What are the global and local extrema of f(x)=x^3+48/xf(x)=x3+48x ?

1 Answer
Darshan Senthil
Jan 22, 2018

Local: x = -2, 0, 2x=2,0,2
Global: (-2, -32), (2, 32)(2,32),(2,32)

Explanation:

To find extrema, you just find points where f'(x) = 0 or is undefined . So:

d/dx(x^3 + 48/x) = 0

To make this a power rule problem, we'll rewrite 48/x as 48x^-1. Now:

d/dx(x^3 + 48x^-1) = 0

Now, we just take this derivative. We end up with:

3x^2 - 48x^-2 = 0

Going from negative exponents to fractions again:

3x^2 - 48/x^2 = 0

We can already see where one of our extrema will occur: f'(x) is undefined at x = 0, because of the 48/x^2. Hence, that is one of our extrema.

Next, we solve for the other(s). To start, we multiply both sides by x^2, just to rid ourselves of the fraction:

3x^4 - 48 = 0
=> x^4 - 16 = 0
=> x^4 = 16
=> x = ±2

We have 3 places where extrema occur: x = 0, 2, -2. To figure out what our global (or absolute) extrema are, we plug these into the original function:

By Darshan Senthil

So, our absolute minimum is the point (-2, -32), while our absolute maximum is (2, -32).

Hope that helps :)

Related questions
See all questions in Identifying Turning Points (Local Extrema) for a Function
Impact of this question
1861 views around the world
You can reuse this answer
Creative Commons License