Use transformations to graph the function. Determine the domain, range, and horizontal asymptote of the function.
-$f(x)=-2^{x+3}+4$

A) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; asymptote: $\mathrm { y } = - 4$
B) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; horizontal horizontal asymptote: $\mathrm { y } = - 4$
C) domain of $\mathrm { f } : ( - \infty , \infty )$; range of $\mathrm { f } : ( - 4 , \infty )$; range of $\mathrm { f } : ( - \infty , 4 )$
D) domain of $\mathrm { f } : ( - \infty , \infty )$; ; horizontal asymptote: $\mathrm { y } = 4$

Question

Use transformations to graph the function. Determine the domain, range, and horizontal asymptote of the function.
-$f(x)=-2^{x+3}+4$

A) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; asymptote: $\mathrm { y } = - 4$ 
B) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; horizontal horizontal asymptote: $\mathrm { y } = - 4$ 
C) domain of $\mathrm { f } : ( - \infty , \infty )$; range of $\mathrm { f } : ( - 4 , \infty )$; range of $\mathrm { f } : ( - \infty , 4 )$ 
D) domain of $\mathrm { f } : ( - \infty , \infty )$; ; horizontal asymptote: $\mathrm { y } = 4$

Quizplus · Accepted Answer

The Answer of Use transformations to graph the function. Determine the domain, range, and horizontal asymptote of the function.
-$f(x)=-2^{x+3}+4$

A) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; asymptote: $\mathrm { y } = - 4$ 
B) domain of $f : ( - \infty , \infty )$; range of $f : ( - \infty , - 4 )$; horizontal horizontal asymptote: $\mathrm { y } = - 4$ 
C) domain of $\mathrm { f } : ( - \infty , \infty )$; range of $\mathrm { f } : ( - 4 , \infty )$; range of $\mathrm { f } : ( - \infty , 4 )$ 
D) domain of $\mathrm { f } : ( - \infty , \infty )$; ; horizontal asymptote: $\mathrm { y } = 4$

Use Transformations to Graph the Function f(x)=−2x+3+4f(x)=-2^{x+3}+4f(x)=−2x+3+4 A) Domain Of f:(−∞,∞)f : ( - \infty , \infty )f:(−∞,∞)

Use Transformations to Graph the Function $f(x)=-2^{x+3}+4$ A) Domain Of $f : ( - \infty , \infty )$