Answer:
1. [tex]H = 5.9(0.82)^{t}[/tex]. Exponential decay function.
2. [tex]y = 0.8(3.6)^{t}[/tex]. Exponential growth function.
3. [tex]f(t) = 0.72(15)^{t}[/tex]. Exponential growth function.
4. [tex]A = \frac{4}{9} (8)^{t}[/tex]. Exponential growth function.
5. [tex]A = (\frac{4}{3})^{t}[/tex]. Exponential growth function.
6. [tex]H = \frac{7}{2} (\frac{5}{6} )^{t}[/tex]. Exponential decay function.
7. g(x) = 0.3(x). Not an exponential function.
Step-by-step explanation:
1. [tex]H = 5.9(0.82)^{t}[/tex]. This is an exponential decay function.
As the value of t increases H-value decreases.
2. [tex]y = 0.8(3.6)^{t}[/tex]. This is an exponential function of growth.
As the value of t increases y-value also increases.
3. [tex]f(t) = 0.72(15)^{t}[/tex]. This is an another example of exponential growth function.
As the value of t increases f(t)-value also increases.
4. [tex]A = \frac{4}{9} (8)^{t}[/tex]. This is again an example of exponential growth function.
As the value of t increases A-value also increases.
5. [tex]A = (\frac{4}{3})^{t}[/tex]. This is again an example of exponential growth function.
As the value of t increases A-value also increases.
6. [tex]H = \frac{7}{2} (\frac{5}{6} )^{t}[/tex]. This is another an example of exponential decay function.
As the value of t increases, H-value decreases.
7. g(x) = 0.3(x). This is a non-exponential function. (Answer)
