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 Course Information
- ¼ö¾÷½Ã°£: ¿ù,¸ñ 2:00 ~ 4:00pm (¼öÇаú Àü»ê½Ç)
- ´ã´ç±³¼ö: ±è ±¤ ¿¬ (e-mail: eulerkim@kangwon.ac.kr)
- ¼ö¾÷±³Àç: °ÀdzëÆ® (Âü°íµµ¼: ¾Ë±â ½¬¿î ¼öÄ¡Çؼ®. ÀúÀÚ - Àå°Ç¼ö ¿Ü. ÃâÆÇ»ç - û¹®°¢)
- º¸´Ù ÀÚ¼¼ÇÑ »çÇ×Àº Syllabus ÂüÁ¶.
Course Description
- ÇÑ Çб⠵¿¾È ¹è¿ì´Â ÁÖ¿ä ÁÖÁ¦´Â ´ÙÀ½°ú °°½À´Ï´Ù:
- ´Üº¯¼ö ¹æÁ¤½ÄÀÇ ±Ù ±¸Çϱâ (Solution of Equations in Single Variable)
- ´ÙÇ×½Ä º¸°£¹ý ¹× ±Ù»ç (Polynomial Interpolation and Approximation)
- ¼öÄ¡ ¹ÌºÐ ¹× ÀûºÐ (Numerical Differentiation and Integration)
- »ó¹ÌºÐ ¹æÁ¤½ÄÀÇ ÃʱâÄ¡ ¹®Á¦ (Initial Value Problems for Ordinary Differential Eqiations)
- º» °ú¸ñ¿¡¼´Â ¼öÄ¡Çؼ®ÀÇ ÀÌ·Ð ÇнÀ°ú MATLABÀ» ÀÌ¿ëÇÑ ÄÄÇ»ÅÍ ½Ç½ÀÀ» º´ÇàÇÏ¿© ½Ç½ÃÇÕ´Ï´Ù.
MATLAB ½Ç½À ¹®Á¦´Â °úÁ¦¿Í ½ÃÇè¿¡ ³ª¿Ã ¿¹Á¤À̹ǷΠ²ÙÁØÈ÷ ¿¬½ÀÇÏ¿© ÀÍÈ÷´Â °ÍÀÌ Áß¿äÇÕ´Ï´Ù.
(MATLABÀº Çб³ °ø½Ä ftp »çÀÌÆ®¿¡¼ ´Ù¿î¹Þ¾Æ ¼³Ä¡ÇÒ ¼ö ÀÖ½À´Ï´Ù.)
Announcement
- °úÁ¦ ¹× ½ÃÇè ¶Ç´Â ±âŸ °øÁö »çÇ×ÀÌ ¿©±â¿¡ °Ô½ÃµÉ ¿¹Á¤ÀÓ.
- ¾Æ·¡ÀÇ Lecture 1¿¡¼ pp. 3~5´Â °Ç³Ê¶Ù¾îµµ µÊ.
Lecture Notes
- ¼öÄ¡Çؼ® ÀÔ¹® (Introduction to Numerical Analysis)
Lecture 1 (°£´ÜÇÑ ¿¹Á¦µéÀ» ÅëÇÑ ¼öÄ¡Çؼ®ÀÇ ¼Ò°³)
- ´Üº¯¼ö ¹æÁ¤½ÄÀÇ ±Ù ±¸Çϱâ (Solution of Equations in Single Variable)
Lecture 2 (MATLAB ¹è¿ì±â I) : ±âº»¿¬»ê, ¼öÇÐÇÔ¼ö, »ç¿ëÀÚÁ¤ÀÇÇÔ¼ö, ¹Ýº¹¹®, Á¶°Ç¹®
Lecture 3 (À̺йý) : °¡Àå ¾ÈÀüÇÏÁö¸¸ ´À¸° ¹æ¹ý
Lecture 4 (NewtonÀÇ ¹æ¹ý°ú ÇÒ¼±¹ý) : ÀÏ´Ü ¼ö·ÅÇÏ¸é ºü¸¥ ¹æ¹ý
- ´ÙÇ×½Ä º¸°£¹ý ¹× ±Ù»ç (Polynomial Interpolation and Approximation)
- ¼öÄ¡ ¹ÌºÐ ¹× ÀûºÐ (Numerical Differentiation and Integration)
- »ó¹ÌºÐ ¹æÁ¤½ÄÀÇ ÃʱâÄ¡ ¹®Á¦ (Initial Value Problems for Ordinary Differential Eqiations)
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