113 
de  l'Académie  de  Saint-Pétersbourg-« 
114 
Tenepb  oßpaTusica  kt,  nepTeaty,  h H3b  Tp  — Ka  2QF1F 
BOSbMCMb 
co s2Q  = co sq  = sin  losina0cosyj~+-cos iacoso0 , 
H JH 
sin2  Aÿ = sin2  i(xa — co0)  -j-sin  jcosin co0sin2  A . 
nan,  no  Mpe3BbinaHHOH  MaaocTH  Koe*M>nnieHTa  c, 
• . sin~o  q 
smî,xb=-:  L , nan  ip=- : 
L ‘ sm  cj0  sin  <jv 
cjf>4.  no  Bbiuie-HanÆeHHon  BeannnH-fe  q,  KOTopyio  34-fecb 
40J5kho  npnmiMaTb  OTpimaïeabHoio , CyACTb 
yj  = — 3477"l02,  \oSip  = 3,5412175  — , 
Ho  KâKb 
ip  = at — bt2  = a — ait'1. 
rai  log/  = 1,8388268 — , to 
a = — = 50^38781 , longa  = 1,7023256  , 
u 
b — ai  = 0"0001 12642  , logt  = 4,0517003 . 
3uaa  a,  HaiîAeMb 
c = 0^00000776833  , loge  = 6,8903276. 
H TaKt  rjaBHbifl  <ï*opMyjbi  npe4»apeHia  paBHOAencTBiü,  cnn- 
Taa  orb  1824  r.,  cyTb 
t p = 50^38781/ — 0^000112642/*. 
co  = wo-4-0"00000776833/2. 
OcTaeTca  onpeAfcanTb  Koe4>4>nnieHTbi  Bb  ^opMyaaxb,  Bbipa- 
acaiomnxb  BejnnnHbi  y> , co15  n £.  Bb  Tp — K-fc  NF"  F 
waieMb 
cosWj  = sin  co  sin  Ncos[L — ip)-+-cosacosN 
— 2sincosin  |IVcos  *_Ncos(L — y>)-i-cosco — 2coscosin2AiV, 
H4H 
cos  co , — cos  o = 2sin  co  sin  AiVcos 1 Ncos[L — y>) — 2cos  co  sin2  AlV. 
CauaaBb  cOj — a — x,  OTCKua  HeTpy4H0  naÜTB 
x = — Ncos(L — ip)-i-^N2  cotangcosin2(L — y>) 
H 
ol=a  — Ncos[L — ip)-+-^N2  cotang  cosin2(I — ip). 
03x  Toro  5Ke  Tp  — na  Gepearb 
. Nsin(L — y) 
S = : } 
sin  <j1 
h KaKT.  sinco1  = sinco-t-cccosca  = sin(3 — Ncos[L — ip)coso, 
TO 
£ =^^r— ^2cos  (L—yj)sin 
HpHTOMb 
iVsin  [L — tp)  = gt-t-ht 2 — (a/ — bi2)  [gt — Ici2)  = gt-b-(k — ag)t2, 
Ncos(L — ip)  — gt — kt2-\-  {at — ht2)  (gt-i-hl2)  = g't-i~(ag — k')t2? 
N2cos (I — tp) sin  [L — y>)  =ggt 2,  %p— y/ = £coso0 . 
H TaKb 
(0,  = co0 — gt — [ag—li—  c — {g2  cotang  co0)  /2, 
i p'  =y>  — £cosco0  = (a — 9 cotang  co0)/ 
— [b -+-  [k — ag)  cotang  co0-H  gg  cotang2  coQ]  Z* 
TaKHMb  o6pa30Mb  aocTnraeMb  40  ca^yion^xb  oKOHnaTeab- 
HblXb  BblB040Bb  : 
tp  = 50;/3878l/— 0"000112642/2, 
co  = co0h-  0^000007  76833 12, 
y/ = 50^24 1 27  -+-  0^000 1 08807  z2, 
co,  = co,  — 0"47 5 1 3 Z — 0"00000 1 934  Z2, 
I = 0*'l  5974  /— 0^000241 407 12. 
noTOMb  4>opMyabi  (26)  Aaiorb 
«2— 7cl=0"l59743/-i-0jo00000357106/*, 
u2-+-ux  — 46"22202/— 0''000103329/2, 
q = 20^,061 36  / — 0^000044847 1 Z2,  1 (2g, 
A = 46^,06228 /-i-0j000 138078 z2.  )'  ' ' J 
4a a ncnbiTaHia  3Tnxb  ocHOBHbiXb  a>opMyab  h nnceab, 
cpaBHHMb  noaoaceHia  HÏiKOTopbixb  3Bt34b  1824  r.  co  3B-fe3- 
43mh  1840  r.,  coaepacamiuMnca  Bb  KaTaaort  3npn.  HoeanKy 
34'J;cb  Z = 16,002  r.,  log/ = 1,2041254,  caiA. 
«2 — ux  = 2^555  , — 1 — Mj  = 739,561  , 
«2=  37l"058  , Mx  = 368"503  = 6'8;'503. 
q — 320"9708,  loge?  = 2,5064654,  | = 2>94. 
KorAa  Bb  4-opMyabi  (11)  h (12)  BCTaBHMb  3Ha^em a [X  h h', 
TorAa  noaynnMb 
8X  = 8-+-qco&  (a-t- -u)  — a q 2 tang  d sin 2(a+u) , 
a,  = k+Mj+u( — £-t-<jrsin(a-i-w)  tangô 
-+-  q2  sin  (a-t-u)  cos  (an-«)  (|-+-tang25) , 
no  KOTOpblMb  HaXOAHMb 
8 
