- 74 -
Fig.2 : Theodolite with CCD camera
Fig.3 : Laser
3. LASER SYSTEM WITH ROTATING LASER
paralax. The first image with a laser trace is used as a base
measurement and, however, the distance y 0 between the base
and the object is known by using self-reflecting distance
meter. For each image the rotating angle is recorded. Further,
the distances to the object point are computed from paralax and
the final 3D co-ordinates are determinated from rotating angle.
The system is fixed on a platform and the platform position
must be observed by using a total station. For this reason three
reflecting prisms are added to the platform. The scheme is
illustrated on fig.2. From a technical reasons it is better, when
the camera is stationary and the rotating device is equipped by a
prism.
jgÊÊ
r
Fig.4: : Optical device (for line track)
Fig.5: : Laser point track on the wall
Mathematically, the method is based on measurement of
horizontal paralax of laser track centre. The first image is used
as a base measurement. The difference between a laser track
centre on the first image and the next images gives the paralax.
The b is the known base distance and it is know, y 0 must be
measured at the beginning of the experiment. The camera axis
is perpendicular to the base. In this case we can use an equation
for normal case of terrestrial photogrammetry. For this method
the relation to terrestrial photogrammetry is evident.
y ±= (fy_
b p ’
( 1 )
From equation (1) it is clear, that it is not necessary to know the
camera constant. Nevertheless, for output precision reason it is
recommended to use an objective with maximum focus
distance. The precision of this can be obtained by derivation of
( 1 ):
For the second system, a new setting of the elements has been
developed. There is a rotating base with a convergent laser
marker and a CCD camera. This model is used for making
profiles for example in tunnels. The frame CCD camera is
connected with a notebook and the images are post-processed
by using special software. The centre of laser track on the
images is detected with a sub-pixel resolution and the centre of
laser trace (in image co-ordinates) represents a horizontal
d y = ~-dp+ ^dy Q - ~j~db ( 2 )
b b b
The precision is given by the element y 0 / b. For example by
using a CCD with the resolution 640x480pixels, the object
distance about 4m and basis 40cm, the precision in dy is better
than 10mm.
