Find f(x) and g(x) so the function can be expressed as y = f(g(x)). (1 point) y=(7)/(x^(2) ) +10

Question

asked Jun 9, 2021 191k views

1 Answer

Jaymjarri · Answer 1 · 2021-06-13T23:06:01+0000

Answer:

The functions are
$f(x) = 7\cdot x+10$ and
g(x) = (1)/(x^(2)) , respectively.

Explanation:

Let suppose that
g(x) = (1)/(x^(2)) , then
f(g(x)) is:

$f(g(x)) = 7\cdot \left((1)/(x^(2)) \right) + 10$

$f(g(x)) = 7\cdot g(x) + 10$

Thus,

$f(x) = 7\cdot x + 10$

The functions are
$f(x) = 7\cdot x+10$ and
g(x) = (1)/(x^(2)) , respectively.