y=2x-3 2x-4y=8
-4y=-2x+8
y=-2/-4x+8/-4
y=1/2x-2
the equation for slope intercept form is y=mx+b
m being the slope
parallel equations would have the same slope (m) and
perpendicular equations have opposite reciprocal slopes
the opposite reciprocal of 2 is -1/2
the equations are neither parallel or perpendicular.
Neither perpendicular nor parallel
The slope of both lines is 8. So they're parallel.
If the second equation is: y minus 2x equals 3, then:y - 2x = 3 ⇒ y = 2x + 3 and it is parallel to y = 2x.Otherwise (with with missing operator as "plus", "multiply" or "divide"), the lines are neither parallel nor perpendicular.
Parallel. They both have a slope of 4.
No, they are perpendicular.
Neither perpendicular nor parallel
Neither: because one line, by itself, can be neither parallel or perpendicular. These characteristics are relevant only in the context of another line (or lines). The given line is parallel to some lines and perpendicular to others.
The slope of both lines is 8. So they're parallel.
If the second equation is: y minus 2x equals 3, then:y - 2x = 3 ⇒ y = 2x + 3 and it is parallel to y = 2x.Otherwise (with with missing operator as "plus", "multiply" or "divide"), the lines are neither parallel nor perpendicular.
They are both parallel because the slope or gradient is the same but the y intercept is different.
Parallel. They both have a slope of 4.
y=-2 is parallel to the x-axis and perpendicular to the y-axis.
No, they are perpendicular.
Base on the slope of two linear equations (form: y = mx+b, where slope is m): - If slopes are equal, the 2 graphs are parallel - If the product of two slopes equals to -1, the 2 graphs are perpendicular. If none of the above, then the 2 graphs are neither parallel nor perpendicular.
y = -5x + 9 is the equation of a straight line. It cannot be parallel or perpendicular by itself, you need another line to compare it to.
They are parallel because the slope has the same value in both equations.
4