ained
ziz in
ain
1 +
2/4 +
1246
6)
/3)/4
ained
lera
W : the object width
H : the object height
Ein : the theodolite elevation
Cth : the theodolite accuracy
Oph :the accuracy in measuring the image
co-ordinates
The optimum theodolite positions as given by
Abdel-Aziz (1982) are as follows :
the optimum base distance ('B)= 1.4L or 0.7W ;
the optimum object distance (/D) =0.26L or
0.13W ;
the optimum theodolite elevation (Ey) =0.5H
The optimum camera positions may be achieved
when the object distance (D) is a minimum and
the base distance (B) is a maximum .
In the normal case of photography B and D are
related together by this formula
BsD.F TIL... ierasectrs ren canter (8)
where:
B: the base distance
D: the object distance
F: the format size
T: the overlap ratio
f: the principal distance
The optimum base distance 'B and the optimum
object distance ‘D are chosen to minimize the
value of om (equation 4 ) .Different values of
D are assumed and the corresponding values of B
are calculated from equation (8) . The optimum
values of B and D which give the minimum value
of on are B-0.31W and 'D-0.35W .
The theodolite elevation E, affects only the
value Oymt ( equation 6) , and it has no effect on
the values of Gynt and Spmt -
The optimum theodolite elevation Ein is chosen
to give the minimum value of Oyqmt (i.e
2Symt/Eth=0 )
3Symt/Etn =L W#/40 + ( 4D2/3 + B2/6 ).(W2/4 )
« 2D?^((2E,, Hy B?D?)] «(2Eg, H) «[
((H. Eg) ^ E, )/2HDW ] [ tan (0.5W40.5ByD..
tan 1(0.5W + 0.5B D] m0 ee (9)
From equation (9) the estimated value of Ey,
=0.50 H
Analysis of |
1 the expected mean accuracy of all the object
points (Oxmt/oYmt?Dmti) for any
phototheodolite positions can be obtained from
equations (5,6 and 7) .
. 2 the accuracy of object points obtained either
from a camera mounted on a theodolite
(phototheodolite) or from a special case of
photography (i.e when we used the same
stations and the same co-ordinate system for
the camera and theodolite together ) can be
maximized in the normal case of photography if
the base distance (B) is taken as 0.31W , the
object distance (D) is taken as 0.35W and the
theodolite elevation E,n is taken as 0.5H .
3 the accuracy of the object points is a
non-linear function of the object distance (D)
and theodolite elevation (Ej) .
3. CONVERGENT CASE OF PHOTOGRAPHY
From the equations developed by Abdel - Aziz in
1982 and by the author in 1989, we can obtain
Oxmt” = (0pn2/D22) [ (W410 + W2B2 4 BY/2
).sin 49/8 + CUR B? ). pu D. Sine cosg/2 4. D?
. sing . cos2g We +3B2 y242.B. QD
cos?g.sing 4 (D^ Wî/6. Bé+D*/2 21.60 .cos^o ] *
E EAM WÓ/224 + w4(8D2_B2)/160 +
2(204/3_282D2/3_B%/24)/4 + B8/32 +
cn 44 DB. den (10)
Gvmi? - (0pp?/D?f?).[ D?W?sing?/t2 «
D2B?sino?/4 + HW2sing*/36 « H?B?sino^/12 «
D 3B sing cosg + H2 D B
sinS0.cosg/3+D2.H2 sino2.coss2/3+(2.D*.H2/3.B2
+D%2).c0582 1+( oq, (H2. 3HEq «Eqs 2)/2B?D?)
[ W440 + W2(4D2/3+B2/6)/4 « 2D*) ] oq? [-
W2/24 + B2/8 + D2/2 + (HZ_3HE,p+3E,p")/3 +
(((H_Epn)°+E;n°/ 10WDH).(tan”*((0.5W+0.5B)/D
— tan ! ((.0.5W40.5ByD )) ]....... n (11)
Opmt> = (20 oh2/B22(1+tan@? )2).[D* « 203 B
tanO 4 n (D^w?i2«3p^Bi2) +tan@“(D w2
B/2 + DB3/2 ) 4 tanO *(W^780 + W2B2/8 + B*/16
) ] + (044 2/B2).[W4/40 + (B2 + 4D2/3 ).(W2/4) +
(B2/8 + B2D2 « 2D^) Jerem (12)
