Gold 36

Confluent hypergeometric function

Gold ID

36

Link

https://sigir21.wmflabs.org/wiki/Confluent_hypergeometric_function#math.86.44

Formula

${\displaystyle M(1,2,z)=(e^{z}-1)/z,\ \ M(1,3,z)=2!(e^{z}-1-z)/z^{2}}$

TeX Source

M(1,2,z)=(e^z-1)/z,\ \ M(1,3,z)=2!(e^z-1-z)/z^2

Translation Results
Semantic LaTeX	Mathematica Translation	Maple Translations

Semantic LaTeX

Translation

\KummerconfhyperM@{1}{2}{z} =(\expe^z - 1) / z , \KummerconfhyperM@{1}{3}{z} = 2!(\expe^z - 1 - z) / z^2

Expected (Gold Entry)

\KummerconfhyperM@{1}{2}{z} = (\expe^z - 1) / z , \KummerconfhyperM@{1}{3}{z} = 2! (\expe^z - 1 - z) / z^2

Mathematica

Translation

Hypergeometric1F1[1, 2, z] == (Exp[z]- 1)/z Hypergeometric1F1[1, 3, z] == (2)!*(Exp[z]- 1 - z)/(z)^(2)

Expected (Gold Entry)

Hypergeometric1F1[1, 2, z] == (Exp[z]- 1)/z Hypergeometric1F1[1, 3, z] == (2)!*(Exp[z]- 1 - z)/(z)^(2)

Maple

Translation

KummerM(1, 2, z) = (exp(z)- 1)/z; KummerM(1, 3, z) = factorial(2)*(exp(z)- 1 - z)/(z)^(2)

Expected (Gold Entry)

KummerM(1, 2, z) = (exp(z)- 1)/z; KummerM(1, 3, z) = factorial(2)*(exp(z)- 1 - z)/(z)^(2)