Let f(x)=e^x and g(x)=x-3 what are the domain and range of (f g) (x)
A. domain: x>0 range: y<0
B. domain: x>3 range y>0
C. domain: al real numbers range: y<0
D. domain: all real numbers range: y>0

The domain and range of g are "all real numbers," so you want to find the range of f when its argument is from the set "all real numbers." That range is y > 0. The appropriate choice is
D. domain: all real numbers; range: y > 0

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lublana lublana · Answer 2 · 2019-07-04T12:28:55+02:00

Answer:

D. Domain: all rea numbers

Range: y >0

Step-by-step explanation:

Let f(x) =[tex]e^x[/tex]

Domain of function f(x) : all real numbers because it is define for every real number.

Range of function f(x) y >0 because exponential function can never be zero.

g(x)=x-3

Domain of g(x) : all real numbers

Range g(x): all real numbers.

(fg)(x)= f(g(x))

f(x-3)=[tex]e^{x-3}[/tex]

(fg)(x)= [tex]e^{x-3}[/tex]

Put x=0 then we get

[tex](fg)(0)= [tex]e^{0-3}[/tex]

(fg)(0)=[tex]e^{-3}[/tex]

Domain of (fg)(x) is the set of real numbers because it is define for every real number.

Exponential function can never be zero .

Function (fg)(x) can never be zero it is always greater than zero because it is an exponential function

Therefore , the range of (fg)(x) is greater than zero.

Hence, option D is correct .

Domain: all real numbers

Range: y >0

Let f(x)=e^x and g(x)=x-3 what are the domain and range of (f g) (x) A. domain: x>0 range: y<0 B. domain: x>3 range y>0 C. domain: al real numbers range: y<0 D. domain: all real numbers range: y>0

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Let f(x)=e^x and g(x)=x-3 what are the domain and range of (f g) (x)
A. domain: x>0 range: y<0
B. domain: x>3 range y>0
C. domain: al real numbers range: y<0
D. domain: all real numbers range: y>0