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Question
Solve `xy(1+xy^2)(dy)/(dx)=1`
Sum
Solution
`therefore(dx)/(dy)=xy+x^2y^3`
`therefore 1/x^2(dx)/(dy)-1/xy=y^3` Now, put`-1/x=v`
`therefore (dv)/(dy)+vy=y^3` ...........................``
This is linear differential eqn.
∴ Integrating Factor `=e^(intydy)=y^2/e^2`
The solution of linear diff. eqn is given by,
𝒗.(I.F.) = ∫(𝑰.𝑭.)(𝑹.𝑯.𝑺) + c
`ve^(y^2/2)=inte^(y^2/2)(y^2-2)+c`
Where c is constant of integration.
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Linear Differential Equations
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