Alan Turing Computable Numbers
On Computable Numbers, with an Application to the Entscheidungsproblem (1936)
Spoken as a jest to one of his officers named Gisgo, who had remarked on the numbers of Roman forces against them before the Battle of Cannae (2 August 216 BC), as quoted in A History of Rome (1855), by Henry George Liddell Vol. 1, p. 355
Variant translation: You forget one thing Gisgo, among all their numerous forces, there is not one man called Gisgo.
Alan Turing Computable Numbers
On Computable Numbers, with an Application to the Entscheidungsproblem (1936)
Richard Feynman (1918–1988) American theoretical physicist
from a 1987 class, as quoted in David L. Goodstein, "Richard P. Feynman, Teacher," Physics Today, volume 42, number 2 (February 1989) p. 70-75, at p. 73
Republished in the "Special Preface" to Six Easy Pieces (1995), p. xx.
Simone Weil (1909–1943) French philosopher, Christian mystic, and social activist
Oppression and Liberty (1958), p. 82
“The number one book of the ages was written by a committee, and it was called The Bible.”
Louis B. Mayer (1884–1957) American film producer
To a writer who complained that his work was being changed.
Halliwell's Who's Who in the Movies (2001 ed)
“To the eye of God there are no numbers: seeing all things at one time, he counts nothing.”
Étienne Bonnot de Condillac (1714–1780) French academic
As quoted in Physically Speaking: A Dictionary of Quotations on Physics and Astronomy (1997), p. 101.
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.
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.