The composed fraction [tex] f \circ g [/tex] means that the input of [tex] f(x) [/tex] is the ouput of [tex] g(x) [/tex].
So, the chain is
[tex] x \mapsto g(x) \mapsto f(g(x)) = f\circ g = \dfrac{1}{g(x)} = \dfrac{1}{x^2-4x}[/tex]
The domain of [tex] f(x) [/tex] is composed by all inputs which are not zero, otherwise we would have a zero denominator.
So, since [tex] f(x) [/tex] doesn't accept 0 as an input, and we want to feed it with [tex] g(x) [/tex], we conclude that [tex] g(x) [/tex] can't be zero.
So, we have
[tex] f \circ g = f(g(x)) = f(x^2-4x) = \dfrac{1}{x^2-4x} \implies x^2-4x \neq 0 [/tex]
Since
[tex] x^2-4x = x(x-4) [/tex]
we have
[tex] x^2-4x = 0 \iff x(x-4) = 0 \iff x=0 \lor x=4 [/tex]
Since these two points cases [tex] g(x) [/tex] to vanish, they can't be accepted as inputs by [tex] f(x) [/tex].
