Find the general solution of the differential equation: (xy – x2) dy = y2 dx

प्रश्न

Find the general solution of the differential equation:

(xy – x²) dy = y² dx

योग

उत्तर

(xy − x²) dy = y²dx

Divide throughout by y² (assuming y ≠ 0) to simplify:

`(xy-x^2)/y^2 dy = dx`

`(x/y - x^2/y^2) dy = dx`

To simplify, let us introduce a substitution. Divide the entire equation by x² (assuming x ≠ 0):

`(1/x.y/x - 1/y) dy = 1/x^2 dx`

`v = y/x` (so that y = vx and dy = v dx + x dv)

Substitute into the equation:

`(1/xv - 1/v) (v dx + xdv) = 1/x^2 dx`

`(v/x - 1/(vx) (v dx + xdv) = 1/x^2 dx)`

Simplify step by step:

Multiply and separate:

`v^2/x dx + v/x xdv - 1/(vx) vdx - 1/(vx) xdv = 1/x^2 dx`

`v^2/x dx - 1/x dx + v dv - 1/vdv = 1/x^2 dx`

Group terms involving v and x. The equation becomes:

`(v^2 - 1)/v dv = (1/x^2 - (v^2-z)/x) dx`

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Methods of Solving Differential Equations> Homogeneous Differential Equations

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