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| ºÎ¿ï´ë¼ö ¹× Á¶ÇÕ³í¸®È¸·Î ¼³°è¿¡ °üÇØ Á¤¸®ÇÑ ÀÚ·áÀÔ´Ï´Ù. EC´ë¼ö¹×Á¶ÇÕ³í¸®È¸·Î¼³°è¼¼¹Ì³ªÀÚ·á / ºÎ¿ï´ë¼ö(boolean algebra)ÀÇ °³³ä Basic Laws OR ¿¬»ê AND ¿¬»ê 2Áß º¸¼ö(Double Inversion)¿Í µå¸ð¸£°(De Morgan)ÀÇ ¹ýÄ¢ ½Ö´ë¼º Á¤¸® (Duality Theorem) Fundamental Products ºÎ¿ïÇÔ¼öÀÇ ´ë¼öÀû °£¼ÒÈ consensusÀÇ Á¤¸® Á¤±ÔÇü Áø¸®Ç¥·ÎºÎÅÍ ºÎ¿ï ´ë¼ö½ÄÀ» À¯µµÇÏ´Â Sum-of-Produc¡¦ |
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| ¡¥iomatic definition of boolean algebra B: set of elementsex> B={0,1} +, ¡¤ : 2 binrary operators satisfies boolean algebra postulates p.36 two-values B.A ¡Õ switching algebra ¡Õ binray logic operator tables : (¡¤ : AND) (+ : OR) (` : NOT) C. Basic theorems and properties of boolean algebra ¨ç Duality : ¿ø·¡ ¼º¸³ÀÌ ÀÎÁ¤µÈ ÁÖ¾îÁø B.AÀÇ ½Ä¿¡¼ dualÀ»¡¦ |
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| °ü°è´ë¼ö/ °ü°èÇؼ®/ SQLÈ°¿ë¿¹¿¡ ´ëÇÑ ±ÛÀÔ´Ï´Ù. µ¥ÀÌÅͺ£À̽º_°ü°è´ë¼ö_°ü°èÇؼ®_SQLÈ°¿ë¿¹ / 0. °ü°è ´ë¼ö / °ü°è Çؼ® ºñ±³ 1. °ü°è ´ë¼ö¶õ (Relational Algebra) 1-1. Ư¡ 1-2. °ü°è¿¬»êÀÚÀÇ Á¾·ù 1-3. ÀÏ¹Ý ÁýÇÕ ¿¬»êÀÚ 1-4. ¼ø¼ö °ü°è ¿¬»êÀÚ 2. °ü°è Çؼ® À̶õ (Relational Calculus) 2-1. Ư¡ 2-2. QBE (Query By Example) 2-3. ÅõÇà °ü°è Çؼ®(tuple relational ca¡¦ |
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| Ä«¸£³ë ¸Ê¿¡ ´ëÇÑ ±ÛÀÔ´Ï´Ù. Ä«¸£³ë¸Ê1 / Á¦1. ºÒ ÇÔ¼ö(Boolean Algebra) 1-1. ±³È¯ ¹ýÄ¢ (commutative laws) 1-2. °áÇÕ ¹ýÄ¢ (associative laws) 1-3. ºÐ¹è ¹ýÄ¢ (distributive law) Á¦2. OR ¿¬»ê Á¦3. AND ¿¬»ê Á¦4. 2Áß º¸¼ö(Double Inversion)¿Í µå¸ð¸£°£(De Morgan)ÀÇ ¹ýÄ¢ 4-1. 2Áß º¸¼öÀÇ ¹ýÄ¢ 4-2. µå¸ð¸£°£ÀÇ ¹ýÄ¢ Á¦5. ½Ö´ë¼º Á¤¸® (Duality Theorem) Á¦6. Áø¸®¡¦ |
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| GIS ¿ë¾îÁ¤¸® ÀÚ·áÀÔ´Ï´Ù. GIS¿ë¾îÁ¤¸®B / Boolean Algebra (ºÎ¿ï ´ë¼ö, ³í¸®´ë¼ö) ºÎ¿ï º¯¼ö°¡ °®´Â °ª°ú ºÎ¿ï º¯¼ö¿¡ ´ëÇÑ ¿¬»êÀÌ Á¤ÀǵǾî ÀÖ´Â ´ë¼ö°è. ºÎ¿ï´ë¼ö´Â ƯÁ¤ÇÑ Á¶°ÇÀÌ ÂüÀÎÁö °ÅÁþÀÎÁö¸¦ ¾Ë¾Æº¸±â À§ÇÏ¿© AND, OR, XOR, NOT°ú °°Àº ¿¬»êÀÚ¸¦ »ç¿ëÇÑ´Ù. Boolean Expression (ºÎ¿ï Ç¥Çö, ³í¸® Ç¥Çö) Âü ¶Ç´Â °ÅÁþ(³í¸®Àû) Á¶°ÇÀ¸·Î ºÐ·ùÇϴ ǥÇöÀÇ À¯Çü, ºÎ¿ï Ç¥Çö¿¡´Â¡¦ |
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| [¼öÇÐ] ºÒ´ë¼öBooleanalgebra / ¡ººÒ´ë¼ö (Boolean algebra)¡» Çö´ë ¼öÇп¡ ¼ÓÇÏ´Â ´ë¼öÇÐÀÇ ÇÑ ºÐ°ú·Î¼, G.ºÒÀÌ ³í¸®°è»êÀ» Çü½ÄÈÇÏ¿© µµÀÔÇÑ ´ë¼ö°è. µÎ °¡ÁöÀÇ 2Ç׿¬»ê ¡û(³í¸®°ö)°ú ¡ú(³í¸®ÇÕ)¿¡ °üÇÏ¿© ´ÙÀ½°ú °°ÀÌ ¨ç ±³È¯¹ýÄ¢ ¨è °áÇÕ¹ýÄ¢ ¨é Èí¼ö¹ýÄ¢À» ¸¸Á·ÇÏ´Â °ÍÀ» ¼Ó(áÖ)À̶ó ÇÏ°í, ¨ç¢¦¨éÀÇ µî½ÄÀº ¼ÓÇ×µî½ÄÀ̶ó ÇÑ´Ù. ¨ç x¡ûy=y¡ûx, x¡úy=y¡úx ¨è x¡û(y¡ûz)=(x¡ûy)¡ûz ¡¦ |
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| [µ¥ÀÌÅͺ£À̽º ¸ðµ¨] °ü°è µ¥ÀÌÅͺ£À̽º ¸ðµ¨°ú °èÃþ ¹× ³×Æ®¿öÅ© µ¥ÀÌÅͺ£À̽º ¸ðÇü / [µ¥ÀÌÅͺ£À̽º ¸ðµ¨] °ü°è µ¥ÀÌÅͺ£À̽º ¸ðµ¨°ú °èÃþ ¹× ³×Æ®¿öÅ© µ¥ÀÌÅͺ£À̽º ¸ðÇü ¸ñÂ÷ µ¥ÀÌÅͺ£À̽º ¸ðµ¨ ¥°. °ü°è µ¥ÀÌÅͺ£À̽º ¸ðµ¨ 1. Á¤±ÔÈ 2. °ü°è µ¥ÀÌÅÍ ¿¬»ê ¥±. °èÃþ µ¥ÀÌÅͺ£À̽º ¸ðÇü ¥². ³×Æ®¿öÅ© µ¥ÀÌÅͺ£À̽º ¸ðÇü µ¥ÀÌÅͺ£À̽º ¸ðµ¨ DBMS¿¡ ÀÇÇØ À¯ÁöµÇ´Â µ¥ÀÌÅͺ£À̽ºÀÇ¡¦ |
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| µ¥ÀÌÅÍ º£À̽ºÀÇ °³³ä(Á¤ÀÇ, Çʿ伺)°ú ±¸¼º¿ä¼Ò ¹× µ¥ÀÌÅͺ£À̽º ¸ðÇü / µ¥ÀÌÅÍ º£À̽ºÀÇ °³³ä(Á¤ÀÇ, Çʿ伺)°ú ±¸¼º¿ä¼Ò ¹× µ¥ÀÌÅͺ£À̽º ¸ðÇü ¸ñÂ÷ µ¥ÀÌÅͺ£À̽º ¥°. µ¥ÀÌÅͺ£À̽ºÀÇ ±âº» °³³ä 1. µ¥ÀÌÅͺ£À̽ºÀÇ Á¤ÀÇ 2. µ¥ÀÌÅͺ£À̽ºÀÇ Çʿ伺 1) µ¥ÀÌÅÍÀÇ ºñȣȯ¼º 2) µ¥ÀÌÅÍ Áߺ¹ 3) µ¥ÀÌÅÍÀÇ ÇÁ·Î±×·¥ Á¾¼Ó ¥±. µ¥ÀÌÅͺ£À̽º ½Ã½ºÅÛÀÇ ±¸¼º ¿ä¼Ò 1. µ¥ÀÌÅͺ£À̽º 1) µ¥ÀÌ¡¦ |
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