Andrews, G. E. and Burge, W. H. "Determinant Identities." Pacific J. Math.158, 1-14, 1993.Bailey,
W. N. Generalised
Hypergeometric Series. Cambridge, England: Cambridge University Press, pp. 25
and 29, 1935.Whipple, F. J. W. "On Well-Poised Series,
Generalized Hypergeometric Series Having Parameters in Pairs, Each Pair with the
Same Sum." Proc. London Math. Soc.24, 247-263, 1926a.Whipple,
F. J. W. "Well-Poised Series and Other Generalized Hypergeometric
Series." Proc. London Math. Soc. Ser. 225, 525-544, 1926b.Whipple,
F. J. W. "A Fundamental Relation Between Generalized Hypergeometric
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![_7F_6[a,1+1/2a,b,c,d,e,-m; 1/2a,1+a-b,1+a-c, ; 1+a-d,1+a-e,1+a+m]
=((1+a)_m(1+a-d-e)_m)/((1+a-d)_m(1+a-e)_m)_4F_3[1+a-b-c,d,e,-m; 1+a-b,1+a-c,d+e-a-m]](/images/equations/WhipplesTransformation/NumberedEquation1.svg)
and 
are generalized
hypergeometric functions with argument 
and 
is the gamma function.
![_4F_3[a,b,-z,-n; u,v,w;1]
=(Gamma(u+z+n)Gamma(w+z+n)Gamma(v)Gamma(w))/(Gamma(v+z)Gamma(v+n)Gamma(w+n)Gamma(w+z))_4F_3[u-a,u-b,-z,-n; 1-v-z-n,1-w-z-n,u;1]](/images/equations/WhipplesTransformation/NumberedEquation2.svg)
and 
a nonnegative integer (Andrews and Burge 1993).
