72 



SECULAR VARIATIONS OF THE ELEMENTS OF 



From these quantities we get the following equations, 



]^ 16.9430808.^+ 63.4422934092 ; 

 ^ 8 18.7291398 v a+ 73.4197265812 ; 

 |=^ 23.2857477.J4- 98.8742332985 ; 

 [272]=/ 24.4996522.^-j- 149.2607377924 ; 

 3=^ 29.0562601.^-j- 201.0092068986; 

 ==.9 2 30.8423191.^+232.6214929780; 



(290) 



]=0 2 26.2910618.^+141.0725417557; 

 ]=0 2 10.2880008.0+ 20.8515399746 ; 

 [4TT][77f]=!7 2 8.1621230.0+ 4.8811478864; 

 ]=0' 21.5543118.0+ 52.1225989505 ; 

 -f-r 19.4284340.0+ 12.2014064196; 

 ]=0 2 3.4253730.0+ 1.80345594215. 



]=0 4 47.7853999.0 3 + 818.62769096.0 2 ) 

 5898.0322091.0 +14758.0410108 ; j 



]=0 4 29.7164348.0 s +232.93269093.0 2 ) 

 530.6408472.0 +254.418113702. j 



We shall therefore obtain the following 



Fundamental Equations for [i ir =-\- ; or for m rr = 



(291) 



100 



^ = /_40.3084942.<7 +194.2847527 ; 

 ^'=i7 2 23.30847617.<7 + 99.1027623; 

 A"=./ 2 18.08032078..; + 69.61059281; 

 A l =f 14.626095329.<7 + 46.1708070; 

 J 2 =j7 2 10.02759291.^ + 6.38342153; 

 A 3 =g 2 26.365472005.^ + 83.71712664; 



D =/ 47.971972067.<7 +703.129607 ; 

 D=ff t 55.11012591.^ + 662 - 354 -530 ; 

 IT=(f 31.78521949..7 +249.0357671 ; 

 Z) i=i7 2_48.29148549..7 +202.685210 ; 

 A=i/ 2 51.237157667.7 + 34.5983143; 

 D 3 ='f 3.4298710566.;/+ 1.7430000948. 





(294) 



(295) 



B= }j/ 34.7052507 |ft; 



# = ^17.713826807(6; ) 

 B"= \ (/12.49329597 } 5; j 



C = 1 23.7784900 ^|[9.1763990]fe'; 

 C' = \ 17.72858328 ^|[8.8694654]6' f 

 0'= [0.24459 17]6'; 

 C"= [0.2654598]6'. 



(296) 



(297) 



