1)0 



SECULAR VARIATIONS OF THE ELEMENTS OF 



From these quantities we get the following equations, 



[^TT||T7T| ==( 7 3 — 16.8851877.^+ 63.0273292956 

 \oJ]{2j\=g*— 18.6426662.^4- 72.8170149476 

 [0,0 113,3 1=^—23.1235274,9+ 97.7767641555 

 |i,i||2,2| =(7 2 — 24.3872503./7+147.9123116292 

 E3[I3=/— 28.8681115.0+198.6127448410 

 ri^r^ =<7 2 — 30.6255900.. < 7+ 229.4621614386 



EH [13=^— 26.1178640.0+139.7980514254 

 pmfT^^ff 2 — 10.3243550,(7+ 21.1133516636 

 [TTT|[T7T| = = ^ — 8.1627340.0+ 4.8692516739 

 {HE\Ml=9' i — 21.4126648.0+ 52.2668218260 

 {n\UZ}=f— 19.2510438.0+ 12.0539985182 

 \J^][ry\ =(i 2 — 3.4575348.0+ 1.82048538639 



(347) 



► (348) 



(349) 



|o,o||i,i| rimrJ^1=(7 4 — 47.51O7777.0 3 + 809.60832632.0- 

 —5804.7608117.(7+14462.38720986; 



[±S[I3[I3[l3=<7 4 - 29.5753988.0* +231.92196O5O.0 2 ) 



—530.90381750.0+254.50030966. J k ' 



We shall therefore obtain the following 



Fundamental Equations for ^ Fi7 = +_ ; or for 7n T1I =—— 



B-- 



\9- 



10' 



A =cf— 40.22202062.(7 +193.3362269 ; 

 A' =g 2 — 23.14625587.(/ + 98.0038404; 

 A"=g 2 — 18.02242768,r/ + 69.17743373; 

 A 1 =g 2 — 14.639503502.(7 + 46.4149812; 

 4, = ^_10.01320843,(7 + 6.38683557; 

 A s =g 2 — 26.192224114.^ + 83.01495699; 



D = ^_ 47.859570167.^ +700.430559 ; 

 D=g 2 — 54.9219773,(7 +656.151042; 

 jy'=g 2 — 31.56849039,(7 +245 7386441 ; 

 D 1 =g 2 — 48.14983849,7 +203.402186 ; 

 D 2 =g 2 — 51.063762837.0 + 34.5618232; 

 £> 3 =g 2 — 3.4620415785.(7+ 1.7536927202. 



-34.6347594 \b ; B — \ g— 17".567588907 } h 

 J B" = |^_12.451385272J6 



= ^23.7079988 — 0J[9.176399O]Z/; 

 C = j 17.58234538— 0J[8.8694654]ft'; 

 C" =— [0.244591 7]6'; 

 C""=— [0.2654598]6'; 



"17072.73 



!■} 



(351) 



(352) 



(353) 



(354) 



