50 



SECULAR VARIATIONS OF THE ELEMENTS OF 



(225) 



B 1= {#—4.7868001 } \ ; B a =)g— 0.6795722937 \b i; ) 

 B 3 = {#—18.665588512 } b t ; i 



C l = |4.365093544 — #j[9.2840950]& 2 ; 1 



C 2 = { 0.68791009996— g\ [9.182431 1]5 2 : 

 C 3 =— [0.6832317]Z> 2 ; 

 C 4 =— [0.6834824]Z> 2 ; 



.E l =+[7.8267723]& 3 ; 



# 2 = {43.7345719 — #J[8.2017618]& 3 ; 



E z = { 0.648004519— #j[0.7610455]6 3 ; 



^ 4 =+[1.0655652]& 3 ; 



#=— [7.0339474]6 4 ; 



^=+[0.2724895]^; 



F 3 = { 2.770665138— #J[1.7737962]& 4 ; 



.F 4 = \ 50.36500746 — #J[9.1128486]& 4 ; 



(226) 



1 



\ (227) 



I 

 J 



(228) 



«*— 47.9507108.# 3 +799.53205638.</ 2 — 5381.3548732.gr ) _, , f00Q . 



+12499.1914947 J _C% ' #' Z * Xz) ' { } 



o 4 — 29.5230351.o 3 +172.74239830.a 2 — 323.32220515.^) , , , OQft . 



+ 140.47332174 J =<****3«Zt). (230) 



The values of b, b\ b", and b'" are given by equations (118); and the values of 

 J 15 b 2 , b 3 , and 6 4 are given by equations (119), by simply adding log. (l+Jo)= 

 [0.0211893] to the coefficients of N'. 



Putting equations (229) and (230), equal to nothing, they will give, 



g = 5".59773937 

 9l = 7.25215980 

 # 2 =17 .20072233 

 # 3 =17 .90008930 



9i = 0".61668564 

 g 6 = 2.72773622 

 g a = 3.71796565 

 # 7 =22 .46064759. 



(231) 



The equations just computed will give the following values: — 

 For the root g, we get, 



#=5".5978504; 



^'=+0.05341742^ log. 98.7276830; 



N" =+0.03480002iV " 98.5415794; 



N'" =+0.00540574iV " 97.7328551 ; 



N' y =— 0.00005306593iV " 95.7248158?*: 



N T =—0.00004782067^ " 95.6796157rc: 



N yI =+0.00001988778^ " 95.2985863; 



JV rJ =+0.0000004029593iV " 93.6052612. 



