How do you determine whether a linear system has one solution, many solutions, or no solution when given x+ 5y=1 and -3x +4y= 16?

1 Answer
Oct 25, 2015

Rearrange in slope intercept form and notice that the slopes are different, so these equations represent two non-parallel lines that intersect at one point - that is one solution.

Explanation:

Given #x+5y=1#, subtract #x# from both sides, then divide both sides by #5# to get:

#y = -1/5 x + 1/5#

Given #-3x+4y=16#, add #3x# to both sides, then divide both sides by #4# to get:

#y = 3/4 x + 4#

So these equations represent lines with slope #-1/5# and #3/4#.

Since the slopes are different, the lines will intersect at exactly one point.

graph{(x+5y-1)(-3x+4y-16) = 0 [-10, 10, -4.5, 5.5]}