Cho $a_1,a_2,...,a_n>0$ thỏa mãn: $a_1+a_2+\cdots+a_n=1.$
Đặt $H_k=\frac{k}{\displaystyle\frac{1}{a_1}+\frac{1}{a_2}+\cdots+\frac{1}{a_k}}$ với $k=1,2,\cdots, n$.
Chứng minh rằng: $H_1+H_2+\cdots+H_n<2.$

đúng đấy, thi mà gặp thì next –  banhquykeomut 05-11-12 09:06 PM
đang nói là khi đi thi, còn lúc học thì phải hỏi chứ :D –  kellyhoang297 05-11-12 08:30 PM
khó quá thì phải gặp thầy cô hỏi chứ,k nên bỏ :)))) –  duachua.no1 05-11-12 08:28 PM
uh. khó nhỉ –  babylionneu 05-11-12 08:26 PM
mình gặp dạng này toàn bỏ thôi :( –  babylionneu 05-11-12 08:25 PM
đề bài khó mà, nên đc gọi với cái tên khác là đề bài hay –  duachua.no1 05-11-12 08:08 PM
Bài này hay đấy –  khangnguyenthanh 04-11-12 09:29 PM
ban xem huong dan su dung de biet cach dang nhap nhe –  boy_nude_thik_nude 04-11-12 12:19 PM
Ta sẽ chứng minh: $H_k\le\frac{4}{k(k+1)^2}(a_1+4a_2+\ldots+k^2a_k),\forall k=\overline{1,n}$                 $(*)$
Thật vậy:
$\left(\frac{1}{a_1}+\frac{1}{a_2}+\ldots+\frac{1}{a_k}\right)(a_1+4a_2+\ldots+k^2a_k)$
$\ge\left(\sqrt{\frac{1}{a_1}}.\sqrt{a_1}+\sqrt{\frac{1}{a_2}}.2\sqrt{a_2}+\ldots+\sqrt{\frac{1}{a_k}}.k\sqrt{a_k}\right)^2$
$=(1+2+\ldots+k)^2=\frac{k^2(k+1)^2}{4}$, suy ra $(*)$.
Từ đó, suy ra: $H_1+H_2+\ldots+H_n\le x_1a_1+x_2a_2+\ldots+x_na_n$
với: $x_i=4i^2\sum_{j=i}^n\frac{1}{j(j+1)^2},\forall i=\overline{1,n}$
Mà: $\frac{1}{j(j+1)^2}<\frac{1}{2}.\frac{2j+1}{j^2(j+1)^2}=\frac{1}{2}\left(\frac{1}{j^2}-\frac{1}{(j+1)^2}\right)$
Suy ra: $x_i<4i^2\sum_{j=i}^n\frac{1}{2}\left(\frac{1}{j^2}-\frac{1}{(j+1)^2}\right)$
                    $=2i^2\left(\frac{1}{i^2}-\frac{1}{(n+1)^2}\right)<2,\forall i=\overline{1,n}$
$\Rightarrow H_1+H_2+\ldots+H_n<2(a_1+a_2+\ldots+a_n)=2$

@_@ hoa cả mắt, hơi khó hiểu ad ơi –  duachua.no1 05-11-12 08:08 PM

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