How do you simplify the complex fraction \frac { c x + c n } { x ^ { 2} - n ^ { 2} }cx+cnx2n2?

3 Answers
Mark D.
Jul 4, 2018

factorise top and bottom

(c(x+n))/((x+n)(x-n))c(x+n)(x+n)(xn)

Cancel the x+nx+n

c/(x-n)cxn

Jacobi J.
Jul 4, 2018

c/(x-n)cxn

Explanation:

We have the following:

color(blue)(cx+cn)/color(purple)(x^2-n^2)cx+cnx2n2

In the numerator, both terms have a cc in common, so we can factor that out to get

color(blue)(c(x+n))c(x+n)

The denominator is a difference of squares, which factors as

color(purple)((x+n)(x-n))(x+n)(xn). If you multiply this out, you will indeed get x^2-n^2x2n2. Putting it together, we now have

(color(blue)(c(x+n)))/(color(purple)((x+n)(x-n)))c(x+n)(x+n)(xn)

Same terms in the numerator and denominator cancel. We're left with

(c cancel((x+n)))/(cancel(x+n)(x-n))

=>c/(x-n)

Hope this helps!

Jim G.
Jul 4, 2018

c/(x-n)

Explanation:

"factor the numerator/denominator and cancel common"
"factor"

"numerator "c(x+n)larrcolor(blue)"common factor"

"the denominator is a "color(blue)"difference of squares"

x^2-n^2=(x-n)(x+n)

(cx+cn)/(x^2-n^2)

=(c cancel((x+n)))/((x-n)cancel((x+n)))

=c/(x-n)to"with restriction "x!=n

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