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| rdfs:comment | - Conway's Tetratri, also known as Conway's three-three-three-three (or 3-3-3-3) is a large number coined by John H. Conway. It was mentioned in his Book of Numbers as an example of a number larger than Graham's number using Conway Chained Arrow Notation. Jonathan Bowers once cited it as "the largest number I've seen in the professional literature" on his original 2002 website. The number is defined as: \[3 ightarrow 3ightarrow 3ightarrow 3\] using chained arrows. The number is indeed bigger than Graham's number.
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| abstract | - Conway's Tetratri, also known as Conway's three-three-three-three (or 3-3-3-3) is a large number coined by John H. Conway. It was mentioned in his Book of Numbers as an example of a number larger than Graham's number using Conway Chained Arrow Notation. Jonathan Bowers once cited it as "the largest number I've seen in the professional literature" on his original 2002 website. The number is defined as: \[3 ightarrow 3ightarrow 3ightarrow 3\] using chained arrows. The number is indeed bigger than Graham's number. Googology Wiki user Hyp cos calls this number a primibolplex, and it's equal to s(3,3,3,2) in strong array notation.
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