This prudence of not attempting to give reasons before one is sure of facts, I learnt from one of your sex, who, as Selden tells us, being in company with some gentlemen that were viewing, and considering something which they called a Chinese shoe, and disputing earnestly about the manner of wearing it, and how it could possibly be put on; put in her word, and said modestly, Gentlemen, are you sure it is a shoe? — Should not that be settled first?
— Benjamin Franklin, letter to Mary Stevenson, Sept. 13, 1760
In July 1968, ethologist John B. Calhoun built a “mouse utopia,” a metal enclosure 9 feet square with unlimited food, water, and nesting material. He introduced four pairs of mice, and within a year they had multiplied to 620. But after that the society began to fall apart — males became aggressive, females began neglecting their young, and the weaker mice were crowded to the center of the pen, where resources were scarce. After 600 days the females stopped reproducing and the males withdrew from them entirely, and by January 1973 the whole colony was dead. Even when the population had returned to its former levels, the mice’s behavior had remained permanently changed.
There were no predators in the mouse universe; the only adversity was confinement itself. Calhoun felt that his experiment held lessons as to the potential dangers of human overpopulation, and he urged his colleagues to study the effects of high population density on human behavior. “Our success in being human has so far derived from our honoring deviance more than tradition,” he said. “Now we must search diligently for those creative deviants from which, alone, will come the conceptualization of an evolutionary designing process. This can assure us an open-ended future toward whose realization we can participate.”
I think this first appeared in the puzzle newsletter The Ag Mine — 12 chemical elements can be spelled using element symbols:
From Sir Edward Victor Appleton’s speech at the 1947 Nobel Banquet:
Ladies and gentlemen, you should not … overrate scientific methods, as you will learn from the story of a man who started an investigation to find out why people get drunk. I believe this tale might interest you here in Sweden. This man offered some of his friends one evening a drink consisting of a certain amount of whisky and a certain amount of soda water and in due course observed the results. The next evening he gave the same friends another drink, of brandy and soda water in the same proportion as the previous night. And so it went on for two more days, but with rum and soda water, and gin and soda water. The results were always the same.
He then applied scientific methods, used his sense of logic and drew the only possible conclusion — that the cause of the intoxication must have been the common substance: namely the soda water!
That’s from Ronald Clark, Sir Edward Appleton, 1971. Clark adds, “Appleton was pleased but a little surprised at the huge success of the story. Only later did he learn that the Crown Prince drank only soda water — ‘one of those unexpected bonuses which even the undeserving get from Providence from time to time,’ as he put it.”
Launched in November 1981, the Soviet Union’s Venera 14 probe carried a spring-loaded arm to test the soil of Venus.
The craft journeyed for four lonely months to reach its destination, descended safely through the hostile atmosphere, and landed securely on the surface.
The spring-loaded arm plunged downward — into a camera lens cap, which had just fallen there.
Apocryphal but entertaining: During one of Norbert Wiener’s talks on cybernetics, a student raised an esoteric point.
Wiener said, “Why, that’s as improbable as a bunch of monkeys having typed out the Encyclopaedia Britannica.”
The student said brightly, “But that’s happened once, anyway.”
T.H. Huxley defined “four stages of public opinion” of a new scientific theory:
- Just after publication — The novelty is absurd and subversive of religion and morality. The propounder both fool and knave.
- 20 years later — The novelty is absolute truth and will yield a full and satisfactory explanation of things in general. The propounder man of sublime genius and perfect virtue.
- 40 years later — The novelty won’t explain things in general after all and therefore is a wretched failure. The propounder a very ordinary person advertised by a clique.
- A century later — The novelty is a mixture of truth and error. Explains as much as could reasonably be expected. The propounder worthy of all honour in spite of his share of human frailities, as one who has added to the permanent possessions of science.
J.B.S. Haldane had a more concise list:
- This is worthless nonsense.
- This is an interesting, but perverse, point of view.
- This is true, but quite unimportant.
- I always said so.
Niels Bohr liked westerns but found them exasperating. After one feature he told his friends, “I did not like that picture, it was too improbable. That the scoundrel runs off with the beautiful girl is logical, it always happens. That the bridge collapses under their carriage is unlikely but I am willing to accept it. That the heroine remains suspended in midair over a precipice is even more unlikely, but again I accept it. I am even willing to accept that at that very moment Tom Mix is coming by on his horse. But that at that very moment there should be a fellow with a motion picture camera to film the whole business — that is more than I am willing to believe.”
He did approve of movie gunfights, where the villain always draws first and yet the hero always wins. Bohr reasoned that the man who draws first in a gunfight is using conscious volition, where his opponent is relying on reflex, a much faster response. Hence the second man should win.
“We disagreed with this theory,” wrote George Gamow, “and the next day I went to a toy store and bought two guns in Western holders. We shot it out with Bohr, he playing the hero, and he ‘killed’ all his students.”
Since Helen’s face launched a thousand ships, Isaac Asimov proposed that one millihelen was the amount of beauty needed to launch a single ship. And one negative helen is the amount of ugliness that will send a thousand ships in the other direction.
When the taciturn Paul Dirac was a fellow at Cambridge, the dons defined the dirac as the smallest measurable amount of conversation — one word per hour.
Robert Millikan was said to be somewhat conceited; a rival suggested that perhaps the kan was a unit of modesty.
And a bruno is 1158 cubic centimeters, the size of the dent in asphalt resulting from the six-story free fall of an upright piano. It’s named after MIT student Charlie Bruno, who proposed the experiment in 1972. The drop has become an MIT tradition; last year students dropped a piano onto another piano:
“While I am describing to you how Nature works, you won’t understand why Nature works that way. But you see, nobody understands that.” — Richard Feynman
“I am no poet, but if you think for yourselves, as I proceed, the facts will form a poem in your minds.” — Michael Faraday
“Now, this case is not very interesting,” said Bell Labs mathematician Peter Winkler during a lecture at Rutgers. “But the reason why it’s not interesting is really interesting, so let me tell you about it.”
Ernest Rutherford addressed the Royal Institution in 1904:
I came into the room, which was half dark, and presently spotted Lord Kelvin in the audience and realised that I was in for trouble at the last part of the speech dealing with the age of the Earth, where my views conflicted with his. To my relief Kelvin fell fast asleep, but as I came to the important point, I saw the old bird sit up, open an eye, and cock a baleful glance at me. Then a sudden inspiration came and I said Lord Kelvin had limited the age of the Earth, provided no new source was discovered. That prophetic utterance referred to what we are now considering tonight, radium! Behold! the old boy beamed upon me.
When Antonie van Leeuwenhoek declined to teach his new methods in microbiology, Leibniz worried that they might be lost. Leeuwenhoek replied, “The professors and students of the University of Leyden were long ago dazzled by my discoveries. They hired three lens grinders to come to teach the students, but what came of it? Nothing, so far as I can judge, for almost all of the courses they teach there are for the purpose of getting money through knowledge or for gaining the respect of the world by showing people how learned you are, and these things have nothing to do with discovering the things that are buried from our eyes.”
In 1784, French architect Étienne-Louis Boullée proposed building an enormous cenotaph for Isaac Newton, a cypress-fringed globe 500 feet high. A sarcophagus would rest on a raised catafalque at the bottom of the sphere; by day light would enter through holes pierced in the globe, simulating starlight, and at night a lamp hung in the center would represent the sun.
“I want to situate Newton in the sky,” Boullée wrote. “Sublime mind! Vast and profound genius! Divine being! Newton! Accept the homage of my weak talents. … O Newton! … I conceive the idea of surrounding thee with thy discovery, and thus, somehow, surrounding thee with thyself.”
As far as I can tell, this is unrelated to Thomas Steele’s proposal to enshrine Newton’s house under a stone globe, which came 41 years later. Apparently Newton just inspired globes.
In 2011 M.V. Berry et al. published “Can apparent superluminal neutrino speeds be explained as a quantum weak measurement?” in Journal of Physics A: Mathematical and Theoretical.
The abstract read “Probably not.”
In 1978 John C. Doyle published “Guaranteed margins for LQG regulators” in IEEE Transactions on Automatic Control.
The abstract read “There are none.”
Consider a finite list of n statements:
S1: At least one of statements S1-Sn is false.
S2: At least two of statements S1-Sn is false.
Sn-1: At least n-1 of statements S1-Sn is false.
Sn: At least n of statements S1-Sn is false.
Is this a paradox? It depends: The statements form a self-consistent system if n is even, but not if it’s odd.
From Roy T. Cook’s new book Paradoxes — which is dedicated in part to “anyone whom I don’t discuss in this book.”
- Alexander Pope was 4 foot 6.
- SOCIAL INEPTITUDE is an anagram of POTENTIAL SUICIDE.
- 6! × 7! = 10!
- Is the correct answer to this question no?
- “Do something well, and that is quickly enough.” — Baltasar Gracián
Call a game finite if it terminates in finitely many moves. Now consider Hypergame, which has two rules:
- The first player names a finite game.
- The two players play that game.
Is Hypergame a finite game? It seems so: It consists of a single game-naming move, followed by a subgame with a necessarily finite number of moves. But what if the first player names Hypergame itself as the subgame, and the second player names Hypergame as the sub-sub-game, and so on?
In presenting this question to students and colleagues at Union College, mathematician William Zwicker found that many saw the catch and quickly pointed out that it leads to infinite play, thinking that this settles the matter. But the proof that Hypergame is finite seems sound. “I … have to convince them that mathematicians cannot simply abandon a proof once a counter-example has been found, for if the internal flaw in such a proof cannot be identified then the counterexample threatens the entire edifice of mathematical proof.” What is the answer?
(William S. Zwicker, “Playing Games with Games: The Hypergame Paradox,” American Mathematical Monthly 94:6, 507-514)
The 1957 edition of Exotica: Pictorial Cyclopedia of Indoor Plants included a species called Rumandia cocacoliensis of the family Alcoholiaceae.
The description read “Cuba-libre tall, stemless, succulent, with brown-frosty bloom often with lemon flavor; good in summer, keep cool.”
It was indexed without a page number, and disappeared from subsequent editions.
In the early 1600s, Johannes Kepler wrote a fantasy in which he imagined a journey to the moon:
We congregate in force and seize a man of this sort; all together lifting him from beneath, we carry him aloft. The first getting into motion is very hard on him, for he is twisted and turned just as if, shot from a cannon, we were sailing across mountains and seas. Therefore, he must be put to sleep beforehand, with narcotics and opiates, and he must be arranged, limb by limb, so that the shock will be distributed over the individual members, lest the upper part of his body be carried away from the fundament, or his head be torn from his shoulders. Then comes a new difficulty: terrific cold and difficulty in breathing. The former we counter with our innate power, the latter by means of moistened sponges applied to the nostrils.
Somnium is largely a treatise on lunar astronomy, describing the motions of the planets as observed from the moon. But Kepler also considers the appearance of the moon’s inhabitants, who “wander in hordes over the whole globe in the space of one of their days, some on foot, whereby they far outstrip our camels, some by means of wings, some in boats pursue the fleeing waters, or if a pause of a good many days is necessary, then they creep into caves.” Carl Sagan and Isaac Asimov called it the first work of science fiction.
Full text of “The Unsuccessful Self-Treatment of a Case of ‘Writer’s Block’,” by Dennis Upper, from the Journal of Applied Behavior Analysis, Fall 1974:
For Capricorn, Aquarius, Pisces, Aries, Taurus, Gemini, Cancer, Leo, Virgo, Libra, Scorpio, and Sagittarius:
The coming year is likely to present challenges; these trials are when your true character will show. Trusted friends can provide assistance in particularly pressing situations. Make use of the skills you have to compensate for ones you lack. Your reputation in the future depends on your honesty and integrity this year. Monetary investments will prove risky; inform yourself as much as possible. On the positive side, your chances of winning the lottery have never been greater!
(By Tim Harrod.)
On July 1, 1858, the Linnean Society of London heard a joint presentation by Charles Darwin and Alfred Russel Wallace on the theory of evolution by natural selection.
In his annual report the following May, society president Thomas Bell wrote, “The year which has passed has not, indeed, been marked by any of those striking discoveries which at once revolutionize, so to speak, the department of science on which they bear.”
In 1962, botanist Reid Moran published a note in the journal Madroño recounting his collection of a bush rue on a mountaintop in Baja California.
The note’s title was “Cneoridium dumosum (Nuttall) Hooker f. Collected March 26, 1960, at an Elevation of About 1450 Meters on Cerro Quemazón, 15 Miles South of Bahía de Los Angeles, Baja California, México, Apparently for a Southeastward Range Extension of Some 140 Miles.”
The text read, “I got it there then.”
This was followed by a 28-line acknowledgment section in which Moran thanked the person who had reviewed the text, his college professors, and the person who had mailed the manuscript.
- SWARTHMORE is an anagram of EARTHWORMS.
- The sum of the reciprocals of the divisors of any perfect number is 2.
- We recite at a play and play at a recital.
- Is sawhorse the past tense of seahorse?
- “Things ’twas hard to bear ’tis pleasant to recall.” — Seneca
In Book II, Chapter 9, of H.G. Wells’ novel The War of the Worlds, a sentence begins “For a time I stood regarding …” These words contain 3, 1, 4, 1, 5, and 9 letters.
In 1730 Stephen Gray found that an orphan suspended by insulating silk cords could hold an electrostatic charge and attract small objects.
In 1845, C.H.D. Buys Ballot tested the Doppler effect by arranging for an orchestra of trumpeters to play a single sustained note on an open railroad car passing through Utrecht.
In 1746 Jean-Antoine Nollet arranged 200 Carthusian monks in a circle, each linked to his neighbor with an iron wire. Then he connected the circuit to a rudimentary electric battery.
“It is singular,” he noted, “to see the multitude of different gestures, and to hear the instantaneous exclamation of those surprised by the shock.”
How can six people be organized into four committees so that each committee has three members, each person belongs to two committees, and no two committees have more than one person in common?
It’s possible to work this out laboriously, but it yields immediately to a geometric insight:
If each line represents a committee and each intersection is a person, then the problem is solved.