If f(x) = x+7 and g(x) = 1/x-13 , what is the domain of (f•g)(x)?

Question

asked Mar 8, 2019 160k views

2 Answers

KNfLrPn · Answer 1 · 2019-03-13T14:10:19+0000

Answer:

The domain of the given equation is
$D=[x|x\\eq 13]$

Explanation:

Given : If
f(x)=x+7 and
g(x)=(1)/(x-13)

To find : What is the domain of
(fog)(x) ?

Solution :

We can write,

(fog)(x)=f(g(x))

(fog)(x)=f((1)/(x-13))

(fog)(x)=(1)/(x-13)+7

(fog)(x)=(1+7x-91)/(x-13)

(fog)(x)=(7x-90)/(x-13)

We have seen that
(fog)(x) to be defined when denominator cannot be zero.

i.e.
$x-13\\eq0$

$x\\eq13$

So, The domain of the given equation is
$D=[x|x\\eq 13]$