Let kkk and mmm, with k>mk > mk>m, be positive integers such that the number km(k2−m2)km(k^2 - m^2)km(k2−m2) is divisible by k3−m3k^3 - m^3k3−m3. Prove that (k−m)3>3km(k - m)^3 > 3km(k−m)3>3km.