Suppose that the population develops according to the logistic equation dP/dt = 0.0102P - 0.00003P^2 where...

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 population P obeys the logistic model. It satisfies the equation dP/dt=(2/700)*P(7−P) for P>0 Assume that...

A population P obeys the logistic model. It satisfies the equation dP/dt=(2/700)*P(7−P) for P>0 Assume that P(0)=2. Find P(53)

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?

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...

The rate of growth dP/dt of a population of bacteria is proportional to the square root...

The rate of growth dP/dt of a population of bacteria is proportional to the square root of t with a constant coefficient of 7, where P is the population size and t is the time in days (0≤t≤10). The initial size of the population is 600. Approximate the population after 7 days. Round the answer to the nearest integer.

Suppose that the certain population obeys the logistics equation dP / dt = 0.025·P ·(1−P /...

Suppose that the certain population obeys the logistics equation dP / dt = 0.025·P ·(1−P / C) where C is the carrying capacity. If the initial population P0 = C/3, find the time t∗ at which the initial population has doubled, i.e., find time t∗ such that P(t∗) = 2P0 = 2C/3.

a logistic equation for a pipulation P(T) in which there is harvesting can be written as...

a logistic equation for a pipulation P(T) in which there is harvesting can be written as (dP/dt)=aP(1-(P/M))-h, P(0)=P0 (a) if a=22, M=11, h=48, what are the equilibrium solutions for the logistic equation? (b) if P(0) = 4, what will the long-term behavior of the population?

Suppose a population P(t) satisfies dP/dt = 0.8P − 0.001P2    P(0) = 50 where t is measured...

Suppose a population P(t) satisfies dP/dt = 0.8P − 0.001P2    P(0) = 50 where t is measured in years. (a) What is the carrying capacity? ______ (b) What is P'(0)? P'(0) = ______ (c) When will the population reach 50% of the carrying capacity? (Round your answer to two decimal places.) _____yr Please show all work neatly, line by line, and justify steps so that I can learn. Thank you!

The rate of growth of the population of a city is predicted to be dp/dt =...

The rate of growth of the population of a city is predicted to be dp/dt = 1000t^1.08 where P is the population at time T and T is measured in years from the present.   a) What is the predicted rate of growth 5 years from the present? b) what is the population 5 years from the present? No current population was given

Differential Equations problem Given the equation - dP / dt = kP(M - P) - h...

Differential Equations problem Given the equation - dP / dt = kP(M - P) - h where k, h, and M are constant real numbers and P is population as a function of time t, with the initial condition P(0) = Po, find the solution for P(t). Show your work and enough steps so another student can understand the solution.