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à¤Ã×èͧÁ×ͧ͢ËÑÇ¢éÍ | ¤é¹ËÒã¹ËÑÇ¢é͹Õé |
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#1
23 ¾ÄȨԡÒ¹ 2018, 14:10
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ªèÇÂ˹èͤÃѺ ¢éÍÊͺ ¹Ñ¡àÃÕ¹àµÃÕÂÁ·ËÒÃ
¹ÒÂ´Ó·Ó§Ò¹ä» 1/3 ¢Í§§Ò¹·Ñé§ËÁ´ ËÅѧ¨Ò¡¹Ñé¹ãËé¹ÒÂá´§ÁÒ·Óµèͨ¹àÊÃç¨ ¾ºÇèÒãªéàÇÅÒÃÇÁ·Ñé§ÊÔé¹ 13 ªÁ áµè¶éÒãËé·Ñé§Êͧ¤¹ªèÇ¡ѹ·Ó ¾ºÇèÒ§Ò¹¨ÐàÊÃç¨ã¹ 20/3 ªÁ ÍÂÒ¡·ÃÒºÇèÒ¶éÒãËé¹Ò´ӷӧҹ¤¹à´ÕÂǨ¹àÊÃ稨ÐãªéàÇÅÒ¡ÕèªÑèÇâÁ§
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#2
23 ¾ÄȨԡÒ¹ 2018, 16:31
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ÍÕ¡¢é͹֧¹Ð¤ÃѺ ¢Í¤ÇÒÁªèÇÂàËÅ×Í´éǤÃѺ
ªÒ¤¹Ë¹Öè§ÊÙ§ 6 ¿Øµ Â×¹ÍÂÙè·ÕèÃÒºá¹Çà´ÕÂǡѺàÊÒä¿¿éÒ áÅÐËèÒ§¨Ò¡àÊÒä¿¿éÒ 30 ¿Øµ »ÃÒ¡¯ÇèÒ à§Ò¢Í§¢Ò¤¹¹Õé·Í´ÂÒÇ 10 ¿Øµ ¶éÒªÒ¤¹¹Õéà´Ô¹à¢éÒä»ã¡ÅéàÊÒä¿¿éÒÍÕ¡ 10 ¿Øµ áÅéÇà§Ò¢Í§ªÒ¤¹¹Õé¨Ð·Í´ÂÒÇà·èҡѺ¡Õè¿Øµ
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#3
25 ¾ÄȨԡÒ¹ 2018, 16:56
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ÍéÒ§ÍÔ§:
\begin{align} \frac{1}{3x} + \frac{2}{3y} &= 13 \\ \frac{1}{x+y} &= \frac{23}{3} \end{align} á¡éÊÁ¡ÒÃÍÍ¡ÁÒä´é $(x,y) = (\frac{3}{52}, \frac{6}{65})$ ËÃ×Í $(\frac1{13},\frac{1}{12})$ ´Ñ§¹Ñé¹¹Ò´ӨÐÊÒÁÒö·Ó§Ò¹¤¹à´ÕÂǨ¹àÊÃç¨ã¹àÇÅÒ $\frac1{x}$ à·èҡѺ $ \frac{52}{3}$ ËÃ×Í $15$ ªÑèÇâÁ§
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#4
25 ¾ÄȨԡÒ¹ 2018, 17:16
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ÍéÒ§ÍÔ§:
ãªéÊÒÁàËÅÕèÂÁ¤ÅéÒÂÍÕ¡¤ÃÑé§ ¨Ò¡ÊÁ¡Òà $\frac{x}{6} = \frac{x+20}{h}$ ¨Ðä´é¤ÇÒÁÂÒÇà§Ò $x = \frac{20}{3}$
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