Important Solve the bernoulli's differential equation \frac{dy}{dx}(x^2y^3+xy)=1

Marenonigt

Marenonigt

Answered question

2022-01-22

Important
Solve the bernoullis

Answer & Explanation

Jeremy Merritt

Jeremy Merritt

Beginner2022-01-22Added 31 answers

Make the given differential equation into the standard form of first order ordinary differential equation. Now determine the integrating factor.
Substitute it in the solution form. Simplify the equation in proper form.
First rewrite the equation and convert it into first order ordinary differential equation.
dydx(x2y3+xy)=1
dydx=1(x2y3+xy)
dxdy=x2y3+xy
dxdyxy=x2y3
1x2dxdyyx=y3
Now let 1x=u then on differentiating this equation on both the sides with respect to y, 1x2dxdy=dudy.
Substituting it in the equation, it will be dudx+uy=y3.
braodagxj

braodagxj

Beginner2022-01-23Added 38 answers

Now this is an equation of first order differential equation dydx+P(x)y=Q(x) thus determine the integrating factor (IF) determine as IF=eP(x)dx where the solution is yeP(x)dx=Q(x)eP(x)dxdx.
IF=eydx=ey22
Substitute it in the solution form and simplify.
uey22=y2ey22dy
ey22x=2(y221)ey22+c
1x=2y2+cey22
Hence the solution is 1x=2y2+cey22

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