Far Along The Derivation We Remember Mentally Making The Right Move: √2/√2-2⁕1/∞⁕√2/√2...Coffee Ice Cream Break

WITH LEMMA: {(∞-1)/∞} ± [{(∞-1)/∞}/∞] = ∞*{(∞-1)/∞} PROVIDING CYCLIC {(1-∞)/∞}^(1/2) = {(∞-1)/∞}^(1/4) = {(1-∞)/∞}; SHOW THAT GELFOND-SCHNEIDER CONSTANT WHICH IS DEFINED AS 2^(√2) DERIVES √2/√2 = -0 VIA (-0)^∞=(-0)⁕(-0)^(∞-1) AS (-0)^{∞/(∞-1)}=0 AS (0)^{(∞-1)/∞}=-0 AS (1-1)^∞ = 2⁕√2/√2 - 2⁕√2/√2 AS (∞-∞)⁕(1+1)/(1+1)=√2/√2 - √2/√2 AS (2⁕∞/2)-(2⁕∞/))=√2/√2 - √2/√2 AS √2/√2 + (2⁕∞/2)=√2/√2 + (2⁕∞/2)) AS √2/√2 + ∞⁕(√2⁕/√2)^2=√2/√2 + ∞⁕(√2⁕/√2))^2 AS √2/√2⁕ + (√2⁕/√2+ ((√2⁕/√2)-(1/∞)⁕((√2⁕/√2)))^2= √2/√2 +((√2⁕/√2)-(1/∞)⁕((√2⁕/√2)))^2 AS √2/√2 +1- 2/∞ + 1/∞^2 = √2/√2 +1- 2/∞ + 1/∞^2 AS √2/√2 +(1+1/∞)^2 = √2/√2 +(1+1/∞)^2 AS √2/√2 =√2/√2; THEREFORE DIAGONAL OF POSITIVE REALS LIST AS '1111111.....11111' EQUALS DIAGONAL OF NEGATIVE REALS LIST AS '00000.....00000"; WHICH IS NICELY EXPLAINED BY INFORMATION THEORY IN THAT THE GREATER HOMOGENEITY OF A STRING OF DIGITS THE LESS INFO IT SUPPLIES. SO IN SHORT CANTOR DIAGONALS SYMMETRICALLY PROVIDE ACCORDING TO INFORMATION THEORY NO INFORMATION TO BE COUNTED BIJECTIVELY WHICH IS THE LITERAL OPPOSITE OF UNRESTRICTED COMPREHENSION CONCERNS