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¹Ú¹®±Ô : ¼±Çü´ë¼öÇÐ 3ÆÇ ¼Ö·ç¼Ç (Linear Algebra and Its applications 3th) ´Ù¿î¹Þ±â ¹Ú¹®±Ô : ¼±Çü´ë¼öÇÐ 3ÆÇ ¼Ö·ç¼Ç (Linear Algebra and Its applications 3th) [¼Ö·ç¼Ç] ¼±Çü´ë¼öÇÐ 3ÆÇ ¼Ö·ç¼ÇÀÔ´Ï´Ù. ¿øÁ¦ : (Linear Algebra and Its applications 3th) ÀúÀÚ : David C. Lay ¿ª : ±è±¤È¯ ÃâÆÇ»ç : °æ¹®»ç(¹Ú¹®±Ô) ±³¾ç¼öÇÐ Àü°ø¼ °³Á¤3ÆÇ. ÀÌ Ã¥Àº ¼±Çü¹æÁ¤½Ä°ú Çà·Ä´ë¼ö, Çà·Ä½Ä, º¤ÅÍ°ø°£, °íÀ¯°ª°ú °íÀ¯º¤ÅÍ, Á÷±³¼º ¹× ÃÖ¼Ò Á¦°ö, ´ëĪÇà·Ä µîÀ¸·Î ±¸¼ºµÇ¾ú´Ù. Á¦1Àå ¼±Çü¹æÁ¤½Ä Á¦2Àå Çà·Ä ´ë¼ö Á¦3Àå Çà·Ä½Ä Á¦4Àå º¤ÅÍ°ø°£ Á¦5Àå °íÀ¯°ª°ú °íÀ¯º¤ÅÍ Á¦6Àå Á÷±³¼º ¹× ÃÖ¼ÒÁ¦°ö Á¦7Àå ´ëĪÇà·Ä°ú ÀÌÂ÷Çü½Ä ÇØ´ä ã¾Æº¸±â1.1 SOLUTIONS Notes: The key exercises are 7 (or 11 or 12), 19?22, and 25. For brevity, the symbols R1, R2,¡¦, stand for row 1 (or equation 1), row 2 (or equation 2), and so on. Additional notes are at the end of the section. 1. x1 + 5 x2 = 7 ?2 x1 ? 7 x2 = ?5 ? 1 ? ?2 ? 5 ?7 7? ?5? ? x1 + 5 x2 = 7 Replace R2 by R2 + (2)R1 and obtain: 3x2 = 9 x1 + 5 x2 = 7 x2 = 3 x1 ?1 ?0 ? ?1 ?0 ? ?1 ?0 ? 5 3 5 1 0 1 7? 9? ? 7? 3? ? ?8? 3? ? Scale R2 by 1/3: Replace R1 by R1 + (?5)R2: The solution is (x1, x2) = (?8, 3), or simply (?8, 3). 2. = ?8 x2 = 3 2 x1 + 4 x2 = ?4 5 x1 + 7 x2 = 11 ?2 ?5 ? 4 7 ?4 ? 11 ? ? x1 + 2 x2 = ?2 Scale R1 by 1/2 and obtain: Replace R2 by R2 + (?5)R1: Scale R2 by ?1/3: Replace R1 by R1 + (?2)R2: The solution is (x1, x2) = (12, ?7), or simply (12, ?7). 5 x1 + 7 x2 = 11 x1 + 2 x2 = ?2 ?1 ?5 ? ?1 ?0 ? ?1 ?0 ? ?1 ?0 ? 2 7 2 ?3 2 1 0 1 ?2 ? 11 ? ? ?2 ? 21? ? ?2 ? ?7 ? ? 12 ? ?7 ? ? ?3x2 = 21 x1 + 2 x2 = ÀÚ·áÃâó : http://www.allreport.co.kr/search/detail.asp?pk=11033763&sid=knp868group1&key=%B9%DA%B9%AE%B1%D4 [¹®¼Á¤º¸] ¹®¼ºÐ·® : 423 Page ÆÄÀÏÁ¾·ù : PDF ÆÄÀÏ ÀÚ·áÁ¦¸ñ : ÆÄÀÏÀ̸§ : linear_algebra_and_its_applications_3rd_ed.pdf Å°¿öµå : ¼±Çü´ë¼öÇÐ,¹Ú¹®±Ô,:,3ÆÇ,¼Ö·ç¼Ç,Linear,Algebra,and,Its,applications |
