PHOTOGRAMMETRIC ENGINEERING
from adjacent segments (J, k) and (j+1,
k) using matrix notation to designate the
segments.
It should be noted for both control points and
tie points that:
Xin) — Bj. po T T = Cj
5"
/ \
Uu)
- (4) > (à)
AXjk = AA CX; m
and
eay?- T FB +R
(2)
AY
where: X Y are the mean coordinates of
the corner tie points and control points for
segment (7, k).
Since there is a redundance of relative equa-
tions (note equation (6) ), expressing the re-
lationship between segments (generally 12
equations per segment) and normally more
than two control equations (note equation
(5) ), a least squares solution results from
minimizing the sum of the squares of the
residual errors; that is,
n
sS ( po^ + > (V, à? + > (V te)
il il
ium]
TO t)G:uo,) - minimum
The method had been tested on a project
area with ten strips of 16 to 20 exposures each.
The photo scale was 1:18,000, and there were
eight control points around the perimeter of
the area. There were 86 segments, 344 co.
efficients for the secondary transformations,
16 condition equations on control and 602
condition equations of relative differences. A
total of 36 geodetic control points was used
for checking. The results of this test show that
the RMS error on these points was 12.25' with
a maximum error of 27’. It is felt that these
errors have been adversely affected by errors
in the input data and the method should
normally give better results. With the con-
ventional independent strip adjustment, em-
ploying the procedures normally used at the
Army Map Service, it is estimated that 22
control points, instead of 8, would have been
required for obtaining the same results. The
time with the UNIVAC for this
adjustment was sixteen hours; however, as
Computer
previously mentioned, existing programs were
used. It has been estimated that with the pro-
gram which is currently being written for this
particular problem the time will be signifi-
cantly reduced.
Archi
