84 SECULAR VARIATIONS OF THE ELEMENTS OF 



From these quantities we get the following equations : 



J=0 3 16.8852611.0+ 63.0278564952 ; 

 [3=^ 18.6427732.0+ 73.8177655141 ; 

 J75]=0 2 23.1237130.0+ 97.7780448551 ; 

 r^n^ff 2 24.3873895.0+147.9139794608; 

 ]=0 2 28.8683793.0+198.6155386162; 



(328) 



]=0 2 30.6258414.0+229.4658349917; 



|4,4|| 5 _, i |=0 s 26.1262905.0+139.8767572878; 

 g]=0 2 10.2824157.0+ 20.7916038174 ; 

 ]=0 9 8.1771758.0+ 4.9682765223; 

 ]=/ 21. 3763792.0+ 51.4803047560; 

 F77]=^_19.2711393.0+ 12.3015228516; 

 ET3Q7H0* 3.4272645.0+ 1.82852672910. 



4 47.5111025.0 3 +809.61901994.0 a 

 -5804.87167416.0 +14462.73971842 ; 



=y* 29.5535550.0 3 +231.24699197./ | 

 527.16726514.0+255,76838948. J 



(329) 



(330) 



We sliall therefore obtain the following 



Fundamental Equations for //'"'=+; or, for w "=237 19* 



A = g * 40.22212762.<7 +193.3374230 ; 

 A=tf 23.14644147.J/ + 98.0051228; 

 A'=f 18.02250108..7 + 69.17798438; 

 ^,=^14.698591492.^ + 46.9394976; 

 A i =ff 10.02448873.<7 + 6.47860075 ; 

 ^ 3 =/26.200650614.^ + 83.09379428; 



D =g* 47.859709367.j7 +700.433897 ; 

 Lf=ff 54.92219511.^ +656.158133; 



Lr='f 31.56874179.^ + 245 - 7424731 - 

 Z>,=/7 2 48.19349485.j7 +205.563726 ; 

 D^y* 51.079862967./7 + 35.0495614; 

 D 3 =g* 3.4319830985.J7+ 1.7650873387. 



7 _ 34.6348459 16 ; ^=1017.56775390716; ) 

 S"=\g 12.45143805 \b- 1 



C = |23.7080852 0|[9.1763990]i'; 1 

 f" = {17.58251038 0|[8.8694654]ft' ; 

 f"= [0.24459 17]6'; 

 C"*== [0.2654598JV; 



(332) 



(333) 



(335) 



