78 



SECULAR VARIATIONS OP THE ELEMENTS OF 



From these quantities we get the following equations, 



[o7_o][r;T|=0 2 16.8919278.0+ 63.0757148282 ; 

 [o7o][27J]:=0 2 18.6525233.0+ 72.8860828897 ; 

 [o7o][17T]=0 2 23.1408369.0+ 97.8958073789 ; 

 [I7jf]=0 2 _24.4000763.0+148.0660()67328; 

 r7J] = 2 28.8883899.0+198.8725515186; 

 [71]=^ 30.6489854.0+229.8038367694. 



]=#* 26.2934977.?+143.140;3468927; 

 3=^ 10.4984250.^+ 21.5611738841 ; 



]=/ 8.3504354.^+ 5.0274861855; 



]=g* 21.3973531.^+ 52.0905995219 ; 



\=f 19.2493635.^+ 12.1461276134 ; 

 3=^ 3.4542908.^7+ 1.8295664023. 



-47.5409132.0 3 +810.60000012.0- 

 -5815.0364817.<7+14495.04127448 



7 4 29.7477885..7 3 +235.7953005. r / 

 542.55408336.0+261.88476948 



We shall therefore obtain the following 



(309) 



(310) 



(311) 

 (312) 



Fundamental Equations for |U r =+j^; or, for w r =-~- - . 



A =0 3 40.2318777.0 +193.4460881 ; 

 A =0 2 23.16356537.0 + 98.1230397; 

 A"=g 2 18.02916778.0 + 69.22796584; 

 ,l i =^_U.813573502.0+ 47.2122074-; 

 A 3 =g* 10.19774833.0 + 6.52926208; 

 A 3 =g* 26.369591592.0+ 84.94828460. 



j) =0247.872396167.0 +700.738213 ; 

 Z)'=0 2 54.94225571.0 +656.812394; 

 I7=g* 31.59188579.0 +246.0948532; 

 Z> 1 =0 2 48.76298515.0 +206.032362 ; 

 D t =g"- 51.852306416.0 + 35.1877225; 

 D 3 =<f 3.4587888566.0+ 1.7691277905. 



B= ^-34.6427310 \b; ^ = {^-17.58301281 } 5; ) 



B"=\g 12.4562398|&; ) 



C = J23.7159703 g\ [9.1763990]6 ; 

 C' = \ 17.5977693 g\ [8.8694654]&'; 

 C"= [0. 24459 17]6'; 

 C m = [0.2654598]i' ; 



(313) 



(314) 



(315) 



(316) 



