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Solve the differential equation: (dy/dx)=(2y/x)

Solve the differential equation: (dy/dx)=(2y/x)
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Solve the differential equation: (dy/dx)=(2y/x)

User Mannykary
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1 Answer

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Transform the equation into a separable differential equation:

(dx)/(x) = (dy)/(2y) \\ (1)/(2) lny=lnx + C \\ ln √(y) =lnx +C
To get rid of the logarithmic terms, raise the terms to the exponential power:

e^((ln √(y)) ) = e^((lnx + C))
Since
e^(lnx) =x,

√(y) =x + C since
e^(C) can be considered another constant. Squaring the whole answer gives the final answer,

( √(y) = X + C) ^(2) \\ y = x^(2) + 2Cx + C^2
User Waqas Idrees
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8.8k points
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