440
coordinates and Cartographers have chosen to present flat
maps of the earth. witha host of mapping transforms.
Control
—
Plotted
——ÓÀ
Data
Figure 4
The rectangular coordinate system shown on the right in figure
4 is the one chosen by the photosrammetrist which best:suits
the pair of photographs being employed and also minimizes
computation of the central perspective transformation to each
photograph. This system is usually unique for each photopair
and as such does not qualify .for standardization» Likewise,
the output coordinate system for plotted data is usually
chosen in particular for the "best fit" to che areas being
mapped and as such can take on a variety of shapes. The most
universal of the three ‚(upper left in fig. 4) is that of the
geodesist--the curvilinear system in latitude, longitude and
height. These systems are usually consistent over large con-
tinental land masses and are precisely defined by two para-
meters--either two axes of an ellipsoid (a and' b) or^ by one
axis (a) and an eccentricity (e-squared). Sometimes the figure
is given by the axis (a) and a flattening {f); however there
are expressions that relate the four parameters. Most import-
ant is the fact that there are rigorous transformation to and
from Cartesian coordinates. That is, for transform fron
geodetic coordinates (5,4, and h) to:/Cartesian. coordinates
(X. Y, and 2), one. uses. (assuming positive longitude: west):
Ms gu fret stus
X = (N+h) 005$ cosA ;
[1]
Y ==(N+h)cosé sinA
us [" (iet) v^] sind
Conversely, to transform from Cartesian to geodetic coordinates:
Af = f Y) "2
À = Cos, Xs) MER /27
ó = fan f Z(a«») /a ( 54^]
