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प्रश्न
Find the general solution of the differential equation: `y log y dx/dy+x=2/y`.
बेरीज
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उत्तर
Given,
`y log y dx/dy+x=2/y`
`dx/dy+1/(ylogy)x=2/(y^2logy)`
I.F = `e^(intpdy)`
= `e^(int1/(ylogy)dy)`
Let log y = t
`1/ydy=dt`
⇒ dy = ydt
I.F. = `e^(inty/(y.t)dt)`
= `e^(intdt/t)`
= `e^(log|t|)`
= `e^(log|logy|)`
= logy
x × 1·F = ∫(Q × I·F) dy + C
xlogy = `int(2/(y^2logy)*logy)dy+C`
⇒ xlogy = `2inty^-2dy+C`
= `2*(y^-2+1)/(-2+1)+C`
⇒ xlogy = `(-2)/y+C`
⇒ xlogy = `C-2/y`
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