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60 LA COMPENSATION DES BLOCS DE BANDES, PRESENTATION 
La deuxième partie donne un aperçu systématique des diverses méthodes actuelle- 
ment utilisables. Ces méthodes ont été classées de la façon suivante: 
1. Triangulation radiale. 
2. Stéréo-templet. 
3. Aérotriangulation spatiale: Méthodes reposant sur la compensation individuelle 
préalable des bandes qui composent le bloc, méthodes de compensation simulta- 
née d’un ensemble de bandes, méthodes de fragmentation du bloc, méthodes re- 
posant sur l’utilisation de calcul automatique. 
Pour chaque groupe, le rapport s’efforce de faire ressortir les avantages et les in- 
convénients. 
En conclusion, on peut dire qui’il existe actuellement plusieurs solutions approchées 
qui ont été consacrées par la pratique et ont prouvé leur efficacité; le choix entre ces 
solutions dépend des conditions particulières du problème cartographique à résoudre. 
Mais le développement très rapide des puissants moyens de caleul modernes a permis 
récemment la mise au point de solutions théoriquement plus rigoureuses, mais qui exi- 
gent la possibilité d’utiliser un calculateur automatique à grande capacité. 
Presentation of the Paper by Dr H. G. Jerie 
I was chosen to assist Mr Bonneval and I 
will try first to give some introductory remarks 
which are based mainly on the essential feature 
of Mr Bonneval's report. 
Mr Bonneval pointed out that the general 
requirement for the block adjustment method 
will be the following: first, of course, all co- 
ordinates have to be in one uniform co-ordinate 
system; secondly, they have to be homogeneous, 
and if possible high relative precision will be 
required; thirdly, absolute precision is required 
that will be satisfactory to the topographical 
task; lastly, of course, the lowest possible cost 
should be connected with such a block adjust- 
ment method, but this cost has to include all 
procedures — namely, aerial photography, 
ground control, aerial triangulation work itself, 
computation and adjustment. So we cannot 
allow that only the adjustment method itself is 
evaluated in respect to cost, but also the com- 
plete procedure. 
In the evaluating method we have to consider 
the following circumstances in our work: first, 
the kind of area, whether the area is easily 
accessible, and the density of existing ground 
control; then the time available for the project; 
the existing material; machines and personnel, 
and, of course, also the skill of the personnel. 
We then have to consider the precision requir- 
ed, and we have to ask whether a method 
allows us to use existing ground control, or 
whether a method forces us to get the ground 
control on very special places, which would 
mean that a special ground survey has to be 
done. Last, the security of a method with respect 
to blunders and gross errors has to be con- 
sidered. 
In the next chapter, Mr Bonneval gives a 
survey of the existing or proposed methods in 
block adjustment. The first subject of a block 
adjustment could be radial triangulation, es- 
pecially numerically radial triangulation, but 
this could be treated just like the normal slotted- 
templet adjustment of radial triangulation strips. 
We have to regard this as a block adjustment 
method. It is the oldest, the fastest and the most 
efficient method in block adjustment, and pos- 
sibly the most used tool, but it gives only 
graphical precision and it cannot be used for 
large-scale mapping. However, I do not think 
that it is really a problem for this meeting here. 
Then we have to deal with spatial and analytical 
air triangulation. I have here considered them 
together as we can say that analytical air trian- 
gulation will be either adjusted according to 
rigid methods, as proposed, for instance, by Mr 
Schmid or Mr De Masson d'Autume and some 
others, or it can be adjusted according to ap- 
proximative methods which are then basically 
equal, and then adjustment of aerial triangula- 
tion strips. 
With regard to spatial aerial triangulation, we 
can distinguish between numerical solutions, 
such as adjustment of independent strips and 
taking the average of the co-ordinate obtained 
in this strip adjustment, the method of cross 
strips as proposed by the school of Professor 
Zeller. Then there are second or third order 
functions for the correction of the co-ordinates 
which are found simultaneously for the whole 
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