The differential equation of the form Mdx+Ndy=0, where M and N are functions of x and y or constants is said to be an exact differential equation if dM/dy=dN/dx(partial derivative)
Solution of exact differential equation.
1.integrating w.r.t x the terms in M treating y as a constant.
2.integrate w.r.t y those terms in M which are free from x.
3.Add the two expressions and equate the result to a constant eg.
Solution of exact differential equation.
1.integrating w.r.t x the terms in M treating y as a constant.
2.integrate w.r.t y those terms in M which are free from x.
3.Add the two expressions and equate the result to a constant eg.
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