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#1
22 ÁԶعÒ¹ 2013, 17:44
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͹ءÃÁ
1) ¼ÅºÇ¡ $n$ ¾¨¹ìáá¢Í§ $1 + \frac{1^2 + 2^2}{1 + 2} + \frac{1^2 + 2^2 + 3^2}{1 + 2 + 3} +...$
2) $\sum_{k = 1}^{\infty} \frac{(2k-1)}{k(k+1)(k+2)}$ ¨§ËÒ $S_n$ áÅÐ $S_\infty$ 3) ¡Ó˹´ $a_n$ à»ç¹¾¨¹ì·ÑèÇ仢ͧÍѹ´ÑºàâҤ³Ôµ â´Â¼ÅºÇ¡Í¹Ñ¹µì¢Í§ $a_n$ ÁÕ¤èÒà»ç¹ $S_1$ áÅмźǡ͹ѹµì¢Í§ $(a_n)^2$ ÁÕ¤èÒà»ç¹ $S_2$ ¨§ËÒ¤èÒÍѵÃÒÊèǹÃèÇÁ¢Í§Íѹ´ÑºàâҤ³Ôµ $a_n$ ¹Ñé¹ã¹ÃÙ»¢Í§ $S_1$ áÅÐ $S_2$ 
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#2
22 ÁԶعÒ¹ 2013, 18:39
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ÍéÒ§ÍÔ§:
1. $\sum_{i = 1}^{n} i = \frac{n(n+1)}{2}$ $\sum_{i = 1}^{n} i(i+1) = \frac{n(n+1)(n+2)}{3}$ $\sum_{i = 1}^{n} i(i+1)(i+2) = \frac{n(n+1)(n+2)(n+3)}{4}$ ... 2. $\frac{1}{ab} = \frac{1}{b-a}(\frac{1}{a} - \frac{1}{b})$ $\frac{1}{abc} = \frac{1}{c-a}(\frac{1}{ab} - \frac{1}{bc})$ 3. $S_1 = \frac{a_1}{1-r}, S_2 = \frac{a_1^2}{1-r^2}$
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#3
22 ÁԶعÒ¹ 2013, 19:41
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ÍéÒ§ÍÔ§:
¢éÍ 2 ·Óá¡ÊèǹáÅéǤèÐ áµè¾ÍàÈÉ·ÕèäÁèà·èҡѹ (1, 3, 5, ....) àŵԴÍÂÙè¤èÐ ¢éÍ 3 ä´éẺ¹ÕéáÅéǤèÐ áµè·ÓµèÍãËé r ã¹ÃÙ» $S_1$ áÅÐ $S_2$ äÁèä´é¤èÐ
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#4
22 ÁԶعÒ¹ 2013, 21:17
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ÍéÒ§ÍÔ§:
¡è͹¤ÃѺ ¨Ò¡¹Ñé¹áµèÅÐÍѹãªé·Õè Hint äÇé 3. $a_1^2 = (1-r)^2S_1^2 = (1-r^2)S_2$ áÅéÇᡵÑÇ»ÃСͺáÅéǵѴ¡Ñ¹ ¨Ò¡¹Ñ鹤ٳ¡ÃШÒÂáÅéÇÂéÒ¢éÒ§¨Ñ´ÃÙ»¡ç¨Ðä´é $r$ ã¹ÃÙ» $S_1, S_2$ ä´é¤ÃѺ.
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The Lost Emic <<-- ˹ѧÊ×Íà©Å¢éÍÊͺÃдѺ»ÃжÁ¹Ò¹ÒªÒµÔ EMIC ¤ÃÑ駷Õè 1 - ¤ÃÑ駷Õè 8 ªØ´ÊØ´·éÒ ËŧÁÒ
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#5
22 ÁԶعÒ¹ 2013, 22:54
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ÍéÒ§ÍÔ§:
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#6
24 ÁԶعÒ¹ 2013, 10:07
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ÍéÒ§ÍÔ§:
¡è͹Í×è¹ËÒÃÙ»¢Í§¾¨¹ì·ÑèÇ仢ͧ͹ءÃÁ¹Õé ¤×Í $\frac{\sum_{i = 1}^{k}i^2}{\sum_{i = 1}^{k}i}$ $=\frac{\frac{k}{6}(k+1)(2k+1)}{\frac{k}{2}(k+1)}=\frac{2k+1}{3}$ $\therefore $ ¼ÅÃÇÁ¢Í§Í¹Ø¡ÃÁ¹Õé =$\sum_{k = 1}^{n}\frac{2k+1}{3}$ ´Ñ§¹Ñé¹ $=\frac{1}{3}(n(n+1)+n)=\frac{n^2+2n}{3}$ à»ç¹¤ÓµÍº
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#7
29 ÁԶعÒ¹ 2013, 14:08
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à¾ÔèÁ⨷Âì ¤ÃѺ
¨§ËҼźǡ n ¾¨¹ìáá¢Í§ $1+\frac{3}{4}+\frac{3\cdot5}{4\cdot8}+\frac{3\cdot5\cdot7}{4\cdot8\cdot12}+...$
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WHAT MAN BELIEVES MAN CAN ACHIEVE
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#8
29 ÁԶعÒ¹ 2013, 15:14
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ÍéÒ§ÍÔ§:
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You may face some difficulties in your ways But it’s “Good” right ? 
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#9
29 ÁԶعÒ¹ 2013, 17:29
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à¾ÔèÁ⨷Âì¤èÐ
¨§ËÒ $S_n = \frac{1 \cdot 2}{1 \cdot 3 \cdot 5} + \frac{2 \cdot 3}{5 \cdot 7 \cdot 9} +\frac{3 \cdot 4}{9 \cdot 11 \cdot 13} +... $ Åͧ·Ó´Ùä´é $\sum_{n = 1}^{n} \frac{n \cdot (n+1)}{(4n-3) \cdot (4n-1) \cdot (4n+1)} $ áµè仵èÍäÁèä´é¤èÐ 
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#12
30 ÁԶعÒ¹ 2013, 15:15
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ÍéÒ§ÍÔ§:
 à¾ÃÒжéҨѴÃÙ»¨Ðä´éà»ç¹ $$\frac{1}{16}[\frac{1}{4n-1} + \frac{3}{(4n-1)(4n+1)} + \frac{9}{(4n-3)(4n-1)(4n+1)}]$$ «Ö觾¨¹ìáá¤×Í $\frac{1}{4n-1}$ ¶éÒËҼźǡ¨ÐäÁèÊÒÁÒöà¢Õ¹ã¹ÃÙ»ÍÂèÒ§§èÒÂä´é µéͧµÔ´¼ÅºÇ¡µÃ§ æ ËÃ×Íà¢Õ¹ã¹ÃÙ»¿Ñ§¡ìªÑ¹ºÒ§ÍÂèÒ§ áµè¶éÒ¤Ù³·ÕèµÑÇÊèǹ¢Í§â¨·Âì´éÇ $(4n+3)$ ËÃ×Í $(4n-5)$ Ẻ¹Õé¡ç¨ÐËÒà»ç¹ÊٵçèÒ æ ä´é¤ÃѺ.
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#14
01 ¡Ã¡®Ò¤Á 2013, 11:27
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¼ÁËÁÒ¤ÇÒÁÇèÒ ¶éÒà»ÅÕè¹⨷Âìà»ç¹ àªè¹ $$\sum_{i = 1}^n\frac{i(i+1)}{(4i-3)(4i-1)(4i+1)(4i+3)}$$
Ẻ¹Õé¡ç¨ÐËÒ $S_n$ ä´é¤ÃѺ à¾ÃÒÐÁѹ¨Ð¨Ñ´ÃÙ»ãËéÍÂÙèã¹ÃÙ»¼ÅµèÒ§¢Í§àÈÉÊèǹ áÅéǵѴ¡Ñ¹ä´é
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