Parallel Lines - Algebra

Parallel lines have the same slope and the only equation that has the same slope as the given equation is

We are given

and we compare it to the general formula of a straight line

where is the slope and is the y-intercept. In our case, . Know that in order for another function to be parallel, it has to have the same slope. Therefore, we pick an answer choice that has the slope of . It turns out that the answer choice is

Parallel lines need to have slopes that are equal. For the line , the slope is 3, since this is the coefficient attached to the x-variable. For the line , the slope is 4. Because these slopes are not equal, the lines are not parallel.

Lines are parallel if they have the same slope. The lines are all given in the form y = mx + b. In this form, m represents the slope, thus, we are looking for another line with a slope of 2. This is y = 2x – 3.

Note that the line given by y = (–1/2)x + 6 has a slope that is the negative reciprocal of 2. This line will be perpendicular to our given line.

When both equations are solved for the form the slopes are the same.

Parallel lines must have identical slopes. The given equation is in the form. Therefore, we can quickly determine that its slope is 3. The only other equation with a slope of 3 is .

Parallel lines have the same slope. Since all of these equations are in the form, it is easy to determine their slopes, . The slope of is 2.

The only other line with a slope of 2 is .

Parallel lines must have equal slopes to one another. Since all of the lines are in the form, it is easy to determine their slopes. The given line has a slope of 3, which means that any line that is parallel to it must have a slope of 3. The only other line with a slope of 3 is .

Parallel lines have the same slope as one another. The only pair of lines with the same slope is .

Parallel lines have the same slope. To find the slope of a given equation, it is necessary to convert it to slope-intercept form.

Subtract the from both sides.

Divide by .

Understanding slope-intercepts form, we can see that the slope is .

We can convert each answer choice to slope-intercept form to detrmine which has a slope matching the equation in the question.

This equation has the same slope, and is therefore parallel.

Parallel lines have identical slopes with one another. The given line has a slope of 9, so its parallel line must also have a slope of 9. The only other line with a slope of 9 is .

Parallel lines have identical slopes, so you must figure out which of these lines have the same slope as the given line. To determine the slope of the given line, you can rearrange it to resemble the form. can be rearranged to . Looking at the rearranged equation, it is clear that the line's slope is . The only other line with a slope of is .

Parallel lines have identical slopes. Since all of these lines are in the form, you can easily determine their slopes (). The slope of the given line is , so a line that's parallel to it must have the same slope. The only other line with a slope of is .

Two lines can only be parallel if they have identical slopes. In this case, the slope is , which is equal to . The only line that has the same slope is

so that is the correct answer. Take note that the value does not matter when determining whether two lines are parallel, unless the values are the same, in which case the lines would be identical and not parallel.

The first equation is written in standard form: . In this format, the slope is equal to .

The second equation is written in slope-intercept form: . The slope is given by the value of .

Because the slopes of both lines are equal, the lines must be parallel.

Parallel lines have identical slopes to one another. The slope of the given line is 7, so the slope of the other line must also be 7. The only other equation with a slope of 7 is .

Lines can be written in the slope-intercept form:

In this form, equals the slope and represents where the line intersects the y-axis.

Parallel lines have the same slope: .

Only one choice contains tow lines with the same slope.

The slope for both lines in this pair is .

For two lines to be parallel, they must have the same slope. So, we are looking for a line with a slope of . However, it's difficult to tell what the slopes of the answer choices are because they are not in slope-intercept form. Luckily, it's easy to convert them.

Take the answer choice . Subtracting from both sides gives

which can be simplified to

This is our answer! To be safe, the other choices can be rewritten in slope-intercept form as well, upon which it becomes clear that none of them are parallel.

Parallel lines have identical slopes. The slope of the given line is 8, so the slope of the parallel line must also be 8. The only other line with a slope of 8 is

.

To find out if lines are parallel or perpendicular you must look at the slopes of both lines. If they have the same slope then they are parallel and go in the same direction. If they have opposite slopes, then they are perpendicular and go in opposite directions and will eventually cross eachother at a right angle.

We have the following equations:

and

They are written in slope-intercept form:

In this form, is the slope. The slopes are both in our equations; therefore, the lines are parallel.