SOLUTION: y=5x+6 -18x+3y=-54 Are the graphs of the lines in the pair parallel? Explain. Solution: In the second equation, divide everything by 3: -6x+y=-54 Then, add 54 to each side:

Algebra ->  Coordinate Systems and Linear Equations  -> Lessons -> SOLUTION: y=5x+6 -18x+3y=-54 Are the graphs of the lines in the pair parallel? Explain. Solution: In the second equation, divide everything by 3: -6x+y=-54 Then, add 54 to each side:       Log On


   

Question 368733: y=5x+6
-18x+3y=-54
Are the graphs of the lines in the pair parallel? Explain.
Solution:
In the second equation, divide everything by 3: -6x+y=-54
Then, add 54 to each side: 54-6x+y=0
Next, subtract y from each side: -6x+54=-y
Now, add the two equations together: 0=-x+60
Finally, add x to both sides: x=60
The equation "x=60" denotes a vertical line, but the equation "y=5x+6" denotes a line with a slope of 5, so the lines are not parallel.
Found 2 solutions by mananth, acmc:
Answer by mananth(16946) About Me  (Show Source):
You can put this solution on YOUR website!
y=5x+6..............1
...
-18x+3y=-54
3y= 18x-54
/3
y = 6x -18 .......2
compare the slopes.
They are not the same. Hence they are not parallel lines.
..
graph%28300%2C300%2C-6%2C5%2C-5%2C100%2C%285x%2B6%29%2C%2818x-54%29%29
...
m.ananth@hotmail.ca

Answer by acmc(2) About Me  (Show Source):
You can put this solution on YOUR website!
In the second equation, divide everything by 3: -6x+y=-54
Then, add 54 to each side: 54-6x+y=0
Next, subtract y from each side: -6x+54=-y
Now, add the two equations together: 0=-x+60
Finally, add x to both sides: x=60
The equation "x=60" denotes a vertical line, but the equation "y=5x+6" denotes a line with a slope of 5, so the lines are not parallel.