Airy's equation is a second-order linear differential equation of the form $y'' - xy = 0$. It is notable for its solutions known as Airy functions, which are particularly useful in physics.
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Airy's equation is written as $y'' - xy = 0$.
The general solution to Airy's equation involves two linearly independent solutions, typically denoted as $Ai(x)$ and $Bi(x)$.
Airy functions can be expressed using power series expansions.
In the context of Taylor Series, the coefficients of the series for $Ai(x)$ and $Bi(x)$ can be determined by solving recurrence relations derived from substituting the series into Airy's equation.
Airy's equation appears in quantum mechanics, optics, and other fields involving wave propagation.