpendicular Lines
Line includes the points and . Line includes the points and . Which of the following statements is true of these lines?
The lines are identical.
More information is needed to answer this question.
The lines are perpendicular.
The lines are parallel.
The lines are distinct but neither parallel nor perpendicular.
The lines are distinct but neither parallel nor perpendicular.
We calculate the slopes of the lines using the slope formula.
The slope of line is
The slope of line is
Parallel lines and identical lines must have the same slope, so these can be eliminated as choices. The slopes of perpendicular lines must have product . The slopes have product
so they are not perpendicular.
The correct response is that the lines are distinct but neither parallel nor perpendicular.
Example Question #2 : Perpendicular Lines
Line includes the points and . Line includes the points and . Which of the following statements is true of these lines?
Insufficient information is given to answer this question.
The lines are distinct but neither parallel nor perpendicular.
The lines are identical.
The lines are parallel.
The lines are perpendicular.
The lines are perpendicular.
We calculate the slopes of the lines using the slope formula.
The slope of line is
The slope of line is
The slopes are not the same, so the lines are neither parallel nor identical. We multiply their slopes to test for perpendicularity:
The product of the slopes is , making the lines perpendicular.
Example Question #1 : Perpendicular Lines
Consider the equations and . Which of the following statements is true of the lines of these equations?
The lines are perpendicular.
The lines are distinct but neither parallel nor perpendicular.
Insufficient information is given to answer this question.
The lines are identical.
The lines are parallel.
The lines are parallel.
We find the slope of each line by putting each equation in slope-intercept form and examining the coefficient of .
is already in slope-intercept form; its slope is .
To get in slope-intercept form we solve for :
The slope of this line is also .
The slopes are equal; however, the -intercepts are different - the -intercept of the first line is and that of the second line is . Therefore, the lines are parallel as opposed to being the same line.
Example Question #1 : Perpendicular Lines
Which line is perpendicular to ?
To determine if lines are perpendicular, look at the slope. Perpendicular lines have slopes that are negative reciprocals. The slope of is . The negative reciprocal of is . Therefore, the answer is .
Example Question #1 : How To Find The Slope Of Perpendicular Lines
Two points on line m are (3,7) and (-2, 5). Line k is perpendicular to line m. What is the slope of line k?
2/5
-5/2
0
3
-5
-5/2
The slope of line m is the (y2 - y1) / (x2 - x1) = (5-7) / (-2 - 3)
= -2 / -5
= 2/5
To find the slope of a line perpendicular to a given line, we must take the negative reciprocal of the slope of the given line.
Thus the slope of line k is the negative reciprocal of 2/5 (slope of line m), which is -5/2.
Example Question #2 : Perpendicular Lines
The equation of a line is: 8x + 16y = 48
What is the slope of a line that runs perpendicular to that line?
2
-2
-1/4
8
-1/8
2
First, solve for the equation of the line in the form of y = mx + b so that you can determine the slope, m of the line:
8x + 16y = 48
16y = -8x + 48
y = -(8/16)x + 48/16
y = -(1/2)x + 3
Therefore the slope (or m) = -1/2
The slope of a perpendicular line is the negative inverse of the slope.
m = - (-2/1) = 2