Answer:
[tex]f(t)=1804(1.04)^{t}\\f(25)=4809.17[/tex]
Step-by-step explanation:
1. Since the increasing rate is 0.04 or (4%) per day, then the factor is (1+0.04) raised to t days, and we have and exponential growth therefore we can write:
[tex]\\f(t)=c(1.04)^t\\f(t)=1,804(1.04)^t\\[/tex]
2. To estimate the number of cases, 25 days later following that exponential model
[tex]f(25)=1804(1.04)^{25}\\f(25)=4809.17[/tex]
