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ÀúÀÚ: ¶ìÅõ ¾Èµå·¹½ºÄí, ¶óÁî¹Ý Á©Ä« (ÁöÀºÀÌ), ±è»óÈÆ (¿Å±äÀÌ)
1 ´ë¼ö
1.1 An algebraic identity 3
1.2 Cauchy-Schwartz ºÎµî½Ä ´Ù½Ãº¸±â 16
1.3 Easy ways through absolute values 29
1.4 ¸Å°³º¯¼ö 41
1.5 ÄÓ·¹¸¦ ÀÌ¿ëÇÑ Ç®ÀÌ 49
1.6 º¼·ÏÇÔ¼öÀÇ ºÎµî½Ä 60
1.7 ±Í³³Àû Á¢±Ù 69
1.8 ±Ù°ú °è¼ö¿ÍÀÇ °ü°è 77
2 ±âÇÏ¿Í »ï°¢¹ý
2.1 ±âÇÏ ºÎµî½Ä 89
2.2 Àç¹ÌÀÖ´Â ÀÚÃë 104
2.3 ¿ø¿¡ ³»Á¢ÇÏ´Â »ç°¢Çü 121
2.4 µî°¢ ´Ù°¢Çü 136
2.5 Á¤»ï°¢ÇüÀÇ ¿©·¯ °¡Áö ¹®Á¦ 152
2.6 "carpet" Á¤¸® 168
2.7 ³»Á¢¿øÀ» °¡Áø »çº¯Çü 174
2.8 Dr. Trig learns complex numbers 183
3 Á¤¼ö·Ð°ú Á¶ÇÕ·Ð
3.1 ¼öÀÇ Á¤·Ä 194
3.2 Á¡ÀÇ ÁýÇÕ»ó¿¡ Á¤ÀÇµÈ ÇÔ¼öµé 203
3.3 µÎ °¡Áö·Î ¼ÀÇϱâ 212
3.4 ¼ö¿ 220
3.5 ¹«¼öÈ÷ ¸¹Àº Çظ¦ °®´Â ¹æÁ¤½Ä 229
3.6 Çظ¦ °¡ÁöÁö ¾Ê´Â ¹æÁ¤½Ä 238
3.7 2ÀÇ °ÅµìÁ¦°ö 246
3.8 ¼ö¿ 259
1.1 An algebraic identity 3
1.2 Cauchy-Schwartz ºÎµî½Ä ´Ù½Ãº¸±â 16
1.3 Easy ways through absolute values 29
1.4 ¸Å°³º¯¼ö 41
1.5 ÄÓ·¹¸¦ ÀÌ¿ëÇÑ Ç®ÀÌ 49
1.6 º¼·ÏÇÔ¼öÀÇ ºÎµî½Ä 60
1.7 ±Í³³Àû Á¢±Ù 69
1.8 ±Ù°ú °è¼ö¿ÍÀÇ °ü°è 77
2 ±âÇÏ¿Í »ï°¢¹ý
2.1 ±âÇÏ ºÎµî½Ä 89
2.2 Àç¹ÌÀÖ´Â ÀÚÃë 104
2.3 ¿ø¿¡ ³»Á¢ÇÏ´Â »ç°¢Çü 121
2.4 µî°¢ ´Ù°¢Çü 136
2.5 Á¤»ï°¢ÇüÀÇ ¿©·¯ °¡Áö ¹®Á¦ 152
2.6 "carpet" Á¤¸® 168
2.7 ³»Á¢¿øÀ» °¡Áø »çº¯Çü 174
2.8 Dr. Trig learns complex numbers 183
3 Á¤¼ö·Ð°ú Á¶ÇÕ·Ð
3.1 ¼öÀÇ Á¤·Ä 194
3.2 Á¡ÀÇ ÁýÇÕ»ó¿¡ Á¤ÀÇµÈ ÇÔ¼öµé 203
3.3 µÎ °¡Áö·Î ¼ÀÇϱâ 212
3.4 ¼ö¿ 220
3.5 ¹«¼öÈ÷ ¸¹Àº Çظ¦ °®´Â ¹æÁ¤½Ä 229
3.6 Çظ¦ °¡ÁöÁö ¾Ê´Â ¹æÁ¤½Ä 238
3.7 2ÀÇ °ÅµìÁ¦°ö 246
3.8 ¼ö¿ 259