374 
MR. LUBBOCK’S RESEARCHES 
+ + — ( 2 — 2 m) A x C 1 -j — — (2 — 2 m) C 6 + — (2 3 rri) AqC^ 
+ i-(2-«i) 4 7 C,} e ( cos z 
[5] 
+ j^ 6 + 1 (2-2 ib)^C 5 + 3 ^ 5 C 1 }e / cos(2<-z) 
[ 6 ] 
+ |^ 7 - 1 (2-2m)a4 t C s -3,* s <?,}«, cos (2< + z) 
[7] 
+ {^ 8 + 1 (2-2m)A 1 C i0 + 1 (2-2 m)A l C 9 - L. A 2 C 2 + JL (2 - 2m - c) C 4 
+ — (2 — 2 m + c) C 3 + (2 — 2m — 2 c) A a C 1 -f- — (2 — 2m + 2 c) ^ 0 C, j> e 2 cos 2x 
[ 8 ] 
+ | + -i- (2 - 2 m) C 8 + -1 C 3 + -i (2 - 2 m - c) A 3 C 2 + c 4s C, } e 2 cos (2 * — 2 a?) 
[ 9 ] 
+ {Ac — y (2 — 2m) ^ C 8 — £-^ 3 C 4 — -i (2 — 2m+ c) ^ 4 C„ — cA s C x j e 2 cos (2 t + 2«) 
[ 10 ] 
+ [a u + \ (2-2m)A l C l3 + 1 (2-2m)i,C IJ -| ^ a C 5 +1 (2-2m-c)A 3 C 7 
+ I. (2 - 2 m + c) A, C 6 - OL A b C 2 + ± (2 _ 3 m) 4, C 4 + -1 (2 - m) ^ 7 C 3 
+ |-(2-3m-c)^ 
1 c 2 ^1 } e e, cos (a? + z) 
[ 11 ] 
+ {A* + j (2-2 m)A l C n + ±A,C 6 + -1 (2-2m-c)^C 5 + |^C 3 
+ A- (2 - 3 m) Co + -1 (c + m) A n C, j e e t cos (2 1 - a? — z) 
[12] 
+ {A li -±(2-2m)A 1 C u — ^ A 2 C 7 ^ (2 — 2 m + e) A,C b -^A b C, 
— -A- (2 a — m) A 7 C 2 — -1 (c + m) C,| ee y cos(2< + x + z) 
[13] 
+ {<*.« + \ (2-2 m)^C 16 + 1 (2 -2m) ^C 18 + J 2 C 5 + -i (2-2m-c)A 3 C 6 
+ -A (2 - 2m + c) A, C 7 + A 5 C, + -I (2 - 3m) A 6 C 3 + ± (2 - m) a* 7 C 4 
