Ordinary Differential Equations/d'Alembert

The d'Alembert's Equation, which is sometimes called the Lagrange equation was solved by John Bernoulli before 1694, and d'Alembert studied its singular solutions in a 1748 publication. It is essentially an equation of the form

${\displaystyle y=xf(y^{\prime })+g(y^{\prime })}$

Where ${\displaystyle f}$ and ${\displaystyle g}$ are functions of ${\displaystyle y^{\prime }}$.

Take the derivative

${\displaystyle y^{\prime }=f(y^{\prime })+(x{f}^{\prime }(y^{\prime })+g^{\prime }(y^{\prime }))y^{″}}$

Now write this equation as

${\displaystyle \frac{dx}{d{y}^{\prime }}-\frac{f^{\prime }(y^{\prime })}{y^{\prime }-f(y^{\prime })}x=\frac{g^{\prime }(y^{\prime })}{y^{\prime }-f^{\prime }(y^{\prime })}}$

Then it is a linear equation with dependent variable x and independent variable <amth>y'</math>.

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