PlanetPhysics/Differential Equation of the Family of Parabolas

To find the differential equation of the family of parabolas

${\displaystyle y=ax+b{x}^2}$

we differentiate twice to obtain

${\displaystyle y^{\prime }=a+2bx}$ ${\displaystyle y^{\prime \prime }=2b}$

The last equation is solved for ${\displaystyle b}$, and the result is substituted into the previous equation. This equation is solved for ${\displaystyle a}$, and the expressions for ${\displaystyle a}$ and ${\displaystyle b}$ are substituted into ${\displaystyle y=ax+b{x}^2}$. The result is the [[../DifferentialEquations/|differential equation]] ${\displaystyle y=x{y}^{\prime }-\frac{1}{2}{x}^2{y}^{\prime \prime }}$

The elimination of the constants ${\displaystyle a}$ and ${\displaystyle b}$ can also be obtained by considering the equations

${\displaystyle xa+x^{2}b+(-y)1=0}$ ${\displaystyle a+2xb+(-y^{\prime })1=0}$ ${\displaystyle 2b+(-y^{\prime \prime })1=0}$

as a [[../SimilarityAndAnalogousSystemsDynamicAdjointnessAndTopologicalEquivalence/|system]] of homogeneous linear equations in ${\displaystyle a}$,${\displaystyle b}$,${\displaystyle 1}$. The solution ${\displaystyle (a,b,1)}$ is nontrivial, and hence the [[../Determinant/|determinant]] of the coefficients vanishes.

${\displaystyle \left|\begin{array}{ccc}x& x^2& -y\\ 1& 2x& -y^{\prime }\\ 0& 2& -y^{\prime \prime }\end{array}\right|=0}$

Expansion about the third column yields the result above.

[1] Lass, Harry. "Elements of pure and applied mathematics" New York: McGraw-Hill Companies, 1957.

This entry is a derivative of the Public [[../Bijective/|domain]] [[../Work/|work]] [1].

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