Answer to Question #173550 in Differential Equations for ANJU JAYACHANDRAN

1)"\\frac{dN}{dt}=(\\beta-\\delta)N"

"N(t)-population \\space size"

"\\beta(N)-" birth rate

"\\delta(N)-" death rate

"N=1000\\implies \\beta =40"

"N=3000\\implies \\beta =30"

here "\\beta" is birth rate

here we have seen 1000 is population when birth rate is 40%

and also

here we have seen 3000 is population when birth rate is 5%

so equation comes out to be

"\\beta(N)=-0.005N+45"

"N=1000\\implies \\delta=5"

"N=3000\\implies \\delta=10"

here "\\delta" is death rate

here we have seen 1000 is population when death rate is 5%

and also

here we have seen 3000 is population when death rate is 10%

"\\delta(N)=-0.0025N+2.5"

"\\beta-\\delta =\n\\frac{dN}{dt}"

"\\beta-\\delta = -0.0075N-42.5" ......................(a)

putting (a) = 0 to get equilibrium points

i.e

"\\frac{dN}{dt}=0"

"(-0.0075N + 42.5)N=0"

Equilibrium points :-

N= 0 , N≈3667........(1)

"2) \n\n{dN\\over dt}\n\u200b\t\n =(\u22120.0075N+42.5\u221215)N"

"{\ndN\\over dt}\n\u200b\t\n =(\u22120.0075N+27.5)N" this is the equation that will come when we subtract the shooting rate of 15 , this is new equilibrium population.

Equilibrium points :- from (1) for part 1 answer

N=0, N≈3667