Futility Closet An idler's miscellany of compendious amusements

1. Bd2! forces Black to move the bishop, and then 2. Ba5 will mate.

From Basler Nachrichten, 1887.

If he’s flying halfway around the world, to the antipodes, then he can arrange to stop at any intermediate destination without going out of his way. Another solution is that he plans to fly entirely around the world and return to this airport.

1. Ka5! [ha!] and the king will duck behind the rook.

From the New York Evening Telegram, 1890.

My brewers have sent their clerk,
And I must pay my score;
For if I trust my beer
What shall I do for more?

From West’s Tavern Anecdotes and Sayings, 1881.

The winning move is hard to find: 1. Qb5! leads to mate by 2. Rh8, 2. Qe8, or 2. Nf4.

From The Westminster Papers, 1874.

1. Qg1! and the d4 rook will give mate.

From The Chess Problem, 1887.

The digit sum of each even number differs by 1 from that of the odd number that follows it, so they have opposite parity. Thus the score remains tied until we reach the last number, 123456, whose digits total 21. So the second set is larger than the first by a single member.

(By Polish mathematician Paul Vaderlind.)

White wins with the pretty 1. Bd5! The pawn will queen next move.

From the Chess Player’s Chronicle, 1862.

Rainbows are not worth writing odes to.

The key is to promote the pawn to a bishop:

1. f8=B Kxe8 2. Qc8#.

Only a bishop will do — queening the pawn gives stalemate.

Set up two abutting equilateral triangles ABC and BCD with unit sides, as above, and suppose A is red. In order to avoid a unit segment with similarly colored endpoints, D must also be red. By the same reasoning, every point at this distance from A must also be red. But this describes a monochromatic circle, and we can always find two points on this circle that are 1 unit apart. Thus it’s impossible to avoid having a unit segment with ends of the same color.

From Joseph Konhauser, Macalester College, St. Paul., Minn., in the Pi Mu Epsilon Journal, 1984, 668, via Ross Honsberger, Mathematical Chestnuts From Around the World, 2001.

White wins with the absurd-looking 1. Qe6! Every Black response leads to mate.

From Deutsche Schachzeitung, 1875.

The tradesman was a coal merchant, and his message meant:

If the grate be empty put coal on.
If the grate be full stop putting coal on.

Only 1. Ra1!, withdrawing the rook to a guarded square, leads to mate in every variation.

From Chess Problems, 1880.

White wins with the most unlikely move on the board, 1. Nd4!, threatening to jump to b5 or f5 with mate. Black can stop this only by capturing the knight with a pawn, which permits White to push a pawn of his own, giving mate.

From Sissa, 1872.

The trains one way took 180 minutes, the other way 120. Let us take the l.c.m., 360, and divide the railway into 360 units. Then one set of trains went at the rate of 2 units a minute and at intervals of 30 units; the other at the rate of 3 units a minute and at intervals of 45 units. An easterly train starting has 45 units between it and the first train it will meet: it does 2/5 of this while the other does 3/5, and thus meets it at the end of 18 units, and so all the way round. A westerly train starting has 30 units between it and the first train it will meet: it does 3/5 of this while the other does 2/5, and thus meets it at the end of 18 units, and so all the way round. Hence if the railway be divided, by 19 posts, into 20 parts, each containing 18 units, trains meet at every post, and each traveler passes 19 posts in going round, and so meets 19 trains.

From A Tangled Tale, 1886.

None. The sum of the digits of each of these numbers is 45, so all are divisible by 9.

White wins with 1. Qa8!, threatening to take the bishop with mate. There’s no escape for Black: If the bishop moves to b1 then the rook takes it, giving mate, and if 1. … Kxa1 or 1. … Bxb3 then the queen mates from h8.

From The Torch, 1878.

1. Rb5! and White will mate along the eighth rank.

From Deutsche Schachzeitung, 1874.

The first argument is correct. Alan’s chance of winning is 2/3.

What’s wrong with the second argument? It’s true that there are four possible outcomes, but (a) subsumes two possibilities — Alan’s first roll might come closest to the mark, with his second roll in second place, or the reverse might be true. Similarly, case (d) covers two possible outcomes — in one, Alan’s first marble takes second place and his second comes in last, and in the other these positions are reversed. So in fact there are six possible outcomes, with (a) and (d) each twice as likely as (b) or (c), and 4 of the 6 outcomes favoring Alan.

From J. Bertrand, Calcul des Probabilités, 1889, via Eugene Northrop, Riddles in Mathematics, 1975.