Reggie Fils-Aimé quote: “Now I know many of you today walked in with numbers already swimming in your heads: 360, 16x9, 1080, 8.2 GHz. Well, we'…”

“This annoyed me: I was on the phone with somebody today tryin to get a phone number from that person and write it down, but they didn't have phone number rhythm and that pissed me off. You know what I'm talkin about? Phone number rhythm. Especially if there's like an area code involved, like 'two one two - bum bum buh - bum buh bum buh!' That is the rhythm I think we're all familiar with. This guy had no clue! I was like "Okay, Hank. Gimme the number." He's like "Alright. It's two one two nine - fifteen eight eleven six [mumbling incoherently] fou.. tw.. five.. eight.. seven.. two." "Did you throw in your zip code? Cause I got a lot of extra numbers over here. I have extra. I can almost start a new number! What do ya got?! Start again from the top!" They really screw you up on the last four numbers. That's where they get ya. "Five five five - six.. teen forty one" "Dude, I already wrote the six! I made the dash too close, I can't shimmy the one in there now! Forget you!"”

Kevin James (1965) American actor and comedian

Sweat The Small Stuff (2001)

“I discovered two very important facts that day - Number one: The springs will pull the hair out of your legs, and Number two: the dog doesn't like to jump.”

Bill Engvall (1957) American comedian and actor

about trampolines
Source: Blue Collar Comedy Tour, Blue Collar Comedy Tour: One For the Road (2006)

“To add to golden numbers golden numbers.”

Thomas Dekker (1572–1632) English dramatist and pamphleteer

Patient Grissell (1599), Act i. Sc. 1.

“You say your life's a bum deal 'n yer up against the wall. Well, people, you ain't even got no deal at all. 'Cause what they do in Washington. They just takes care of Number One. An' Number One ain't you. You ain't even Number Two!”

Frank Zappa (1940–1993) American musician, songwriter, composer, and record and film producer

"The Meek Shall Inherit Nothing"
You Are What You Is (1981)

“If a, c are two different numbers, there are infinitely many different numbers lying between a, c.”

Richard Dedekind (1831–1916) German mathematician

p, 125
Stetigkeit und irrationale Zahlen (1872)

“Look out for number one and try not to step in number two.”

Rodney Dangerfield (1921–2004) American actor and comedian

“If you actually took the number of Muslims Americans, we'd be one of the largest Muslim countries in the world.”

Barack Obama (1961) 44th President of the United States of America

Interview with Laura Haim, Canal Plus, France. http://www.whitehouse.gov/the_press_office/Transcript-of-the-Interview-of-the-President-by-Laura-Haim-Canal-Plus-6-1-09/, White House Library (1 June 2009)
2009

“Let as many Numbers, as you please, be proposed to be Combined: Suppose Five, which we will call a b c d e. Put, in so many Lines, Numbers, in duple proportion, beginning with 1. The Sum (31) is the Number of Sumptions, or Elections; wherein, one or more of them, may several ways be taken. Hence subduct (5) the Number of the Numbers proposed; because each of them may once be taken singly. And the Remainder (26) shews how many ways they may be taken in Combination; (namely, Two or more at once.) And, consequently, how many Products may be had by the Multiplication of any two or more of them so taken. But the same Sum (31) without such Subduction, shews how many Aliquot Parts there are in the greatest of those Products, (that is, in the Number made by the continual Multiplication of all the Numbers proposed,) a b c d e.”

John Wallis (1616–1703) English mathematician

For every one of those Sumptions, are Aliquot Parts of a b c d e, except the last, (which is the whole,) and instead thereof, 1 is also an Aliquot Part; which makes the number of Aliquot Parts, the same with the Number of Sumptions. Only here is to be understood, (which the Rule should have intimated;) that, all the Numbers proposed, are to be Prime Numbers, and each distinct from the other. For if any of them be Compound Numbers, or any Two of them be the same, the Rule for Aliquot Parts will not hold.
Source: A Discourse of Combinations, Alterations, and Aliquot Parts (1685), Ch.I Of the variety of Elections, or Choice, in taking or leaving One or more, out of a certain Number of things proposed.

“Let as many Numbers, as you please, be proposed to be Combined: Suppose Five, which we will call a b c d e. Put, in so many Lines, Numbers, in duple proportion, beginning with 1. The Sum (31) is the Number of Sumptions, or Elections; wherein, one or more of them, may several ways be taken. Hence subduct (5) the Number of the Numbers proposed; because each of them may once be taken singly. And the Remainder (26) shews how many ways they may be taken in Combination; (namely, Two or more at once.) And, consequently, how many Products may be had by the Multiplication of any two or more of them so taken. But the same Sum (31) without such Subduction, shews how many Aliquot Parts there are in the greatest of those Products, (that is, in the Number made by the continual Multiplication of all the Numbers proposed,) a b c d e. For every one of those Sumptions, are Aliquot Parts of a b c d e, except the last, (which is the whole,) and instead thereof, 1 is also an Aliquot Part; which makes the number of Aliquot Parts, the same with the Number of Sumptions. Only here is to be understood, (which the Rule should have intimated;) that, all the Numbers proposed, are to be Prime Numbers, and each distinct from the other. For if any of them be Compound Numbers, or any Two of them be the same, the Rule for Aliquot Parts will not hold.”

John Wallis (1616–1703) English mathematician

Source: A Discourse of Combinations, Alterations, and Aliquot Parts (1685), Ch.I Of the variety of Elections, or Choice, in taking or leaving One or more, out of a certain Number of things proposed.

“The bodies of which the world is composed are solids, and therefore have three dimensions. Now, three is the most perfect number,—it is the first of numbers, for of one we do not speak as a number, of two we say both, but three is the first number of which we say all.”

Aristotle (-384–-321 BC) Classical Greek philosopher, student of Plato and founder of Western philosophy

Moreover, it has a beginning, a middle, and an end.
I. 1. as translated by William Whewell and as quoted by Florian Cajori, A History of Physics in its Elementary Branches (1899) as Aristotle's proof that the world is perfect.
On the Heavens

“Now I know many of you today walked in with numbers already swimming in your heads: 360, 16x9, 1080, 8.2 GHz. Well, we'd like to add one more number to the mix. And that number is two.”

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Reggie Fils-Aimé 34

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