Avoiding the chain rule

Identifying composite functions

Memorizing all derivative formulas

Using only basic trigonometric identities

To avoid using the chain rule

To account for different trigonometric identities

To differentiate between basic and composite functions

To simplify calculations

It is the derivative of the outer function

It is the derivative of the inner function

It is a constant

It is the original function

Because the derivative is zero

Because the inner function is a constant

Because the function is composite

Because it is not a composite function

3 / sqrt(1 - x^2)

3x / sqrt(1 - x^2)

3 / (1 - x^2)

3x^2 / sqrt(1 - x^2)

The result is incorrect

The derivative becomes zero

The function becomes undefined

The correct derivative is still obtained

x^2

inverse cosine

3x^2

4x

4 / sqrt(1 - 9x^4)

-4 / sqrt(1 - 9x^4)

4x / sqrt(1 - 9x^4)

-4x / sqrt(1 - 9x^4)

To simplify the learning process

To emphasize the importance of composite functions

To reduce the number of formulas

To avoid confusion with basic functions

They are easier to memorize

They highlight the need to identify composite functions

They eliminate the need for calculations

They are more accurate