What is upper & lower bound of tritri (C{x,,x})? First: C{4,,2} = C{4,4} = 2^^7-3 C{5,,2} = C{5,5} = 2^^^8-3 Any number is not even close to tritri Try again: C{0,,3} = C{0,0,0} = 1 C{1,,3} = C{1,1,1} = C{0,7} = 2^^^^^5-3 (Still not close ???) C{x,,2} = C{x,x} = 2{x-2}(x+3) - 3 (Not I’ll defined) Number closest to tritri: C{0,5} = 2^^^3 - 3 (not too close) C{1,5} = 2^^^4 - 3 (closest number!!!) Bipent = {2,2,2,2,2} = {2,{2,2,2,2,2},1,2,2} Bitet = {2,2,2,2} = 2{{2}}2 = 2{{1}}2{{1}}2 = 2{{1}}4 = 2{2{2{2}2}2}2 = 2{2{4}2}2 = 2{4}2 = 4 Bitri = 2^^2 = 4 Unitri = 1^^1 = 1 Zeratri = 0^^0 = 1 Tribi = 3^3 = 27 Bibi = 2^2 = 4 Uniuni = 1 Zerazera = {0,0(1)2} = 0 Be careful because w^^(w+1) is I’ll defined (w+1)^^(w+1) seems like slightly larger w^^(w+1) = ? w^(w^^w+1) = w^^w*w w^(w^(w^^w+1)) = (w^^w)^w Unfortunately because they are no approximations of well defined w^^(w+1) Like: x^x = x^(x-1)*x x^x^^x, unlike w^w^^w which is x^^(x+1). True or false. (x^^x)^^x > x^^2x (False) x vvv x > x^^x (False) x vvvv x > x^^x^2 (True) x vvvvv x > x^^^x (False) x vˣ x > x{x/2+1}x (False) fᵥᵥ₊₁(x) = fᵥᵥˣ(x) (3^^3)^^3 = 76255484987^^3 = 3^^6 Fairly easy = moderately easy Slightly easy = bit easy = lowly easy > hard Very easy = (easy) easy Very extremely easy (not possible to can’t make project even if it’s bad at coding) Limit: Ultra ^ Ω easy = 100% Possible Very extremely hard to solve math C{0,4} = 2^^3-3 = 13 C{1,4} = 2^^4-3 = 65533 C{0,5} = 2^^^3-3 = 2^^2^^2 - 3 = 2^^4 - 3 = 65533 C{0,x} = 2{x - 3}4 C{x,0,0} = C{x,1} C{x,0,1} = C{x,C{x,-1,0},1}
Fairly easy = moderately easy Slightly easy = bit easy = lowly easy > hard Very easy = (easy) easy Very extremely easy (not possible to can’t make project even if it’s bad at coding) Super easy < Extremely easy Super easy = Fairly Very very easy Extremely easy = Very very very easy Hyper easy = Very very very very easy Mega easy = Very very very easy Ultra easy = very very very very very very easy I(1,easy) = easy I(2,easy) = easy easy = very easy I(3,easy) = easy easy easy I(4,easy) = easy easy easy easy I(5,easy) = easy⁵ I(5.5,easy) = Super easy, insanely easy I(6,easy) = easy⁶ = Extremely easy I(x,easy) = easyˣ I(easy,easy) = ²easy I(easy,easy,easy) = easy^^3 I(easy,,easy) = easy^^easy I(easy,,,…,,,easy) = easy{easy}easy