462
DOC.
14
EINSTEIN
AND BESSO MANUSCRIPT
[p.
49]
x
=
dg
[eq.
326]
A82fx=
[A8/,
r]
Jx
h
J
Xx
rv
A
8/vr,
-
A
S/,rv
2k
204
205
[226]
tiy
=
dhlx
"
V,r
[227]
=
2/x8(
sinisind)
=
-
I
v)
d(p
(p
1
u
Statt
der
Äx,.,.
werden die entsprechenden
x
,.,.
eingeführt.
cosi
=
1
und sini
=
i
gesetzt
x
=
rcos
(p
+
d)
y
=
rsin
(p
+
d)
xx
= -r
sin(cp
+ d).cp
yx = rcos ((p
+
d).
cp
x
=
{3r3
.
i2.
sincp.
sin
(cp
+
d)
coscp.cp
+ (r2
-
3r2
Z
=
r.
/.
sincp
Z =
r./.coscp.cp
[eq.
327]
[228]
,2
-2
•z • ^ x / cvx •
1
1 2
Axr
.
1
sin
cp)
rcos
(cp
+
d)
.cp}
-
-c0-cos(cp
+
d)
=,N
-i
{.Sok
[3/2sincpcoscp.
sin
(cp
+
d)
+
(1
-
3/2sin2cp)
cos
(cp
+
d)
]
cp-^c'o
A
cos
(cp
+
d)
}
r
2
/
i2
ist
aber =
0
gesezt,
gegen
1
daher
x
=
-
Sok
cos
(cp
+
d) -c0
acos
(cp
+
d)
=
cos(cp
+
d)
1
2r'
(cpSoK-
-Cq
A)
y
=
+^5osin
(cp
+
d)--^cß
Asin
(cp +
d)
=
sin((P
+
^)
(^ok-
}-Cq
A)
[eq.
328] 12291
2r"
r
2
z
[229]r
=
3
Sok
r
3 2
.
•
3.-2,
.
•
,
1
1
A
ri
sincp
{r
.1.•
cost
9
+
d)
sincp.
cp
+ r
.
1.
sin
(cp
+
d).
sincp.cp}
--Cq
•
-
-
Sok
.
.
2 w •
3
•
-^-.z.cp
--2c'0l
AyT
1
sincp
==
(3cp5,oK-^c2)
Asintp)
2k
[eq.
329]
1.
r .
2//^8sind
=
-
I
{rsin
(cp +
d)
•
-
(3cpSoK-
-Cq
A
sincp)
-
r./. sincp.
9
I
r
sin
(cp
+
d)
1
2
.
(cpSoK--c0
A)
}
dcp
dd5
[230]
2k
2/.8sind
=
~
|
-
sin (cp
+
d)
{%3cp5oK-
sincp.
ipSo
1
}d
9
0
2k
So
k
1 .
Sok
sin
(cp
+
d)
(3
-
sincp)
dcp =
cosd.7i
cosdSd
[eq.
330]
0
für
Merkur
So
=
4,
38
.
10
KSn
49
--
c
[eq.
331]
_
4q
..
So
So.k
1
4.38
1049 2/.80
=
-jc-k
8d
=
-it-:
=
-it
nr-
r
2fr
3
1019
6
.
1012
0
18
KM
=
\
Kr3
=
reo
CO2
M
r
= 6
.
10
12
2/=
=2n-3-^
25 7,
6
•
10
19
=
-0,7-
10
•
K
=-1,4-
10
_9
=
3
.
10
K~
0.7 •
10-7-
(Ifi-'r2/3)
k
~
2
•
10
-27
(m"1/)
per
Umlauf
=
[231]
-5,
6 •
10-7(im
Jahrhundert
=
-2,
3"
im
Jahrhundert
Winkeleinheiten
=
0, 41
•
10
6//
S
=
/5
•
ml~\
So
ml2t
1
5. OK
=
/V
/=
/V
für
Venus
-2,3
//
d
\
3/2
R
= -2,3(0,53)
0J8
3/2
_
=
-0,
9"
i.Jh.
[232]