Answer:
Domain of (cd)(x) is all real numbers values except 2.
The value of (f/g)(5) is 270
Step-by-step explanation:
Given c(x) and d(x) we have to find the domain of (cd)(x)
[tex]c(x)=\frac{5}{x}-2[/tex] and [tex]d(x)=x+3[/tex]
The product of above two is
[tex](cd)(x)=c(x)d(x)=(\frac{5}{x-2})(x+3)[/tex]
The above function is defined at all real numbers values except 2 because that would make the denominator 0.
Hence, domain of (cd)(x) is all real numbers except 2.
Given [tex]f(x)=7+4x[/tex] and [tex]g(x)=\frac{1}{2x}[/tex]
we have to find the value of (f/g)(5)
[tex]\text{(f/g)x=}\frac{7+4x}{\frac{1}{2x}}=2x(7+4x)[/tex]
put x=5
[tex]\text{(f/g)(5)=}2x(7+4x)=2(5)(7+4(5))=10(27)=270[/tex]
