60 



SECULAR VARIATIONS OP THE ELEMENTS OF 



"Whence we get, 



P?Toj=<7— 5".5982373; 

 |TTT1=<7 — 11 .4168037; 



{TJ\=g—13 .3703731 ; 

 riTi1 =fl r— 17 .5528645 ; 



|T74l=<y — 7".5154781 

 [TT^— y— 18.5965426 

 \M]=g— 2.7662797 

 rrj]=g— 0.6479626. 



(270) 



From these quantities we get the following equations, 



{^)[rT\=gZ— 17.0150410.fl4- 63.9139763201 

 r^^m=ff 3 — 18.9686104.g-j- 74.8505214033 

 DmOEIN^— 28.1511018.0+ 98.2651007657 

 \HB HZ] =9 2 — 24.7871768.#+152.6469250785 

 rmip^l—g 2 — 28.9696682.0+200.3976083692 

 [T^]r^ =0 2 — 30.9232376.0+234.6883473387 



[T771[T^q =t / 2 — 26.1120207.0+139.7619086460 

 rr^]r^1=0 2 — 10.2817578.0+ 20.7899145038 

 |T^1fTT^— 9 2 — 8.1634407.0+ 4.8697487299 

 EH dH]=/— 21.3628223.0+ 51.4432382846 

 \TJ] {Ty\ =g*— 19.2445052.0+ 12.0498640941 

 DE3EIN0 2 — 3.4142423.0+ 1.79244578674 



(271) 



► (272) 



[I3[!II][!3[E!]=/-47.9382786.<7 3 +824.7624793y 1 „_ 

 —5969.6589279.^+14999.865474416; J v ' 



Ed][iI3[EI]EI!]=^-29.526263O.0 3 +23O.7O712OO45y ) „ 



—523.98540191 ..7+250.515644299. J V ; 



We shall therefore obtain the following 



Fundamental Equations for (i m =-\-l; or, for m'"=l-=-1340318.5. 



A =tf— 40.54796482.0 +195.9771436 ; 

 A=rf~ 23.18819358.0 + 98.5732170; 

 A'=c) 2 — 18.15228098.7 + 70.09590592; 

 A 1 =(f— 14.596906302.0 + 45.9936083; 

 A 2 = ! f— 10.01075363.0 + 6.35635695 - 

 A 3 =(f— 26.186380814.0 + 82.97883004; 



D =g 2_ 48.259496667.0 +710.074578 ; 

 V=cf— 55.05265379.0 +658.652503 ; 

 D"=0 2 — 31.86740965.7 +250.7131091; 

 2> 1= =0*_48 .09999599 ,7 +201.479694; 

 D 2 =if— 51.053228867,7 + 34.3827873; 

 Z> 3 =0 2 — 3.4187403566.0+ 1.7319812509. 



(275) 



