PHOTOGRAMMETRIC ENGINEERING
permits fitting to each band or isolated con-
trol point, it is possible to fit to a vertical
control point on which the elevation is in
error without detecting this error from the
residual errors. It has been observed on
numerous extensions that the change in lat-
eral tilt error between two successive models
on an extension is usually less than .38 X 107.
With respect to the adjustment equations
this means that
af (xy) of (xv) :
Ir 2 = 10.38 ¢ 107%
| Ö(y): Ö(y)i+ | ; Ï
where: (7) refers to the number of the photo-
graph and the distance from (7) to (-- 1) is the
longitudinal dimension of the stereoscopic
model (approximately, the model base). The
partial derivative
(Of (xy))
av)
can obviously be determined as a by-product
of the solution to the adjustment equation.
Numerical values are then computed at in-
equivalent to the longitudinal
dimension of two stereo-models. The differ-
tervals in “x”
ences between consecutive values are ex-
amined in evaluating the results of the solu-
tion. Unfortunately only relatively large
errors can be detected by this method. With
regard to the longitudinal change in slope,
there is less consistency than with the lateral
change in slope. In fact the variation result-
ing from the use of different cameras ob-
scures the expected correlation due to flight
altitude. For this reason, no attempt has been
made to use the longitudinal slope difference.
The program described
operational at the Army Map Service since
September 1959, It has reduced the graphical
adjustment to an occasional minor revision
above has been
for a computed solution. Furthermore, there
has been no evidence of excessive flexibility
which is constantly checked by the differences
of independently adjusted elevations from
adjacent strips.
And now to digress from the discussion of
the vertical adjustment to another applica-
tion of the computer, namely, the horizontal
block adjustment. Despite the intensive use
made of the independent strip method for
horizontal and vertical adjustment, the ad-
vantages of a block adjustment had not been
overlooked. The problem remained to devise
a method, both practical and efficient, that
is compatible with the facilities and equip-
ment available at Such a
method for horizontal block adjustment has
been recently tested at the Army Map Serv-
our installation.
6
ice. The method in principle can most readily
be described by comparing it with the familiar
method of Dr. Jerie;! however, the adjustment
is completely mathematical and was accom-
plished using existing UNIVAC programs.
The method and results obtained will now
be briefly described.
The strips of photographs are stereotri-
angulated and then divided into segments of
at least two models (possibly more) in length.
Tie points are preselected common to the
corners of four segments; that is,
ments each from two adjacent strips. The
object is to adjust the segments from all of
two seg-
the strips on the project area to the best rela-
tive fit
net of geodetic control. Such an adjustment
between segments and also to the
consists of the simultaneous solution of a set
(linear
formal transformation and scale change) for
of transformation coefficients con-
each segment by the method of least squares.
Although theoretically possible, the mathe-
matical solution for the above problem has its
computational limitations. The number of
significant places which must be carried in
solving for the coefficients of transformation
make this procedure impractical; therefore,
the adjustment has been divided into two
phases.
The first phase consists of transforming the
stereophotogrammetric coordinates of each
strip into the geodetic coordinate system
using the well-known equations:
X = A:x — Biy + (
(4)
Y = A:v+Bx+D
where
X, Y are the approximate geodetic coor
y, are the stereophotogram
B; C; D; are the
coefficients for strip 1(3=1l, 2, 3 -- n»).
dinates: x,
metric coordinates; 4;
Such a transformation is applied to thc
stereophotogrammetric coordinates of a base
strip, which contains at least two geodetie
control points, thus transforming the coor-
dinates of control and tie points into the
geodetic coordinate system. The coordinates
of the adjacent strips are then consecutively
transformed into the geodetic coordinate
system using the adjusted coordinates of two
tie points from the previously transformed
NOW
The strips are approximately
this time the differences
strips.
transformed and at
between the true geodetic coordinates and the
t “Block Adjustment by Means of Analogue
Computers,” by Dr. H. C. Jerie, Photogrammetria,
Vol. XIV, No. 4, 1957-1958.
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