42 



SECULAR VARIATIONS OF THE ELEMENTS OF 



If we now put 1+^=2.5 in the values of (i ,o), (2,0), (3,0), &c., Q7_o], [To], QjTo], &c., 

 and substitute the resulting numbers in equations (26), we shall get the following 



values of ["7^1, |TT1, [J3> &c - 



[TT4] == 7".5125167; 



[T7T|=0 18.5962297; 



7s]=0 2.7662536; 

 777] =<7 0.6479572. 



[oTo]=0 5".5702558; 

 (TT71=0 11.5785090; 

 [Tg] =013.1331088; 

 pTT|=0 17.5645194; 



These values give 



^lT7T\=g 2 17.1487648.0+ 64.4952569126 ; 

 EI!][I3=^ 18.7033646.04- 73.1547754652 ; 

 [oTo][3:i]=0 2 23.1347752.04- 97.83886606206 ; 

 [TTTI [17^1=0' 24.7116178.04-152.06181843878; 

 |TTT|=r/ 2 29.1430284.0+203.37094595357; 

 ]=/ 30.6976282.04-230.67674429991; 



[T^/ 26.1087464.0+139.70448617829; 

 ]=0 2 10.2787703.04- 20.78152636644 ; 

 ]=0 2 8.1604739.04- 4.86778928589; 

 ]=0 a 21.3624833.,v-(- 51.44188735405 ; 

 ]=0 2 19.2441869.04- 12.04956092697 ; 

 1=4" 3.4142108.04- 1.792413937146. 



]=0* 47.8463930.0H- 821.59840712 

 -5935.67265019.04-14877.555887385 



]=0* 29.5229572.0 3 +230.63766404.0 

 523.77824644.0 4-250.40826811 



(153) 



(154) 

 (155) 

 (156) 

 (157) 

 (158) 

 (159) 



(160) 



(161)' 



(162) 



(163) 



(164) 



(165) 



f } (166) 

 } (167) 



The difference between these values and the similar quantities depending on the 

 assumed masses being denoted by A, we shall find the following values, 

 A[o7o]= 0. AE3= 0.0001413, " 



A[T7|=: 0.2637408, A FT1= 0.0000168, 



A[J3= 0.0609358, A [^1= 0.0000014, 



A[^\= 0.0116549, A [Tm= 0.0000003. 



(168) 



-0.2637408.^+1, 

 -0.0116549.^4-0 

 -0.2753957.^+4 

 -0.0609358.^4-0 

 -0.3246766.^4-4 

 -0.0725907.^+1 



-0.0001581.^+0 

 -0.0001416.^4-0 

 -0.0000171.<7+0 

 -0.0001427.*9+0 

 -0.0000182.^+0 

 -0.000001 7..J7+0. 



4691037; 

 06492077 ; 

 7643529 ; 

 33942800 ; 

 1532110 ; 

 2226629 ; 

 00275386 ; 

 00009381 ; 

 .00001647; 

 .00040139; 

 00007250 ; 

 0000017370. 



(169) 



