How do you show that if #a+b=0#, then the slope of #x/a+y/b+c=0# is #1#?

1 Answer
Dec 19, 2015

Solve the linear equation for #y# to obtain the slope-intercept form, and use the conditions on #a# and #b# to show that the slope is #1#.

Explanation:

If we solve a linear equation for #y# we get the slope-intercept form #y=mx + b# where #m# is the slope of the graph and #b# is the
#y#-intercept.

Doing so in the given case, we have

#x/a + y/b + c = 0#

#=> y/b = -1/ax - c#

#=> y = -b/ax - c#

Thus the slope #m# is #(-b)/a#

But from #a + b = 0# we can subtract #b# from both sides to obtain #a = -b#. Substituting this into the above slope, we get

#m = (-b)/a = (-b)/(-b) = 1#