Line Work

bilinski problem

Robert Bilinski proposed this problem in the April 2006 issue of Crux Mathematicorum. On square ABCD, two equilateral triangles are constructed, ABE internally and BCF externally, as shown. Prove that D, E, and F are collinear.

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This solution is by Titu Zvonaru. Triangle ADE is isosceles (because AD and AE are the same length). And ∠DAE = 90° – 60° = 30°. Similarly, triangle EBF is isosceles (because BE and BF are the same length). And ∠EBF = 60° + 30° = 90°. So $\displaystyle \angle \mathit{DEF} = \angle \mathit{DEA} + \angle \mathit{AEB} + \angle \mathit{BEF} \\\\ = \frac{180^{\circ} - 30^{\circ}}{2} + 60^{\circ} + \frac{180^{\circ} - 90^{\circ}}{2} = 180^{\circ}.$ Hence D, E, and F are collinear. 04/03/2022 UPDATE: Reader Peter Smith sent this alternative proof, which doesn’t require the calculation of angles: AECFB is a symmetrical pentagon (containing two equilateral triangles); therefore EC is parallel to AF. It follows that ∠DCE is equal to ∠BAF. By symmetry about a vertical axis, ∠CDE is equal to ∠DCE. By symmetry about a horizontal axis, ∠CDF is equal to ∠BAF. Therefore ∠CDE is equal to ∠CDF and DEF must be collinear. (Thanks, Peter.)

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March 26, 2022April 3, 2022 | Puzzles

A Century-Old Ghost

What does this mean?

PMVEB DWXZA XKKHQ RNFMJ VATAD YRJON FGRKD TSVWF TCRWC
RLKRW ZCNBC FCONW FNOEZ QLEJB HUVLY OPFIN ZMHWC RZULG
BGXLA GLZCZ GWXAH RITNW ZCQYR KFWVL CYGZE NQRNI JFEPS
RWCZV TIZAQ LVEYI QVZMO RWQHL CBWZL HBPEF PROVE ZFWGZ
RWLJG RANKZ ECVAW TRLBW URVSP KXWFR DOHAR RSRJJ NFJRT
AXIJU RCRCP EVPGR ORAXA EFIQV QNIRV CNMTE LKHDC RXISG
RGNLE RAFXO VBOBU CUXGT UEVBR ZSZSO RZIHE FVWCN OBPED
ZGRAN IFIZD MFZEZ OVCJS DPRJH HVCRG IPCIF WHUKB NHKTV
IVONS TNADX UNQDY PERRB PNSOR ZCLRE MLZKR YZNMN PJMQB
RMJZL IKEFV CDRRN RHENC TKAXZ ESKDR GZCXD SQFGD CXSTE
ZCZNI GFHGN ESUNR LYKDA AVAVX QYVEQ FMWET ZODJY RMLZJ
QOBQ-

No one knows. Cryptologist Louis Kruh discovered it in the New York Public Library’s rare book room in 1993 among some old material from the U.S. Army Signal School. In 1915 first lieutenant Joseph O. Mauborgne had created what he believed was a more secure cipher than the ones currently in use, and had offered this challenge to see if his colleagues could break it. Kruh found no solution in the archive, and he published it in both The Cryptogram and Cryptologia, inviting their readers to try their hands at it. As far as I know, none succeeded.

Mauborgne described it as a “a simple, single-letter substitution cipher adapted to military use.” He invited the director of the Army Signal School to place it on a bulletin board and allow the officers there to work on it for three months and then to post the solution “to show why the standard method of attacking a substitution cipher fails in this case.” “If any attack upon this cipher is successful, I shall be glad to hear of it,” he wrote.

Kruh, who died in 2010, noted that “it was probably solved or otherwise deemed unsuitable for use because there is no knowledge of a new cipher being adopted by the Army around that time.” If a solution was found, I don’t believe anyone alive today knows what it is.

(Louis Kruh, “A 77-Year-Old Challenge Cipher,” Cryptologia 17:2 [April 1993], 172-174.)

March 14, 2022March 13, 2022 | Puzzles · Science & Math

Setting the Date

A romantic puzzle from Albert H. Beiler’s Recreations in the Theory of Numbers:

An ardent swain said to his lady love, some years ago, ‘Once when a week ago last Tuesday was tomorrow, you said, “When a day just two fortnights hence will be yesterday, let us get married as it will be just this day next month.” Now sweetheart, we have waited just a fortnight so as it is now the second of the month let us figure out our wedding day.’

Beiler’s book came out in 1964, so he gives the answer Tuesday, March 17, 1936 — the couple are speaking on March 2, discussing a conversation they had on February 17. Obviously the answer is not unique — “Tuesday, March 17, 1908, is another solution but then the swain would not be very young.” Basically we need a leap year in which March 17 falls on a Tuesday. Beiler finds these occur also in 1964 and 1992 — and one did in 2020 as well.

February 24, 2022February 23, 2022 | Puzzles

Black and White

brown chess problem

By John Brown. White to mate in two moves.

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1. Qe7! and the queen or bishop will mate. From Chess Strategy, 1865.

February 20, 2022 | Puzzles

Handiwork

A team of volunteers have deciphered a message written by Charles Dickens in his own puzzling brand of shorthand, solving a riddle that had persisted for more than 150 years.

Apparently in 1859 the Times had mistakenly rejected an advertisement that Dickens had hoped to run during his delicate transition from the editorship of Household Words to All The Year Round. Dickens had written to the newspaper’s editor, J.T. Delane, asking him to intervene in the matter and had saved a cryptic copy of the message, possibly for legal reasons. With the passage of time the key to the author’s so-called Brachygraphy had been lost.

When scholars recently appealed for help in understanding the message, an international team of amateur solvers pooled their insights to decipher the “Tavistock Letter.” “Having the text of this letter at long last will allow scholars to learn more about Dickens’s shorthand method while gaining further insight into his life and work,” wrote Philip Palmer, curator and head of literary and historical manuscripts at Morgan Library & Museum. “We are thrilled that colleagues at the Dickens Code project have helped make this letter accessible in new ways to researchers.”

That’s not the end of it — a further puzzling page, this one from the notebooks of Dickens’ shorthand pupil Arthur Stone, still awaits solution.

(Thanks, Bill.)

February 11, 2022February 10, 2022 | Literature · Puzzles

Cribbage

From reader Derek Christie:

Each player in a game of cribbage has a hand of four cards. A single further card is turned up and serves as the fifth card in every player’s hand. Part of the game involves scoring your hand. You get points for any combination of cards that adds to 15, like 9 4 2; for two or more of any rank, like 3 3; or for any run of three or more, like Ace 2 3. The Jack, Queen, and King each score 10. Show that if a 5 has been turned up, every player must score some points.

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Try and make a hand that doesn’t score. The turnup is a 5. This means you must choose 4 different additional cards from the group 1 2 3 4 6 7 8 9, and to avoid scoring, the resulting hand mustn’t include any pairs or runs or any combination of cards that adds to 10. Since you can’t have two cards adding to 10, you’ll need to choose one card from each of the pairs 9 1, 8 2, 7 3, and 6 4. Try 6 from 6 4. Now you have 5 6. You can’t have 7 (which would produce a run), so you must take the 3, giving 5 6 3. But this is a dead end: Now you must avoid both the 1 and the 9, since each of these produces a 15. So you can’t get anywhere with the 6 from the 6 4 pair. Try the other card from that pair, the 4. Now you have 4 5. You can’t have 3 (producing a run), so you must take the 7, giving 4 5 7. Now you can’t take 8 (since this would produce 15), so you must take the 2, giving 2 4 5 7. And now both the 1 and the 9 again give 15, another dead end. With both the 6 and the 4 excluded, there’s no way to assemble a hand of four cards that can remain scoreless with a turnup card of 5. So every hand must score something. (Thanks, Derek.)

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February 6, 2022February 5, 2022 | Puzzles

Black and White

huggins chess problem

By A.Z. Huggins. White to mate in two moves.

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1. Ne4! and the queen must mate. (Knotty little puzzle!) From Chess Problems, 1872.

January 31, 2022January 30, 2022 | Puzzles

A Miserable Vacation

twine puzzle

Your eccentric uncle has dropped you into the middle of Twine Island, which is festooned with one continuous loop of twine. The twine never crosses itself, but it snakes everywhere, and the island is too hilly for you to see the whole layout at once. As a character-building exercise, your uncle offers you a million dollars if you can determine whether you’re inside the loop or outside. How can you do this?

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Walk in any direction until you reach the shore, counting the number of times you cross the twine. If the final number is odd then your starting point was inside the loop; if not then you were outside. Related: Is it possible to draw a straight line that intersects every side of a 999-sided polygon? No. A straight line can’t intersect every side of any polygon with an odd number of sides. Each time the line crosses a side, one of the polygon’s vertices falls on one side of the line and another vertex falls on the other side. If we succeeded there would be an equal number of vertices on each side of the line, but an odd-sided polygon has an odd number of vertices. (That last one is by Polish mathematician Paul Vaderlind.)

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January 28, 2022January 27, 2022 | Puzzles

Footgear

City A contains 20,000 people. One percent of these have one foot only and wear one shoe apiece. Half of the remaining people go barefoot, wearing no shoes at all, and the rest wear two shoes apiece.

In City B, 20 percent of the residents have one foot only and wear one shoe apiece. Of the remainder, half go barefoot and half wear two shoes apiece.

If 20,000 shoes are worn in City B, what is its population?

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20,000. Just as in City A, it really doesn’t matter what proportion of the population has one foot only. Because the rest of the population also averages one shoe per person, so does the town as a whole. In both cities, the number of residents equals the number of shoes. (A Puzzler from NPR’s Car Talk.)