@@ -53,34 +53,33 @@ with $R=2.2$, $\beta_i = i.\pi/4$ and $\alpha_j = (2-j).\pi/4$.
When $|\alpha_j|=\pi/2 \Rightarrow \cos(\alpha_j) = 0,$ we obtain the same camera position eight times. Only one of them is kept because we always have exactly the same view.
## **Organizing json files:**
```math
'Participant'
|__ 'Age'
|__ 'Gender'
'Tasks'
|__ 'Task_1'
|__ 'obj_name': name of the 3D model that was viewed during task n°1
|__ 'random_initial_position': random intial position of viewed 3D model
|__ 'choices'
|__ 'choice_1': first selected point of view defined by its two angles (α,β)
|__ 'choice_2': second selected point of view defined by its two angles (α,β)
|__ 'choice_3': third selected point of view defined by its two angles (α,β)
|__ 'Task_2'
Participant
|__ Age
|__ Gender
Tasks
|__ Task_1
|__ obj_name: name of the 3D model that was viewed during task n°1
|__ random_initial_position: random intial position of viewed 3D model
|__ choices
|__ choice_1: first selected point of view defined by its two angles (α,β)
|__ choice_2: second selected point of view defined by its two angles (α,β)
|__ choice_3: third selected point of view defined by its two angles (α,β)
|__ Task_2
|__ ...
...
|__ 'Task_10'
|__ Task_10
|__ ...
'Analyses'
|__ 'Analyse_1'
|__ 'obj_name': name of the 3D model that was viewed during analyse n°1
|__ 'keywords': ordered list of selected keywords
Analyses
|__ Analyse_1
|__ obj_name: name of the 3D model that was viewed during analyse n°1
