ich means that
must than be
vn the strip in
1g-line or simi-
termined with-
every plotting
orous, but still
line interval is
1g lenses place
'ACy In separa-
iphs are taken
J0 meters) and
30—65 sqkm),
— and I do not
ig — the prob-
te obstacle for
> we must ob-
or many activi-
ind
es normally is
the determina-
1g and orienta-
as inaccessible
artics but than
it high altitude
be substituted
surements.
asized that —
ping — photo-
n many cases
:strial levelling
d for planning
strial levelling
ening there is
tal accuracy i$
m the geodesy,
letic points of
:oncerned, this
] purposes. In
ially in block-
Ce
mum Je ie ZI so tug se 104 Se [777777700089 mmm
| | | I
| | I I
‘ ~ — t = = = ^ — ~ —
F : r !
| | ;
| : Pm VA - c s.
* . .
| \ I
| ~ - 1 = ‘ -— — N V
} Pd |
| | |
4 - . I | i x |
| food |
Da À le oe ig wom rm nt
Fig. 1. Suppose an area 5 X 5 km taken from a district mapped by two different
methods and suppose further that check surveys at 36 evenly distributed points
in both cases show a standard co-ordinate error of *= 10 m. The map to the left
has only random errors varying in size according to the Gaussian frequency law
as shown with vectors. The map to the right has random errors equal to one half
of those of the left map but in addition a systematic error /\ y — + 8 m. The
maximum co-ordinate error becomes 30 m for the left and 16 m for the right
map; distances of 1.000 m have a standard and maximum error 11 m and 30 m
for the left and + 5 m and 15 for the right map. This illustrates the importance
of knowing the character of the errors.
methods, such coordinate-errors do not give the best information for
the majority of map users. The block-methods — two-or three-dimen-
sional — are characterized by correlation which, if the fixed geodetic
controls are widely separated, causes regional displacements without
discrepancies. For most map users such regional errors, of course of
limited magnitude, are of no or limited disadvantage; it is the local er-
ror within his region of interest (e. g. 5 X 5 km) he needs to know.
In fig. 1 this is illustrated.
The general discussion above has been included in order to put the
reader in a zero-position before the following concentrate of my study
1s presented.*) The two-dimensional radial triangulation methods, how-
ever, are not introduced here as a substitute for the three-dimensional
stereotriangulation methods, but their advantages — and disadvantages
— are to be earnestly considered without a step-by-step comparison
with those methods more general accepted for precision work.
The very limited research work in and instrument design for radial
triangulation during the last ten or fifteen years could be incorrectly
understood as this group of methods be of limited value. There are,
however, other reasons for this lack of interest for radial triangulation
*) P. O. Fagerholm: A study of Mechanical Radial Triangulation and some
Related Problems in Modern Mapping. Stockholm 1952.
i en
