Q. 11

Suppose g, h, and j are differentiable functions with the values for the function and derivative given in the following table:

Use the table to calculate the values of the derivatives listed in Exercises 9–16.

If $f (x) = {(g (x))}^{3}$ , find $f' (- 2)$

Verified

Answer

The value of $f' (- 2) = 6$

1Step 1. Given information:

Function is: $f (x) = {(g (x))}^{3}$

Given table:

2Step 2. Find f ' ( - 2 ) using chain rule:

Since $f (x) = {(g (x))}^{3}$ ,

Hence, according to the chain rule of derivative:

$f' (x) = 3 {(g (x))}^{2} \times g' (x) f' (- 2) = 3 {(g (- 2))}^{2} \times g' (- 2)$

From the given table we can see that

$g (- 2) = 1 g' (- 2) = 2$

Substitute all these values in the above derivative:

$f' (- 2) = 3 {(- 1)}^{2} \times 2 = 3 \times 1 \times 2 = 6$