138 



SECULAR VARIATIONS OF THE ELEMENTS OF 



The solutions of equations (467-478) will now give the following values : 



For the root g, we get, 



g =— 5".186718, 



2V =+0.11399082V log. 9.0568698, 



N" =+0.08022242V " 8.9042956, 



N'" =+0.016229262V " 8.2102986, 



N IT =— 0.0001963412V " 6.2930111m, 



N 7 =— 0.00025087662V " 6.3994600a, 



N TI =+0.000213949 N " 6.3303095, 



2V rj =+0.000006300732V " 4.7993910. 



For the root g ± , we get, 



9l =— 6".708872, 

 2V X ' =— 0.30098342V! 

 2V," =— 0.23890962VJ 

 2V7 =—0.050862162^ 

 2V X JF =+0.00037137732V t 

 2V/ =+0.00052924752^ 

 N/ 1 =— 0.00026492502V 

 N 1 TII =— 0.000016499562^ 



l0£ 



9.4785424«, 



9.3782336», 



8.7063948«, 



6.5698154, 



6.7236588, 



6.4231228m, 



5.2174723re. 



For the root g 2 , we get, 



# 2 =— 17".327793, 



2V 2 ' =— 5.5264272V 3 log. 0.7424444m, 



2V 2 " =+ 4.2507402V 2 " 0.6284646, 



2V 2 '" =+21. 160622V 2 " 1.3255284, 



2V 2 /r =— 0.0020564172V 2 " 7.3131111m, 



2V 2 r =— 0.016972172V 2 " 8.2297373m, 



2V/ J =+ 0.0016641 172V 2 " 7.2211838, 



2V 2 F/J =+ 0.0001913242V 2 " 6.2817698. 



For the root g s , we get, 



^3=_ 18".726623, 

 2V 3 ' =— 6.2804372V 3 log 



2V 3 " =+7. 1470222V, 

 2V 3 '" =— 8.1177852V 3 

 2V/ F =+0.00005835662V 3 

 2V 3 F =+0.001772272V 3 

 2V 3 FJ =— 0.00015168762V 3 

 2V/==— 0.00001762792V, 



0.7979898m, 



0.8541251, 



0.9094376n, 



5.7660900, 



7.2485300, 



6.1809500m, 



5. 2462000a. 



For the root g it we get, 



g A =0"; and 2V,=2V 4 '=2V/=&c. 



