TRIP CHANGE
(e,1) has n as a factor
(-f,1) has (n-1) as a factor
Row (n-1)
Row n
At cell (e,n) c is an an element.
At cell (-f,n-1) c is also always an element
There is a pattern of repeating cells on each row. 2n in row n. 2(n-1) in row (n-1).
This gives additional information.
Information constrains values.
Every piece of information constrains values.
The most valuable information greatly constrains values as c increases.
Yes, its the way it was explained.
I'll show an example using RSA 100 as an example. This weekend.
a[t] simply means the value of a in a cell at position t. t is a function of x but since x can be odd or even, t is used for convenience.
a[7] : (1,1) = 85
If 85 is "an" then n could be 5 or 17, a could be 17 or 5. Both values of n would appear in the column at (1,n)