Leslie Z. Benet (1937) American pharmaceutical scientist
Pharmacokinetics: Basic Principles and Its Use as a Tool in Drug Metabolism, p. 199 in Drug Metabolism and Drug Toxicity, Mitchell JR, Horning MG, editors, Raven Press, New York, 1984.
De Luce seu de Inchoatione Formarum (c. 1215-1220)
Context: One cause, in so far as it is one, is productive of only one effect. I do not rule out several efficient causes of which one is nearer and another more remote in the same order. Thus when I say simply 'animal', I do not exclude another substance or particular substance. Hence motion, in so far as it is one, is productive of only one effect. But motion is present in every body from an intrinsic principle which is called natural. Therefore an efficient cause simply proportional to the motion is present in all bodies. But nothing is present in common in every body except primitive matter and primitive form and magnitude, which necessarily follows from these two, and whatever is entailed by magnitude as such, as position and shape. But simply through magnitude a body does not receive motion, as is clear enough when Aristotle shows that everything that moves is divisible, not, therefore, simply because of magnitude or something entailed by magnitude is a body productive of motion. Nor is primitive matter productive of motion, because it is itself passive. It is therefore necessary that motion follow simply from the primitive form as from an efficient cause.
Leslie Z. Benet (1937) American pharmaceutical scientist
Pharmacokinetics: Basic Principles and Its Use as a Tool in Drug Metabolism, p. 199 in Drug Metabolism and Drug Toxicity, Mitchell JR, Horning MG, editors, Raven Press, New York, 1984.
Maimónides book The Guide for the Perplexed
Source: Guide for the Perplexed (c. 1190), Part I, p. 296 (1881) Tr. Friedlander
Isaac Barrow (1630–1677) English Christian theologian, and mathematician
p, 125
Geometrical Lectures (1735)
Paul Klee (1879–1940) German Swiss painter
IIII.37, The Arrow. p. 54
1921 - 1930, Pedagogical Sketch Book, (1925)
Rudyard Kipling (1865–1936) English short-story writer, poet, and novelist
The Wonder
Epitaphs of the War (1914-1918) (1918)
“I can calculate the motions of the heavenly bodies, but not the madness of the people.”
Isaac Newton (1643–1727) British physicist and mathematician and founder of modern classical physics
Such a statement is indicated as his response to a question regarding the financial fiasco known as the South Sea Bubble; the earliest mention of this famous anecdote appears to be from manuscripts of the Second Memorandum Book (1756) of Joseph Spence, first published in Anecdotes, Observations, and Characters, of Books and Men (1820) https://archive.org/details/anecdotesobserv00singgoog edited by in Samuel Weller Singer; a Lord Radnor is quoted as saying:<br>When Sir Isaac Newton was asked about the continuance of the rising of South Sea stock? — He answered, "that he could not calculate the madness of the people." <br class="br">Variants: <br class="br">I can calculate the motions of erratic bodies, but not the madness of a multitude. <br class="br">As quoted in "Mammon and the Money Market", in The Church of England Quarterly Review (1850), p. 142 http://books.google.com/books?id=s_cDAAAAQAAJ&pg=PA142&dq=%22but+not+the+madness%22&hl=en&ei=nUtbTfuoCYG6ugPFi4n4DA&sa=X&oi=book_result&ct=book-preview-link&resnum=1&ved=0CCkQuwUwAA#v=onepage&q=%22but%20not%20the%20madness%22&f=false <br class="br">I can calculate the motions of the heavenly bodies, but not the madness of people. <br class="br">I can calculate the motions of heavenly bodies but not the madness of men. <br class="br">I can calculate the movement of the stars, but not the madness of men. <br class="br">Disputed
William Kingdon Clifford (1845–1879) English mathematician and philosopher
"Energy and Force" (Mar 28, 1873)
Samuel Vince (1749–1821) British mathematician, astronomer and physicist
As quoted in: Russell McCormmach (2011) Weighing the World: The Reverend John Michell of Thornhill. p. 193
Lazare Carnot (1753–1823) French political, engineering and mathematical figure
On geomatric motion. A History of the Work Concept: From Physics to Economics, by Agamenon Oliveira, p. 154.
Robert Grosseteste (1175–1253) English bishop and philosopher
see De Luce Tr. Ludwig Baur (1912) pp. 51-52
De Luce seu de Inchoatione Formarum (c. 1215-1220)