Suppose a population grows according to a logistic model with initial population 100 and carrying capacity...

a population of rabbits in a sanctuary grows according to logistic model , with 100 rabbits...

a population of rabbits in a sanctuary grows according to logistic model , with 100 rabbits initially and time measured in years. using eulers method with h=0.25, estimate the population of rabbit growth after 1 year

1. A population grows according to an exponential growth model. The initial population is P0=12, and...

1. A population grows according to an exponential growth model. The initial population is P0=12, and the common ratio is r=1.45 Then: P1 = P2 = Find an explicit formula for Pn. Your formula should involve n. Pn =    Use your formula to find P9 P9= Give all answers accurate to at least one decimal place 2. Assume there is a certain population of fish in a pond whose growth is described by the logistic equation. It is estimated that...

Suppose that a population develops according to the following logistic population model. dp/dt=0.04p-0.0001p^2 What is the...

Suppose that a population develops according to the following logistic population model. dp/dt=0.04p-0.0001p^2 What is the carrying capacity? 0.0001 400 10000 0.04 0.0025 What are the equilibrium solutions for the population model ? P = 400 only P = 0 and P = 10000 P = 0 and P = 400 P = 0 only Using the population model , for what values of P  is the population increasing? (0,400) and (0,10000) and

A logistic growth model is given below for the number of students attending CCC per year....

A logistic growth model is given below for the number of students attending CCC per year. P(t)= (13,000)/(1+0.73e^-0.13t) a. Find the initial population of students at CCC. b. Find the population of students at CCC in five years. c. Find the population of students at CCC in twenty years. d. What is the carrying capacity of students at CCC?

The population P(t) of mosquito larvae growing in a tree hole increases according to the logistic...

The population P(t) of mosquito larvae growing in a tree hole increases according to the logistic equation with growth constant k = 0.3 days−1 and carrying capacity A = 800. Find a formula for the larvae population P(t), assuming an initial population of P(0) = 80 larvae. P(t) =______________

Biologists stocked a lake with 300 fish and estimated the carrying capacity (the maximal population for...

Biologists stocked a lake with 300 fish and estimated the carrying capacity (the maximal population for the fish of that species in that lake) to be 7000. The number of fish doubled in the first year. (a) Assuming that the size of the fish population satisfies the logistic equation dP/dt = kP(1−PK), determine the constant k, and then solve the equation to find an expression for the size of the population after t years. k = P(t) = (b) How...

Pigs are invading a ranch in California. Estimates of logistic model parameters for this population suggest...

Pigs are invading a ranch in California. Estimates of logistic model parameters for this population suggest that the instantaneous rate of population growth is 0.4 year-1 and the carrying capacity is 50 pigs km-2. The area of the ranch is 40 km2. The island’s owner applies for a permit to allow recreational shooting of up to 60 pigs per year. If the logistic equation is valid for this species, would the hunting program be likely to cause a decline in...

The population P(t) of bacteria grows according to the logistics equation dP/dt=P(12−P/4000), where t is in...

The population P(t) of bacteria grows according to the logistics equation dP/dt=P(12−P/4000), where t is in hours. It is known that P(0)=700. (1) What is the carrying capacity of the model? (2) What is the size of the bacteria population when it is having is fastest growth?

Biologists stocked a lake with 240 fish and estimated the carrying capacity (the maximal population for...

Biologists stocked a lake with 240 fish and estimated the carrying capacity (the maximal population for the fish of that species in that lake) to be 6,000. The number of fish tripled in the first year. (a) Assuming that the size of the fish population satisfies the logistic equation, find an expression for the size of the population after t years. P=_____ (b) How long will it take for the population to increase to 3000? (Round your answer to two...

The population of the world was about 5.3 billion in 1990 (t = 0) and about...

The population of the world was about 5.3 billion in 1990 (t = 0) and about 6.1 billion in 2000 (t = 10). Assuming that the carrying capacity for the world population is 50 billion, the logistic differential equation dP =kP(50−P)dt models the population of the world P(t) (measured in billions), where t is the number of years after 1990. Solve this differential equation for P(t) and use this solution to predict what the population will be in 2050 according...