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Solve the differential equation by separation of variables. dx/dy= dy/dx=x^2*cuberoot(y+1)

Solve the differential equation by separation of variables. dx/dy= dy/dx=x^2*cuberoot(y+1)
asked 11.5k views
1 vote
Solve the differential equation by separation of variables. dx/dy= dy/dx=x^2*cuberoot(y+1)

asked
User Wizurd
by
8.6k points

1 Answer

6 votes

Answer:


(2)/(3)(1+y)^{(2)/(3)}+ (x^3)/(3)=c

Explanation:

variable separable form:


\frac{\mathrm{d} y}{\mathrm{d} x}=x^2\sqrt[3] {1+y}\\(dy)/(√(1+y)) = x^2dx\\\int\frac{dy}{\sqrt[3] {1+y}} = \int x^2dx\\(2)/(3)(1+y)^{(2)/(3)}= (x^3)/(3)+c\\(2)/(3)(1+y)^{(2)/(3)}+ (x^3)/(3)=c

hence the solution comes out be


(2)/(3)(1+y)^{(2)/(3)}+ (x^3)/(3)=c

answered
User John Vasileff
by
8.7k points
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