Question

1. suppose that of a cohort of 200 rats in a rat colony born in january, 160 are still alive at the start of march and 120 are still alive at the start of may.

a. what is the survivorship up to the start of march? round to the nearest hundredth.
b. what is the mortality rate from the beginning of march to the beginning of may? round to the nearest hundredth.
c. if the survivorship during may is 0.3, how many rats died during the month of may? round to the nearest whole number.

1. suppose that of a cohort of 150 mice in a mouse colony born in february, 125 are still alive in march and 115 are still alive in april.

a. what is the survivorship up to the start of april? round to the nearest hundredth.
b. what is the mortality rate during the month of march? round to the nearest hundredth.
c. if the survivorship during april is 0.5, how many mice will there be at the start of may? round to the nearest whole number.

1. there are 2,000 mice living in a field. if 1,000 mice are born each month and 200 mice die each month, what is the per capita growth rate of mice over a month? round to the nearest tenth.

1. the doubling time of a population of plants is 12 years. assuming that the initial population is 300 and that the rate of increase remains constant, how large will the population be in 36 years?

1. suppose that 50 fish are born in year 1. there are only 36 left in year 2 and 22 left in year 3. what is the mortality rate between years 2 and 3? round to the nearest hundredth.

1. you and your friends have monitored two populations of wild lupine for one entire reproductive cycle (june year 1 to june year 2). by carefully mapping, tagging, and taking a census of the plants throughout this period, you obtain the data listed in the chart.

parameter	population a	population b
number of new seedlings established	100	30
number of initial plants that die	20	100

a. calculate the following parameters for each population. round each to whole number or hundredth where applicable and record your answers here (no grids provided.)

parameter	population a	population b
d (deaths during time interval)
b (per capita birth rate)
d (per capita death rate)
r (per capita rate of increase)

Explanation:

Question 8a

Step1: Recall survivorship formula

Survivorship (\(l\)) is the number of survivors divided by the initial number. Formula: \(l=\frac{\text{Number of survivors}}{\text{Initial number}}\)
Initial number of rats = 200, Survivors at start of March = 160.

Step2: Calculate survivorship

\(l = \frac{160}{200}=0.80\)

Step1: Find number of deaths between March and May

Survivors at start of March = 160, Survivors at start of May = 120. Deaths = 160 - 120 = 40.

Step2: Recall mortality rate formula

Mortality rate (\(m\)) is deaths divided by initial number for the period. Here, initial for the period is survivors at start of March. Formula: \(m=\frac{\text{Deaths}}{\text{Survivors at start of period}}\)

Step3: Calculate mortality rate

\(m=\frac{40}{160}=0.25\)

Step1: Recall survivorship and deaths relation

Survivorship (\(l\)) = \(\frac{\text{Survivors at end}}{\text{Survivors at start}}\), so Survivors at end = \(l\times\text{Survivors at start}\). Deaths = Survivors at start - Survivors at end.
Survivors at start of May = 120, \(l = 0.3\).

Step2: Calculate survivors at end of May

Survivors at end = \(0.3\times120 = 36\)

Step3: Calculate deaths

Deaths = 120 - 36 = 84

Answer:

0.80

Question 8b