# How do you find the domain and range of g(x)=3/(5-3x)?

Domain (x) are all real numbers except $x = \frac{5}{3}$ and Range are all real values except $g \left(x\right) = 0$
Here denominator must not be $0$ i.e $x \ne \frac{5}{3} \therefore$Domain(x) are all real numbers except $x = \frac{5}{3}$ and Range (g(x)) are all real values except $g \left(x\right) = 0$ As for no values of x , g(x) can be Zero.[Ans]