Answer:
"f(x) = 4(1.02)7x; spreads at a rate of approximately 2% daily"
Step-by-step explanation:
Complete Question:
A virus that initially infected four people is spreading at a rate of 15% each week. The following function represents the weekly spread of the virus: f(x) = 4(1.15)x. Rewrite the function to show how quickly the virus spreads each day and calculate this rate as a percentage.
f(x) = 4(1.15)7x; spreads at a rate of approximately 1.5% daily
f(x) = 4(1.02)7x; spreads at a rate of approximately 2% daily
f(x) = 4(1.157)x; spreads at a rate of approximately 2.66% daily
f(x) = 4(1.02)x; spreads at a rate of approximately 0.2% daily
Solution:
The weekly number of people infected would be:
[tex]f(x)=4(1.15)^x[/tex]
7 days in a week, so daily number of people infected would be:
[tex]f(x)=4(1+r)^{7x}[/tex]
To find daily rate, we set these 2 equations equal and solve for r:
[tex]4(1.15)^x=4(1+r)^{7x}\\1.15^x=(1+r)^{7x}\\1.15^x=((1+r)^7)^x\\1+r=1.02\\r=1-1.02=0.02[/tex]
That is 0.02*100 = 2% daily
2nd answer choice is right.
