The slope of any line parallel to the line described is -5.
Solution:
45x+9y=36. Solve for y.
9y=36-45x.
y= -5x+4
m=-5
Y = -2x + 5 so the slope of this equation, along with the slopes of parallel equations, is -2
When a straight line equation is parallel to another equation the slope remains the same but the y intercept changes
q2
-4
1, it will have the same slope but the y intercept will be different.
The slope is 5. Parallel lines always have the same slope.
5
Parallel, the slope of the second equation is 4
Y = -2x + 5 so the slope of this equation, along with the slopes of parallel equations, is -2
5
9
When a straight line equation is parallel to another equation the slope remains the same but the y intercept changes
q2
-4
1, it will have the same slope but the y intercept will be different.
All lines that have the same slope are parallel to each other. To determine which lines are parallel to the give equation, you must first have to determine the slope of the equation. Notice that your equation is written in y = mx + b form, where m represents slope. In this case, m = 2. Any equation with a slope of 2 is parallel to your given line. For examples of lines that would be parallel, the following are all parallel: y = 2x y = 2x + 1 y = 2x + 2 y = 2x + 100
A parallel equation has the same slope to the given equation. Note that your equation is in slope-intercept form; when an equation is solved for "y" (y = ...x + ...), the number in front of the "x" is the slope. Solve each of the other equations for "y" (if they are not already solved for "y"), and check the number in front of the "x".