Use the definition of the derivative to find f'(x) if f(x) = (1)/(x - 1)

asked Aug 17, 2021 61.6k views

2 votes

Use the definition of the derivative to find f'(x) if

f(x) = (1)/(x - 1)

5.6k points

Please log in or register to add a comment.

5 votes

Answer:

f'(x) = -
(1)/((x-1)^2)

Explanation:

f'(x) =
lim_(h>0)
(f(x+h)-f(x))/(h)

=
lim_(h>0)
((1)/(x+h-1)-(1)/(x-1) )/(h)

=
lim_(h>0)
(x-1-(x+h-1))/(h(x+h-1)(x-1))

=
lim_(h>0)
(x-1-x-h+1)/(h(x+h-1)(x-1))

=
lim_(h>0)
(-h)/(h(x+h-1)(x-1)) ← cancel h on numerator denominator

= -
(1)/((x-1)^2)

Forin answered Aug 23, 2021

by Forin

6.0k points

Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

6.6m questions

8.8m answers