Chi ti\u1ebft c\u00e1c c\u00f4ng th\u1ee9c To\u00e1n h\u1ecdc l\u1edbp 12 s\u1ebd gi\u00fap c\u00e1c s\u0129 t\u1eed c\u00f3 th\u1ec3 d\u1ec5 d\u00e0ng t\u1ed5ng h\u1ee3p ki\u1ebfn th\u1ee9c v\u00e0 gi\u1ea3i quy\u1ebft c\u00e1c d\u1ea1ng b\u00e0i t\u1eadp \u201ckh\u00f3 x\u01a1i\u201d trong m\u00f4n To\u00e1n h\u1ecdc.<\/em><\/p>\n 1. Tam th\u1ee9c b\u1eadc 2 <\/a><\/p>\n <\/a><\/p>\n <\/a><\/p>\n Ph\u1ea7n II. L\u01af\u1ee2NG GI\u00c1C<\/b><\/span> <\/a><\/p>\n <\/a><\/p>\n <\/a><\/p>\n <\/a><\/p>\n <\/a><\/p>\n 1. \u0110\u1ea1o h\u00e0m <\/a><\/p>\n <\/a><\/p>\n <\/a><\/p>\n
\n2. B\u1ea5t \u0111\u1eb3ng th\u1ee9c Cauchy
\n3. C\u1ea5p s\u1ed1 c\u1ed9ng
\n4. C\u1ea5p s\u1ed1 nh\u00e2n
\n5. Ph\u01b0\u01a1ng tr\u00ecnh, b\u1ea5t ph\u01b0\u01a1ng tr\u00ecnh ch\u1ee9a gi\u00e1 tr\u1ecb tuy\u1ec7t \u0111\u1ed1i
\n6. Ph\u01b0\u01a1ng tr\u00ecnh, b\u1ea5t ph\u01b0\u01a1ng tr\u00ecnh ch\u1ee9a c\u0103n
\n7. Ph\u01b0\u01a1ng tr\u00ecnh, b\u1ea5t ph\u01b0\u01a1ng tr\u00ecnh logarit
\n8. Ph\u01b0\u01a1ng tr\u00ecnh, b\u1ea5t ph\u01b0\u01a1ng tr\u00ecnh m\u0169
\n9. L\u0169y th\u1eeba
\n10. Logarit<\/a><\/p>\n
\nBao g\u1ed3m 3 chuy\u00ean \u0111\u1ec1 l\u1edbn<\/i><\/b>
\n1. C\u00f4ng th\u1ee9c l\u01b0\u1ee3ng gi\u00e1c
\n2. Ph\u01b0\u01a1ng tr\u00ecnh l\u01b0\u1ee3ng gi\u00e1c
\n3. H\u1ec7 th\u1ee9c l\u01b0\u1ee3ng trong tam gi\u00e1c<\/p>\n
\n2. B\u1ea3ng c\u00e1c nguy\u00ean h\u00e0m
\n3. Di\u1ec7n t\u00edch h\u00ecnh ph\u1eb3ng \u2013 Th\u1ec3 t\u00edch v\u1eadt th\u1ec3 tr\u00f2n xoay
\n4. Ph\u01b0\u01a1ng ph\u00e1p t\u1ecda \u0111\u1ed9 trong m\u1eb7t ph\u1eb3ng
\n5. Ph\u01b0\u01a1ng ph\u00e1p t\u1ecda \u0111\u1ed9 trong kh\u00f4ng gian
\n6. Nh\u1ecb th\u1ee9c Newton<\/p>\n