Mil. L. N. G. FILOX ON THE ELASTIC EQUILIBPJUM OF 
198 
§ 18. Tables of the Constants for the special case taken. 
The values of these coiistauts I have calculated for the values 1 to 6 of n and the 
values p = 0, a 3, 2a/3, a, i.e., remembering that in our case a = 3», for p = 0, 
n, 2n, 3n. These values are given in the following tables :— 
Table of Constants. 
Cji. 
n. 
r = 0. 
1 
II 
pj 
r = 2« 3. 
r = a. 
1 
- -126474 
- -177294 
- -375444 
- -901257 
0 
w 
-•815103 X 10-- 
- -241966 X 10-1 
- -144470 
- -929393 
o 
O 
-•485003 X 10-3 
-•345613 X 10-2 
-•553007 X 10-1 
- -949670 
4 
-•275613 X 10-^ 
- -488500 X 10-3 
-•208129 X 10-1 
- -961180 
5 
-•152381 X 10-3 
-•681835 X 10-1 
-•776521 X 10-2 
- -968455 
6 
-•825385 X 10-' 
-•943397 X 10-3 
- -288544 X 10-2 
- -973449 
e 
n- 
n. 
r = 0. 
r = 11 3. 
II 
r = a. 
1 
•971897 
1-132478 
1•57 3394 
1-960798 
2 
•120292 
•260646 
•914018 
1-998081 
3 
•117631 X 10-1 
■586808 X 10-1 
•534190 
2-319025 
4 
•945472 X 10-3 
•115601 X 10-1 
■273635 
2-545291 
5 
•678980 X 10-1 
•208131 X 10-2 
•129351 
2-702777 
6 
•454266 X 10-3 
•353345 X 10-3 
•582489 X 10-1 
2-816948 
n. 
/• = 0. 
/• = tt/3. 
/■ = 2ti/3. 
r = a. 
1 
•252949 
•320250 
•576618 
1-234590 
0 
•163021 X 10-1 
•371619 X 10-1 
•184245 
1-096059 
3 
•970005 X 10-3 
•473439 X 10-2 
•652177 X 10-1 
1-060779 
4 
•551226 X 10-1 
■622991 X 10-3 
•235682 X 10-1 
1-044513 
5 
•304762 X 10-3 
•830167 X 10-1 
■857923 X 10-2 
1-035120 
6 
•165477 X 10-3 
•111258 X 10-1 
•313561 X 10-2 
1-029005 
