822 
ME, G. H. DARWIN ON THE SECULAR CHANGES IN 
It is proposed to carry the new integration over the field defined by £=1 to '88, 
and to compute four equidistant values. 
The following tables give the results of the computation, as in the previous case. 
Table V. 
€ 
!■ 
•96 
•92 
•88 
nJn Q = 
1-00000 
1-02664 
1-05327 
1-07991 
log £+10 = 
8-60614 
8-62898 
8-65122 
8-67292 
log 10 = 
7-90356 
7-79718 
7-68628 
7-57045 
log X +10 = 
8-95841 
9-00018 
9-04451 
9-09157 
log t'/ 2 X£t+ 10 = 
10-03798 
9-86699 
9-68952 
9-50493 
m=a= 
1-5017 
1-6060 
1-7193 
1-8429 
log g +10 = 
9-91693 
9-95049 
9-98531 
10-02170 
log d +10 = 
9-65322 
9-64780 
9-64118 
9-63303 
/ 
a = 
-13-873 
-17-719 
— 21-607 
-25-692 
a' = 
-18-790 
— 21-266 
— 24-130 
— 27-460 
II 
II 
oa. 
- 10-010 
-10-636 
-11-316 
— 12-057 
log-(«! + «) +10 = 
9-82285 
9-88247 
9-92401 
9-95203 
log (/Oj-j-a)-p ] 0 — 
•35374 
•32327 
•31133 
•31347 
log (ffo— /q^-pl 0 = 
•46586 
•45758 
•46052 
•47035 
Table VI. 
£ 
1 - 
"96 
•92 
•88 
— (a.'—f3')(K 1 -\-a)/Jcn(K 2 —K 1 ) 2 = 
— -1998 
— -4261 
— -6551 
- -8630 
■d'h[K 1 J r cc)/hl(K.,-\- a)(/Co — K 1 ) 2 = 
•4312 
•6077 
•7500 
•8445 
a'b [kn{K % —k 1 )®= 
— 1-4643 
-1-6770 
— 1-8297 
-1-9410 
ba) (k 3 — K i) 3 — 
•3450 
•4882 
•6047 
•6833 
cy 
sP 
T 
1 
y, 
II 
— 1-1714 
— 1-3469 
— 1-4752 
— 1-5706 
g(K 1 -\-a)/kn(K, — K 1 ) = 
- -1251 
— -1540 
- -1777 
— -1965 
g{ K 2+ ct )/kn(K 2 —K\) = 
•4248 
•4248 
•4335 
•4517 
d(K 1 -\-Ot)/Icn(K. 2 — K { ) = 
— -0682 
- -0767 
- -0805 
— -0803 
d (k 2 -\- a.)/kn(i < 2 — « 1 )= 
•2315 
•2116 
•1963 
•1846 
(bg— ad)/Tcn(K. 2 —k 1 ) = 
•0342 
•0404 
•0469 
•0542 
