[tex]\bf \begin{cases}
c(x)=\cfrac{5}{x-2}\\\\
d(x)=x+3\\
----------\\
(cd)(x)\implies c(x)\cdot d(x)
\end{cases}
\\\\\\
c(x)\cdot d(x)\implies \left( \cfrac{5}{x-2}\right)(x+3)\implies \cfrac{5(x+3)}{x-2}[/tex]
now, for a fraction, if its denominator ever becomes 0, the fraction becomes undefined, because it'd be a division by 0.
when does that happen? let's zero out the denominator to check,
x - 2 = 0, thus x = 2
so, if "x" ever becomes 2, the fractions goes kaput.
so, that domain is all real values except that one, that makes the fraction undefined.
