A linear equation in the form y = mx + c has slope m
Any line parallel to 3x + 9y = 5 has the same slope
3x + 9y = 5
→ 9y = -3x + 5
→ y = (-3/9)x + 5/9
→ y = -⅓x + 5/9
→ Every line parallel to 3x + 9y = 5 has slope -⅓.
It equals the slope of the line y = -x. That's a pretty darn strong hint right there is what that is.
If it is parallel, it must have the same slope of the original line which is -5.
The graph of [ y = 4x + 2 ] is a straight line with a slope of 4.Any line with a slope of 4 is parallel to that one, and any line parallel to that one has a slope of 4.
Get in slope intercept form. 3X + 5Y = 15 5Y = -3X + 15 Y = -3/5X + 3 -3/5 is the slope of this line and the line parallel to this line
Y = -2x + 5 so the slope of this equation, along with the slopes of parallel equations, is -2
Minus one half, (-1/2).
If you mean -x+y = 12 then y = x+12 and so the parallel line will have the same slope but with a different y intercept.
[ y = 2x + 5 ] has a slope of 2. [ y = 2 ] is a horizontal line ... its slope is zero. Their slopes are different, so they're not parallel.
6x + 3y = -9 So 3y = -6x - 9 or y = -2x - 3 So the slope of the given line is -2 Therefore, the slope a any parallel line is also -2.
Rewriting the equation 3x + y = 15 gives y = 15 - 3xThe slope of this and any parallel line is the x multiple, which in this case is -3
the slope of the line is -4
Y=2X+4. You must only change the plus blank...
The whole line 'shifts up' by two units, and is parallel to the original line (same slope)
The slope of the line of 2x plus 2y equals 7 is (7/2x - 1).
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
Parallel, the slope of the second equation is 4
4x+y = 14 will be parallel to the above equation because the slope or gradient remains the same but the y intercept changes.
I assume the question should be y = -2x + 5? The equation of a line that is parallel to that line is any line that begins 7 = -2x ... after the -2x any number may be added or subtracted. Parallel lines have the same slope. In the original equation, the slope is -2.
It will be any of the equations that has the same slope of y = 5x+9 but with a different y intercept
The equations will have the same slope as y = 5x+9 but a different y intercept
Slope of given line = -3 Therefore, slope of perpendicular = 1/3
x-2y+8 = 0 -2y = -x-8 y = 1/2x+4 in slope intercept form and the slope of the line parallel to it is 1/2
Put in this form to see. Y = mX + c9X + 3Y = 63Y = - 9X + 6Y = - 3X + 2=========The slope of the line you seek is - 3.
the equation is in the correct format [y = m*x + b]. m is slope, b is y intercept. So m = 1/3, and b = 2. Slope is 1/3. Any other line which has a slope of 1/3 will be parallel to this line.