(dy)/(dx)+x sin2y=x^(3)cos^(2)y...

(dy)/(dx)+x sin2y=x^(3)cos^(2)y

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Solve the following differential equations. (dy)/(dx)+x sin 2y=x^(3)cos^(2)y

The differential equation (dy)/(dx)+x sin 2y=x^(3)cos^(2)y when transformed to linear form becomes

The differential equation (dy)/(dx)+x sin 2y=x^(3)cos^(2)y when transformed to linear form becomes

Differential equation (dy)/(dx)+(1)/(x)sin2y=x^(3)cos^(2)y is represented by family of curves which is given by (where C is arbitrary constant)

The solution of (dy)/(dx) + x sin 2y = x^(3) cos^(2) y is

Solve (dy)/(dx) + x sin 2y = x^(3) cos^(2) y

Solve (dy)/(dx) + x sin 2y = x^(3) cos^(2) y

Solve (dy)/(dx) + x sin 2y = x^(3) cos^(2) y

Solve (dy)/(dx) + x sin 2y = x^(3) cos^(2) y

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