SOLUTION: The differential equation
y−2y^3=(y^5+2x)y′
can be written in differential form:
M(x,y)dx+N(x,y)dy=0
where M(x,y)=My answer is x/y^2, wrong
------N(x,y)= My answer is
Algebra.Com
Question 1184076: The differential equation
y−2y^3=(y^5+2x)y′
can be written in differential form:
M(x,y)dx+N(x,y)dy=0
where M(x,y)=My answer is x/y^2, wrong
------N(x,y)= My answer is y^3-((2x)/y^3), wrong
The term M(x,y)dx+N(x,y)dy becomes an exact differential if the left hand side above is divided by y^3. Integrating that new equation, the solution of the differential equation is
My answer (x/y^2)-(y^3/3)-2x=C , correct
Answer by robertb(5830) (Show Source): You can put this solution on YOUR website!
and
After division by ,
∂()/∂y == ∂()/∂x,
and the new differential form becomes exact.
RELATED QUESTIONS
The differential equation
y+y3=(y5+2x)y′
can be written in differential form:... (answered by Edwin McCravy)
Use the "mixed partials" check to see if the following differential equation is exact.
(answered by robertb)
sopve the differential equation :
(x^2-y^2)*dy=2xy*dx
1. dy*6x+dy(-y^2)=2x^2yd
2. (answered by kekegeter ,robertb)
please solve this differential equation :
dy/dx=e^(x+y)... (answered by Fombitz)
solve the differential equation:
y dy/dx = x(y^4 + 2(y)^2 + 1) at x= -3 ,... (answered by solver91311,ikleyn)
please solve the differential equation :
dy/dx*tany = sin(x+y) +sin(x-y) (answered by Fombitz)
use the differential equation given by dy/dx=xy/3, y > 0.
Find the particular solution y (answered by robertb)
use the differential equation given by dy/dx=xy/3, y > 0.
Find the particular solution y (answered by Fombitz)
use the differential equation given by dy/dx=xy/3, y > 0.
Find the particular solution y (answered by Fombitz)