03/29/2017, 06:27 PM
(This post was last modified: 03/29/2017, 06:28 PM by Xorter.

*Edit Reason: (c)*)
I suppose that between evertyhing is there something. E. g. xy = x*y (multiplication).

I suppose that between every operators must be there a multiplication, let us call it operational multiplication: □

For example:

xy = x*y

123 = 1*100 + 2*10 + 3

¬x = ¬ □ x

¬¬x = ¬ □ ¬ □ x

(x = y) = (x □ = □ y)

etc ...

And as the "normal" multiplication has power and functional multiplication (f o c = f( c )) has functional power (f^oN = f o f o ... o f) as the operational multiplication has operational power and roots: O □ O □ ... □ O = O^□N

For instance:

(¬¬x)^□0.5 = x or ¬x, because id id x = x and ¬¬x = x, right?

What do you think, is it exist or not? Can we substitute operational multiplication with other multiplication, like the functional or not?

I suppose that between every operators must be there a multiplication, let us call it operational multiplication: □

For example:

xy = x*y

123 = 1*100 + 2*10 + 3

¬x = ¬ □ x

¬¬x = ¬ □ ¬ □ x

(x = y) = (x □ = □ y)

etc ...

And as the "normal" multiplication has power and functional multiplication (f o c = f( c )) has functional power (f^oN = f o f o ... o f) as the operational multiplication has operational power and roots: O □ O □ ... □ O = O^□N

For instance:

(¬¬x)^□0.5 = x or ¬x, because id id x = x and ¬¬x = x, right?

What do you think, is it exist or not? Can we substitute operational multiplication with other multiplication, like the functional or not?

Xorter Unizo