How do you graph #5/6x - 6y = 8# by plotting points?

1 Answer
Jan 23, 2017

Pick values for #x# and solve for #y#

Only 2 points are needed to graph a line, but additional points can be used to check your answer.

Explanation:

To eliminate the need to deal with fractions, we can multiply all terms of the equation by 6:

#color(red)((6))5/6x-color(red)((6))6y=color(red)((6))8#
#5x-36y=48#

Re-write the equation so that it is in the form #y=...#

#5x-36y=48#
#5x-36ycolor(red)(+36y)color(blue)(-48)=48color(blue)(-48)color(red)(+36y)#
#5x-48=36y#
#(5x-48)/color(red)(36)=(36y)/color(red)(36)#
#y=(5x-48)/36#

Pick values for #x# and calculate the corresponding value for #y#

Let #x=-5#

#y=(5(color(red)(-5))-48)/36 => y=-2.084#

Let #x=0#

#y=(5(color(red)(0))-48)/36 => y=-1.333#

Let #x=5#

#y=(5(color(red)(5))-48)/36 => y=-0.639#

Plot these points and connect with a straight line

graph{5/6x-6y=8 [-10, 10, -5, 5]}