Early Discoveries and Mathematical Proofs

a) Two plus two equals four.

b) 2 + 2 = 4

c) Let us assume A is a constant variable represent an integer containing the number 2, and that B represent a constant variable containing an integer with number 2. C represents constant variable containing an unknown integer with sum equals to A + B we can therefore prove that

A + B = C

Based on the assumptions that the variables not are stochastic but constants, this lead us to the conclusion that C must equals 4. For full proof and axioms see appendix 1.5.6 and 1.5.7.

Why do many researcher only seems to understand solution c) and they even ignores referring to work before them published in the form of b) and particular if it is published in form a) .

Some very interesting proofs of this exist in the literature and some of the old masters will soon be back ...