What is an equation of the line that goes through point (8, −9) and whose slope is undefined?

1 Answer
Nov 25, 2015

The equation of a line is #x=8#.

Explanation:

General equation of a straight line on a coordinate plane is
#ax+by+c=0#
where #a#, #b# and #c# - some real constants and variable #x# and #y# are coordinates.

In order for this line to go through point #(8,-9)#, values #x=8#, #y=-9# should satisfy this equation:
#a*8+b*(-9)+c=0#

Since another condition is that a slope is undefined, it means that the line should be parallel to Y-axis, that is any other point with the same X-coordinate (#x=8#) and any Y-coordinate (say, #y=0# or #y=1#) also lies on this line and, therefore, should satisfy the equation.

For instance, let's use point #(8,0)#, which produces:
#a*8+b*0+c=0#
And for point #(8,1)#:
#a*8+b*1+c=0#
And any other point of a type #(8,y)# should produce
#a*8+b*y+c=0#

This necessitates #b=0# and the only condition on coefficients #a# and #c# is:
#a*8+c=0#

Any real numbers that satisfy the above conditions, for instance #a=1, c=-8# or #a=2, c=-16# etc., are good to be coefficients to construct an equation of a line that goes through point #(8,-9)#.

Examples are:

  1. #a=1, b=0, c=-8#
    Equation: #x-8=0#

  2. #a=2, b=0, c=16#
    Equation #2x-16=0#

Obviously, all equations are equivalent to each other and can be reduced to a form #x=8#.