The Apple Pear Basket Problem: A Combinatorial Exploration

Abstract

We investigate a combinatorial puzzle in which N apples and N pears are distributed among baskets subject to two constraints: every basket must contain the same number of apples, and every basket must contain a distinct number of pears. We prove that the maximum number of baskets is the largest divisor of N not exceeding (1 + 1+8N)/2. For the original puzzle with N = 60, this yields 10 baskets. The solution reveals a rich interplay between divisibility and combinatorics, leading to a natural classification of integers into perfect values, primes, and highly composite numbers according to their basket-packing efficiency. Computational results for N up to one million confirm the asymptotic growth rate of 2N, and a complete tabulation for N = 1 to 100 is included.