(Henry E. Dudeney, “The World’s Best Puzzles,” Strand 36:216 [January 1909], 692-700; Henry E. Dudeney, “The World’s Best Puzzles — Solutions,” Strand 36:217 [February 1909], 113-116.)

Since there were no ties, each time the boy played scissors the girl must have played rock or paper. The girl’s record shows us that he lost two of those six rounds and won four.

Likewise, in the four rounds in which the girl played scissors, the boy played rock three times and paper once. She lost three times and won once.

Altogether the boy won seven rounds and lost three.

(Via Nobuyuki Yoshigahara’s Puzzles 101: A Puzzlemaster’s Challenge, 2004.)

This solution is by Gustavo Krimker of Universidad CAECE, Buenos Aires.

The distance between the first and fifth points is 19. That means that 19 is also the sum of each of three pairs of intermediate distances:

• (the distance from the first point to the second point) + (the distance from the second point to the fifth point) = 19
• (the distance from the first point to the third point) + (the distance from the third point to the fifth point) = 19
• (the distance from the first point to the fourth point) + (the distance from the fourth point to the fifth point) = 19

Looking over the list of distances we’ve been given, the only pairs that add to 19 are (2, 17) and (4, 15). So those pairs correspond to two of the bulleted sums above. What’s the third pair? It must be (7, k) or (8, k). (It can’t be (5, k) or (k, 13) because we know that k falls between 8 and 13 and so those pairs can’t be made to total 19.) And if the third case is (7, k) or (8, k), then k must be 11 or 12.

Now, 17 is the second-greatest distance on the list; that means it’s the distance between one of the end points in the row of five and the penultimate point on the opposite side. Either way, that means that 17 is the sum of two pairs of intermediate distances, using the same reasoning as above. One of those pairs is (4, 13), and the other must be (5, k), (7, k), or (8, k). That means that k must be 12, 10, or 9. The only one of these that matches a candidate above is 12.

(Ian VanderBurgh, “Mathematical Mayhem,” Crux Mathematicorum 34:5 [September 2008], 275-286.)

1. Rb3! and the queen will mate.

From the Southern Trade Gazette, via Charles F. Wadworth’s Unique Chess Problems, 1890.

07/20/2021 UPDATE: This is cooked. 1. Qd6+ works just as well and is simpler. (Thanks, Travis.)

07/20/2021 UPDATE: Blimey, doubly cooked! 1. Rc3 works too. (Thanks, Chris.) And the pawn seems to have no role in any of this, not even in Carney’s intended solution. Not sure how Wadworth can have chosen this without noticing the errors — but I guess I just did the same thing!

18 hours 57 minutes (1:11 to 20:08).

(Thanks, Nick.)

07/16/2021 UPDATE: Properly speaking the interval is one minute less than that, because it extends from the last moment of 1:11 to the first of 20:08. Also, given my wording, the answer might equally be 5 hours 3 minutes, as that’s the interval “between” 20:08 and 1:11. (Thanks, Michael and Joe.)

1. Qa7!

1. … Kg5 2. Qe3#.
1. … Kxg3 2. Ne2#.
1. … Ke5 2. Nd3#.
1. … Ne5 2. Qe3#.

On any other knight move, 2. Qc7 is mate.

Via Arthur Ford Mackenzie, Chess: Its Poetry and Its Prose, 1887.

Roll the board into a cylinder and paint each of its diagonals a different color. These 10 regions contain 41 = 4 × 10 + 1 rooks, so at least one region must contain 5 rooks. And rooks on the same diagonal don’t attack one another.

(Alexander Soifer and Edward Lozansky, “Pigeons in Every Pigeonhole,” Quantum 1:1 [January 1990], 25-28, 32.)

Take the equation

2³ + 3³ = 35

and multiply by 35³, getting

70³ + 105³ = 35⁴.

(“Diogenes,” “Note on a Diophantine Equation,” Eureka 10 [March 1948], 5.)

First, suppose Steve takes 335 cookies. We will argue that Tony can then win by taking 334 cookies. If Tony does take 334, Bruce will be left with a plate of 331 cookies to take from. No matter how Bruce plays from here, he cannot meet objective #1, because he will need at least 335 cookies to do so, and has only 331 to take from. Therefore, Bruce will maximize the number of cookies he eats, and take the remaining 331. Tony finishes with 334, the middle amount, so he meets objective #1, justifying his decision to take 334 cookies. (Note that if Tony had taken more than 334, Bruce would still have taken all the remaining cookies, but Tony would not have met objective #1, so taking 334 is in fact Tony’s best play.)

Therefore, Steve will fail objective #1 if he takes 335 cookies. Furthermore, we can repeat the argument above if Steve takes more than 335 cookies, by always having Tony take 1 fewer cookie than Steve (or all remaining cookies, if this amount is less than the number Steve took).

Now suppose instead that Steve takes 334 cookies. We will show that Tony cannot take any amount of cookies resulting in him (Tony) meeting objective #1. First, note that if Tony takes 333 or more cookies, Bruce will be unable to meet objective #1 (he will need at least 334, but there are at most 333 remaining), and so will take all remaining cookies, resulting in a “loss” for Tony.

Now suppose instead that Tony takes x cookies, where x ≤ 332. Then there will be 666 – x cookies remaining. Suppose Bruce takes 333 cookies. This leaves 333 – x cookies on the plate. Even if Steve takes only 1 cookie each turn from now on, Bruce can ensure that he will have fewer cookies than Steve by also taking 1. Suppose Steve takes s cookies. Then on Tony’s next turn, he has 333 – x – s cookies to take from. Even if Tony takes all remaining cookies, total over his two turns, he will have taken 333 – x – s + x = 333 – s, which is at most 332 (since s ≥ 1), so Tony will definitely finish with fewer cookies than Bruce. Thus, if Tony takes 332 or fewer cookies, Bruce can win by taking 333 cookies, since this guarantees he will finish with less than Steve and more than Tony.

Therefore, if Steve takes 334 cookies, Tony cannot meet objective #1, and so will take as many cookies as possible, leaving none for Bruce. This leaves Steve with the middle amount of cookies, so taking 334 cookies is in fact a winning strategy for Steve. As shown above, Steve cannot do any better than this.

Steve: 334

Tony: 666

Bruce: 0