Q. 28

Question

Use (a) the $h \to 0$ definition of the derivative and then

(b) the $z \to c$ definition of the derivative to find $f' (c)$ for each function f and value $x = c$ in Exercises 23–38.

28. $f (x) = x^{4} + 1, x = 2$

Step-by-Step Solution

Verified

Answer

$f' (2) = 32$ .

1Part (a) Step 1. Given information.

A function is given as $f ((x) = x^{4} + 1$ and x=c=2.

2Part (a) Step 2. Solve f ' ( 2 ) using h → 0 definition of the derivative.

We have

$f' (c) = \lim_{h \to 0} \frac{f (c + h) - f (c)}{h} f' (2) = \lim_{h \to 0} \frac{f (2 + h) - f (2)}{h} = \lim_{h \to 0} \frac{{(2 + h)}^{4} + 1 - [2^{4} + 1]}{h} = \lim_{h \to 0} \frac{{(2 + h)}^{4} + 1 - 2^{4} - 1}{h} = \lim_{h \to 0} \frac{[{(2 + h)}^{2}]^{2} - {(2^{2})}^{2}}{h} = \lim_{h \to 0} \frac{[{(2 + h)}^{2} - 2^{2}] [{(2 + h)}^{2} + 2^{2}]}{h} = \lim_{h \to 0} \frac{(h^{2} + 4 h) (h^{2} + 4 h + 8)}{h} = \lim_{h \to 0} (h + 4) (h^{2} + 4 h + 8) = \lim_{h \to 0} (h^{3} + 4 h^{2} + 4 h^{2} + 16 h + 8 h + 32) = \lim_{h \to 0} (h^{3} + 8 h^{2} + 24 h + 32) = 0 + 0 + 0 + 32 = 32$

3Part (b) Step 1. Solve f ' ( 2 ) using z → 2 definition of the derivative.

We have

$f' (c) = \lim_{z \to c} \frac{f (z) - f (c)}{z - c} f' (2) = \lim_{z \to 2} \frac{f (z) - f (2)}{z - 2} = \lim_{z \to 2} \frac{z^{4} + 1 - (2^{4} + 1)}{z - 2} = \lim_{z \to 2} \frac{z^{4} - 2^{4}}{z - 2} = \lim_{z \to 2} \frac{(z^{2} - 2^{2}) (z^{2} + 2^{2})}{z - 2} = \lim_{z \to 2} \frac{(z - 2) (z + 2) (z^{2} + 4)}{z - 2} = \lim_{z \to 2} (z + 2) (z^{2} + 4) = \lim_{z \to 2} (z^{3} + 4 z + 2 z^{2} + 8) = 2^{3} + 4 (2) + 2 {(2)}^{2} + 8 = 8 + 8 + 8 + 8 = 32$

Q. 27

Q. 29

Other exercises in this chapter

Q. 26

Use (a) the h→0 definition of the derivative and then(b) the z→c definition of the derivative to find f'(c) for each function f and value

View solution

Q. 27

Use (a) the h→0 definition of the derivative and then(b) the z→c definition of the derivative to find f'(c) for each function f and v

View solution

Q. 29

Use (a) the h→0 definition of the derivative and then(b) the z→c definition of the derivative to find f'(c) for each function f and value

View solution

Q. 30

Use (a) the h→0 definition of the derivative and then (b) the z→c definition of the derivative to find f'(c) for each function f and value x = c.&

View solution