What is the antiderivative of #1/x^4#?

1 Answer
Morgan
Jan 2, 2017

#-1/3x^-3+C#

Explanation:

I would begin by rewriting the expression as #x^-4#.

We then have:

#intx^-4dx#.

To integrate or take the anti-derivative, we do the opposite of what we would do if we were taking the derivative; instead of bringing down the power and reducing it by #1#, we will add one to the power and multiply what is now the integrand by the reciprocal of the power.

#=>-1/3x^-3#

To account for any constants we might have lost when the derivative was taken (the derivative of a constant is zero), we add a general constant, #C#.

#=>-1/3x^-3+C#

This is equivalent to

#-1/(3x^3)+C#

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