Life During Wartime

A recent survey of London school children has shown that youngsters between the ages of five and seven have forgotten so many of the attributes of peacetime living that they will have a hard time adjusting themselves to normal conditions again.

Most of the children, when questioned about such things as street lights or foods like bananas, stared suspiciously at the teacher and indicated plainly that they did not believe in their existence.

— New York Times, June 1943

(Shown a seashell, one boy replied, “That’s no shell. Shells come out of guns.”)

March 16, 2026March 15, 2026 | History · Society

Charged Words

Electrical terms that Benjamin Franklin appears to have been the first to use, at least in print in English:

armature
battery
brush
charged
charging
condense
conductor
discharge
electrical fire
electrical shock
electrician
electrified
electrify
electrized
Leyden bottle
minus (negative or negatively)
negatively
non-conducting
non-conductor
non-electric
plus (positive or positively)
stroke (electric shock)
uncharged

This list is from Carl Van Doren’s 1938 biography. “Though he never lost sight of what was being done in electricity during his whole lifetime, he was perfectly willing to have his contributions to it absorbed in the enlarging science. They were absorbed, and it is now difficult to trace the details of his influence.”

March 16, 2026March 15, 2026 | Language · Science & Math

Interest Group

One might conjecture that there is an interesting fact concerning each of the positive integers. Here is a ‘proof by induction’ that such is the case. Certainly, 1, which is a factor of each positive integer, qualifies, as do 2, the smallest prime; 3, the smallest odd prime; 4, Bieberbach’s number; etc. Suppose the set S of positive integers concerning each of which there is no interesting fact is not vacuous, and let k be the smallest member of S. But this is a most interesting fact concerning k! Hence S has no smallest member and therefore is vacuous. Is the proof valid?

— Edwin F. Beckenbach, “Interesting Integers,” American Mathematical Monthly, April 1945

March 15, 2026March 14, 2026 | Science & Math

Square Deal

From the Fall 1983 issue of Pi Mu Epsilon Journal, a wordless proof by Purdue University freshman Hao-Nhen Qua. Vu:

vu proof

$\displaystyle \sum_{k=1}^{\infty }\frac{1}{2^{k}} = 1$

March 14, 2026March 13, 2026 | Science & Math · Uncategorized

He and She

https://commons.wikimedia.org/wiki/File:Scuola_dei_paesi_bassi_medidionali,_paesaggio_antropomorfo,_uomo,_1550-1600_ca._02.JPG — Image: Wikimedia Commons

The Royal Museums of Fine Arts of Belgium hold two anthropomorphic landscapes painted in the 16th century, one masculine (above) and one feminine (below).

The artist is unknown.

https://commons.wikimedia.org/wiki/File:Scuola_dei_paesi_bassi_medidionali,_paesaggio_antropomorfo,_donna,_1550-1600_ca._02.JPG — Image: Wikimedia Commons

March 13, 2026March 12, 2026 | Art

The Lovers’ Knot

This unusual poetic form made its first appearance in William Browne’s 1625 verse collection Britannia’s Pastorals.

The text traces a single continuous intertwined line, involved with itself and never ending.

March 13, 2026March 12, 2026 | Poems

A Few Specific Words

abactor
n. a person who steals livestock

epyllion
n. a little epic

hecatomped
adj. measuring 100 feet square

nouveau pauvre
n. a person who has recently become poor

pogonology
n. a treatise on beards

tessaraglot
adj. written or printed in four languages

transpontine
adj. beyond a bridge

truandise
n. fraudulent begging

(Thanks, Kevin.)

March 12, 2026March 11, 2026 | Language

Penetration

The coastline of Nova Scotia was once frequented by pirates, and people occasionally dig for buried pirate treasure. On a local radio program a few years ago I heard an interview with someone who had done a study of attempts to find pirate treasure. He claimed that in most of the cases in which treasure was actually found, it was in a place where treasure-hunters had dug before, rather than in a brand new, previously undug, location. Past diggers simply hadn’t dug deep enough. The previous digger had, in fact, often stopped just short of the treasure. If the previous digger had dug a little deeper than he did, he would have found it.

The interviewer asked him what advice he would give to treasure hunters on the basis of this study; and, producing an interesting application of induction, he lamely suggested that diggers should dig a little deeper than they in fact do. Can you see why this advice is impossible to follow?

— Robert M. Martin, There Are Two Errors in the the Title of This Book, 2002

March 12, 2026March 11, 2026 | Science & Math

Paperwork

Meek young men grow up in libraries, believing it their duty to accept the views, which Cicero, which Locke, which Bacon, have given, forgetful that Cicero, Locke, and Bacon were only young men in libraries when they wrote these books.

— Emerson, “The American Scholar,” 1838

(Daniel Dennett: “A scholar is just a library’s way of making another library.”)

March 11, 2026March 10, 2026 | History · Literature · Quotations · Society

Charlie’s Birthday

A puzzle by National Security Agency mathematician Stephen C., from the agency’s July 2015 Puzzle Periodical:

Charlie presents a list of 14 possible dates for his birthday to Albert, Bernard, and Cheryl.

Apr 14, 1999
Feb 19, 2000
Mar 14, 2000
Mar 15, 2000
Apr 16, 2000
Apr 15, 2000
Feb 15, 2001
Mar 15, 2001
Apr 14, 2001
Apr 16, 2001
May 14, 2001
May 16, 2001
May 17, 2001
Feb 17, 2002

He then announces that he is going to tell Albert the month, Bernard the day, and Cheryl the year.

After he tells them, Albert says, “I don’t know Charlie’s birthday, but neither does Bernard.”

Bernard then says, “That is true, but Cheryl also does not know Charlie’s birthday.”

Cheryl says, “Yes, and Albert still has not figured out Charlie’s birthday.”

Bernard then replies, “Well, now I know his birthday.”

At this point, Albert says, “Yes, we all know it now.”

What is Charlie’s birthday?

	Select Click for Answer
When Albert claims that Bernard does not know Charlie’s birthday, he is saying that he knows that the correct day occurs more than once in the list. In other words, he is saying that Charlie’s birthday is not Feb 19, 2000, and the only way he could know that is that he knows that the month is not February. So by making this claim Albert has reduced the list for everyone to: Apr 14, 1999 Mar 14, 2000 Mar 15, 2000 Apr 16, 2000 Apr 15, 2000 Mar 15, 2001 Apr 14, 2001 Apr 16, 2001 May 14, 2001 May 16, 2001 May 17, 2001 When Bernard says that it is true that he does not know Charlie’s birthday, it tells everyone that even with the restricted list the correct day occurs more than once in the list. So everyone can thus eliminate May 17, 2001. Furthermore, the claim that Cheryl also does not know Charlie’s birthday is a claim that Bernard knows that the year occurs more than once on the remaining list. This rules out Apr 14, 1999, and since Bernard could only rule this out by knowing that the day was not 14, everyone can further reduce the list to: Mar 15, 2000 Apr 16, 2000 Apr 15, 2000 Mar 15, 2001 Apr 16, 2001 May 16, 2001 When Cheryl says that Albert still has not figured out Charlie’s birthday, she is telling everyone that given the new list the month occurs more than once and thus rules out May 16, 2001. This tells everyone that Cheryl knows that the year is not 2001 and the list can be reduced to: Mar 15, 2000 Apr 16, 2000 Apr 15, 2000 When Bernard then claims to know the date he is saying that the day occurs only once among the 3 remaining choices, thus telling everyone that Charlie’s birthday is Apr 16, 2000.

Click for Answer

March 11, 2026March 10, 2026 | Puzzles