26
+3 + T3 +
i^ *i MEE T
+5 +6 +5 +
Fig. 6. Location and notation of scale transfer points into models ;— 1, 4 and 7, à+1
respectively.
1.22. The error accumulation in the triangulation procedure
In all observed data there are errors of various types present. When
the observed data are used in functions as intersections and coordinate
transformations the errors will propagate and accumulate. When the
strip is transformed into the coordinate system of the ground the errors
in the control points will become compensated by the elements of trans-
formation but will become distributed to all other points.
It is of fundamental importance for the triangulation procedure to
study the laws for the error propagation, aceumulation and compensa-
tion in order to be able to express the accuracy which can be expected
from the triangulation under different conditions.
First we will define some notations, see fig. 6.
The intersected coordinates x, y of the points 3—6 which are
demonstrated in fig. 6 are denoted as follows.
In the image pair à — 12
v. ;
1454, .
for point 4
Yi—1,i4
x. A
11,6 . s
for point 6
Yi—1,i6
v
for point :
for point 5
-
For simplicity we further assume all individual bases to be equal (b)
and the points 3—6 to be located at the distance b from the bases.
