288 
MR. LUBBOCK ON THE PLANETARY THEORY. 
Table II. (Continued.) 
1 10 
50 
150 
10 
50 
150 
10 
50 
150 j 
172{ 
72 
32 
} 172 
212| 
m 
j-212 
272^ 
132 
j- 272 
173 j 
73 
33 
} 173 
213 j 
113 
j- 213 
273- 
L 133 
CO 
x^. 
0* 
174{ 
74 
34 
} 174 
214-| 
Tu 
j- 214 
274 < 
134 
j- 274 
181 { 
81 
41 
j- 181 
221 -j 
121 
j- 221 
281- 
141 
j- 281 
182 1 
82 
42 
j- 182 
222 -j 
122 
j-222 
282- 
142 
j-282 
1 83 1 
83 
43 
j- 183 
223 -j 
123 
j-223 
283- 
' 143 
1 283 
184{ 
84 
44 
1 184 
224 -j 
124 
j- 224 
284- 
144 
j- 284 
190 { 
90 
- 30 
} 190 
230 -J 
1 230 
290- 
[ -130 
j-290 
191 { 
91 
41 
} 191 
231 -j 
"m 
1 231 
291- 
[ 141 
} 29 1 
192{ 
92 
42 
} 192 
232 -j 
122 
1 232 
292- 
[ 142 
j- 292 
193 j 
93 
43 
} 193 
233 -j 
123 
j- 233 
293- 
143 
} 293 
194 1 
94 
44 
} 194 
234 -j 
m 
}234 
294- 
144 
j- 294 
201 { 
101 
31 
j- 201 
241 -j 
111 
1 241 
301- 
131 
| 301 
202 j 
102 
32 
1 202 
242 j 
112 
j- 242 
302- 
132 
1 302 
203 { 
103 
33 
1 203 
243 *j 
113 
j- 243 
303- 
133 
j- 303 
204 j 
104 
34 
j- 204 
244 -j 
114 
j- 244 
304 
' 134 
1 304 
210 j 
110 
j- 210 
270 a 
130 
} 270 
211 { 
111 
j- 21 1 
271 - 
}27l 
The following - examples will show the use of the preceding Table, in forming 
the equations of condition which serve to determine the coefficients of the in- 
equalities of the reciprocal of the radius vector and of the longitude. 
