Find {eq}f'(x) {/eq} for the given function. The find {eq}f'(3) {/eq}, {eq}f'(0) {/eq} and {eq}f'(-4) {/eq}

{eq}f(x)=6 \sqrt{x} {/eq}

Question:

Find {eq}f'(x) {/eq} for the given function. The find {eq}f'(3) {/eq}, {eq}f'(0) {/eq} and {eq}f'(-4) {/eq}

{eq}f(x)=6 \sqrt{x} {/eq}

Derivative of the Function:

The functional derivative (also known as a variational derivative) in the calculus of variations, a branch of mathematical analysis, connects a change in a functional defined here as a function that operates on other functions, to a change in a function on which the functional depends.

Answer and Explanation: 1

Become a Study.com member to unlock this answer!

View this answer

Given

The given function is {eq}f\left( x \right)=6\sqrt{x}{/eq}

  • The objective is to find {eq}{f}'\left( x \right),{f}'\left( 3 \right),{f}'\left( 0...

See full answer below.


Learn more about this topic:

Loading...
How to Compute Derivatives

from

Chapter 20 / Lesson 1
72K

Understand what derivative calculus is and how to find the derivative of a function. Learn the derivative rules, and practice taking derivatives by following examples.


Related to this Question

Explore our homework questions and answers library