Given $f(x)=3x^4-2x^2$ & $g(x)= 2/sqrtx, (x ≠0)$ how do you find the composition of f and g?

Question

2997 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-02-02T21:48:59

See explanation.

There are two ways of composing 2 functions:

To find this composition you have towrite the formula of $g(x)$ for every $x$ in the formula of $f$ . Here we get:

$f(g(x))=3*g^4(x)-2*g^2(x)$

$f(g(x))=3*(2/sqrt(x))^4-2*(2/sqrt(x))^2$

$f(g(x))=3*16/x^2-2*4/x=48/x^2-8/x=(8*(6-x))/(x^2)$

To find this composition you have towrite the formula of $f(x)$ everywhere $x$ is in the formula of $g$ . Here we get:

$g(f(x))=2/(sqrt(f(x)))=2/sqrt(3x^4+2x^2)$

Given f(x)=3x^4-2x^2f(x)=3x^4-2x^2 & g(x)= 2/sqrtx, (x ≠0)g(x)= 2/sqrtx, (x ≠0) how do you find the composition of f and g?