Natalia Moskal
3.3. The initial equations are analogous to (2.10) but B,=0.
It means that the measuring for the control data was not made (Y, = 0). Then we get
AU = (CNC +5518) (CN, - $/5;0.).
(35)
in 4
Zo = ICONIC + Sj.
3.4. The task is analogous to the third, but the functions of losses for € ,£, and? are square.
| 2
—1 —
The solution will be as follows: — AU 2 (C'N,C € $'Ej,S) (C'Ni 0,- $'Zj'0). (36
The matrix X AU is analogous to (33)
3.5 It is necessary to fulfill the joint adjustment of the measured quantities functions under condition when the errors
of control data can be neglected.
The initial system (2.10). Will be as follows:
De, + CAU +0, =0,
(37)
£,* SAU 4 9, - 0.
Here is B = B, = 0, y. =0 and
AU {CNC +S27'S) (C'N,, 6, - S'Ej'@,),
| : (38
Selene assy
Where N= Dx, D.
3.6. If there is no measuring Y in task five we shall have the adjustment of the measured functions of quantities
with the additional unknown quantities U.
Then
£,-$-0,-X, -0,
AU --(C'(DE, DC) (C’(DE, D'y!o,), (39
Xu = CD DY CY.
The cases (1 - 6) described above do not restrict the list of the partial problems that can be gained by the change
coefficients — A, D, B, B,, C, S , correlation matrix. S Y € .. and quantity d. It should be noticed that it i
2, Ï Y y
not diffucult to get formulas when the functions of losses for the vectors £, and£ , are unsquare and are analogous
p(y) from (2.12).
630 International Archives of Photogrammetry and Remote Sensing. Vol. XXXIII, Part B3. Amsterdam 2000.
The pr
The lat
photogr
slope (S
directioi
The the:
data are
known t
high me
We thin
conside:
found ir
Under si
e =
where
Y
coordina
Y y
photo sta
E - vectc
projectio
space co
P--
1
In this ca
direction
The leng
Therefor:
partial de