One row, one column, and two diagonals pass through the center. In order to honor the requirement, we must arrange the eight outer digits so that none of these four triplets falls in ascending or descending order; that is, in each of these four triplets the center digit must be either the highest or the lowest value.

In order to accomplish this, we must complete each triplet by adding two digits that are either both lower than the central digit or both higher.

But if the center digit is even, that leaves us with an odd number of digits whose value is lower than the center digit and an odd number whose value is higher. So we’ll be forced to complete at least one of the four triplets by combining one higher and one lower value — producing a trio that falls in order of magnitude.

White wins with the seemingly crazy 1. Qd4!: Black can’t prevent both 2. Rb6# and 2. Bf3#.

Between passing the bottle and picking it up, the rower spends a total of 20 + 10 + 5 = 35 minutes rowing upstream. In this period his total motion relative to the bottle (and to the water) is zero — the distance he’s traveled relative to the water’s surface is the same upstream as down. We know he moves half as fast relative to the water when he’s rowing downstream as when he’s rowing upstream; this means he’s spent twice as much time rowing downstream as up, or 70 minutes. He also spent 15 minutes drifting, so altogether he picks up the bottle 35 + 70 + 15 = 120 minutes, or two hours, after passing it. The bottle has covered 1 kilometer in this time, so the current is moving at 1/2 kilometer per hour.

(A simpler way to think about the timing is to imagine that the whole thing takes place on a lake rather than a river. The rower departs from the bottle, rows 35 minutes in one direction, sits motionless for 15 minutes, and rows back to the bottle at half his earlier speed. When he reaches the bottle his round trip has taken him 35 + 15 + 70 = 120 minutes, or two hours.)

The chauffeur has been spared the journey from the meeting point to the station and back. If this brings him home 10 minutes early, then it must normally take him 5 minutes to get from the meeting point to the station. Smith arrived at the station an hour early and arrived home 10 minutes earlier than usual, so it took him 50 minutes longer than usual to get home from the station. That’s due to his walking rather than riding from the station to the meeting point. This shows that it takes Smith 50 minutes more than the car to cover that distance. So he must have walked for 5 + 50 = 55 minutes.

(From Fred Schuh, The Master Book of Mathematical Recreations, 1968.)

1. Qa1! and the queen will mate.

From the Dubuque Chess Journal, 1888.

If the number of deposits of one stone is x, then the number of deposits of two stones is 18 – x. The total number of stones placed is

x × 1 + (18 – x) × 2 = 30.

Solving this gives x = 6, so in this case 6 deposits contained one stone and 12 contained two.

More generally, if a is the total number of stones and n is the number of cries of “here,” then

x × 1 + (n – x) × 2 = a
x + 2n – 2x = a
x = 2n – a

Hence the number of times that two stones are placed is

n – x = n – (2n – a) = a – n

The number of deposits of one stone: 2n – a
The number of deposits of two stones: a – n

(From Sakurai Susumu, Wasan: The Fascination of Traditional Japanese Mathematics, 2009.)

One statement that works is “You will not give me the penny.” If that were false, then I would give you the penny. But I’d said that if your statement were false I’d keep both coins. So your statement can’t be false; it must be true. And if you’ve made a true statement then I owe you a coin. So I have no choice but to give you the quarter.

Smullyan related this puzzle to Gödel’s incompleteness theorem. “I thought of the penny as standing for provability and the quarter as standing for truth. Thus the statement ‘You will not give me the penny’ corresponds to Gödel’s sentence, which in effect says: ‘I am not provable.'”

(From Logical Labyrinths, 2008.)

Yes. The simplest solution is to choose the tournament’s winner, A. Because she won, we know that no other player won more matches than she did. Now suppose I finish all my interviews and find there’s some player B I haven’t spoken with. By the rules of my own plan, that will mean that B lost neither to A nor to any of the players whom A defeated. But because there are no ties, that would mean that B won all those matches. And that would give B a higher total score than the tournament winner, a contradiction. So A must fulfill the condition.

(From Train Your Brain, 2011.)