152 



SECULAR VARIATIONS OF THE ELEMENTS OF 



E = [9.9807377]fe"; 

 E' ={0+22.2497227 } [8.9723624]6"; 

 .''=_ J+17.557S996J[9.7501125]Z>"; 

 E"= [1.0016537]6". 



p +[8.1679376]6'"; 



f"= [9.1453586]6'" ; 



F"= 1^+14.604409 } [0.7927855]Z/" ; 



F"= 10+34.3888650 } [9.6907241]//". 



JB 1= {^+4.6079205} 6,; B a =\g+ 0.7255099(6,; 1 



Baa=|(7-j-18.8315378}X I 



\ [9.5433087]6, ; 



C 2 = ^+0. 7437838 j [9.434971 1]6 S ; 

 C s =+[0.8644527]6 2 ; 

 C 4 =-)-[0.8654649]ft 2 . 



E,= [8.3529341]& 3 ; 



^=1 ^-|-39.7796076 }[8.7487718)^; 



E t = \g-\- 0.6616869 j [0.7242832]^; 



F,=+[7.7244692]i 4 ; 



^=[0.3564628]^; 



F s = \g-\- 2.7812615 j [1.5514854]6 4 ; 



FI= j <7+45.77751 } [9.4626364]Z> 4 . 



(507) 



(508) 



(509) 



(510) 



(511) 



(512) 



Sr*+47.5111025./+773.1351541.flrM , 



+4957.025771^+10802.91193 j" 



^+29.5535550^ +95.6630308.^ ) ~~^. (514) 



+52.197094.^ + 0.534229 j 



The values of 6 X , J 2 , 6 3 , and 6 4 are given by equations (406) ; and the values of 

 b', 6", and I'" are given by equations (405), by merely multiplying the coefficients 



If we now put the equations (513) and (514) equal to nothing, they will give 



g= 5".1224110; </ 4 = 0".()104337; 



,;,=_ 6.5865615; 9 6 = 0.6748372; 



/,= 17.3929254; 7 6 = 2.9245347; 



^,=18 .4092044 ; <7 7 = 25 .9437494. 



