I apologize for all of the questions, but the last graph above:
0660660
6060606
6600066
0000000
6600066
6060606
0660660
Is it describing MBTI as a whole? Each cluster of '6' is given to a letter i.e. I and E (ha.) N and S etc. (or the clusters denotate a complete set of a function like the upper left quadrant describes the scale of E and I), or is this something different?
I will keep in mind that there is no adding or equalling from now on
! At least for this case, that is.
Yes. Well perceived.
It does describe MBTI in the enirety.
The two clusters on the left depict IP. If one of the IP's has the first function Fi, and the other one has got the first function Ti, then we already have drawn the axioms F and T and we go on and in the process determine the other axioms. It may or may not be the case.
If it is not the case or we do not know, or we do not want to determine it yet, we look further. The two clusters up at the top depict EP. If one of EP's has the first function Se, and the other one has the first function Ne, we have already drawn the axioms S and N and we can go on and in the process determine the other axioms. It may or may not be the case.
The two clusters on the right depict EJ. If one of them has the first function Fe and the other one has got the first function Te, we can determine the axioms of F and T from there.
That is, the axiom dividing line is then between them. It may or may not be the case.
The two clusters at the bottom depict IJ. If one of them has the first function Si and the other one has the first function Ni, we can determine the axioms of S and N from there. It may or may not be the case.
Equalling is the finding of the lowest common denominator between the axioms. It is a useful procedure; we used it when we qualified the numbers and therefore we could find the MBTI loci. If there is adding we use the mark + .. if there is no sign of + in sight there is no adding.
There are more ways to find the MBTI loci than one; the simplest is simply to eliminate the straight lines. However, we wanted to find the sound theoretical basis, therefore the equalling. If we are equalling, I try to remember to mention it.
You are welcome to ask any questions! No need to apologize.