Inexact differential equation

An inexact differential equation is a differential equation of the form

M(x,y)\,dx+N(x,y)\,dy=0,{\text{ where }}{\frac {\partial M}{\partial y}}\neq {\frac {\partial N}{\partial x}}.

The solution to such equations came with the invention of the integrating factor by Leonhard Euler in 1739.^[1]

Solution method

In order to solve the equation, we need to transform it into an exact differential equation. in order to do that, we need to find an integrating factor $\mu$ to multiply the equation by. We'll start with the equation itself. $M\,dx+N\,dy=0$ , so we get $\mu M\,dx+\mu N\,dy=0$ . We will require $\mu$ to satisfy ${\frac {\partial \mu M}{\partial y}}={\frac {\partial \mu N}{\partial x}}$ . We get ${\frac {\partial \mu }{\partial y}}M+{\frac {\partial M}{\partial y}}\mu ={\frac {\partial \mu }{\partial x}}N+{\frac {\partial N}{\partial x}}\mu$ . After simplifying we get $M\mu _{y}-N\mu _{x}+(M_{y}-N_{x})\mu =0$ . Since this is a partial differential equation, it is mostly extremely hard to solve, however in most cases we will get either $\mu (x,y)=\mu (x)$ or $\mu (x,y)=\mu (y)$ , in which case we only need to find $\mu$ with a first-order linear differential equation or a separable differential equation, and as such either $\mu (y)=e^{-\int {{\frac {M_{y}-N_{x}}{M}}\,dy}}$ or $\mu (x)=e^{\int {{\frac {M_{y}-N_{x}}{N}}\,dx}}$ .

References

↑ "History of differential equations – Hmolpedia". www.eoht.info. Retrieved 2016-10-16.

External links

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