Derivative of the angular spheroidal function of the second kind: Differential equations (formula 11.13.13.0001)

SpheroidalQSPrime

$Mathematica Notation$

Mathieu and Spheroidal Functions

SpheroidalQSPrime[nu,mu,gamma,z]

Differential equations

Ordinary linear differential equations and wronskians

For the direct function itself

http://functions.wolfram.com/11.13.13.0001.01

Input Form

(1 - z^2) Derivative[2][w][z] - 2 z (2 + (\[Mu]^2 + (1 - z^2)^2 \[Gamma]^2)/ (\[Mu]^2 - (1 - z^2) (SpheroidalEigenvalue[\[Nu], \[Mu], \[Gamma]] + (1 - z^2) \[Gamma]^2))) Derivative[1][w][z] + (-(\[Mu]^2/(1 - z^2)) + (1 - z^2) \[Gamma]^2 - 2 + SpheroidalEigenvalue[\[Nu], \[Mu], \[Gamma]] + (4 z^2 (\[Mu]^2 + (1 - z^2)^2 \[Gamma]^2))/ ((1 - z^2) (\[Mu]^2 - (1 - z^2)^2 \[Gamma]^2 - (1 - z^2) SpheroidalEigenvalue[\[Nu], \[Mu], \[Gamma]]))) w[z] == 0 /; w[z] == Subscript[c, 1] SpheroidalQSPrime[\[Nu], \[Mu], \[Gamma], z] + Subscript[c, 2] SpheroidalPSPrime[\[Nu], \[Mu], \[Gamma], z]

Standard Form

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MathML Form

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Rule Form

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Date Added to functions.wolfram.com (modification date)

2007-05-02