How do you solve #\frac { 1} { n - 4} = \frac { 1} { n ^ { 2} - 6n + 8} + \frac { 5} { n - 4}#?

1 Answer
Dec 24, 2016

#n=7/4#

Explanation:

This prblem will get a little messy. but if we take it step-by-step, it shouldn't be too bad.

Starting with #1/(n-4)=1/(n^2-6n+8)+5/(n-4)#, my fisrt operation is to subtract #5/(n-4)# on both sides. That gives us #(-4)/n-4=1/(n^2-6n+8)#. If we factor #n^2-6n+8#, we get #1/((n-2)(n-4))#. That can be rewritten as #(-4)/(n-4)= 1/(n-2)*1/(n-4)#.

My next step is to divide both sides by #1/(n-4)#. Here's where things get ugly: #((-4)/(n-4))/(1/(n-4))#, or #(-4)/cancel(n-4)*cancel(n-4)/1#. This leaves us with #-4=1/(n-2)#.

From here, we just multiply both sides by #n-2#, giving us #-4n+8=1#. Subtracting #8# both sides gives us #-4n=-7#. We just divide #-4# on both sides, and #n=7/4#.