Kaldes nu en eller andeii Vaerdi at" u, for Uvilken (u) forsv 



© a (u) ® a (2K— u) = B(y 2 - sin*am (a^X)). 

 Konstanten I> knn bcstemmes ved at dividers mod sin 2 am u 

 gjere u = K'i, hvorved man finder 



have vi altsaa: 



(2) © a ( U ) ® a (2K- u) - H ^ (y 2 - sin 2 am aiyX) 



r^Cu)) 2 ^ (^) 2n+1 (F a W + A(y)f a (y)) 

 (@ a (2K- u)) 2 " 4 1 ( a k A ) 2tW "V a (y)- A(y)My)) 



(F a (y)) 2 - (Ay) 2 (My))- - (y*— sin*am (aiy X)) n + . 

 Vi have f'orudsat at f) (u) t'ursvinder for u — r\ , altsaa ogsaa 



u = ^ 4. 4rK 4- 2sK'i. 



Da (2K -f u) = — (9(u), vil den ogsaa fursvinde for 



a =\ + ^+(4r-r-2)K + 2sKi, 

 overhovedet altsaa fur 



