And This Analogy will Proceed throughout All the following Species of The Multiple .

In  The Matrix of The Diagram 

in The Places just above The Quadruple Selves 

The Selves (of 3 , 6 , 9 and 12) Have-Come-to-Light

Now

[14]  by Comparing The selves of The Second Line in both directions beginning from Number 4

with

Their Common Source , 

and falling Cross-wise in each particular row to The Dyad ,

The Lines which are next in order just below Bring-to-Light ,

− by Preserving The Same Order in Relation to The Same Order −

The First Species of The Super-particular , that is , The Sesquialter/Hemiolios .

So also by Divine Nature , not by our convention nor by our agreement ,

The Super-particulars are of later-generation than The Multiples .

from The Monad to The Decads

and In Turn in the opposite sides , in The Two Other Processions

from The Decads to One-Hundred

And on the one hand , The Numbers along The Diagonal

from The Monad to One-Hundred are All Square Numbers ,

by Being The Products of Equal-X Equals ,

whereas on the other hand , Those flanking Selves on either side are All 

Heteromecic 

Unequal and The Products of Sides where 

One is Greater than The Others by

 a Monad 

so that At Once as in simultaneously

 The Sum of the Two Successive Squares

A^2 + b^2 

and Twice of The Heteromecic Numbers 

between Selves

 + 2AB

 Always Renders A Square 

= [A+B]^2

and In The Other Way Around , 

A Square is Always Produced At Once

from The Two Hetero-mecic Numbers on Both Sides

and Twice The Square between Selves .