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Example Questions
Example Question #21 : Parallel Lines
Which of the following lines is parallel to the following line:
Parallel lines have the same slope and the only equation that has the same slope as the given equation is
Example Question #22 : Parallel Lines
Which of the lines is parallel to ?
In order for the lines to be parallel, both lines must have similar slope.
The current linear equation is in standard form. Rewrite this equation in slope intercept form, .
The slope is represented by the in the equation.
Subtract on both sides.
Simplify the left side and rearrange the right side.
Divide by nine on both sides.
Simplify both sides of the equation.
The slope of this line is .
The only line provided that has the similar slope is:
The answer is:
Example Question #1 : How To Find The Slope Of Parallel Lines
What is the slope of a line parallel to the line described by 3x + 8y =16?
First, you should put the equation in slope intercept form (y = mx + b), where m is the slope.
Isolate the y term
3x + 8y – 3x = 16 – 3x
8y = 16 – 3x
Rearrange terms
8y = –3x +16
Divide both sides by 8
The slope of the line is -3/8. A parallel line will have the same slope, thus -3/8 is the correct answer.
Example Question #2 : How To Find The Slope Of Parallel Lines
What is the slope of a line parallel to ?
When two lines are parallel, they have the same slope. With this in mind we take the slope of the first line which is and make it the slope of our parallel line.
If , then .
Example Question #1 : How To Find The Slope Of Parallel Lines
What is the slope of a line that is parallel to ?
Parallel lines have identical slopes. To determine the slope of the given line, transform into the format, or . The slope of the given line is , so its parallel line must also be .
Example Question #1 : How To Find The Slope Of Parallel Lines
Which equation described a line parallel to the line that connects points (–8,9) and (3,–4)?
In order for two lines to be parellel, their slopes have to be the same.
Find the slope of the line connecting those two points using the general slope formula, , where the points are and . In our case, the points are (–8,9) and (3,–4). The slope is calculated below.
Match this slope value with one of the possible choice of equations. The correct equation is because its slope is the same.
Example Question #1 : How To Find The Slope Of Parallel Lines
Which of the following are NOT parallel to each other?
Four of the answers are not in slope-intercept form.
For the lines to be parallel, all must share the same slopes.
To identify the slopes, this is the term of:
The only equation that does not have a slope of is
.
Example Question #6 : How To Find The Slope Of Parallel Lines
Lines A and B are parallel. Line A can be represented by the equation .
Find the slope of line B.
If two lines are parallel, then they have the same slope.
Line A is:
Rewrite this in slope-intercept form where is the slope:
The slope of line A is .
If the slope of line A is , then the slope of line B must be .
Example Question #7 : How To Find The Slope Of Parallel Lines
Find the slope of a line parallel 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:
And it has a slope of:
Parallel lines share the same slope.
The parallel line has a slope of .
Example Question #3 : How To Find The Slope Of Parallel Lines
Find the slope of a line parallel 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:
And it has a slope of:
Parallel lines share the same slope.
The parallel line has a slope of .
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