Understanding Derivatives and the Chain Rule

Apply the chain rule directly.

Rewrite the radical using a rational exponent.

Simplify the function using algebraic identities.

Differentiate the function twice.

x^(1/3)

x^(1/2)

x^3

x^(3/2)

When the derivative of the inner function is one.

When the function is a constant.

When the derivative of the inner function is zero.

When the function is a polynomial.

To simplify the original function.

To solve for the variable x.

To apply the chain rule.

To prepare for finding the second derivative.

Chain rule

Product rule

Quotient rule

Power rule

-2/3

-1/3

1/3

2/3

Convert it to a positive exponent by moving it to the denominator.

Multiply the exponent by negative one.

Leave it as is.

Add one to the exponent.

1/3

-2/9

2/9

-1/3

As a logarithmic function.

In radical form.

As a fraction with a negative exponent.

As a polynomial.

The form as a logarithmic function.

The form with a negative exponent.

The form as a polynomial.

The form in radical notation.