No. Think of the large cube as a square well with a flat bottom. If the task is possible, then this floor is tiled perfectly with cubes of different sizes. Consider the smallest of these cubes. This can’t adjoin an edge of the floor, because in that position it would be impossible to surround it with cubes larger than itself. So it lies somewhere on the expanse of the floor, surrounded by larger cubes.

But now we’re back where we started. The top of this small cube forms the floor of a square well, and all the reasoning above applies again. And so on forever: At each stage we’ll be forced to supply smaller cubes, and our task will never be finished.

Ten.

The bishops are nicely aligned with White’s king; if Black had no other option, he’d have to play … Bxg2, giving mate. But White can’t simply withdraw his bishop along the long diagonal, as then Black could shift his own bishop mildly to g2, avoiding mate.

What other options does White have? He mustn’t move his knight, as that would allow the Black king to move. 1. e6 allows Black to take the f6 pawn. Moving the f6 pawn allows Black to take the g7 pawn. Promoting the g pawn to a queen or a rook counterproductively protects the g2 bishop. Promoting it to a knight checkmates Black (!). Promoting it to a bishop almost works, but after 1. g8=B exf6 2. exf6 Bxg2+ White now has 3. Bd5, which again prevents checkmate.

The only resource that works is to promote the c7 pawn to a knight. Now Black has only two ways to avoid giving mate, and both are only temporary:

1. … exf6 2. exf6 Bxg2#
2. … e6 2. g8=B Bxg2# (as now the promoted bishop can’t reach d5)

Note that the c7 pawn must promote to a knight — any other piece could block the final check.

At first it might seem that the answer is 75 percent, since A is three times as good a shot as B. “But there are two things happening here: hitting and missing,” writes Dartmouth mathematician Peter Winkler. The probability that A hits and B misses is 3/4 × 3/4 = 9/16, and the probability that B hits and A misses is 1/4 × 1/4 = 1/16. So there’s fully a 9/10 chance that the successful bullet was A’s.

From Winkler’s excellent Mathematical Puzzles, 2021.

“There were twelve pigeons in all, seven upon the upper branches and five upon the lower branches. If one of the lower ones joined the higher, there would be eight above, which would be the double of four; but if one of the seven flew down to the lower ones, there would be six in each position. But Allah is all-knowing.”

Via Aplusclick‘s excellent collection of math and logic problems. (Thanks, Igor.)

This solution is by CMG Lee:

Pleasingly, the six pieces contain 2, 3, 4, 5, 6, and 7 cubical cells.

01/31/2025 UPDATE: Reader Jon Jerome sent me this beautiful hand-crafted version, following Lewis’ design. It makes a great puzzle — the degree of challenge is just right, and the target object is beautifully simple. Thanks, Jon!