Category:Dougall's Hypergeometric Theorem
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This category contains pages concerning Dougall's Hypergeometric Theorem:
- $\ds \map { {}_5 \operatorname F_4} { { {\dfrac n 2 + 1, n, -x, -y, -z} \atop {\dfrac n 2, x + n + 1, y + n + 1, z + n + 1} } \, \middle \vert \, 1} = \dfrac {\map \Gamma {x + n + 1} \map \Gamma {y + n + 1} \map \Gamma {z + n + 1} \map \Gamma {x + y + z + n + 1} } {\map \Gamma {n + 1} \map \Gamma {x + y + n + 1} \map \Gamma {y + z + n + 1} \map \Gamma {x + z + n + 1} }$
Source of Name
This entry was named for John Dougall.
Subcategories
This category has only the following subcategory.
Pages in category "Dougall's Hypergeometric Theorem"
The following 8 pages are in this category, out of 8 total.
D
- Dougall's Hypergeometric Theorem
- Dougall's Hypergeometric Theorem/Corollary 1
- Dougall's Hypergeometric Theorem/Corollary 2
- Dougall's Hypergeometric Theorem/Corollary 3
- Dougall's Hypergeometric Theorem/Corollary 3/Lemma
- Dougall's Hypergeometric Theorem/Corollary 4
- Dougall's Hypergeometric Theorem/Corollary 5
- Dougall's Hypergeometric Theorem/Corollary 6