Respuesta :
Answer:
The exponential model for the value of the home is [tex]V(t)=120000e^{0.045t}[/tex].
Step-by-step explanation:
According to the give information 2002 is the initial year and the value of the hom in 2002 is $120,000.
The model will have the form
[tex]V(t)=V_0e^{kt}[/tex]
Where V₀ is initial value of home, k is a constant and t is number f years after 2002.
[tex]V(t)=120000e^{kt}[/tex]
The value of home in 2007 is $150,000. Difference between 2007 and 2002 is 5 years. Therefore the value of function is 150000 at t=5.
[tex]150000=120000e^{k(5)}[/tex]
[tex]\frac{150000}{120000}=e^{5k}[/tex]
[tex]\frac{5}{4}=e^{5k}[/tex]
Take ln both sides.
[tex]ln(\frac{5}{4})=lne^{5k}[/tex]
[tex]ln(\frac{5}{4})=5k[/tex] ([tex]lne^a=a[/tex])
[tex]\frac{ln(\frac{5}{4})}{5}=k[/tex]
[tex]k=0.04462871\approx 0.045[/tex]
Therefore exponential model for the value of the home is [tex]V(t)=120000e^{0.045t}[/tex].
Where t is number of years after 2002.
Answer:
[tex]V(t)=120000*e^{(0.044)t}[/tex]
Step-by-step explanation:
If the given equation is [tex]V(t)=V₀*e^{kt}[/tex] .............(i)
Here from the question it is given that
V(t) = $150,000
V₀=$120,000
t= 2007-2002=5 years
e≅2.718
k=?
Now for the Value of k putting all values in equation (i)
[tex]150000=120000*e^{k(5)}[/tex]
[tex]e^{5(k)}=\frac{150000}{120000}[/tex]
[tex]e^{5(k)}=\frac{5}{4}[/tex]
Now taking Natural log on both sides of the equation
㏑ (e^{5(k)})= ㏑\frac{5}{4}
as we Know that ln(e)=1
so
5k = 0.223
dividing both sides by 5 gives
k = [tex]\frac{0.223}{5}[/tex]
k= 0.044
Now as we got the value of k we can form a general exponential equation which will be
[tex]V(t)=V₀*e^{(0.044)t}[/tex]
here value of v₀ is 120000
so equation will be
[tex]V(t)=120000*e^{(0.044)t}[/tex]
