104 



SECULAR VARIATIONS OF THE ELEMENTS OF 



Computation of D. 2 . 



(5, 5 )(7,7)= s +19.2441698.#+12.0495445 

 _( i)5 )(4,7)(7,6)-:-(4,6)= -J- 0.0827715.17+ 1.539238 

 (',')( 4 '0( S '0-K 4 '0= +27. 1673827.^+ 17.603294 

 0(.0('.0-K*'0- + 1-752231 



7)(7, 5 )(5,6)-i-(4 > 6) = + 0.018327 



(7,6)0-0 - 0.014281 



Sum of terms A^+46.4943240.^+32.948353 



Computation of D 3 . 



(6, 6)(7,7)=/+3.4142091.0+l. 79241220 

 (6 , 6 )(4 , T)(T , 5 )-=-0 , s )= +0.0006746.0+0.00186605 

 _(7,7)(4,6)(6, s )-h(4, 5 )= +0.0142946.0+0.00926231 

 +( 4 -0( 7 -0( 6 -0-K 4 '0= +0.00118319 



-j-(4,e)(e,7)(7,6)-:-(4,.)= +0-00092197 



('.)(, 0.11312682 



Sum of terms Z> 3 =0 2 + 3.4291782.0+1.69251890 



Computation of B, B, and B 1 . 



(2, 2 )=0+13.072173 



(i,i)(,s)-t-(i,s)= +19.37798 



Sum =J B-i-&=0+32.45015 



(3, 3 )=0+l 7.5528645 



(.,.i)( 3 ,2)-^-(i,2)= + 0.0270293 



Sum =B+b=g+ 17.5798938 



(i, 0=^+11.314768 



_( 1> .)(i,3)^-( 2 ,3)= + 1.824148 



Sum =5*^-6=^+13.138916. 



Computation of C, C", C", and C'". 



(2,2)= g 13.0721730 

 (o,i)(i.i)-s-(o,j)= - - 9.183266 

 Sum =|^+22.255439 1 

 log. \ (0,3) --(1,3) | = [9.4381 189] 

 'Therefore C'= |gr+22.255439| x 



[9. 



-(>.) =-^17.5528645 

 (o, 3 ) (3, 2) -5- (.)= - - 0.0570356 

 Sum =^+17.60990011 

 log. j(o,)-s-(,i)|=[9.113807P] 

 Therefore C'= \g-\-\ 7.6099001 } x 



[9.1138076]//. 



Computation of J5 15 B 2 , and B 3 . 



(6, e) =<7+2.7662522 

 -(0 (, )-=-(, T)= +1.7539698 

 Sum =B,H-& 1 =/+4.5202220; 



(7, 7) =#+0.6479569 

 -_(,T)(T,t)-t-(,j +0.0644976 

 Sum =5 2 -=-Z> 1 =(7-)-0.7124545; 



( S)5 )= 5 r+18.5962120 



_(,,)(,,T)_!-(,T)= + 0.2214108 



Sum =5 3 ^-6 1 =^+18.81 76237. 



Computation of C^ C t , C 3 , and C k . 



(6,6)= g 2.7662522 

 (4,e) (0,7) -^(4 ,7)= - - 1.3667356 



Sum = \g+ 4.1329878| 

 log. {(, 7)^-(, 7) (=[9.5433087] 

 Therefore Ci= \g+ 4.1 329878 jx 



[9.5433087]5 2 . 



(7,7)= g 0.6479569 

 (4,T)(7,6)-i-(4,.)= -- 0.0827715 



Sum = j/+ 0.7307284 } 

 log. {(4,)-5-(.e)|=s[9.484971l] 

 Therefore (7 a = \g-\- 0.7307284 } x 



[9.434971 1]/> Z . 



