132 



SECULAR VARIATIONS OF THE ELEMENTS OF 



E = [0.0221304]6"; 

 E'= {+22.6010814 } [8.9723624J6*; 

 E"= j^+17.7330184 j [9.7501 125]6"; 

 E"= [1.0430464J&". 



F =+[8.1679376]6'"; 

 F'= [9.1453586J6'"; 

 ^"=^+14.7573271 [0.7927855]6" ; ; j 

 F"= {^+35.0517532 \ [9.6907241J6". j 



: {0+4.5202306 } 6,; B t =\g+ 0.7 1 24563 } b t ; \ 



uiv,/ 



<7 1= _ |^+4. 1329964 1 [9.5433087]& 2 ; 

 (7,= {^+0.7307302} [9.434971 1]J S . 



<7 4 =--[0.8654649]&. 2 . 



E,= 1^+39.7657938 } [8.7437718& ; 

 E 3 = \g-\- 0.6486333 1[0.7242832]& 3 ; 



(459) 



(460) 



(461) 



(462) 



(463) 



(464) 



J\=-f[7.7244692]& 4 ; 



F 2 = [0.3564628]6 4 ; 



JT 3= _|^+ 2.7805554 j[1.5514854]5 4 ; 



F 4 = |V-|-45.7636960|[9.4626364]6 4 . 



^ +48.4349358*- +802.5743024.^ ) = 



+5231.898890.^+11585.83042 j 



^+29.5237894^ +95.0997623.^ 1 =( } . (466) 



+51.201831.^ + 0.553045 j 



The values of &, ?/, &", and &"' are given by equations (405); and the values of 

 4,, ft,, i a , and Z> 6 are given by equations (406), by merely multiplying the coefficients 

 of N" by 1+^= 



If we put equations (465) and (466) equal to nothing, they will give, 



g= 5".2095599; g,=- 0".0110263; 



g,= 6 .6631448 ; g t = .6630507 ; 



2 = 17. 6257463; g e = 2.9169913; 



g 3 = 18 .9364848 ; 9i=^ .9327210, 



