1 



206 Karl Bohlin, 



XXVII. 2^>+r._-n+*); (112) (113) 





n = o 



1 



2 



3 



4 



5 



6 



7 



F . (n.—n) 





1.142 103 



2.039528 



1.820669 



1.570888 



1 .304828 



1 .0287 26 



0.745816 



F uo (n + l.-n) 

 Fi.o(n-i.-n) 



1.467078,, 

 1.467078 



'•736673,, 

 1.468369,, 



9.99625 

 2.622592,, 



1 .368692 

 2.613024,, 



1.4 1 05 1 2 

 2-5o3°5 2 « 



1.316417 



2.342290,, 



1. 16286 

 2.150740,, 



0.97528 

 1-938503., 



F 0A {n.-n + l) 

 Fo.-iin.-n-l) 





1.5 14824 

 1.945489 



1.9 18504,, 

 2.899459 



2.062097,, 

 2.831666 



2.007899,, 

 2.693584 



1.876507,, 

 2.5 16223 



1. 703192,, 

 2-3 ' 37°5 



'■5°3409,, 

 2.0936S 1 



F 2 . (n + 2.-n) 



F^{n.-n) 



F 2A {ti-2.-n) 



1 .689409 

 1 .689409,, 



1.765868 

 2.200537 

 0.82831,, 



1. 391 1 19 



1.777814,, 



2.827765 



'•254855 

 2 39063'" 

 [3 053698] 



!-2 r 533 1 

 2.497326,, 

 3 096056 



1.165378 



2.472914,, 



3.048067 



1.078960 

 2.382 198,, 

 2.946066 



0.95854 



2.250477,, 



2.808088 



Fu(n + l.—n+l) 

 F u (n-i.-n+l) 

 F x x(n + l.-n-V) 

 F^in-h-n-1) 



2.031568,, 

 2.031568 

 2-031568,, 

 2.031568 



2.204808,, 

 [1.796505,,] 

 2.529024,, 

 2-3434'7» 



r. 799716,, 

 2 3S8764 



2259341 

 [3.524651,,] 



1.740463,, 

 2.808369 



2.616179 

 3.650040,, 



1.8 1 7902,, 



2.9 1 1 800 

 2.678206 

 3-6444 '7" 



1-832452" 

 2.893839 

 2.634246 

 3-568185,, 



1.780066,1 

 2.S09668 

 2532433 

 3-44755°" 



1. 679196,, 

 2.683494 

 2393525 

 3- 2 9 6 347» 



F Q . 2 (n.-n+2) 



Fo.-in.-n) 



F . 2 (n.-n-2) 





2.003550 

 2.204 198 

 [2.614924] 



1.701431 



2.948493,, 



3.600687 



1.684340 



3.152844,, 



3-645499 



1.866537 

 3.182328,, 

 3 597053 



1.9287 1 4 

 3.1 26103,, 

 3.494069 



1.899634 



5 n I P, A 9 0> 



3'355o86 



1.8. 1985 

 z . 1 u 3 1 / „ 

 3. 190506 



F .o(n + l.-n+\) + o 

 F iw (n-l.-n-l)- a 

 F . (n + l.-n-l) + * 

 F .,j{n-L-n + l)-3 



1.731414 

 1. 73i4i4» 

 1 • 73 1 4" I 4n 

 1.731414 



2.508690 

 2.508690,, 



2.4497 18 

 ['•972597] 

 2-4497 1 8„ 

 '•972597« 



2.316227 

 2.015 '97 

 2.3 1 6 2 2 7„ 

 2.015 197,, 



2. 1 4 1 67 1 

 1 .9 1 982 2 

 2.1 41 67 1 „ 

 1.919822,, 



1.941044 



'764953 

 1. 941044,, 

 1.764954,, 



I.722378 

 I.576250 

 1.722378, 

 I.576250,, 



1 .490482 



'■365543 

 1.400482,, 



i-3 6 5543« 



XXVII a. F upjl (n+r.^n+s) + / . M O+r.— n+&) 



; (H7) (144) 









72 = 



1 



2 



3 



4 



5 



6 





F . (n.-n)+f 





'•67435» 



2.464 76,, 



2-344' '« 



2. 1 74OO,, 



'•975°9« 



'•75 7°5» 





Fj.. (n + 



F 10 (n-l.-w)+/ 



1-355477 



1.855480,, 



2.279028 

 1 .8 1 7 790 



2050353 

 3.262499 



0.76923,, 

 3.2121 1 i 



I .789062,, 



3.147691 



1 .869078,, 

 3°39 2 5 1 



1.81612,, 

 2.S9779 





^o.i(» + 

 Fo.^.-^-lJ+Z 





2.01 439,, 

 2.64445,, 



2.1 7849 

 3'407 '5'. 



2.5 2060 

 3 3975 2 « 



2 57358 



3-3 22 79« 



2.52196 

 3.2042 i„ 



2-4I373 

 3 0549 '" 





FUn.-n)+,f 

 F 2 . {n-2.-u)+f 









[3-576337»] 











F,.,(»-l.-n + l)+/ 

 F M (n-l.--n-l) + / 





[2.3252S6] 



[3 930765]" 













F . 2 (n.-ri)+f 

 F . 2 {n.-n-2)+f 





[3. 1 05461,,] 















F . (n-l.-n-l)-o+f 

 F( KQ (n-i.-n+l)-.8+f 







[2.50 ' 377»] 













*) Diejenigen Coefficienten, welche bei der Integration den Divisor Null bekommen, sind in diesen 

 und den folgenden Tafeln in Klammern angefiihrt. 



