Find the logistic differential equation \frac{dy}{dx}=ky(1-\frac{y}{L})

Irrerbthist6n

Irrerbthist6n

Answered question

2021-12-19

Find the logistic differential equation dydx=ky(1yL)

Answer & Explanation

Donald Cheek

Donald Cheek

Beginner2021-12-20Added 41 answers

Step 1
Given differential equations is
dydx=ky(1yL)
It can be solved as
Step 2
dydx=ky(1yL)
dydx=ky(LyL)
dydx=KLy(Ly)
dydx=KLy(Ly)
dyy(yL)=KLdx
Integrating both side, we get
dyy(yL)=KLdx
1L(1yL1y)dy=KLx+c
1Lln|yLy|=KLx+c
lnyLy=kx+c1
Solution of logistic equation is
lnyLy=kx+c1
limacarp4

limacarp4

Beginner2021-12-21Added 39 answers

We have to find the logistic differential equation dydx=ky(1yL)
dydx=ky(1yL)
dyy(1yL)=kdx
Ldyy(Ly)=kdx
(1y1Ly)dy=kdx
Taking integration on both side, we have
(1y1Ly)dy=kdx
ln|y|ln|Ly|=kx+c1
ln|yLy|=kx+c1[ln|a|ln|6|=ln|ab|]
|yLy|=ekx+c1
yLy=e2ekx
Lyy=e3ekx
Ly=c3yekx
y(1+c3ekx)=L
y=L1+c3ekx
The logistic differential equation has a solution y(x)=L1+c3ekx
RizerMix

RizerMix

Expert2021-12-29Added 656 answers

L/[y(Ly)]=A/y+B/(Ly)
Multiply both sides by the LCD (y(Ly)):
L=A(Ly)+By
If y=L,L=BL,so B=1
If y=0,L=AL,so A=1
L/[y(Ly)]=1/y+1/(Ly)

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