All ACT Math Resources
Example Questions
Example Question #31 : Coordinate Plane
What is the equation of the line passing through and which is parallel to ?
Ordinarily, we would use point-slope form, , to construct a proper parallel from a point and a slope. However, in this case, we have been given a y-intercept by the problem itself, so sticking with slope-intercept form is easiest.
If the new line passes through , then we know the y-intercept is . Since slope is equal in parallel lines, and the slope of our comparison line is , we know the slope of our new line is .
Thus, .
The correct answer is, .
Example Question #31 : Coordinate Plane
Which of the following equations represents a line that is parallel to the line represented by the equation ?
Lines are parallel when their slopes are the same.
First, we need to place the given equation in the slope-intercept form.
Subtract from both sides of the equation.
Simplify.
Divide both sides of the equation by .
Simplify.
Reduce.
Because the given line has the slope of , the line parallel to it must also have the same slope.
Example Question #1 : How To Find The Equation Of A Parallel Line
If the line through the points (5, –3) and (–2, p) is parallel to the line y = –2x – 3, what is the value of p ?
–10
0
4
11
–17
11
Since the lines are parallel, the slopes must be the same. Therefore, (p+3) divided by (–2–5) must equal –2. 11 is the only choice that makes that equation true. This can be solved by setting up the equation and solving for p, or by plugging in the other answer choices for p.
Example Question #1 : How To Find The Slope Of Parallel Lines
What is the slope of a line parallel to the line: -15x + 5y = 30 ?
1/3
30
3
-15
3
First, put the equation in slope-intercept form: y = 3x + 6. From there we can see the slope of this line is 3 and since the slope of any line parallel to another line is the same, the slope will also be 3.
Example Question #203 : Geometry
What is the slope of any line parallel to –6x + 5y = 12?
5/6
6/5
12/5
6
12
6/5
This problem requires an understanding of the makeup of an equation of a line. This problem gives an equation of a line in y = mx + b form, but we will need to algebraically manipulate the equation to determine its slope. Once we have determined the slope of the line given we can determine the slope of any line parallel to it, becasue parallel lines have identical slopes. By dividing both sides of the equation by 5, we are able to obtain an equation for this line that is in a more recognizable y = mx + b form. The equation of the line then becomes y = 6/5x + 12/5, we can see that the slope of this line is 6/5.
Example Question #3 : How To Find The Slope Of Parallel Lines
What is the slope of a line that is parallel to the line 11x + 4y - 2 = 9 – 4x ?
We rearrange the line to express it in slope intercept form.
Any line parallel to this original line will have the same slope.
Example Question #32 : Coordinate Plane
In the standard (x, y) coordinate plane, what is the slope of a line parallel to the line with equation ?
Parallel lines will have equal slopes. To solve, we simply need to rearrange the given equation into slope-intercept form to find its slope.
The slope of the given line is . Any lines that run parallel to the given line will also have a slope of .
Example Question #204 : Geometry
What is the slope of a line that is parallel to the line ?
Parallel lines have the same slope. The question requires you to find the slope of the given function. The best way to do this is to put the equation in slope-intercept form (y = mx + b) by solving for y.
First subtract 6x on both sides to get 3y = –6x + 12.
Then divide each term by 3 to get y = –2x + 4.
In the form y = mx + b, m represents the slope. So the coefficient of the x term is the slope, and –2 is the correct answer.
Example Question #1 : How To Find The Slope Of Parallel Lines
What is the slope of any line parallel to the line ?
To answer this question, we must find the slope of a line parallel to the line .
When a line is parallel to another, they have the same slope. Therefore, if we find the slope of the line we are given, we will find the slope of any line that would be parallel to it.
To find the slope, we must put our equation into point-intercept form. Point-intercept form is displayed as the following:
, where is the slope and is where the line intercepts the -axis.
Note that to put a line into point-intercept form, you must solve for .
Therefore, we must solve for . So, for this data, we must first subtract both sides of the equation by :
This becomes:
Now we must divide each side by to get by itself:
This becomes:
Because is in our point-intercept form, the slope of our line is . Therefore, the slope of any line parallel to this line is also .
Example Question #22 : Parallel Lines
What is the slope of a line parallel to the line given by the equation:
?
Parallel lines have the same slope. You find slope by using the general form of slope-intercept:
where represents the slope of the line and represents the -intercept.
For our equation we see that the
is
thus the anser is .
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