In 1975, a wildlife resource management team introduced a certain rabbit species into a forest for the first time. In 2007 the rabbit population had grown to 7880 . The relative growth rate for this rabbit specles is $19 \%$. Use the exponential growth model $P(t)=P_{0} e^{\mathrm{tt}}$ to answer the following
a) How many rabbits did the wildife resource management team introduce into the forest in 1975 ?
b) How many rabbits can be expected in the year 2021 ?
a) The population in 1975 was $\square$ rabbits.
(Round to the nearest whole number as needed)
b) The population in 2021 is expected to be $\square$ rabbits.
(Round to the nearest whole number as needed)
Answer
The population in 2021 is expected to be \( \boxed{112655} \) rabbits
Step 1 :Given the exponential growth model \( P(t) = P_0 e^{rt} \)
Step 2 :Given the population in 2007 \( P(32) = 7880 \) and the growth rate \( r = 0.19 \)
Step 3 :Solve for the initial population \( P_0 \) using the equation \( 7880 = P_0 e^{0.19 \cdot 32} \)
Step 4 :Calculate the population in 2021 using the initial population \( P_0 \) and the equation \( P(46) = P_0 e^{0.19 \cdot 46} \)
Step 5 :The population in 1975 was \( \boxed{18} \) rabbits
Step 6 :The population in 2021 is expected to be \( \boxed{112655} \) rabbits
