If t = a ≠ 0 is a singular point of a second-order linear differential equation, then the substitution t = x − a transforms it into a differential equation having t = 0 as a singular point. We then attribute to the original equation at x = a the behavior of the new equation at t = 0. Classify (as regular or irregular) the singular points of the differential equations.
(x2 − 4)y″ + (x − 2)y′ + (x + 2)y = 0
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