A. Die Hannoversche Dreieckskette. 
119 
9,997 7808.0+ 2,13 (г)— г,13 (3) 
9,9289094.0—13,10 (5)+ 13,10 (6) 
9,879 0168.9 — 18,18 (ю) + 18,18 (и) 
9,940 0645.7 + 11,87 ( г2 ) — п-^7 (>5) 
9,867 2664.6 — 19,33 (i8) + 19,33 (19) 
9,942 2545.5 + 11,62 (20) — 11,62 (23) 
9,9974184.5+ 2,30(29)— 2,30(31) 
9,854 8820.5 — 20,53 (33) + 20,53 (34) 
9/407 59317 
9,512 0470.2 
9,895 5461.5 
4,759 8120.7 — log АМе 
— 22.5 = Д 2 — Д1 
7-74-3 = lo g Ч — 1о ё л 4 
4,656 0834.0 = log s 4 
9/577 7079- г + 5 I /54(i) — 5 Г /54 (з) + 51,54(8) — 5D54 (и) + 5 х /54 (i6) — 51,54(19) 
+ 5i,54 (24) — 5 1 /54 (28) = log sin 4 
9,966 4837.5 — 8,60 (i) + 8,60 (3) — 8,60 (8) + 8,60 (ii) — 8,60 (16) + 8,60 (19) 
— 8,60 (24) + 8,60 (28) = log cos ¿4 
4,233 7913.2,, 
4,622 5671.5 
log (У* —yì) — 4/233 7913-2;, + 51,54 (i)+ 2,13 (2) — 53,67 (3) — 13,10 (5) 
+ 13,10 (6) + 60,53 (8) — 8,99 (9) — 18,18 (io) 
— 33,36 (11) + 11,87 ( I2 ) + 21,92 (13) — 21,92 (14) 
— 11,87 (45) + 51,73 (16) — 0,19 (17) — 19,33 (18) 
— 32,21 (19) + 11,62 (20) + 11,39 (21) — 11,39 (22) 
— 11,62 (23) + 64,15 (24) — 12,61 (25) — 51,54 (28) 
+ 15,46 (29) — 13,16 (30) — 2,30 (31) — 20,53 (33) 
+ 36,22 (34) — i5, 6 9 (35) + 2,19 (37) — 2,19 (38) 
log (*4 - хг) = 4,622 5671.5— 8,6o ( i ) + 2,13 (2)+ 6,47 (3) — 13,10 (5) 
+ 13,10 (6) + 0,39 (8) — 8,99 (9) — 18,18 (io) 
+ 26,78 (II) + 11,87 (!2) + 2,1,92 (13) — 21,92 (14) 
• —11,87(15)— 8,41(16)— 0,19 (17) — 19,33 (18) 
+ 27,93 (19) + “/62 (20) + 11,39 (21) — 11,39 (22) 
— 11,62 (23) + 4,01 (24) — 12,61 (25) + 8,60 (28) 
+ 15/46 (29) — 13,16 (30) — 2,30 (31) — 20,53 (33) 
+ 36,22 (34) — 15,69 (35) + 2,19 (37) — 2,19 (38) 
9,963 6109.i — 8,99 (8) + 8,99 (9) 
9,840 6073.1 — 21,92 (13) + 21,92 (14) 
9,9999825.1— 0,19(16)+ 0,19(17) 
9,944 2242.3 — 11,39 (21) + n,39 (22) 
9/933 4739-5 — 12,61 (24) + 12,61 (25) 
9,928 3891.0 — 13,16 (29) + 13,16 (30) 
9,9°4 0954.4 — 15,69 (34) + 15,69 (35) 
9,997 6635.7— 2,19(37)+ 2,19(38) 
9,512 0470.2 
5. Queckenberg — Cloppenburg. 
sin MeAMo. sm MoMeBi. sin B1M0W1. sin W1B1SW. sin bWWiD. sinDSWN 
sin + == sin AMc • . 
sm MeMoA. sin MoBiMe. sin B1W1M0. sin WiSWBi. sin SWDWi. sinDNSW 
. sin DNBe . sin BeDQ . sin QBeH . sin QHWb . sin QWbC 
. sin DBeN . sin BeQD . sin QHBe . sin QWbH . sin QCWb 
MeAMo =95 47 14,175— (2)+ (3) 
MoMeBi = 58 6 12,357— (5)+ (6) 
BiMoWi =49 ii 18,110—(io) + (ii) 
WiBiSW = 60 35 9,288 + (12) — (15) 
SWWiD — 47 26 51,289 — (18) + (19) 
DSWN =61 6 13,762+ (20) — (23) 
DNBe = 83 45 32,332+ (29) —(31) 
BeDQ = 50 13 6,509 — (27) + (28) 
QBeH =4828 5/5°6 — (32) + (33) 
QHWb =70 2 6,692 — (41) + (42) 
QWbC =61 12 5,019 — (45)+ (46) 
О / Il 
MeMoA =66 52 16,912— (8)+, (9) 
MoBiMe = 43 51 7,529 — (13) + (14) 
BiWiMo =89 29 8,808—(16) + (17) 
WiSWBi = 61 34 45,392 — (21) + (22) 
SWDWi = 59 5 23,354 — (24) + (25) 
DNSW =57 59 36,146 — (29) + (30) 
DBeN =53 18 27,137 —(34)+ (35) 
BeQD =84 3 43,595 — (37)+ (38) 
QHBe =83 37 43,470 —(42)+ (43) 
QWbH =57 17 4,614 —(46)+ (47) 
QCWb =67 44 41,447 — (49) + (50)