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Gold 45 - LaTeX CAS translator demo

Gold 45

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Whittaker function

Gold ID: 45
Link: https://sigir21.wmflabs.org/wiki/Whittaker_function#math.95.0
Formula: $\frac{d^{2} w}{d z^{2}} + (- \frac{1}{4} + \frac{κ}{z} + \frac{1 / 4 - μ^{2}}{z^{2}}) w = 0$
TeX Source: \frac{d^2w}{dz^2}+\left(-\frac{1}{4}+\frac{\kappa}{z}+\frac{1/4-\mu^2}{z^2}\right)w=0

Translation Results
Semantic LaTeX	Mathematica Translation	Maple Translations

Semantic LaTeX

Translation: \deriv [2]{w}{z} +(- \frac{1}{4} + \frac{\kappa}{z} + \frac{1/4-\mu^2}{z^2}) w = 0
Expected (Gold Entry): \deriv [2]{w}{z} +(- \frac{1}{4} + \frac{\kappa}{z} + \frac{1/4-\mu^2}{z^2}) w = 0

Mathematica

Translation: D[w, {z, 2}]+(-Divide[1,4]+Divide[\[Kappa],z]+Divide[1/4 - \[Mu]^(2),(z)^(2)])*w == 0
Expected (Gold Entry): D[w, {z, 2}]+(-Divide[1,4]+Divide[\[Kappa],z]+Divide[1/4 - \[Mu]^(2),(z)^(2)])*w == 0

Maple

Translation: diff(w, [z$(2)])+(-(1)/(4)+(kappa)/(z)+(1/4 - (mu)^(2))/((z)^(2)))*w = 0
Expected (Gold Entry): diff(w, [z$\$$(2)])+(-(1)/(4)+(kappa)/(z)+(1/4 - (mu)^(2))/((z)^(2)))*w = 0

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