Answer:
[tex]P(t)=3,000,000-3,000,000e^{0.0138t}[/tex]
Step-by-step explanation:
Since P(t) increases at a rate proportional to the number of people still unaware of the product, we have
[tex]P'(t)=K(3,000,000-P(t))[/tex]
Since no one was aware of the product at the beginning of the campaign and 50% of the people were aware of the product after 50 days of advertising
P(0) = 0 and P(50) = 1,500,000
We have and ordinary differential equation of first order that we can write
[tex]P'(t)+KP(t)= 3,000,000K[/tex]
The integrating factor is
[tex]e^{Kt}[/tex]
Multiplying both sides of the equation by the integrating factor
[tex]e^{Kt}P'(t)+e^{Kt}KP(t)= e^{Kt}3,000,000*K[/tex]
Hence
[tex](e^{Kt}P(t))'=3,000,000Ke^{Kt}[/tex]
Integrating both sides
[tex]e^{Kt}P(t)=3,000,000K \int e^{Kt}dt +C[/tex]
[tex] e^{Kt}P(t)=3,000,000K(\frac{e^{Kt}}{K})+C[/tex]
[tex] P(t)=3,000,000+Ce^{-Kt}[/tex]
But P(0) = 0, so C = -3,000,000
and P(50) = 1,500,000
so
[tex]e^{-50K}=\frac{1}{2}\Rightarrow K=-\frac{log(0.5)}{50}=0.0138[/tex]
And the equation that models the number of people (in millions) who become aware of the product by time t is
[tex]P(t)=3,000,000-3,000,000e^{0.0138t}[/tex]
