How do you find the derivative of ln((x+1)/(x-1))?

1 Answer
Ken C.
Jul 3, 2016

Simplify using natural log properties, take the derivative, and add some fractions to get d/dxln((x+1)/(x-1))=-2/(x^2-1)

Explanation:

It helps to use natural log properties to simplify ln((x+1)/(x-1)) into something a little less complicated. We can use the property ln(a/b)=lna-lnb to change this expression to:
ln(x+1)-ln(x-1)

Taking the derivative of this will be a lot easier now. The sum rule says we can break this up into two parts:
d/dxln(x+1)-d/dxln(x-1)

We know the derivative of lnx=1/x, so the derivative of ln(x+1)=1/(x+1) and the derivative of ln(x-1)=1/(x-1):
d/dxln(x+1)-d/dxln(x-1)=1/(x+1)-1/(x-1)

Subtracting the fractions yields:
(x-1)/((x+1)(x-1))-(x+1)/((x-1)(x+1))
=((x-1)-(x+1))/(x^2-1)
=(x-1-x-1)/(x^2-1)
=-2/(x^2-1)

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