Problem 366 (difficulty: 7/10)

\(\displaystyle h_n:=\sum_{i=1}^{n} {1\over i}\). Prove that

\(\displaystyle {1\over h_1^2}+{1\over 2h_2^2}+\ldots+{1\over nh_n^2}<2.\)

Give me another random problem!