Answer:
Part 1: [tex]P(t)=3(1.4142)^t[/tex]
Part 2: There are 24 people infected
Part 3: P(48)=50,331,648
More than 50 million people are infected after 2 days
Step-by-step explanation:
Exponential Growth
The natural growth of some magnitudes can be modeled by the equation:
[tex]P(t)=P_o(1+r)^t[/tex]
Where P(t) is the actual amount of the magnitude, Po is its initial amount, r is the growth rate and t is the time.
We know the Zika virus started with Po=3 people infected. The number of people infected doubles every 2 hours, which means that for t=2 hours, P(2)=6, thus:
[tex]6=3(1+r)^2[/tex]
Dividing by 3:
[tex](1+r)^2=2[/tex]
Solving for 1+r:
[tex]1+r=\sqrt{2}[/tex]
1+r=1.4142
Part 1:
The equation to model the situation is:
[tex]\boxed{P(t)=3(1.4142)^t}[/tex]
Part 2:
After t=6 hours:
[tex]P(6)=3(1.4142)^6[/tex]
P(6)=24
There are 24 people infected
Part 3:
After 2 days, t=2*24 = 48 hours:
[tex]P(48)=3(1.4142)^48[/tex]
P(48)=50,331,648
More than 50 million people are infected after 2 days
