🔙 Quay lại trang tải sách pdf ebook Bài Tập Hình Học 10 Nâng Cao Ebooks Nhóm Zalo VAN NHU CUONG (Chu bien) PHAM VU KHUE - TRAN HUU NAM ^ VAN NHU CUONG (Chu bien) PHAM VU KHUfi - TRA N HUU NAM BAI TAP HINH HQC (Tdi bdn ldn thd ndm) NHA XUAT BAN GIAO DUG VI^T NAM Ban quyen thudc Nha xua't ban Giao due Viet Nam 01-201 l/CXB/851 - 1235/GD Ma so : NB004T1 ^^^^^^WJTM^ iuu, aait Day Ici cudn sach bai tap dung cho hoc sinh hoc theo chucng trinh Toan nang cao Idfp 10. Cac bai tap trong sach dxSOc sap xep theo cac chtfcfng, mucua Sach giao khoa Hinh hoc 10 Nang cao. Phan ldn cac bai tap trong sach nham cung cd kien thijfc va ren luyen ki nang giai toan cho hoc sinh theo muc tieu cua chifdng trinh va SGK Hinh hoc 10 nang cao ; nhOrig bai tap nay tiicfng tii nhif cac bai tap trong SGK. Vi vay, hoc sinh lam dxiOc cac bai tap do se co (finh hifdng de giai cac bai tatrong SGK. Ngoai ra con c6 mot sd bai tap danh cho hoc sinh kha, gidi. Cudi moi chucflng co cac bai tap trac nghidm. Mdi bai cd bdn phifdng an tra Idi, trong do chi cd mot phifcfng an dung. NhiSm VU cua hoc sinh la tim ra phiicfng an dung do. Cac tac gi^ chan thanh c^m On nhdm bien tap cua ban Toan, Nha xuat ban Giao due tai Ha Noi da giup dd rat nhilu di. hocin thi^n cudn sach nay. Cdc tdc gid hitang I. VECT0 A. CAC KIEIV THlfC CO BAM VA il l BAI §1, §2, §3 : Vectd, tdng va tiieu cua tiai vecto I - CAC KI^N THac CO BAN 1. Cdc dinh nghia : Vecta, hai vecta cting phucmg, hai vecta cUng hudng, vecta - khdng, dd ddi vecta, hai vecta bdng nhau. 2. Dinh nghia tdng cua hai vecta, vecta ddi cua mgt vecta, hieu cua hai vecta. Cdc tinh chdt ve tdng vd hieu cua hai vecta. 3. Cdc quy tdc : Quy tdc ba diem : Vdi ba diem A, B, C tu^ y, ta ludn cd AB + BC = AC. Quy tdc hinh binh hdnh : Ne'u ABCD Id hinh binh hdnh thi AB + AD = AC. Quy tdc vehieu hai vecta: Cho hai diem A, B thi vdi mgi diem O bdt ki ta co AB = OB-dA. II-D^BAI 1. Cho hai vecto khdng ciing phircmg a vk b . C6 hay khdng m6t vecta cung phucmg vdi hai vecta dd ? 2. Cho ba didm phan biet thang hang A, B, C. Trong tnicmg hop nao hai vecto AB vk AC cung hudng ? Trong trudng hop nao hai vecto dd nguoc hudng ? 3. Cho ba vecto a, b, c ciing phuong. Chiing td rang cd ft nh^t hai vecto trong chting cd ciing hudng. 4. Cho tam gidc ABC nOi ti^p trong dudng trdn iO). Goi H la true tam tam gidc ABC va 5' la dilm ddi xiing vdi B qua tam O. Hay so sinh cac vecto AH vkWc,AB' vkliC. —» 5. Chiing minh rang vdi hai vecto khdng ciing phuong a va b ,tac6 \d\ - \b\ <\d + b\< \a\ + \b\. Cho tam giac OAB. Gia sii OA + OB = OM, OA-OB = ON. Khi nao diem M nam tren dudng phan giac cua gdc AOB ? Khi nao dilm A^ nam trSn dudng phan giac ngoai cua gdc AOB ? Cho hinh ngu giac diu ABCDE tam O. Chiing minh rang OA + OB + OC + OD + OE ^0. Hay phat bilu bai toan trong trudng hop n-giac diu. Cho tam giac ABC. Goi A' la dilm ddi xiing vdi B qua A, B' la dilm ddi xiing vdi C qua B, C'lk diim ddi xiing vdi A qua C. Chiing minh rang vdi mdt dilm O ba't ki, ta cd OA + OB + OC ^ OA' + OB' + OC. 9. Mot gia dd duoc gan vao tudng nhu hinh 1. Tam giac ABC vudng can d dinh C. Ngudi ta treo vao dilm A mdt vat nang 5N. Hdi cd nhiing luc nao tac dOng vao biic tudng tai hai dilm BvaCl 10. Cho n dilm trdn mat phang. Ban An ki hi6u chung la A^, A2,..., A„. Ban Binh kf hiSu chiing laBi,B2,...,B„. Chiing minh rang _B 5N Ai^i + A2B2 + ... + \B„=0. Hinh 1 §4. Tich cua mot vecto v6i mdt so I - CAC KIEN THa c CO BAN 1. Dinh nghia tich cua vecta vdi mot sdvd cdc tinh chdt. 2. Tinh chdt cua trung diem ': -Diem I la trung diem cua doan thdng AB khi vd chi khilA + lB = 0. - Neu I la trung diem cua doan thdng AB thi vdi mgi diem O ta cd 20/ = 04 + 05 . 3. Tinh chdt cua trgng tdm tam gidc : - Diem G Id trgng tdm tam gidc ABC khi vd chi khi GA + GB + GC = 0. - Ni'u G Id trgng tdm tam gidc ABC thi vdi mgi diem O ta cd 3dG = OA + 0B + dC. 4. Dieu kien de hai vecta cUng phuang : Dieu kien cdn vd dii de vecta b ciing phuang vdi vecta a i^ 0 la cd mgt sdk sao cho b = ka. Dieu kien de ba diem thdng hdng : Ba diem phdn biet A, B, C thang hdng khi vd chi khi hai vecta AB vd AC ciing phuang. 5. Bieu thi mdt vecta theo hai vecta khdng cUng phuang : —• Cho hai vecta khdng cUng phuang a vk b . Khi dd vdi vecta x bdt ki, ludn cd cap sd duy nhdt mvdn sao cho x = ma + nb. ll-DiBAl 11. Cho ba dilm O, M, N vk s6k. L^y cac dilm M' vk N' sao cho OM' = kOM, ON' = kON. Chiing minh rang M'N' = kMN. 12. Chiing minh rang hai vecto a vk b cing phuong khi va chi khi cd cap sd m, n khdng ddng thdi bang 0 sao cho ma + nb = 0. Hay phat bilu dilu kien cdn va dii dl hai vecto khOng cung phuong. 13. Cho ba vecto OA, OB,OC cd dd' dai bang nhau vk OA + OB + OC = 0Tfnh cac gdc AOB, BOC, COA. 14. Chiing minh rang vdi ba vecto tuy y a, b, c, ludn ludn cd ba sd a, p, y khdng ddng thdi bang 0 sao cho aa + pb + yc =0. 15. Cho ba dilm phdn biet A, B, C. a) Chiing minh rang nlu cd mdt dilm / va mOt sd t nao dd sao cho lA = tlB + il- t)lC thi vdi moi dilm /', ta cd Vk^tTB + il- t)Tc. b) Chiing td rang lA = t7B + il- t)lc la dilu kien cdn vk dii dl ba dilm A, B, C thing hdng. 7 16. Dilm M goi la chia doan thang AB theo tis6 kji=l ndu MA = kMB. a) Xet vi tri ciia dilm M ddi vdi hai dilm A, B trong cac trudng hop : it<0;0 1 ; k = -l. b) Nlu M chia doan thang AB theo ti sd ^ (^ ;^ 1 vd ^ ^^ 0) thi M chia doan thang BA theo ti sd ndo ? c) Nlu M chia doan thdng AB theo tis6 kik jt ivk k ^ 0) thi A chia doan thang MB theo ti sd ndo ? 5 chia doan thang MA theo ti sd ndo ? ' d) Chiing minh rdng : Ne'u dilm M chia doan thang AB theo ti sd ^ ^t 1 thi vdi dilm O bdt ki, ta ludn cd OA-kOB 17. Cho tam giac ABC. Goi M, N, P ldn luot la cdc dilm chia cdc doan thang AB, BC, CA theo ciing ti sd ^ 9^ 1. Chiing minh rang hai tam gidc ABC vk MNP cd Cling trong tdm. 18. Cho ngu gidc ABCDE. Goi M, N, P, Q ldn luot Id trung dilm cdc canh AB, BC, CD, DE. Goi / vd / ldn luot la trung dilm cdc doan MP vk NQ. Chiing minh rdng // // AE vk IJ = -rAE. 19. Cho tam gidc ABC. Cdc dilm M, N, P ldn luot chia crdc doan thang AB, BC, CA theo cdc ti sd ldn luot la m, n, p (diu khdc 1). Chiing minh rdng a) M, N, P thdng hdng khi vd chi khi mnp = 1 iDinh li Me-ne-la-uyt); b) AN, CM, BP ddng quy hodc song song khi vd chi khi mnp = - 1 iDinh li Xe-va). 20. Cho tam gidc ABC vk cdc dilm A^, By, Cj ldn luot nam tren cac dudng thang BC, CA, AB. Goi Aj, B2, C2 ldn lugt Id cac dilm ddi xiing vdi Aj, fij, Ci qua trung dilm cua BC, CA, AB. Chiing minh rdng a) Ne'u ba dilm A1, B^, Cj thdng hdng thi badilm Aj, B2, Cj cung th^; b) Ne'u ba dudng thang AA^, BB^, CC^ ddng quy hodc song song thi ba dudng thang AA2, BB2, CC2 ciing thd. 21. Cho tam gidc ABC, I Id trung dilm cua doan thing AB. Mdt dudng thang d thay ddi ludn di qua /, ldn lugt cat hai dudng thang CA vk CB tai A' va 5'. Chting minh rdng giao dilm M cha AB' vk A'B nam tren mdt dudng thdng cd dinh. 22. Cho dilm O ndm trong hinh binh hanh ABCD. Cac dudng thing di qua O va song song vdi cac canh cua hinh binh hdnh ldn lugt cat AB, BC, CD, DA tai M, N, P, Q. Goi E la giao dilm cua BQ vk DM, F Id giao dilm ciia BP vk DN. Tun dilu kien dl E, F, O thing hang. 23. Cho ngii gidc ABCDE. Goi M, N, P, Q, R ldn lugt Id trung dilm cac canh AB, BC, CD, DE, EA. Chiing minh rdng hai tam giac MPE vk NQR cd ciing trgng tdm. 24. Cho hai hinh binh hanh ABCD vk AB'CD' cd chung dinh A. Chiing minh rang a) BB' + C'C + DD' = 0 ; b) Hai tam gidc BCD vk B'CD' cd ciing trgng tdm. 25. Cho hai dilm phdn biet A,B. a) Hay xdc dinh cdc dilm P, Q, R, bilt: 2PA -I- 3PB = 0 ; -2eA + QB = 0; RA-3RB = d. b) Vdi dilm O bdt ki vd vdi ba dilm P,Q,Rb cdu a), chiing minh ring : 'dP = \oA + \oB ; 0Q = 20A-OB ; OR = -jOA + ^OB. 26. Cho dilm O cd dinh vd dudng thing d di qua hai dilm A, fi cd dinh. Chiing minh ring dilm M thudc dudng thing d khi vd chi khi cd sd a sao cho OM = adA+ il-a)OB. Vdi dilu kien ndo cua a thi M thudc doan thing AB ? 27. Cho dilm O cd dinh vd hai vecto M , v cd dinh. Vdi mdi sd m ta xdc dinh dilm M sao cho OM = mil + (1- m)v. Tim tdp hgp cdc diem M khi /n thay ddi. 28. Cho tam gidc ABC. Ddt CA = a ; Cfi = S. Ldy cdc dilm A' vd 5' sao cho 'CA' = nid ; CB' = nb. Ggi I Ik giao dilm cua A'B vk B'A. Hay bilu thi vecto CI theo hai vecto a vk b. 29. Cho tam gidc ABC vk trung tuydn AM. Mdt dudng thing song song vdi AB cat cdc doan thing AM, AC vk BC ldn lugt tai D, E vk F. Mdt dilm G nam tren canh AB sao cho FGIIAC. Chiing minh rdng hai tam giac ADE vk BFG cd dien tfch bdng nhau. 30. Cho hinh thang ABCD vdi cdc canh ddy la AB va CD (cac canh ben khdng song song). Chiing minh ring ne'u cho trudc mdt dilm M ndm giiia hai dilm A, D thi cd mOt dilm N nam tren canh BC sao cho ANHMC vk DNIIMB. 31. Cho tam gidc A5C. Ld'y cdc dilm A', 5', C sao cho A'B = -2A'C; B'C = -2B'A;C'A^-2C'B. Doan thing AA' cdt cac doan BB' vk CC ldn lugt tai M vk N, hai doan BB' vk CC cat nhau tai P. a) So sdnh cdc doan thing AM, MN, NA'. b) So sdnh dien tfch hai tam giac ABC vk MNP. 32. Cho tam gidc ABC vk ba vecto cd dinh U, v,w. Vdi mdi sd thuc t, ta ldy cac dilm A', B', C sao cho AA' = tU,^' = tv,CC'' = tw. Tim quy tfch trgng tdm G' cua tam giac A'B'C khi t thay ddi. 33. Cho tam gidc ABC. a) Hay xdc dinh cac dilm G, P, Q, R, S sao cho : GA + GB + GC = d ; 2PA+ 7B+ PC = 0 ; QA+ 3QB+ 2QC = 0 ; RA-RB + RC = d ; 5SA-2SB-SC = 0. b) Vdi dilm O bdt ki va vdi cdc dilm G, P, Q,R,Sb cdu a), chiing minh rdng: OG = ]^OA + ]^OB + ^OC ; OP = ^OA + ^OB + ^OC ; OQ = ^OA + jOB + ^dc ; OR = 0A-OB+ 0C ; 'dS = ^OA-0B-]-dc. 2 2 34. Cho tam gidc ABC vk mdt dilm O bdt ki. Chiing minh ring vdi moi dilm M ta luOn ludn tim dugc ba sd a , /?, y sao cho a + p + y =^lvk OM = adA + pOB + yOC. Nlu dilm M triing vdi trgng tdm tam gidc ABC thi cdc s6 a , p, y bdng bao nhieu ? 10 35. Cho tam gidc ABC vk dudng thing d. Tim dilm M trtn dudng thing d sao cho vecto M = MA + MB + 2MC cd dd ddi nhd nhdt. 36. Cho tii gidc ABCD. Vdi sd k tuy y, Id'y cac dilm M vk N sao cho AM = kAB vk DN = kDC. Tim tdp hgp cdc trung dilm / cua doan thing MN khi k thay ddi. 37. Cho tam gidc ABC vdi cdc canh AB = c,BC = a,CA = b. a) Ggi CM Id dudng phdn gidc trong cua gdc C. Hay bilu thi vecto CM theo cdc vecto CA vk CB. b) Ggi / la tdm dudng trdn ndi tilp tam gidc ABC. Chiing minh ring alA + bW + clc = 0. 38. Cho tam gidc ABC cd true tdm H va tdm dudng trdn ngoai tilp O. Chiing minh ring a)OA-i-Ofi + OC = 0 ^ ; b) ^ -I- ^ + ^ = 2113. 39. Cho ba ddy cung song song AA^, BB^, CC^ ciia dudng trdn (O). Chiing minh ring true tdm cua ba tam giac ABC^, BCA^ vk CAB^ ndm tren mOt dudng thing.' 40. Cho n diim Aj, A2,..., A„ va n sd k^, ^2. •••> k„ md ki + ^2 +••• + k„ = k^O.a) Chiing minh ring cd duy nhdt mOt dilm G sao cho k^GAi + k2GA2 + ... + k„GA„ = 0. Dilm G nhu thi ggi Id tdm ti cu cua he diem Aj, gan vdi cdc he sdk^. Trong trudng hgp cac he sd k-^ bdng nhau (vd do dd cd thi xem cdc k-^ diu bdng thi G ggi la trgng tdm cua he diem A,- b) Chiing minh ring nlu G Id tdm ti cu ndi d cdu a) thi vdi mgi dilm O bdt ki, ta cd OG = j (^jOAi + k20A2 + ... -I- k„OA^\. 41. Cho sdu dilm trong dd khdng cd ba dilm nao thing hdng. Ggi A Id mOt tam gidc cd ba dinh ldy trong sdu dilm dd va A' la tam gidc cd ba dinh Id 11 ba dilm cdn lai. Chiing minh ring vdi cdc cdch chgn A khdc nhau, cdc dudng thing ndi trgng tdm hai tam gidc A vd A' ludn di qua mdt dilm cd dinh. 42. Cho ndm dilm trong dd khdng cd ba dilm ndo thing hang. Ggi A Id tam gidc cd ba dinh ldy trong ndm dilm dd, hai dilm cdn lai xdc dinh mdt doan thing 6. Chiing minh rang vdi cdc cdch chgn A khdc nhau, dudng thing di qua trgng tdm tam giac A va trung dilm doan thing 0 ludn di qua mdt dilm cd dinh. §5. True toq dp va tie true toa do I - CAC KIEN THQC GO BAN /. Dinh nghia ve true toq dd, toq do cua vecta vd cua diem tren mdt true. Dd ddi dai sd cua vecta tren true. 2. Dinh nghia he true toq do, toq dd cua vecta vd cua diem ddi vdi he true toq do. Mdi lien he giiia toq dd cua vecta vd toq do cdc diem ddu vd diim cudi cua nd. 3. Bieu thdc toq dd cua cdc phep todn vecta: Phep cdng, phep trii vecta vd phep nhdn vecta vdi sd. 4. Toq do cua trung diem doqn thdng vd toq do cua trgng tdm tam gidc. II-D^BAI 43. Cho cac dilm A, B, C trtn true Ox nhu hinh 2. C OA B Hinh 2 a) Tim toa dd cua cdc dilm A, B, C. b) Tinh AB,BC,CA,~AB + CB,'BA- 'BC, A5.M. 12 44. Tren true (O; /) cho hai dilm M vd iV cd toa dO ldn lugt la -5 vd 3. Tim toa dd dilni P trtn true sao cho ^= = -—. ^ • PN 2 45. Tren true (O ;7) cho ba dilm A, B, C cd toa dO ldn lugt la - 4, - 5, 3. Tun toa dd dilm M tren true sao cho H^A + IdB + JiC = 0. Sau dd tfnh = va = . MB MC 46. Cho a, b, c, d theo thii tu la toa dd cua cdc dilm A, B, C, D tren true Ox. a) Chiing minh ring khi a + b^c + dt\n lu6n tim dugc dilm M sao cho 'MA.'MB=~MC MD. b) Khi AB vk CD cd ciing trung dilm thi dilm M d cdu a) cd xdc dinh khdng ? Ap dung. Xdc dinh toa dd dilm M nlu bilt: a = -i, b = 5, c = 3, d = -l. Cdc bdi tap tic 47 den 52 duac x4t trong mat phdng toq dd Oxy 47. Cho cdc vecto a(l; 2), bi-3; I), c(-4; - 2). a ) Ti m to a d d cu a ca c vect o -.-*-.*- . _1->1_ _ u =2a -3b + c ; V = -a + —b - —c •,w = 3a + 2b+4c vk xem vecto nao trong cdc vecto dd cung phuong vdi vecto /, cung —• phuang vdi vecto j . —* b) Tim cdc sdm, n sao cho a =mb + nc. 48. Cho ba dilm A(2 ; 5), 5(1 ; 1), C(3 ; 3). a) Tim toa dd dilm D sao cho AD = 3A5 - 2AC. b) Tim toa dd dilm E sao cho ABCE Ik hinh binh hanh. Tim toa dd tdm hinh binh hanh dd. 49. Bie't Mixi; yi), Nix2; ^2), Pix^ ; ^3) la cdc trung dilm ba canh cua mdt tam gidc. Tim toa dd cdc dinh cua tam giac. 50. Cho ba dilm A(0 ; -4), 5( -5 ; 6), C(3 ; 2). a) Chiing minh ring ba dilm A,B,C khdng thing hang ; b) Tim toa dd trgng tdm tam gidc ABC. 51. Cho tam gidc ABC cd A(-l ; 1), 5(5 ; -3), dinh C nam tren true Oy vk trgng tdm G ndm tren true Ox. Hm toa dd dinh C. 13 52. Cho hai dilm phdn biet A(x^ ; >'^) vd 5(% ; yg). Ta ndi dilm M chia doan thing AB theo ti sd k ne'u JiA = kJlB ik^l). Chiing minh ring _ ^A - ^L ^M - yM l-k l-k Bai tap on tap ctiuong i 53. Tam giac ABC la tam gidc gi ne'u nd thoa man mdt trong cdc dilu kien sau ddy ? a) |A5 + Acl = |A5 - ACI. b) Vecto AB + AC vudng gdc vdi vecto AB + CA. 54. Tii gidc ABCD Id hinh gi nlu thoa man mdt trong cdc dilu kien sau ddy ? a) Jc-~BC = ~DC. b) D5 = m'DC + DA . 55. Cho G Id trgng tam tam gidc ABC. Tren canh AB Id'y hai dilm M vk N sao cho AM = MN = NB. a) Chiing td ring G ciing la trgng tdm tam giac MNC. b) Dat GA = d, GB = b. Hay bilu thi cac vecto sau day qua a vd ^ : GC,AC,GM,CN. 56. Cho tam gidc ABC. Hay xdc dinh cac dilm M, N, P sao cho : a) MA + MB- 2MC = 0 ; h)NA + m + 2NC = 0 ; c)~PA-~PB + 2PC = 6. 57. Cho tam gidc ABC, vdi mdi sd k ta xdc dinh cac dilm A', B' sao cho AX' = k'BC, ~BB' = kCA. Tim quy tich trgng tdm G' ciia tam gidc A'B'C. 14 58. Trong mat phing toa dd Oxy, cho hai dilm A(4 ; 0), 5(2 ; - 2). Dudng thing AB cdt true Oy tai dilm M. Trong ba dilm A, 5, M, dilm ndo ndm giiia hai dilm cdn lai. Cac bai tap trie nghiem chi/dng I 1. Cho tam gidc diu ABC cd canh a. Dd dai cua tdng hai vecto AB vk AC bdng bao nhieu ? (A)2fl; (B)a; iC) a43 ; (D) ^ • 2. Cho tam giac vudng cdn ABC cd AB = AC = a. Dd ddi cua tdng hai vecto AB vk AC bing bao nhieu ? iA) a42 ; (B) ^ ; 2 (C) 2a; , , (D)fl. Cho tam gidc ABC vudng tai A va A5 = 3, AC = 4. Vecto CB+ JB cd dd ddi bing bao nhieu ? (A) 2 ; (B) 2VI3 ; (C) 4 ; (D) Vl3. Cho tam giac diu ABC cd canh bdng a, H la trung dilm cua canh BC. Vecto CA-Hc cd dd dai bing bao nhieu ? a 3a ,^. 2aV 3 ,T^X a4l iA)-; (B) — ; (C) - ^ ; (D) 2 " 5. Ggi G la trgng tdm tam gidc vudng ABC vdi canh huyin BC =12. Tdng hai vecto GB + GC cd dd dai bang bao nhieu ? (A) 2 ; (B) 2V3 ; (C) 8 ; (D) 4. 6. Cho bdn dilm A, 5, C, D. Ggi / vd / ldn lugt Id trung dilm cua cdc doan thing AB vk CD. Trong cdc dang thiic dudi ddy, ding thiic nao sai ? (A) 277 = AB + CD ; (B) 277 = AC + 5D ; (C) 2lj = AD +'BC ; (D) 277 -l- CA + D5 = 6. 7. Cho sdu dilm A, 5, C, D, E, F. Trong cdc ding thiic dudi ddy, ding thiic ndo sai ? (A) 'M>+ ~BE+^ = JE+ 'BD+ 'CF ; (B) JD + 'BE+CF^JE + 'BF + CE ; (C) AD + ^ +CF = AF + BD + CE ; iD) AD+ 'BE+CF = AF+ M:+ CD. 15 8. Cho tam gidc ABC vk diim I sao cho IA = 2IB. Bilu thi vecto CI theo hai vecto CA vk CB nhu sau : —. pM— OJTR > > • (A) CI = ^ ; (B) C/ = -CA-K2C5 ; (C)C7 = ^±^ ; (D)C7 = ^^ . 9. Cho tam giac ABC vk I Id dilm sao cho 1A + 21B = 0. Bilu thi vecto C? theo hai vecto CA vk CB nhu sau : (K)a=i~i^: (B)a = -C/1 + 2C5; (C)a = ^±2« ; (D)a = ^±|^ . 10. Cho tam gidc ABC vdi trgng tdm G. Ddt CA = a, C5 = S. Bilu thi vecto AG theo hai vecto a vd ^ nhu sau : (A)AG = 23_li ; (B): ^ = ^ ; (C)Ag = ^ ; (D)AG = ^ . 11. Cho G Id trgng tdm tam gidc ABC. Ddt ^ = d, CB = b. Bilu thi vecto CG theo hai vecto a vd 6 nhu sau : •^ 3 —• (C) CG = ^ ; (D) CG = ^^ ^ 3 3 • 12. Trong he toa dd Oxy cho cdc dilm A(l ; -2), 5(0 ; 3); C(-3 ; 4), D(-1 ; 8). Ba dilm nao trong bdn dilm da cho Id ba dilm thing hdng ? (A)A,5,C; (B)5,C,D; (C)A,5,D; (D)A,C,D. 16 13. Trong he toa do Oxy cho ba dilm A(l ; 3), 5(- 3 ; 4) va G(0 ; 3). Tim toa dd dilm C sao cho G Id trgng tdm tam giac ABC. (A) (2; 2) ; (B)(2;-2); (C) (2 ; 0); (D) (0 ; 2). 14. Trong he toa dd Oxy cho hinh binh hanh ABCD, bilt A = (1 ; 3), 5 = (- 2 ; 0), C = (2 ; - 1). Hay tim toa do dilm D. (A) (2; 2); (B) (5 ; 2); (C)(4;-l); (D) (2 ; 5). B. LCfl GIAI - HUCfn^G o M - BAP SO §1, §2, §3 : Vecta, tong va hieu cua hai vecto 1. Cd. Dd la vecto-khdng. 2. AB vk AC ciing hudng khi A khdng nim giita 5 vd C, ngugc hudng khi A nam giiia 5 va C. 3. Nlu a ngugc hudng vdi b vk a ngugc hudng vdi c thi b vk c ciing hudng. Vdy cd ft nhdt mdt cap vecto ciing hudng. 4. (h. 3) Hay chiing td rang AHCB' la hinh binh hdnh. Ttt dd suy ra AH = B'C vk AB' = HC. 5. (h. 4) Tir dilm O bd't ki, ta ve 0A = a, AB = b, VI a va b khdng cung phuong nen ba dilm O, A, B khdng thing hang. Khi do, trong tam giac OAB ta cd : OA -AB 1 thi 5 nam gitta A va M. Nlu ^ = -1 thi M la trung dilm cua doan thing AB. h) Theo gia thilt: A: ?;: 0 va A: v^ 1, ta cd M chia doan thing AB theo ti sd k <=> MA = kMB <^ MB = -rMA k <^ M chia doan thing BA theo ti sd'-^. K c) • M chia doan thing AB theo ti sd k <» MA = kMB <=> MA = kKMA + AB) —- k —• , k hay AM = -—-AB <» A chia doan thdng MB theo ti sd - k-l • ° k-l- • M chia doan thing AB theo ti sd k «• JlA = kJiB <^^- 5A7 = kJ{B —' 1 —' - 1 <^ BM = -1 - —TBA ^ • <» 5 chia doa ^^^^^^..^^^^^v n thdng MA theo ti sd . ^_ ^ d) M chia doan thing AB theo ti sd k <=> MA = kMB <:>OA-OM = kiOB - OM) (trong dd O la dilm bd't ki) <:> OA - kOB = il - k)OM —f OA-kOB <» OM = ; ; . 20 1 - ^ 17. Ggi G Id trgng tdm tam gidc MNP thi ta cd 7^ ,7^7 7^ n GA-kGB GB - kGC GC - kGA - GM + GN + GP = 0 <^ —-— ;— -I- —:—-— + = 0 l-k l-k ^GA + GB + GC = 0 Vdy G ciing Id trgng tdm tam giac ABC. 18. (h. 7) Tacd 2lj = 1Q + TN = IM + MQ + IP + PN = MQ + PN = ^iAE + BD) + ^DB Vdy IJ = -AE. Suy ra IJUAE vk IJ = -^AE. 4 4 . a)(h. 8) nao dd. l-k Ldy mdt dilm 0 tacd OM - ON - Tw - OA 1 1- 'oc -mOB - m nOC - n pOA 1-/ 7 Hinh 8 Di don gian tfnh todn, ta chgn dilm O triing vdi dilm C. Khi dd ta cd : I-m I-n Tii hai ding thiic cudi ciia (1), ta cd : C5 = (1 - n)CN, CA = ^ ^ CP l-p- (1). 21 vd thay vdo ding thiic ddu cua (1), ta dugc : ^ = -£z]_cp-^f-:^cN. pil -m) l-m Tit bai todn 15b) ta suy ra dilu kien cdn va du dl ba dilm M, N, P thing hdng la : _pj-j _ _ mil - n) ^ J ^ J _ ^^(j _ „) ^ p^i -m)<^ mnp = 1. pil -m) l-m b)(h.9) Gia sii AA^ cdt BP tai / vd gia sit / chia doan thing AN theo ti sd x. Nhu vdy ba diem P, I, 5 thing hang vd ldn lugt nim tren ba canh cua tam giac CAN. Ta cd P chia doan thing CA theo ti sd p, I chia doan AA^ theo ti sd x, 5 chia doan A^C theo ti sd n n-l (suy tii gia Hinh 9 thilt A^ chia doan BC theo ti sd n). Vdy theo dinh If Me-ne-la-uyt ta c6 p.x. n-l = 1 < » JC = n - l np Gia sit AN cdt CM tai /', vd /' chia AA^ theo ti sd x'. Nhu vdy ba dilm /', C, M thing hang vd ldn lugt ndm tren ba canh cua tam gidc AA^5. Ta co : /' chia doan AA^ theo ti sd x', C chia doan A^5 theo ti sd 1 1-n , M chia doan BA theo ti sd —. Vdy dp dung dinh If Me-ne-la-uyt, ta cd : m I 1 x' • = 1 <:> x' = mil - n). l-n m Ba dudng thing AN, BP, CM ddng quy khi vd chi khi / triing /' hay x = x', cd nghia Id : n-l np = mil - n) <^ mnp = -1 . 22 +) Xet trudng hgp AA^ va BP song song (h. 10). Ta cd : AN = CN-CA = —^CB - CA ; l-n BP = CP-CB^ P-I CA-CB. CM 1 CA-r^CB. l-m l-m Do AN II BP ntn 1 :(_1)=_1:_^ ^ 1 -P-^ B N Hinh 10 I -n • ^ ' ' ' p -I "' i-fi p <» p = (1 - n)ip -I) <:> np = n-l. (*) Khi dd dilu kien cdn vd du dl AA^, BP vk CM song song vdi nhau la CM CA-mCB cung phuang vdi AA^. Vi CM = l-m •, nen CM cung phuong vdi AA^ khi vd chi khi 1 l-n : (-m) = -1 «> min - 1) = -1 . (**) Tit (*) vd (**) ta suy ra mnp = -1 . 20. Ta ggi k, I, m Id cdc sd sao cho Ai5 = kAiC ; B^C = IB^A; C^A = mCi5. Chii y ring ba dilm Aj, 5i, Cj ldn lugt ddi xiing vdi ba dilm A2, 52, C2 qua trung dilm doan thing BC, CA, AB nen ta cd A2C = ^A25, 52A = /52C ; C25 = mC2A Tit dd bing each dp dung dinh If thudn vd dao cua dinh If Me-ne-la-uyt (hodc xe-va) ta chiing minh dugc cdu a) (hodc cdu b)). 21. (h. 11) Ddt CB = mCB', MB' = nMA. Xlt tam gidc ABB' vdi ba dudng ddng quy Id AC, BM vk B'l (ddng quy tai AO. Vi Hinh 11 23 IA - -IB nen theo dinh If Xe-va, ta cd -mn = -I hay mn = 1. Tur MB' = nMA ta suy ra mMB' = mnMA = MA. Vdy ta cd CB = mCB' va MA = mMB', dilu nay chiing td ring CMII AB. Vdy dilm M ludn nim tren dudng thing cd dinh di qua C va song song vdi AB. 22. (h. 12) Xet tam giac ABQ vk ba dilm thing hang M, E, D. Gia sir M chia AB theo ti sd m, E chia BQ theo ti sd n va D chia QA theo ti sd p, theo dinh If Me-ne-la-uyt ta cd mnp = 1. Xet tam giac QNB va ba dilm O, E, C. Khi do O chia QN theo ti sd m, C chia A^5 theo ti sd n vk E chia BQ theo ti sd p. Vi mnp = I nen ba dilm O, E, C thing hang. D Hinh 12 Cling chiing minh tuong tu, ta cd ba dilm F, O, A thing hang. Vdy dl ba dilm E, O, F thing hang, dilu kien cdn vd du la ndm dilm A, C, E, F, 0 thing hang, hay dilm O phai nim tren dudng cheo AC cua hinh binh hanh da cho. 23. (h. 13) Vdi dilm G bdt ki ta cd : GM + GP + GE = ]r(GA + GB) + ^ ^ + GD) + GE = ^i OR =-IrOA + ^OB. 2 2 26. Ta cd : OM = aOA -1- (1 - a)OB ^OM = a{oA-OB) + dB <^0M -OB = aiOA -0B)<:>^ = a^ <:> M ^ d. Vi 5M = a^ ntn M thudc doan thing AB khi vd chi khi 0 < a < 1. 25 27. Ldy hai dilm A, 5 sao cho OA = U vk OB = v thi theo bdi 26, ta c6 OM = mil + (1- m)v khi va chi khi M nim tren dudng thing AB. 28. Vi / nim tren A'B vk AB' ntn cd cac s6xvky sao cho : C7 = xCA' + (1 - jc)C5 = yCA -I- (1 - y)CB' —• —* hay x.md + (l- x)b = j a -i- (1 - y)nb. Vi hai vecto a, b khdng cung phuong nen tit ding thiic cudi cung ta suy ra: mx = y va (1 - JC) = n(l - y). Ttt do ta co 1 - JC = n(l - mx) = n- mnx l-n hay JC = I- mn Y^yci = !^l(L:l^n + \i- ^- " , mil - n) _ nil - m) 7 b = —: a + —r^ b. I - mn 1- mn 29. (h. 15) 1 - mn I- mn Tadat CA = a ;C5 = 6. Khi dd CM = y Vi E nim tren doan thing AC ntn cd sd k sao cho CE = kCA = ka, v6i 0 < k < I. Khi dd CF = kCB = kb. Diim D nim tren AM vk EF ntn cd hai sd JC vd 3^ sao cho CD = xCA + (1 - jc)CM = 3;CF + (1 - y)CF hay _ l-x-> xd + b = kyd + kil - y)b. -> 1 — JC Vi hai vecto a, b khdng ciing phuong nen x = ky vk = Jt(l - y). Suy ra JC = 2A; - 1, do dd CD = (2it - l)a -I- (1 - k)b. Tacd : ED = CD-CE = i2k-l)a + il-k)b-ka = il-k)ib-d) = il-k)AB. Chii y ring vi CF = kCB ntn AG = kJs hay AB+^ = Jk A5, suy ra il-k)AB^GB. 26 Do dd ED = GB. Nhu vdy, hai tam gidc ADE vk BFG cd cac canh day ED vk GB bing nhau, chiiu cao bing nhau (bing khoang each giiia hai dudng thing song song) nen cd dien tfch bing nhau. 30. Ggi O Id giao dilm cua hai dudng thing AD va5C(h. 16). Dat 'dA = d;'dB = b;'dD = kd, khi dd OC = kb (vi ABIIDC). Gia sic OM ^ ma. Ta xdc dinh dilm A'^ tren BC sao cho AN II CM. Ta chiing minh ring DN II BM. Vi N nim tren BC ntn OiV = «6. Khi dd AN = ON-OA = nb-d. Mdt khdc CM = OM-dC = md-kb. Hinh 16 > > n- l Vi AN II CM ntn hai vecto AA^ vd CM cung phuong, tiic Id —r = — K Til hay n = —• Yky ON = —b .Tit do m = ON -OD = —b - ka.Lai cd m m m ' m BM = 0M -0B = ma -b = -— k kr \ m b - kd = -^DN. k Vdy BM vk DN ciing phuong, hay DNHBM. 31. (h. 17) a) Ddt CA = a ; C5 = S. Theo gia thilt ta cd : ?^- _ ^ + '^CB ^ d + 2b ^^ ~ 3 3 • Vi M Id giao dilm ciia AA' vk BB' ntn cd cdc sd xvky sao cho : CM = jcCA -^ (1 - x)CA' = yCB + il- y)CB', 27 - b -r ,^ .2d hay : xa + (1 - x)- = yb + il- y)—- Vi hai vecto a va S khdng ciing phuong nen tii ding thiic tren ta suy ra 2(1-7) ^ 1- ^ x = -3—va y = ^ - 4 1 Giai ra ta dugc : A: = — vd y = —• Tii dd ta cd CM = jCA + ^CA' ^ ^1^ + |MA* ' = 0 => MA = —^^iA' ^AM = jAA'; CM = -CB + -CB' => - m + ^AIB' = 0 => M5 = -6M5^ 1 1 1 1 ^MB' = l-BB'. Tuong tu, vdi MB' = -BB' ta cung cd A^A' = -AA'. Vi AM = IAA'ne n MA^ = |AA' . 7 7 Tdm lai, ta cd AM = MN = 3NA'. Tuang t\x. BP = PM = 3MB' vk CN = NP = 3PC. b) Ggi 5 la dien tfch tam giac ABC. Tit gia thilt ta suy ra AB' = —AC, CA' = ^CB, BC^^BA. Vdy ta cd : S^g. = Sg^c = ^CAA' = 3'^• 1 1 1 Trong tam giac ABB', ta cd MB' = -BB' ntn S^^^f^ = :^^ABB' = TT^" Tuong tu : S^^.^ = hcT = ^CA'N = 2T'^' Tii dd suy ra ^MNP - ^ABC ~ ^ABB' ~ ^BCC ~ ^CAA' + ^AB'M + ^BC'P + ^CA'N = 5-3.f+3.JjS=is. Vdy S^gQ = 7Sj^j^p. 28 32. Ggi G Id trgng tdm tam gidc ABC thi 3GG' = GA' + GB' + GC = GA + AA' + GB + BB' + GC + CC = AA' + BB' + CC = tU + tv + tw = tiU + V + w). — . 1 Dat a = u + v +w thi vecto a cd dinh va GG' = -ta. Suy ra nlu a = 0 thi cac dilm G' triing vdi dilm G, cdn nlu a J^ 0 thi quy tfch cdc dilm G' la dudng thing di qua G vd song song vdi gid cua vecto a. 33. a) • GA + ^ + GC = 0 « G la trgng tdm tam giac ABC. • 2FA + F5 + PC = 6 « 2FA + 2FD = 6 (D la trung dilm ciia canh BC). Vdy P la trung dilm cua trung tuyen AD. • QA + 3QB + 2QC = 0<^QA + QB + 2(QB + Qc) = d<::> 2QE + 4QD (F la tmng dilm cua AB, D la tmng dilm ciia BC) <^QE + 2{QE + ^ ) = 0 <:>FG = |FD . mM-M + RC = 0<:>BA + ^ = d^CR = 'BA. • 5SA-2SB-SC = 0 I <=> 5SA - 2(SA + AB)-iSA + AC) = O^AS^ -AB - ^AC. b) Hudng ddn : Xudt phat tit cdu a), hay vilt mdi vecto thanh hieu hai vecto cd dilm ddu Id O. 34. Vi hai vecto CA vk CB khdng ciing phuong nen ta cd cdc sd a vk p sao cho CM = aCA + p'CB, hay la OM - OC = a^40A - Oc) + pioB - Oc). Vdy : OM = aOA + pOB + il-a- P)OC. Dat y = l-a - P thi a + p + y = l vkOM ^ aOA + pOB + yOC. Ndu M trung G thi ta cd OG =-(oA-i-05-f oc) . Ykya = p=y= y 29 35. Vdi mgi dilm O ta cd : U = MA + JIB + 2'MC =0A-0M + 0B-0M + 2{0C-dM) = OA + OB + 20C - 40M. Ta chgn dilm O sao cho i^ = OA -I- 0 5 -h 20C = 0. (Chu y ring ndu G Id trgng tdm tam gidc ABC tin v =0A +OB+ 0C + dc = 30G + 0C = AOG -I- GC. Bdi vdy dl i? = 0, ta chgn dilm O sao cho 1 GO = -jGC). Khi dd M = - 40M vd do dd |M| = 40M. Dd dai vecto i? nhd nhdt khi vd chi khi 40M nhd nhdt hay M la hinh chie'u vudng gdc cua 0 tren d. 36. (h. 18) Ggi O, O' ldn lugt la trung dilm cuaAD va5C, tacd: 'oo' = UJB + ^). Vi O vd / Id trung dilm cua AD vk MN ntn: 01 = ^{AM + W) = ^{AB + Dc) = kOO'. Vdy khi k thay ddi, tdp hgp cdc dilm / la dudng thing 00' . 37. (h. 19) a) Theo tinh chdt dudng phdn gidc, ta cd : AM CA b —2 b—- Hinh 18 BM -r— = —, suy ra MA = —MB. CB a a CA + -CB Til dd ta cd CM = a a " •CA + -^CB. Hinh 19 a+b "a+ b b) Vi / la tdm dudng trdn ndi tilp tam giac ABC ntn AI la phdn gidc cua tam giac ACM. Bdi vdy theo cdu a), ta cd thi bilu thi vecto A7 theo hai vecto AM vk AC. 30 AI = AC AM + AM be a + b a + b b + be -AC AC + AM AC + AM AC = b + be a + b AB + - a + b b AB + AC = a + b + c ilB - IA) + a + b + c {IC-IA). a + b + c Suy ra : b + c ^ a + b + c b a + b + c IC = 0^aIA + bIB + cIC = 0. l- \IA + -IB + \ a+b+c) a+b+c 38. (h. 20) a) Ggi 5 ' Id dilm ddi xiing vdi 5 qua O, ta cd B'C ± BC. Vi Hlk true tdm tam gidc ABC ntn AHLBC.WkyAH IIB'C. Chiing minh tuong tu ta cd C////5'A. Vdy AB'CH Id hinh binh hdnh. Suy ra TJl = WC. Goi D la trung dilm cua BC thi OD Id dudng trung binh cua tam giac BB'C ntn B'C = 20D. Vdy A// = 20D. Hinh 20 Tii dd, tacd dA = dH + llA = dH -AH =dH-2dD = 0H-ioB + Oc). Suy ra : OA + OB+ dc = 011. ' b) Ggi G Id trgng tdm tam gidc ABC thi: HA + 'HB + 'HC = 3HG = 3110 + 30G = 3110 + 'dA + ^ + 'dc. Kit hgp vdi kit qua cua cdu a), ta cd : HA + HB + HC = 3lld + 0H = 2lld. 39. (h. 21) Ggi //j , H2, H^ ldn lugt Id true tdm cua cdc tam gidc A5Ci, 5CAi, CA5i. Theo kit qua bdi 38, A> ta cd : O//1 =OA + OB + OCi; OH2 =OB + OC + OA^; OH2 =OC + OA + OB^. Hinh 21 31 Suy ra : HyH2 = OHI - 0H[ = OC-OC^+OA^-OA = C^C + AA^, H^H^ = OH2, - OHi = 0C- OCi + OBi -0B = CiC + BBi. Vi cac ddy cung AA^, BB^, CC^ song song vdi nhau nen ba vecto ^ ^ ^ » * AAi,55i,CCi cd Cling phuong. Do dd hai vecto H^H2 va H^H^ ciing phuong, hay ba dilm H^,H2, H^ thing hang. 40. a) Ta ldy mdt dilm O nao dd thi: /tjGAi + k2GA2 + ... + k^GA„ = 0 ^ k^ {pA^ -0G) + k2 {0A2 - OG) + ... + k„ {o\ - OG ) = 0 ^dG = UkiOAl + k20A^ + ... + k„0\Y Vdy dilm G hoan todn xac dinh va duy nhdt. b) Suy tut cdu a). 41. Ggi A, 5, C la ba dinh cua tam giac A va D, E, F la ba dinh cua tam gidc A'. Ggi G va G' ldn lugt la trgng tdm cua tam giac A vd A' thi vdi dilm / tuy y, ta cd : Z4 + ^ + 7c-f TD +/£ + 7F = 3(/G + TG"') . Bdi vdy nlu chgn / la trgng tdm ciia he dilm A, 5, C, D, E, F, tiic la trong tdm ciia he sau dilm da cho, thi / la dilm cd dinh vd IG + IG' = 0. Vdy cac dudng thing GG' ludn di qua dilm / cd dinh (/ la trung dilm cua doan thing GGO. 42. Ggi A, 5, C la ba dinh cua tam giac A va DE la doan thing 6. Ggi G la trgng tdm tam giac A va M la trung dilm ciia DE thi vdi dilm / tuy y, ta co : 1A + 1B + 1C + 1D + 1E = 31G + 21M. Bdi vdy neu chgn / la trgng tdm cua he dilm A,B,C,D,E, tiic la trgng tdm cua he ndm dilm da cho thi / la dilm cd dinh vd 3IG + 2IM = 0. Vdy cac dudng thing GM ludn ludn di qua dilm / cd dinh (vd / la dilm chia doan 2 thing GM theo ti sd -—). 32 §5. True toa do va he true toa do 43. a) A, B, C cd toa dd ldn lugt Id 2 ; 4 ; -3 . b) '^= 05-O A = 4- 2 = 2, 5C = 0C-0 5 = -7, 'CA = 'dA-'dc = 5; A5 + C5 = A5-5 C = 2-l-7 = 9 ; 5A-5C = -A5-5C =-2-1-7 = 5 (hodc 'BA-~BC = 'CB+ ~BA = 'CA = 5); 'ABM. = -AB^ = -4 . 44. _ = - - « 2FM = -¥N ^ 2(0M -0P) = -(ON - Op) PN 2 <^0P = -(2OM -1- OA^) = -[2.(-5) + 3] = - ~ 7 Vdy dilm P cd toa dd la -- • 45. MA + MB + MC = 0 ^ 3M0 + OA + OB + OC = 0 <:>'oM = ]-{pA + 'dB + 'dc) ^OM = UoA + OB + OC) = ^(-4 - 5 + 3) = -2. Vdy M cd toa dd Id - 2. Khi dd : MA = OA -OM = - 4 -(- 2 = -2, M5 = -3, MC = 5. m. 2 W 3 Suy ra MB y MC 46. a) MA.MB = MC.MD <^i^- 'dM){oB-'dM) = {oc- OM)(OD- OM) o dM.{OD + OC-dA-OB) = OC.OD-OA.OB <^OM.{d + c-a-b) = cd-ab. (*) T^ I J . 7T77 cd - ab Do a + bj^c + d ntn OM = -• d + c- a-b 3A-BTHINnripC(NC) 33 b) Gia sit AB vk CD cd cung trung dilm /. Khi dd OA + OB OC + OD / —\ (=07). 2 2 hay a + b = c + d. Khi dd ab ^ cd (vi ne'u ab = cdvka + b = c + dthldt ddng suy ra bdn dilm A, 5, C, D khdng phdn biet). Vdy tii (*) ta suy ra dilm M Ididng xdc dinh. Ap dung : Vdi a = -2, b = 5, c = 3, d = -I, ta thdy a + b ^ c + d. Theo cdu a), dilm M dugc xac dinh vd ta cd cd-ab 3.(-l) - (-2).5 OM = d + c-a-b -l-f3-i-2- 5 Suy ra dilm M cd toa dd la -7. 47. a) M = 2a-3S + c = (2.1 - 3.(-3) + i-4); 2.2 - 3.1 -F (-2)) = (7 ;-l). ,=-a+-b--c = H)- w = 3a + 2b +4c = (-19 ; 0). * —¥ Hai vecto v vd j cung phuong, hai vecto w va i ciing phuong. .. _ 7 ^ \-3m -4/1 = 1 o) a = mb + nc <::> < <=> \m-2n = 2 48. a) GiasttD = (jc; j).Khidd A5 = (-1 ; - 4), AC = (1; - 2); 3 n = 10 AD =3AB- 2AC <^ -—; [jc-2 = 3.(-l)-2.1 <:> \x = -3 [y-5 = 3.i-A)-2.i-2) [y = -3. VdyD = (-3;-3). b) Gia SIX E= ix; y). Tii ABCE la hinh binh hdnh, suy ra AF = 5C, do d6 f JC - 2 = 2 f JC = 4 \ <:>{ . Vdy F = (4; 7). \y-5 = 2 U = 7 -^ 34 3B-BTHlNHHpC(NC) Tdm / ciia hinh binh hanh cung la trung dilm cua AC ntn : / = 2-1-3 5-1-3 (f^* V ^ 49. (h. 22) Gia six tam gidc ABC nhdn M, A^, P Id trung dilm cua cdc canh AB, BC,CA. Tacd MA l^A U = NP ~ ^M = ^P ~ ^N -yM=yp-yN l^A = Xl + X-^ - X2 UA = >'I + 3'3 - y2- Suy ra A = (JCJ + X^ - X2;yi + y^ - 72). Tuong tu ta tfnh dugc : 5 = (^1 -I- ^2 - ^3 ; 3'i + >'2 - >'3)' C = (JC2 + JC3 - Xl; >'2 + ^3 - yi)- 50. a) A5 = (-5 ; 10) ; AC = (3 ; 6). Do - | ^ ^ nen AB vkJc khdng ciing 3 6 phuong, suy ra A, 5, C khdng thing hang, b) Toa dd trgng tdm G cua tam gidc ABC la : - 4 -1-6 + 2^ f ^ "^1 I 3'3j- 51. Gixc ; 0) e Ox, C(0 ; yc) e Oy ^ • 3 J " -1-1-5-1-0 ""^^ 3 [ - ^ 4 ^G = 3 yc = 2- Vdy G = -;0|, C = (0;2). 52. MA = itM5<» \^A ~ ^M - ^(-^fi ~ ^M^ [yA -y\f = f^iyB - yM^ ^A + ^B « • S X - ^ kx^ l - k yM = l - k ik^i). Khi ik = -Ithi J ^M - 2 yA + ya , M la trung dilm cua AB. yM= 2 35 Bai tap on tap chirong I 53. a) Ggi M la trung dilm ciia BC thi tii gia thilt suy ra 2AM = BC. Vdy tam giac ABC vudng tai A. b) Tii gia thie't, ta cd : - (AB + AC).{AB + CA) = O^{AB + AC).{AB-AC) = O oA5^-AC^=0 . Vdy tam gidc ABC Id tam giac cdn, day BC. 54. a) Ta cd AC-BC = DC ^AC+ CB = DC oAB = ^ . \ky ABCD la hinh binh hanh. b) m = m'DC + m<:>DB-DA = mDC <:>AB = m'DC. Vdy ABCD la hinh thang. 55. a) Ggi / la trung dilm ciia MN thi / ciing la trung dilm cua AB, do dd : GM + GN = GA + GB = 2GI. Suy ra GM + GN + GC = GA +GB + GC = 0. Vdy G ciing la trgng tdm tam giac MA^C. b) GC =- a - S ; AC = GC - GA =-2 5 - S. GM = GA + AM =a + Ub-d) = ^^-^- CN = CA + JN = 2d + b + hb-d) = f^Jli^ . 56. a) Ggi / la trung dilm ciia AB thi IAA + IAB- 2MC = 6 khi vd chi khi 2(M7-MC) = O«:>C7 = O. Khdng cd dilm M ndo nhu thi. b) Vdn ggi / nhu tren thi : lfA + ljB + 2iVC = 6 <^ 2(A/7 + IjC) = 0. Vdy A'^ la trung dilm cua IC. c) FA - F5 -I- 2FC = d<;:>^ + 2PC = 0 <=> FC = ^AB. Vdy nlu ldy D sao cho ABCD la hinh binh hdnh thi F la trung dilm cua CD. 36 57. Ggi G Id trgng tdm tam giac ABC, ta cd 3GG' = 'AA' + 'BB' + 'CC = k'BC + kCA + Q = k(^ + CA\ = kBA. Tii dd suy ra quy tfch cac dilm G' Id dudng thing di qua G va song song vdi dudng thing AB. 58. GiasftM = (0;>'),tacd A5 = (-2 ;-2) , AM = (-4 ; j). Vi ba dilm A, 5, M thing hdng nen AB vk AM cung phuong, suy ray = -4. Vdy M = (0 ; -4), khi dd A5 = (-2 ; - 2), JM = (-4 ;- 4), suy ra AM = 2A5. Vdy dilm 5 nim giiia hai dilm A vd M. Cac bai t$p tr^c nghidm chirong I 1. (C) 2. (A) 5. (D) 6. (A) 9. (C) 10. (D) 13. (A) 14. (B). 3.(B) 7. (B) 11. (A) 4.(D) 8.(B) 12. (C) 37 hiCdng IL TICH VO HlfdrNG CUA HAI VECTCf VA UING DUNG A. €AC l&Sm THifC CO BAN VA BE BAI §1. Gia trj li/cfng giac cua mot goc bat ki atr0°dem80°) CAC KIEN THQC CO BAN - Dinh nghia cdc gid tri luang gidc cua mdt gdc. - Ddu cua cdc gid tri luang gidc cua cdc gdc. - Lien he giita cdc gid tri luang gidc cua hai gdc bu nhau, hai goc phu nhau. cos(180° - a) = -cosa ; sin(180° - a) = sina. cos(90° -a) = sina ; sin(90° - a) = cosa (0° < a < 90°). II - BAI TAP Cho bilu thiic F = 3cosa -I- 4sina cosa -I- sina a) Vdi gdc a ndo thi bilu thiic khdng xdc dinh ? b) Tim gia tri cua F bilt tana = -2. 2. Tfnh gid tri ciia mdi bilu thiic sau : a) cosO° + cos20° -i- cos40° -i- cos60° -i-... -i- cosMO" + cosl60° + cosl80''. . b) tan5°tanl0°tanl5° ... tan80°tan85°. 3. a) Chiing minh rang sin^x -i- cos^x = 1 (0° < x < 180°). b) Tim sinx khi cosx = c) Tim cosx khi sinx = 0,3. 2 d) Tim cosx va sinx khi sinx - cosx = — • 38 2 1 4. a) Chiing minh ring vdi mgi gdc a khac 90°, ta cd 1 + tan a = —»— cos a h) Cho tanx = -5 , hay tim cdc gid tri lugng giac cdn lai ciia gdc x. •y 1 5. a) Chiing minh 1 -i- cot a = — — vdi a^O°vka^ 180°. sin a b) Cho cot6 = 3, hay tim cdc gid tri lugng giac cdn lai ciia gdc b. 6. Cho bilt sinl5° = ^ , • 4 a) Tfnh tanl5°. b) Chiing minh 2sinl5°cosl5° = sin30°. 7. Bilt sinx + cosx = m. a) Tim sinx.cosx. b) Tim sin x -i- cos x. c) Tim sin x -i- cos x. d) Chiing minh ring -42 < m < 42 . 8. Bilt tana -i- cota = k. 2 2 a) Tim tan a + cot a. b) Tim tan a + cot a. c) Tim tan a + cot a. d) Chiing minh : \k\ > 2. §2. Tich vd tiadng cua hai vecto I - CAC KIEN THQC CO BAN 1. Dinh nghTa tich vd hudng cua hai vecta vd cdc tinh chdt. 2. Biiu thitc toq dd cua tich vd hudng : Neu U = ix;y), v = ix';y') thi U.v = xx'+ yy'. 3. Dd ddi cda vecta vd gdc giiia hai vecta: Nlu Uix;y),v = ix';y') thi I I r~o T -. -. jcc -I- vv -» -. IMI = V ^ + y ' COS(M, V ) = - ^ Y (vdi u^O,v ^ 0). ylx^+y\y]x'Ky'^ 39 ii-oeBAi 9. Tam gidc ABC vudng d A va cd hai canh AB = 7, AC = 10. a) Tim cdsin ciia cac gdc (AB, ^] ; (AB, ^] ; (AB, CB) ; b) Ggi H la hinh chiiu cua A tren BC. Tinh HB.HC. 10. Cho tam giac ABC cd A5 = 7, AC = 5, A = 120°. a) Tfnh cdc tfch vd hudng JB.JC vkJB.'sC. b) Tfnh dd ddi trung mylh AM cua tam giac (M la trung dilm cua BC). 11. Tam giac MA^F cd MA^ = 4, MF = 8, M= 60°. Ldy dilm E trtn tia MP vk ddt ME = kMP. Tim k di NE vudng gdc vdi trung tuyd'n MF cua tam gidc MNP. 12. Tam giac ABC cd cac canh AC = b,AB = c, BAC = a vd AD Id phdn gidc ciia gdc BAC (D thudc canh BC). a) Hay bilu thi vecto AD qua hai vecto AB, AC. b) Tfnh dd ddi doan AD. 13. Chiing minh cdng thiic sau (vdi hai vecto a vk b bdt ki) : d.b = ^{\d + bf -\d\^ -Ibf). 14. Tam gidc A5C cd A5 = c, 5C = a, AC = 6. a) Tfnh cac tfch vd hudng JB.^ vk ^.^ . b) Tfnh dd ddi trung tuye'n AM cua tam gidc ABC. 15. Tfnh dd ddi cdc dudng phdn gidc trong va phdn gidc ngodi ciia mdt tam gidc theo dd ddi ba canh cua tam gidc dd. 16. Cho ba vecto d,b,c khac 0. Trong trudng hgp ndo ddng thiic sau ddy diing : ia.b)c =dib.c)'> 17. Cho hai dilm cd dinh A, 5 cd khoang cdch bing a. a) Tim tdp hgp cac dilm M sao cho MA.MB = k. b) Tim tdp hgp cac dilm A^ sao cho AA^. A5 = 2a^. 40 18. Cho dilm A cd dinh ndm ngoai dudng thing A, H la hinh chiiu cua A tren A. Vdi mdi dilm M tren A, ldy dilm N trtn tia AM sao cho AA^. AM = AH^. Tim tdp hgp cdc dilm A^. 19. Cho da gidc diu A1A2... A„ ndi tilp trong dudng trdn (O ; R) vk mdt dilm M thay ddi tren dudng trdn dd. Chiing minh ring : a) cosMO\ + COSMOA2 + ... + cosM0\ = 0 ; b) MAi^ -I- MA2 + ... + MAI cd gia tri khdng ddi. 20. Cho tam giac ABC co AB = c, BC = a, CA = b. Ggi M la dilm sao cho ^ = kBC. Tfnh dd ddi doan thing AM. Xet trudng hgp dac biet khi 21. Cho tam giac ABC cd AB = c,BC = a, CA = b. Dat u = {AB.1IC)CA + ('BC.CA)AB + {CA.AB)BC. Chiing minh ring a) a = - abc ^ ^CA ^AB ^BC^ cosB—r- + cosC h cosA b c a V b) Nlu ABC la tam giac diu thi M = 0 ; c) Nlu M = 0 thi ABC la tam gidc diu. 22. Tii gidc ABCD cd hai dudng cheo AC va BD vudng gdc vdi nhau tai M. Ggi F la trung dilm doan thing AD. Chiing minh ring : MP 1 BC khi va chi khi MA.MC = MB.MD. 23. Cho hinh vudng ABCD, diim M nam tren doan thing AC sao cho AM = —— Ggi N la trung dilm cua doan thing DC. Chiing minh ring 5MA^ Id tam gidc vudng cdn. 24. Cho AA' Id mdt ddy cung cua dudng trdn (O) va M la mdt dilm nam tren ddy cung dd. Chiing minh rdng 2MA.M0 = MAiMA -MA'). 41 25. Cho tam gidc ABC ndi tidp trong dudng trdn (O) va mdt dilm M sao cho cdc gdc AMB, BMC, CM A diu bing 120°. Cdc dudng thing AM, BM, CM cdt dudng trdn (O) ldn lugt tai A', 5 ' vd C. Chiing minh rang : MA + MB + MC = MA'+ MB'+ MC. 26. Cho n dilm Ai,A2,...,AnVa« sd'^i, ^2'—' ^n^^'^ ki+k2+... + k„=k (^9^0). a) Chiing minh ring cd mdt vd chi mdt dilm G sao cho kiGAi +k2GA2+ ... + k„GA„ = 0. b) Tim quy tfch nhiing dilm M sao cho : k^MA^ + k^MAl + ... + k„MA^ = m, trong dd m Id mdt sd khdng ddi. 27. Cho tam giac A5C khdng vudng. a) Ggi AA' Id dudng cao ciia tam gidc ABC. Chiing minh (tan 5)A'5 + (tan C)A'C = 0. b) Ggi H la true tdm tam giac ABC. Chiing minh - (tanA) ^ -I- (tan 5) ^ + (tanC) ^ = 0. 28. Cho mdt dilm O bdt ki ndm trong tam gidc A1A2A3. Ggi 5i, 52, 53 ldn lugt la hinh ehilu ciia O tren A1A2, A2A3, A3A1. Dat «1 «2 «3 -AA ^^1 - A A ^^2 ~^^^'0B2 -AA^^^ Hinh 23 Chiing minh rang aj -I- a2 -I- ag = 0. Chit y. Kit qua tren diing vdi da gidc AiA2...A„ bdt ki idinh li Con Nhim). Tren hinh 23, = W+\ (xem A„+i = Al), aj + 02 -1-... -1- a„ = 0 (cdc vecto a^ dugc ggi la cdc "long nhim"). 42 29. Cho hai dudng thing AB, CD cdt nhau d dilm M. Chiing minh rang bdn dilm A,B,C,D cung thudc mdt dudng trdn khi va chi khi MA.MB = MC.MD. 30. Cho dudng thing AB cdt dudng thing A d M vd mdt dilm C tren A (C khdc M). Chiing minh ring A Id tilp tuyin eua dudng trdn iABC) khi vd chi khi MC^ = MA.M5. 31. Cho hai dudng trdn khdng ddng tdm (O; R) vk (O'; R'). Tim tdp hgp cac dilm M sao cho ^MKO, R) = ^MI(O\ Ry 32. Trong dudng trdn ^(O ; R) cho hai ddy cung AA', BB' vudng gdc vdi nhau d dilm 5 vd ggi M la trung dilm cua AB. Chiing minh ring SM 1 A'B'. 33. Cho dilm F cd dinh nim trong dudng trdn (O ; R) vk hai dilm A, 5 chay tren dudng trdn dd sao cho gdc APB ludn bing 90°. Ggi M Id trung dilm cua ddy AB vk H Ik hinh chie'u ciia F xudng AB. Chiing minh ring M, H ludn cung thudc mdt dudng trdn cd dinh. 34. Cho tam gidc ABC ngoai tilp dudng trdn (/) vd (7) Id dudng trdn bang tilp gdc A ciia tam gidc. Chiing minh rang true ddng phuong ciia hai dudng trdn dd di qua trung dilm cua canh BC. 35. Cho dilm M nim trong gdc xOy vk ggi Mj, M2 ldn lugt la hinh ehilu cua M tren Ox, Oy. a) Ve dudng trdn (©) qua Mj, M2, dudng trdn nay cdt hai canh Ox, Oy ldn lugt d A^i, A/^2- Ke dudng thing vudng gdc vdi Ox d N^ vk dudng thing vudng gdc vdi Oy d A'^2' gii sit hai dudng thing dd cdt nhau d A^. Chiing minh OA^ 1M1M2. b) Chiing minh ring khi i^) thay ddi nhung vdn di qua Mj va M2 thi dilm A^ ludn thudc mdt tia Oz cd dinh va zOy = MON^. (*) Oifdng trOn bdng tidp goc A cOa tam giac ABC Id dirdng tr6n ti^p xuc v6i canli BC va vdi phin l<6o ddi ciia cac canfi AB, AC. Tam ciia dudng tron nay chinli la dilm d6ng quy ciia dtrdng phdn giac trong ciia gdc A va cac dudng phdn giac ngodi ciia gdc B vd C. 43 36. Cho dudng trdn dudng kfnh AB vk dudng thing A vudng gdc vdi AB bH. iH khdng trung vdi A vd 5). Mdt dudng thing quay quanh H cat dudng trdn bM,N vk cdc dudng thing AM, AN ldn lugt cdt A d M', N'. a) Chiing minh ring bdn dilm M, N, M', N' cimg thudc mdt dudng trdn (© ) nao dd. b) Chiing minh ring cac dudng trdn (^ ) ludn di qua hai dilm ed dinh. 37. Cho dudng trdn (O ; R) vk diim A khdng thudc dudng trdn dd. Dudng thing A quay quanh A cdt (O ; F) d M va N. Xdc dinh vi trf cua A dl mdt trong ba dilm A, M, N each diu hai dilm kia. 38. Cho dudng trdn dudng kfnh AB, H la dilm nim giiia AB vk dudng thing A vudng gdc vdi AB tai H. Ggi E, F Id giao dilm cua dudng trdn va A. Ve dudng trdn tdm A, ban kfnh AE vk dudng trdn (*© ) bdt ki qua H, B. Gia sur hai dudng trdn do cdt nhau b M vk N, chting minh ring AM vk AN Id hai tilp tuyen cua (^). 39. Cho hai dilm P, Q nim ngoai dudng trdn (/) cd dinh vdi IP ^IQ. a) Ve dudng trdn (^) bdt ki di qua P, Q. Chiing minh ring true dang phuong cua (*^) vd (/) di qua mdt dilm cd dinh. b) Hay neu each ve dudng trdn di qua P, Q vk tilp xiic vdi dudng trdn (/). 40. Cho tii giac ABCD cd cac canh AB, CD keo ddi cit nhau d F vd cdc canh AD, BC keo ddi cdt nhau d F. Chiing minh ring cac trung dilm eua cac doan AC, BD vk EF ciing thudc mdt dudng thing idudng thdng Gao-xa cm tiic gidc). 41. Cho tam gidc ABC ndi tilp trong dudng trdn (O ; R), cd dudng cao AA'. Ggi E, F tuong ling la hinh chie'u ciia A' tren AB, AC vk J la giao dilm cua EF vdi dudng kfnh AD. a) Chiing minh ring AA' la tilp tuye'n cua dudng trdn (A7D). b) Tim dilu kien cua AA' dl ba dilm E, F, O thing hdng. 42. Cho ba dilm A, 5, C thing hang, 5 d gitta A, C va dudng thing A qua A. a) Chiing minh ring cd hai dudng trdn ciing di qua B, C vk ciing tidp xiic vdi A. 44 b) Chiing minh ring khi A quay quanh A, cac dudng trdn di qua 5 vd hai tilp dilm ciia A vdi hai dudng trdn d cdu a) ludn di qua mdt dilm cd dinh khdc 5. 43. Cho dudng trdn dudng kfnh AB cd ddy cung CD vudng gdc vdi AB. Vdi mdi dilm M chay tren dudng trdn dd (khac vdi C va D), ke cac dudng thing AM, BM ldn lugt cdt dudng thing CD bJvkl. a) Chiing minh ring tii dilm F bd't ki cd dinh tren dudng thing AB, cd thi ke dugc hai tilp tuyin din dudng trdn (M//). b) Ke cdc tilp tuyin AT, AT' din dudng trdn (M//) (T, T' Id cdc tilp dilm). Chiing minh rang T, T' ludn thudc mdt dudng trdn cd dinh. 44. Chiing minh ring : Trong tam giac, trung dilm cac canh, chdn cac dudng cao ciing thudc mdt dudng trdn ico) vk dudng trdn ico) ciing di qua trung dilm ciia cac doan thing nd'i mdi dinh vdi true tdm tam giac (dudng tron chin diem hay dudng trdn 0-le ciia tam gidc). 45. Trong mat phing toa dd cho a = (1; 2); 6 = (-3 ;l);c - (-4 ;-2). Tfnh d.b; b.c; c.a; a.ib + c); a.ib-c). 46. Cho cac vecto a(-2; 3), bi4; 1). a) Tfnh cdsin ciia gdc giiia mdi cap vecto sau : a vd ^ ; a vd / ; b vk j ; a + b vk a -b ; b) Tim cac sdk vk I sao cho vecto c = ka + lb vudng gdc vdi vecto a + b. c) Tim vecto d bilt a.d = 4 vd b.d = -2. 47. Cho hai dilm A(-3 ; 2) va 5(4 ; 3). Tim toa dd ciia a) Dilm M tren true Ox sao cho tam giac MAB vudng tai M. b) Dilm A^ tren true Oy sao cho NA = NB. 48. Cho ba dilm A(-l ; 1) vd 5(3 ; 1), C(2 ; 4). a) Tfnh chu vi vd dien tfch ciia tam gidc ABC ; b) Tim toa dd true tdm H, trgng tdm G vd tdm / ciia dudng trdn ngoai tilp tam gidc ABC. Hay kilm nghiem lai he thiic lU = 31G. 45 49. Cho bdn dilm A(-8 ; 0), 5(0 ; 4), C(2 ; 0), D(-3 ; -5). Chiing minh ring tii giac ABCD ndi tilp dugc trong mdt dudng trdn. 50. Bilt A(l ; -1) vd 5(3 ; 0) la hai dinh ciia hinh vudng ABCD. Tim toa dd cdc dinh C va D. §3. H# thCrc luong trong tam giac Trong tam giac ABC ta thudng ki hieu : • a,b,c ldn lugt la dd dai cdc canh ddi dien vdi cdc dinh A, B, C. • m^, mij, m^ ldn lugt la dd dai cac trung tuye'n ling vdi cdc canh a, b, c. • h^, hf,, h^ ldn lugt la dd ddi cdc dudng cao ling vdi cac canh a, b, c. • p = ^ Id nita chu vi tam gidc, 5 la dien tfch tam giac. • R Id ban kfnh dudng trdn ngoai tilp, r la bdn kinh dudng trdn ndi tiep. I - CAC KIEN THQC CO BAN 9 9 9 1. Dinh li cdsin : a = b + c - 2bccosA. 2. Dinh li sin : ——- = -: = = 2F. smA sm5 smC - _ , , , ., 1 r) + c a 3. Cong thuc trung tuyen : m^ = — 4. Cdng thiic tinh dien tich tam gidc :' S = -ah^. S = --bcsinA, abc S = pr. S = yjpip - a)ip - b)ip - c) (cdng thiic He-rdng). 46 II - OE BAI 51. Cho tam giac ABC cd dd ddi cac canh a = 3,b = 4,c = 5,2. Hdi trong cdc kit ludn sau, kit ludn ndo diing ? a) A Id gdc nhgn. b) 5 la gdc tu. c) C Id gdc nhgn. d) C la gdc tii. 52. Tam giac ABC cd dd dai ba canh a, b, c thoa man he thiic a =b + c . a) Chiing minh 5 < A va C < A. b) Chiing minh ring tam giac ABC cd ba gdc nhgn. 53. Tfnh canh thii ba cua tam gidc ABC trong mdi trudng hgp sau : a)a = 7 ; 6=10 ; C = 56°29'. b)a = 2 ; c = 3; 5 = 123°17'. c)b = 0,4; c=l2; A = 23°28'. 54. Tfnh cac canh va gdc cdn lai eua tam gidc ABC trong mdi trudng hgp sau : a) a = 109 ; 5 = 33°24'; C = 66°59'. b) a = 20 ; b=l3 ; A = 67°23'. 55. Tam gidc ABC cd 5 = 60°; C = 45° ,BC = a. a) Tfnh dd ddi hai canh AB, AC. o 46-42 b) Chiing minh cos75 = 56. Tam gidc ABC c6c = 35,b = 20, A = 60°. , a) Tfnh ehilu cao h^. b) Tfnh bdn kfnh dudng trdn ngoai tilp tam giac. c) Tfnh ban kfnh dudng trdn ndi tilp tam gidc. 57. Tam gidc ABC cd cdc canh A5 = 3, AC = 7,5C = 8. a) Tfnh dien tfch ciia tam giac. b) Tfnh bdn kfnh cdc dudng trdn ndi tilp, ngoai tilp cua tam giac. 47 58. Chiing minh ring trong tam giac ABC ta cd : ^ a^ +b^ +c^ ^ cotA -I- cot5 + cotC = ; R. abc 59. Chiing minh ring trong tam giac ABC ta cd : 2 2 a) b - c = aibcosC - ccosB). h) ib - c )cosA = a(ccosC - bcosB). c) sinC = sinAcosF -i- sin5cosA. 60. Tam giac ABC cd 5C = 12, CA = 13, trung tuye'n AM = 8. a) Tfnh dien tfch tam gidc ABC. b) Tfnh gdc 5. 61. Tam gidc ABC cd -r- = —^ ^t 1. Chiing minh ring : b m^ 2cotA = cot5 -I- cotC. 62. Tm quy tich nhiing dilm cd tdng binh phuong cac khoang each din bdn dinh cua mdt tii giac bing k khdng ddi. 63. Chiing minh ring hai trung tuyin ke tur 5 va C cua tam gidc ABC vudng gdc vdi nhau khi va chi khi cd he thiic sau : cotA = 2(cot5 -I- eotC). 64. Chiing minh ring khoang each d tit trgng tdm tam giac ABC din tdm dudng trdn ngoai tiep cua tam giac dd thoa man hi thiic R'-d' = -'^b'^c' 9 65. Chiing minh ring trong mdi tam gidc, khoang each d tii tdm dudng trdn ndi tilp de'n tdm dudng trdn ngoai tilp thoa man he thiic d^ = R^-2Rr (He thvcc 0-le) 66. Cho dilm M cd dinh tren dudng trdn (O ; R) vk hai dilm N, P chay tren dudng trdn dd sao cho J^MP = 30°. a) Tim quy tfch trung dilm / cua NP. b) Xac dinh vi tri cua A^, F di didn tfch tam gidc MA^F dat gia tri ldn nhdt. 48 67. Ke cdc dudng cao AA', BB', CC cua tam gidc nhgn ABC. a) Chiing minh ring B'C = 2FsinAcosA. b) Ldy Aj, A2 ldn lugt Id dilm dd'i xiing vdi A' qua AB, AC. Chiing minh ring chu vi tam giac A'B'C bing do dai doan thing AjA2. c) Chiing minh he thiic : sinAcosA -1- sin5cos5 + sinCcosC = 2sinAsin5sinC. 68. Tii mdt vi trf quan sat A cd dinh trdn bd biln, ngudi ta mudn tfnh khoang each din mgt vi trf 5 trdn mat biln bing giac ke (may do gdc). Em cd thi lam vide dd bang each nao ? 69. Cho tii giac ABCD cd AB = a, CAB = a, DBA = p, DAC = a', CBD = P'. Tinh dd dai canh CD. 70. Cho tam giac ABC cd trgng tam G. Ggi A', B',C' ldn lugt la hinh chiiu cua G tren cac canh BC, CA, AB ciia tam giac. Hay tfnh didn tfch cua tam giac A'B'C bilt ring tam giac ABC cd dien tfch bdng S va khoang each tii G den tam dudng trdn ngoai tilp tam giac dd bang d, ban kfnh dudng trdn ngoai tilp bing R. 71. a) Chiing minh ring nlu a la gdc nhgn thi COS(Q; -I- 90°) = - sina. b) Cho tam gidc nhgn ABC cd cac canh a, b, c vk didn tfnh S. Trtn ba canh vd vl phfa ngoai cua tam giac dd dung cac tam giac vudng can A'BC, B'AC, CAB iA', B', C ldn lugt la dinh). Chiing minh ring : A '5'^ + B'C^ + CA''^ = a^ + b^ + c^ + 65. 72. Cho tii giac ABCD ndi tilp dugc va cd cac canh a, b, c, d. Chiing minh ring dien tfch tii giac dd dugc tfnh theo cdng thiic sau : S = yjip - d)ip - b)ip - c)ip-d), trong dd p la niia chu vi tii gidc. 73. Cho tam gidc cdn cd canh bdn bing b ndi tiep trong dudng trdn (O ; F). a) Tfnh cdsin cua cac gdc ciia tam giac. b) Tfnh bdn kfnh dudng trdn ndi tiep tam giac. c) Vdi gid tri ndo ciia b thi tam giac dd cd dien tfch ldn nhdt ? 74. Cho tam gidc ABC. Ggi r^ la ban kfnh dudng trdn bang tiep gdc A. Chiing minh ring dien tfch tam giac ABC tfnh dugc theo cdng thiic : S = ip- a)ra. 4A-BTHlNHHpC(NC) 49 75. Cho tam giac ABC cd ban kfnh dudng trdn ndi tilp bing r vk cdc bdn kinh dudng trdn bang tiep cac gdc A, B, C tuang umg bing r^, r^, r^. Chiing minh rang ndu r^r^-rf^-r^ thi gdc A la gdc vudng. 76. Cho tam giac ABC cd dd ddi ba trung tuye'n bing 15 ; 18 ; 27. a) Tfnh dien tich ciia tam giac. b) Tfnh do ddi cac canh cua tam giac. 77. Giai tam giac ABC bilt a) a = 6,3 ; 6 = 6,3 ; C = 54°. b)a = 7 ; 6 = 23 ; C = 130°. 78. Giai tam giac ABC biet 5 a) c = 14 ; A = 60° ; ^ = 40°. b) c = 35 ; A = 40° ; 79. Giai tam giac ABC bie't C = 120° a)a= 14; &= 18 ; b) a = 6 ; b = l,3 ; c = :20. c = :4,8. 80. Tren nggn ddi cd mdt cai thap cao 100m (h. 24). Dinh thdp 5 va chdn thap C nhin dilm A d chdn ddi dudi cac gdc tuong ling bing 30° vd 60° so vdi phuong thing diing. Xac dinh chiiu cao HA cua nggn ddi. 81. Mdt vdt nang F = lOON dugc treo bing sgi day gin trdn trdn nha tai hai dilm A, 5 (h. 25). Bie't hai doan ddy tao vdi trdn nhd cdc gdc 30° va 45°. Tfnh luc cdng cua mdi doan ddy. Hinh 24 50 Bai tap on tap chuong II 82. Tm gid tri cua mdi bilu thiic sau A = 2sin30° - 3cos45° + 4cos60° - 5sinl20° + 6cosl50°. 5 = 3sin^45° - 2cos^45° - 4sin^50° - 4cos^50° + 5tan55° cot55°. 83. Cho tam gidc diu ABC cd /, / ldn lugt la trung dilm ciia AB, AC. Tim cos(A5, AC), cos(A5, 5C), cos(57, 5C), cos(A5, 57), cos(57, c7). 84. Cho tam gidc cdn cd gdc d day bang a. Chiing minh ring 2 sin a cos a = sin 2a. 85. Cho tam giac diu ABC cd canh bing 1. Ggi D la dilm ddi xiing vdi C qua dudng thing AB, M Id trung dilm cua canh CB. a) Xdc dinh trdn dudng thing AC mdt dilm A^ sao cho tam giac MDA^ vudng tai D. Tfnh didn tfch tam giac dd. b) Xac dinh tren dudng thing AC diim P sao cho tam giac MPD vudng tai M. Tfnh didn tfch tam giac dd. c) Tfnh cdsin eua gdc hgp bdi hai dudng thing MP vk PD. 86. Cho tam gidc ABC cd A = 60°, a = 10, r= -^ • a) Tfnh R. b) Tfnh b, c. 87. Bilt ring tam giac ABC ed AB = 10, AC = 4 vd A = 60°. a) Tfnh chu vi eua tam gidc. b) Tfnh tan C. c) Ldy dilm D tren tia dd'i cua tia AB sao cho AD = 6 va dilm E trtn tia AC sao cho AE = x. Tim x dl BE Id tilp tuyin cua dudng trdn iADE) HADE) Id dudng trdn ngoai tilp tam giac ADE). 88. Cho dilm D ndm trong tam gidc ABC sao cho DAB = DBC = DCA = (p. Chiing minh ring a) sin (p = sin(A - ^).sin(5 - ^).sin(C - (p). b) cot^ = cotA -I- cot5 + cotC. 51 89. Cho diem M nim trong dudng trdn (O) ngoai tilp tam gidc ABC. Ke cac dudng thing MA, MB, MC, chiing cdt lai dudng trdn dd ldn lugt d A', 5', C. Chiing minh ring : S^.s^r iR^-MO^f ^ABC iMA.MB.MCf 90. Cho ddy cung BC ciia dudng trdn ^iO ; R) iBC < 2R). a) Hay dung dudng trdn tdm / tilp xuc vdi OB d 5 va tiep xiic vdi OC b C. b) Vdi mdi dilm M trdn dudng trdn (/), ke cdc dudng thing MB va MC, chung ldn lugt cit lai dudng trdn i'^) b B' vk C. Chiing minh ring B'C la dudng kfnh ciia dudng trdn (^). 91. Trong tam giac ABC ke cac dudng cao AA', BB', CC vk ggi H la true tdm cua tam giac. a) Chiing minh A'B. A'C = -A'H.A'A. b) Ggi / la mdt giao dilm cua AA' vdi dudng trdn (^ ) dudng kfnh BC. Chiing minh ring cac dudng thing BC, B'C vk tiep tuyin tai / ciia i^) ddng quy. Cac bai tap trac nghiem chirdng II 1. cos 150° bing (A)i; (B)-i; (cf ; (D)- 4^ 2 2. sin 120° bang (A)| ; sm92° ; (C) sin 91° = sin 92° ; (B) sin 91° (D) sin 92° 0 . 92 < sin <0. 4. A) cos 135° = cos 45° ; C) cos 135° =-cos45° ; Tam gidc ABC cd AB = 5, AC = 7, A) JB.AC = 35 ; C) JB.AC = -35 ; Nlu M, N, P thing hang thi A) MN .MP = MN .MP ; C) MN.MP = -MN.MP ; Trong tam giac ABC cd A) a^ =b^+ c^- bccosA ; C) a^ =b^+c^-2bccosA ; 8. B) cos 135° > cos 45° ; D) cos 135° =3cos45°. BAC = 120° thi B) AB.AC = 17,5 ; D) A5.AC =-17,5. B) MN .MP = MN .MP ; D) MN.MP = -MN.MP. B) a^ =b^+ c^ + bccosA ; D) a^ =b^+c^+ 2bccosA. thi 10. Nlu tam giac ABC ed a^ -J- ; C)m„< b + c D) m^ =b + c. 53 B. Ldl GIAI - flUd^G BA N - BAP SO §1. Gia tri lirong giac cu^ mot goc bat ici (tir 0° den 180°) 1. a) Bilu thiic khdng xac dinh khi cosa -i- sina = 0 hay a = 135°. b) Chia ca tir va mdu ciia bilu thiic cho cosa ^ 0, ta tfnh dugc F = 5. 2. a) Luu y cosO° -i- cosl80° = cos20° -i- cosl60 ° = ... = cos80° -i- eoslOO° = 0. b) Luu y tan5°.tan85° = tanlO°.tan80° = ... = tan45° = 1. D5.a)0;b)l . 3. (h. 26) a) sinx = OQ , cosx = OP, sin^x -I- cos^x = OQ^ + OP^ = OM^ = I. K^ • fl ~ 2V2 b) sinx = VI - cos X =^ — c) cosx = ±Vl-sin^x = + Vo^ . A X Hinh 26 d) Giai hd sinx-cosx = 2 sin X + cos X = 1. ^ e • ^14 + 2 V14-2 DS : smx = — ; cosx = — . N 1 . 2 1 sin a cos^a-hsin^a 4. a) 1 -I- tan a = 1 -(-cos a cos a cos a b) Ap dung tanx.cotx = 1 dl tfnh cote. Ap dung cdu a) ta cd —r— = 1 + (-5)^ =^ cos^x = -— cos-^" X 26 1 Vl tanx < 0 ndn cosx < 0, suy ra cosx = - V26 Tit sinx = cosx.tanx, hay tfnh sinx. 5 DS : cotx = - -r, cosx = p= , sinx = -,— 5 V26 V26 - s 1 .2 . cos a sin^a-l-cos^a 1 5. a) 1 -1- cot a = 1 -I sin a sin a sin a 54 1 1 3 b) DS : tanb = - , sinb = —f=, cosb = 3 ' Vio' VlO A ^.«21.o 1 (46-42]^ 8 + 2712 6. a)cosl5 =1-^^^ J =^^ — \2 ,- r- / r-\2 (Ve) +24642+ (42) (4^ + 4^f 16 16 Do 15° < 90° nen cosl5° > 0, suy ra cosl5° = ^^±^ 2 4 ^ ._o sin 15° .46-42 {46-42f ^ r tanlS = = —j= j= = — =z-v3 . cosl5° 46 + 42 6- 2 u^ 1 • 1 cO 1 CO v6 - v2 v6 -I- V2 1 . o b) 2sinl5 cosl5 = 2 ^ ^ = — = sin 30 . 4 4 2 7. a) Binh phuong hai vl vd dp dung bai 3a). DS: sinxcosx = m^- 1 2 i.\- 4 4 /.2N2 / 2X2/. 2 2X2,,. 2 2 b) sin X -I- cos X = (sin x) + (cos x) = (sin x -i- cos x) - 2sin x.eos x - (m^ - 1)^ _ 1 + 2m^ - m^ fi fi 9* ^ 9'^ v v ^ c) Vie't lai sin x -h cos x = (sin x) -i- (cos x) rdi sit dung hdng dang thiic a^ -I- 6^ = (a -I- b)^ - 3abia + b). DS -3m^ + 6m^ + I 2 2 d) Tijf gia thie't suy ra siruc -m- cos;c. Lai co sin x + cos x = 1. 2 9 Tii dd dan de'n cosx la nghiem ciia phuong tnnh 2t - 2mt + m -1= 0 nen A' > 0, tii dd suy ra m^ < 2 hay -42 2vltana|.Icotal = 2, suy ra Itana -t- cotal > 2 hay 1^1 > 2. 1 - 2 Cdch 2. Thay cota = dan din tan a - A: tan a + 1 = 0. Vay tana la nghidtana cua phuang trinh x^ - A:x -i-1 = 0 nen A = ^^ - 4 > 0 hay UI > 2. §2. Ticli v6 hirdrng cua liai vecto 9. (h. 27) a) (JB,AC)= 90° nen cos(A5, AC]= 0. {JB,BC] = 180°- ABC ndn cosf A5, Bc] = - cos ABC = ^=1= ^ ^ V149 (AB, CB) = ABC ndn COS(A5, CB\ = -^ • h)llB.llC = //5.//Ccosl80° = -HB.HC = -AH Theo he thiic trong tam giac vudng 1 1 -I- - 149 ,2 4900 A//2 ~ AB^^AC^ ~4900' 4900 suy ra AH^ = ——-. Vdy HB.HC = 149 149 35 10. a) AB.AC =A5.AC.cosl20°= - — AB.IBC =AB('AC-AB\ = 'AB.AC - AB' = - ^ - 49 = - TT^^T ; ^^2 35 2 b) M la trung dilm cua BC ntn AM = - [ A5-I-Ac), suy ra 133 :2 1 ' — , 2 —. 2 — > —> ^ 1 39 AM = 4 AB +AC +2.AB.AC = -(49 + 25-35)=^ , 56 AM = V 39 11. (h. 28) NE = NM + ME = kMP - MN, 'MF = UA1P+^).^ NELMF<^ i ^ + WiYik'MP - Miv) = 0 14N.{JV1P+WN\ o k = MN.MP+MN MP.\^MP + MNj MP +MN.MP _ 2£jJ^_ 2 " 64 4-16 ~ 5' 12. (h. 29) a) Theo tfnh chdt ciia dudng phdn giac, ta cd - ^ = -^ hay D5 = ^DC . Mat khdc 'DB, ^ DC b b ngugc hudng nen DB = —rDC. Tii dd ddn 4 t> din AD = bAB + cAC b + c b) Binh phuong vd hudng dl tfnh do ddi AD. bc DS: -^42il + cosa). b + c 13. a + b\ - \a\ •\2\ -.2 - 2 - 2 a +b + 2a.b -a -b d.b. 14. a) AB.BC = ^ r. \AB + BC\ -AB -BC ,\ V 1^ >2 • .2 2 y ^'] = ^{b2_,2_^2) AB.AC = - AC -AB \ ,2 —. 2 / . .\2 AB +AC -iAB-AC) _ J_ ( >2 >2 —.2 ^ 1 / 9 , , \ ~ 2 AB +AC -CB =-\c^ +b^ -an. b) Vi AM Id dudng trung tuyin cua tam gidc ABC ntn AM^ = AM 2 1 / > .\2 1 f .2 .2 — . . = MAB + AC) =-r\AB +AC + 2AB.AC 4{ = I p + ^2 ^ ^2 ^ ^2 _ ^2 J ^ j(2^2 +2c^-a'). 57 Vdy : AM = ^ yl2b^ + 2c^ - a^ . 15. Xet tam gidc ABC cd AD, AE ldn lugt la dudng phdn gidc trong va phdn —. bAB + c AC gidc ngodi (h. 30). Theo bdi 12a) ta cd AD = ; Hay binh b + c phuang vd hudng ca hai vl vd sit dung ding thiic AB.AC = b'+c'-a' (theo bai 14) dl tfnh dd dai doan AD. Vi AE Id phdn gidc ngoai ndn EB = — EC (luu y ring phdn gidc ngodi cua gdc A chi cat dirdng thing BCb Mab^c).Tv(d6 AE = bAB-cAC b-c DS: AD = sjbcpip - a) ; b + c 2 = |r^V^c(p - b)ip - c) AE = , a 4- &-I-C , , , , . , ., ^ ip = -z la nua chu vi cua tam giac). 16. Gia sii id.b)c = dib.c). Nlu a.b = 0 thi b.c = 0 (vi a ^ 0). Vdy ca hai vecto a vd ? ciing vudng gdc vdi b hay a = kc. Ndu ah ^ 0 thi b.c * 0. Khi dd a = (dh^ \b.c .c hay a = kc. Ngugc lai, nd'u a = kc thi ia.b)c = ikc.b)c - kic.b)c = ib.c)kc = (Jb.c)d = dib.c). Nhu vdy, ding thiic id.b)c = dib.c) dung khi vd chi khi cd sd k di a = kc. 17. a) Ggi 0 la trung dilm ciia A5 thi OA = - 05 . Vdi mgi dilm M, ta cd m.'MB = ('MO+dA) .{'MO + OB) = {'Md-OB).{'Md+'dB) 2 = MO^ - OB^ = MO^ - t-. 4 58 ,2 ^ , . , ,,^ 2 C^ , ,.... ^ • Tit dd MA.MB =/t ^ MO^ - ^ = k ^ MO^ = ^+k. (*) 4 4 ^2 Ta cd O cd dinh, — -i- A: la sd khdng ddi ndn : 2 - Ne'u k<- -— thi tdp cdc dilm M la tdp rdng. - Nlu k = —T" thi tdp cac dilm M chi gdm mdt dilm O. -Nlu^>--— thi tdp cdc dilm Mid dudng frdn tdm Oban kfnh F=-Vfl^-I-4L b) Ldy dilm C sao cho 'AC = 2 A5. Khi dd JB.'AC = 2 A5^ = 2a^. Tit dd cd A]V.A5 = 2a^ <::^ A/V.A5 = A5. AC o A5.(A/V - Ac) =0 «^ A5.ciV = 0 « CATl A5. Vdy tdp hgp cdc dilm A^ la dudng thing vudng gdc vdi dudng thing AB tai dilmC. 18. (h. 31) Ta cd AN.'AM = AH^ <=>AiV.AM = A77.A^ = A77.AM (theo cdng thiic hinh ehilu) A O AA^.AM- A77.AM = 0 {AN -AH).AM = O ^ HN.AM -^0. M A Vdy tdp hgp cac dilm A^ Id dudng trdn dudng kfnh AH. Hinh 31 19. a) Theo dinh nghia ciia tfch vd hudng ta cd (vdi mdi / e {l, 2,..., n}): OM.OAi = OM.OA,.cosMOA, = F^cosMOA, . Do dd : cos MOAj -i- COSMOA2 -t-... -1- cosMOA„ = = -^OM-foAj" -I- O ^ -I-... + 0A^„). R^ 59 Theo bai 7 (chuang I) thi OA^ + OA2 +... + 0A„ = 0, ndn cosMOAi + COSMOA2 + ... + cos MOA„ = 0. - 2 b) MA{; + MA2 + ... + MA„ = MAi + MA2 + ... + MA„ = (a\-OM) +(OA^-OM) +... + (O\-OM) = OAf + OAI + ... + OAI + nOM^ - 2(oA^ + O ^ + ... -I- 0\).0M = R^ +R^ + ... + R^ +nR^ -0 = 2nR^ . 20. Tiif dilu kidn ^ = klBC, ta suy ra : AM -AB = ki'AC - AB) hay AM = (1 - k)AB + kAC . Bdi vdy : AM = AM = (1 - k)'AB + kJc = (1 - k)^JB^ + k^'AC' + 2ki\ - k)AB.AC ]_ '2 = (1 - kfc^ + k^b^ + 2kil - k).Uc^ +b^ -a^\ (xem bai tdp 14) = i\-k)c^ + kb^ -kil-k)a^. 1 Trong trudng hgp k= — thi M la trung didm cua canh BC, AM la dudng 2 . 2 2 trung tuyin. Khi dd ta cd cdng thiic trung tuyin : AM = — • 21. a) M = ca.cos(180° - B)CA + a&.cos(180° - C)!^ + ZJC.COS(180° - A)'BC = - cacosB .CA - ab. cos CAB - bc. cos A.BC = -abc ^ ^CA ^AB RC^ ' cos5—— -I- cosC + cos A b c a J b) Nlu tam giac ABC diu thi a = 6 = c, cos A = cosB = cosC, tii dd suy ra M = - alcosA.(cA + A5 + 5C) = 6. 60 c) Nhdn vd hudng vecto M = 0 ldn luot vdi ^—, — va ta cd^:* * b c a ^A M.^— = 0, suyra cos5 - 2cosC.cosA = 0. b TuOng tu ta cd : cosC - 2cosA.cos5 = 0, cosA - 2cos5.cosC = 0. Rut cos5 tii ding thiic ddu va thay vao ding thtic thii hai, ta cd : cosC - 4cos^A.cosC = 0 ma cosC ^ 0 (vi nd'u cosC = 0 thi cosfi = 0, 1 1 F = C = 90°, vd If) ndn cos^A = - hay cosA=+-. Vdy A = 60°, hoac A = 120°. Tuang tu nhu vdy, gdc C ho^c bing 60° hoac bing 120°. Vi tdng ba goc cua tam giac bing 180°, ndn chi cd thi cd 2 = B^C = 60°. Vay ABC la tam giac diu. 22. (h. 32) 2MP.BC = iMA + MD).iMC - MB) = MA.MC - MD.MB + MD.MC - MA.MB = MA.MC - MB.MD (vi MA.MB = MD.MC = 0 do AC 1 BD). Tit dd ta cd : MP IBC <:> MP.BC = 0 <:^ MA.MC = MB.MD. 23. Dat AD = d,AB = b. Khi dd : AM = I-'AC = Ud + b),JN = AD + 'DN = d + -- 4 4 2 Tiif dd suy ra : m = JB-AM = b-Ua+ 'b) = -(- a + 3b). MN = AN - AM = a + - - -id + 'b) = --{3d + b) . 2 4 4 61 Ta cd : M5.MAr = J-{-a + 3b){3a + S) 16 = ^(-3a^ +3f +Sa.b)^0. 16 16 16 + 9b -6a.S) = |a ^ 8 MA^^ = :^(3a + 'bf = Mgd^ +f+ 6dh) = \d^. 16 16 8 vay MB 1MA^ vd MB = MA^, tam gidc 5MA^ vudng cdn tai dinh M. 24. (h. 34) Ggi F Id trung dilm ciia AA' thi OP \.AA' ntn theo cdng thiic hinh chie'u ta cd : ' 2MA.MO = 2MA.MP. Nhung vi F la trung dilm cua AA' ntn 2MP = MA -i- IAA' . Vdy : 2AM. MO = MA .te-1-M^) = MA^-I-AM .MA^ = MJ^ - MAMA = MAiMA - MA). 25. (h. 35) Ldy cac dilm Aj, Fj, Cj sao cho : MB •,MB,=-—vkMC,= MC MB •" "" ^ MC khi dd ca ba vecto tren diu cd dd dai bing 1, ma gdc giiia hai vecto bdt ki trong chung diu A bing 120° nen M la tdm cua tam gidc diu Ai5iCi. Theo bdi 24, ta cd : suy ra hay 2MAM0 = MAiMA -MA), MA .MO = MA-MA, 2MAi.M0 = MA-MA. Hinh 35 Tumg tu: 2M5i .MO = MB-MB', 2MC^.M0 = MC - MC. 62 Tir dd ta cd MA + MB + MC- MA- MB'- MC = 2{M\ + JIBI + JIC'A.'MO = 0 , hay MA + MB + MC = MA+ MB'+ MC. 26. a) Ldy mdt dilm O bdt ki thi ding thiic jtjGAi -I- k2GA2 + ... + k„GA^=0 (1) tuong duong vdi kii^i-dc) + k2(0A^-0G\ + ... + kJd\-dG\ = 0 hay OG = UoA^ +0A^ + ... + 04) . Dilu dd chiing td ring cd dilm G thoa man (1). Gia sii didm G' cung thoa man k^G'A^ + k2G'A2 + ... + k„G'A^ = 0 (2). Bing each trir theo vl (1) cho (2) ta dugc k.GG' = 0, suy ra GG' = 0 hay G' triing vdi G. (Dilm G dugc ggi la tdm ti cu cua he dilm {Aj, A2,...,A„} gan vdi cac he sd'A:j, k^,..., ^„). b) Vdi mgi dilm M, ta cd k^MAf + k2MAl + ... + k„MA^ = m ->2 <::> ^jMAj + k2MA2 + ... + k^MA^ =m 9 9 9 m <:> ki{GAi-GM) +k2{GA^-GM) -1-... + /:„(GA^ - GM ) = o kfiAf + k^GAl + ... + k/}Al + kGM^ - 2GM {k^GA^ + k2GA^ + ... + k„GA^„) = m. Ta ddt k^GAf + k2GAl + ... + k„GA^ = s thi ding thiic trdn tuong duong vdi s + kGM^ = m hay GM = —-—. Tii dd suy ra fC • Nlu —-— > 0 thi quy tfch cdc dilm M la dudng trdn tdm G, ban kfnh r = 63 \m- s • Ne'u m - ^ = 0 thi quy tfch eac dilm M la mdt dilm G. Ne'u m- s < 0 thi quy tfch cdc dilm M la tdp rdng. Chu y. Khi ^j -t- ^ -t-... -i- )t„ = ;t = 0 thi he dilm {AI,A2,...,A„} khdng co tdm ti cu, song vecto U = k^OA^ + )t2<^^2 + - + K^Ai khdng phu thudc vao vide chgn dilm O. Thuc vdy, vdi dilm O' khdc dilm O, ta cd : k^O'Aj^ + k20'A2 + ... + k„0'A^ = {k^+k2 + ... + k„)0'0 + y^iOAj + /^0A2 + ... + A;„OA„ = U Bdy gid chgn mdt dilm O ndo dd, ta cd : k^MAf + k^MAl + ... + k^MAl = m -^2 ->2 <:> k^MA^ + k2MA2 +... + k„MA„ =m \2 I > ,\2 •.\2 <» k^ {OA^ - OM) + k2 (0A2 - OM) + ... + k^ {OA^ - OM) = m O k^OAl + k^OAl + ... + k„OA^ - 20M.u =m. Dat kpAl + k20Al + ... + k^OAl = s thi ding thiic trdn trd thanh 2U.0M = s -m. Bdi vdy : • Nlu M=0va 5 = mthi quy tfch cac dilm M la toan bd mat phing. • Nlu M = 0 va 5 ?^ m thi quy tfch cac dilm la tdp rdng. • Nlu M 9^ 0 thi quy tfch cac didm M la mdt dudng thang vudng gdcvdi vecto U. 27. a) Xet trudng hgp dilm A' nim trdn canh BC, tiic la cac gdc 5 va C diu nhgn (h. 36a). Khi dd AA' = A'B. tanB = A'C. tanC. Vi tan5 > 0, tanC > 0 va hai vecta A'B, A'C ngugc hudng nen ta suy ra: (tan5)A'5-f(tanC)A'C = 0. (*) Hinh 36 64 Nlu dilm A' nim ngodi canh BC, chang han dilm C nim giiia hai diem,5 va A' (h. 36b), thi khi dd gdc 5 nhgn vd gdc C tu, tiic la tan5 > 0 va tanC < 0. Ta cd AA' = A'5tan5 = A'Ctan(180° - C) = - A'CtanC. Trong trudng hop nay hai vecto WB, WC cung hudng nen ta cd: (tan 5)A'5 + (tan C)A'C = 0. . b) Nlu H la true tdm tam gidc ABC thi ta cd cac sd a,p,y khdng ddng thdi bing 0 sao cho : aHA + pUB + yUc = 0 (theo bai 14 chuong I). Vi HALBC, ntn nhdn hai vl cua ding thiic tren vdi BC ta dugc pUSBC + yUCBC = 0, vd do dd (theo cdng thiic hinh chiiu) PWB.BC + rA^.^ = O^'BC {PWB + yAc) = 6 <» PAB + yAC = 0 (vi vecto pAB + yA'C cung phuong vdi BC) 7 So sanh ding thiic nay vdi (*) ta suy ra „ ^ . Bang each tuong tu ta di din a Y tan A tan 5 tanC Bdi vdy ding thiic allA + pUB + yUc = 6 trd thdnh : tssiAJIA + tmB.llB + tanC.llC = 0 28. (h. 37) Ta ed ia^ +a2+ a3).AiA2 = (a2 -I- a3).AiA2 = {'^ + '^){'A^^-A2AJ) = a2 .AjA3.cos(a2,AiA3J - a^ .A2A3.cos(a3, A2A3J. '^2 Theo gia thilt a2 = A2A3 va a3 = A1A3. Ngoai ra dl thd'y eos(a2, A1A3) = cos (03, A2A3). Hinh 37 5A-BTHINHH0C(NC) 65 Suy ra {a^ + a2 + ^).AiA2 = 0. Do dd, vecto a^ + a2 + a^ vudng gdc vdi dudng thing A1A2. Chiing minh hoan toan tuong tu, ta cd vecto aj -I- a2 + 03 vudng gdc v6i dudng thing A2 A3. vay ai + 02 + a^ -0. 29. Neu A, 5, C, D ciing thudc mdt dudng trdn (*^ thi MA.M5, JIC.'MD cung bing phuang tfch cua dilm M dd'i vdi dudng trdn i^ ndn MA. MB = MC. MD. Ngugc lai, ve dudng trdn qua ba dilm A, B, C vk gia sir dudng trdn do cat dudng thing CD b diim D' khac C. Khi dd ta cd A, 5, C, D' ciing thudc mdt dudng trdn ndn MA.MB = MC.MD'. Ne'u cd MA.MB = MC.MD thi MC.MD = MC.MD', suy ra MC.DD' = 0. Do MC ^ 0 va DD' ciing phuang vdi MC ndn DD' = 0 hay D, D' trung nhau. Vay A, 5, C, D ciing thudc mdt dudng trdn. 30. Giai tuong tu nhu bai 29. 31. t/^/(o,R) ='-^M/(O;R-) o MO^ -R^ = MO'^ - R'^ "•29 9 « MO -MO' =R-R" «> (MO-MO^).(MO+MO'') =R^-R'^ ^2 D,2 <^20'0 .MI = F - F' , trong dd / la trung dilm cua 00'. Ldy H la hinh chidu ciia dilm M trdn dudng thing 00', ta cd O'O.MI = 0'O.HI = OO'.IH. D2 _ D'2 Tit do suy ra /// = —= — khdng ddi nen H la dilm ed dinh 200 ' 6 6 5B-BTHlNHHpC(Ng Vdy ^M/iO.R) =^MI{O:R-) khi vd chi khi M thudc dudng thing A vudng gdc vdi dudng thing 00' tai dilm cd dinh H. Dudng thing A dugc ggi la true ddng phuang cua hai dudng trdn da cho. 32. (h. 38) Xet tfch vd hudng . 'SMA^' =]r{sA + SB).{'SB'-^') = )-{'SASB' - 'SASA' + SB.SB' - 'SB.'SA'). Tacd 'SA.SB' = 0 do 5A 155', 'SBSA' =0 do SB ISA., SA.SA' = 'SB.SB'. Hinh 38 Tix dd suy ra SM.A'B' = 0, nen SM 1 A'B'. 33. (h. 39) Ta ed ^H/^Q) = H^ ^ = - ^^ ^ va 'Hl{0) = HO^ - F^ suy ra HO^ -R^ = - HP^ hay HO^ + HP'^ = R^. (*) i2 Tuong tu ^MKO) = MA.MB = -MB"" ^Mm=MO'-R'. Hinh 39 vk Mat khdc tam gidc vudng APB cd trung tuyin MP = ^AB ^ MB. Til dd suy ra MO^ -R^ = - MP^ hay MO^ + MP^ = F^ (**) Tii (*) vd (**) ta cd H, M ciing thudc dudng trdn cd tdm la trung dilm cua OP vk ban kfnh bing ^yl2R^ -OP^. 67 34. Dat tdn cdc tiep dilm cua hai dudng trdn nhu hinh 40. Ta cd AF = AS vk AR + AS = iAB + BR) + iAC + CS) = iAB + BH) + iAC + CH) = AB + BC+AC = 2p. Vdy AR = AS = p, suy ra c + BH = p hay BH = p - c. Ta Cling cd AP = AQ, BP = BK, CK = CQ ntnc + CK = b + BK. Do (c -I- CK) + ib + BK) = a + b + c = 2p, ntnc + CK = phayCK = p-c = BH. Ggi M la trung dilm ciia BC, tix BH = CK suy ra MH = MK hay ^/(,) = MK^ = MH^ = ^/(,) . Hinh 40 Vdy M thudc true ding phuang cua hai dudng trdn (/) vd (/). 35. (h. 41) a) Ta cd OMI.ONI = OM^nN^. (*) Xet tfch vd hudng 0N.M^M2 = ON.iOM2 - OMi) = ON.OM2 - ON.OMi Do OA^i la hinh ehilu cua OA^ trdn Ox ndn OA^. OM^ = ON^. OM^ Hinh 41 Tuong tu OA^. OM2 = 0A^2- <^^2 • (**) Tii (*) va (**), suy ra ON.M^M2 = 0 hay ON ± M1M2. b) Theo cdu a), A^ thudc tia Oz cd dinh (vudng gdc vdi M1M2). Lai CO zdy = M^M^ (do Oz 1M2M1, Oy ± M2M). 68 Mat khac, OM1MM2 la tii giac ndi tilp (OMjM = OMjM = 90°) nen M^Mjd = M^OM . Tix do suy ra zOy = MOA^ . 36. (h.42) a) Tii giac HBMM' ndi tilp dugc do 'MHB = MMB = 90°, suy ra AH.AB = AM.AM'. Tii giac HBN'N ciing ndi tilp dugc do NHB = iVTVF = 90°, suy ra AH.AB = AN .AN'. Tii dd tacd AM.AM' = AA^ .AA^'. Suy ra M, A^, M', N' ciing thudc mgt dudng trdn, ta kf hidu dudng trdn dd la ij^. b) Ggi F, Q la cac giao dilm ciia ( ^ vdi dudng thing AB va E, F la cdc giao dilm ciia A vdi dudng trdn dudng kfnh AB. Khi dd HE.HF = HM.HN = HP.HQ ntn E, P, F, Q ciing thudc dudng trdn (5). Dudng trdn nay tilp xiic vdi AE, AF ldn lugt tai E, F vk do AE, AF ddi xiing qua AB ndn (S) cd dinh, suy ra F, Q la hai dilm cd dinh. Vdy F, Q thudc dudng trdn (S) tilp xiic vdi AE, AF b E, F. Do (5) la dudng trdn cd dinh ndn F, Q la hai dilm cd dinh cua (t^). 37. (h. 43) • Nlu A d ngoai dudng trdn thi dilu kien AM = MA^ tuong duong vdi AA^ = 2AM. Ta lai cd AM. AN = / - F^ id = OA). Tir dd ddn din 2AM^ = d^-R^ hay AM = Md'-R^) Hinh 43 Diim M (nlu cd) la mdt dilm chung ciia dudng trdn (O ; F) vd dudng trdn tam A, ban kfnh bing Md'-R') 69 • Nd'u A nim trong dudng trdn thi dudng thing A cdn tim la : - Dudng thing vudng gdc vdi OA b A khi A khdng trung vdi O. - Dudng kfnh bdt ki cua dudng trdn khi A triing vdi O. 38. (h. 44) Ta cd AM = AN = AE (do M, A^, E cung thudc dudng trdn tdm A). Trong tam giac vudng AEB, EH LAB ndn AE^ = AH.AB = AH.AB Tit do suy ra AM^ = AN^= JH.JB. Vdy AM, AN la tid'p tuyin cua (©) (xem bdi 30 chuang II). 39. a)(h. 45) Ggi (^i) la dudng trdn cd dinh cd tdm O vd di qua F, Q. Do / khdng thudc dudng trung true ciia PQ ntn true ding phuong A ciia i^i) vk (/) khdng song song vdi PQ, chiing phai cdt nhau d /. Bdy gid gia sit ( ^ la dudng trdn bd't ki di qua F vd 2> ta cd / thudc true ding phuang PQ cua ('^vd('^i)nen^/(^)=^/(^). Lai do / thudc true ding phuang ciia (*^i) va (/) nen Hinh 45 Tir dd ta ed ^j^^^) = ^/(j), hay / thudc true ding phuang ciia i% vk (/). 70 b) (h. 46) Ke tidp tuyin JM vdi (/) (M Id tilp dilm), ta ed JM^ = ^/(j). Do ^/(i) = IP.IQ ntn dudng' trdn iMPQ) tilp xuc vdi JM b M vk Cling tilp xuc vdi (/) d M. Tir dd suy ra each dung. Bdi toan cd hai nghiem. 40. (h.47) Ke cdc dudng cao CC, DD', FF' cua tam gidc CDF vk ggi H la true tdm ciia tam giac dd thi HC.HC = HD.HD' = HF.HF'. (*) Ta cd trung dilm / ciia AC ciing la tdm dudng trdn dudng kfnh AC, dudng trdn dd di qua C (do ACC = 90°). Suyra ^( ^ = Hc.Hc'. Tuong tu nhu vdy, ^(j) = HD.HD' (/Id tdm dudng trdn dudng kfnh BD). ^(K) = HF .llF' iK Ik tdm dudng trdn dudng kfnh EF). Kit hgp vdi (*) suy ra ^/(i ) - %(J) - '^(K) ' Nlu ldy true tdm H' ciia tam gidc BCE ta ciing se cd ^7(1 ) = '^'/(J) - ^'/(K ) • Vdy HH' la true ding phuong ciia hai dudng trdn (/) vd (7), nen HH' 1 IJ. HH' ciing Id true ding phuong ciia (/) va iK), ntn HH' ± IK. Tit dd ta ed /, /, K thing hang. 71 41. (h. 48) a) Trong hai tam giac vudng AA'B vk AAC tacd 'MJs =AA^vk73.74c =AA'^nen 'M.'AB = AF.AC, suy ra tir giac BEFC ndi tilp dugc, do dd ta cd AFE = ABC. Mat khac ABC = ADC (gdc ndi tilp ciing chin cung AC) ntn tvi giac DCFJ ndi tidp dugc, suy ra A7.AD = AF.7c. Vay A7 . AD = AA'^, do dd AA' la tilp tuydn eua dudng trdn (A'/D). Hinh 48 b) Ba dilm E, F, O thing hang khi O triing vdi J hay AJ = R. Do A7.AD = AA'^ ntn AJ = R nlu AA'^ = 2R^ hay AA' = F V2. 42. (h. 49) a) Ggi M la tilp dilm cua A vdi dudng trdn ( ^ di qua 5 va C, khi dd AM^ = AB.AC = AB.AC khdng ddi. Do dd M Id giao dilm cua A va dudng trdn tdm A, ban kfnh bing ^JAB . AC . Tif dd suy ra cd hai dudng trdn cimg di qua 5, C vd ciing tilp xiic vdi A. b) Ggi M, M' la hai tilp dilm ciia A vdi hai dudng trdn d cdu a) vd ggi D la giao dilm (khac 5) ciia dudng thing BC vdi dudng trdn iBMM') thi Hinh 49' AB.AD=AM.AM' =-AM^ =-AB . AC. Tif dd suy ra AD = - AC hay D la dilm ddi xiing vdi C qua A, do dd D Ik diim cd dinh. Vdy khi A quay quanh A, cac dudng trdn iBMM') ludn di qua dilm D cd dinh khac 5. 72 43. (h. 50) Nhdn xet. Hai dilm / vd / thudc hai tia BM, AM b vl ciing mdt phfa ciia dudng thing AB, do dd dudng trdn di qua ba dilm M, I, J cd dudng kfnh // khdng cit dudng thing AB. Ciing cd thi chiing minh nhu sau. a) Ta cd 5 la dilm chfnh giiia cua cung CD (do AB 1 CD) vk MA JL MB i AMB Id gdc ndi tilp chin nixa dudng trdn) nen MB vk MA la phdn giac trong vd phdn giac ngodi ciia gdc CMD. _ .. IC JC Tu do suy ra : = = -^= . ID JD (*) Hinh 50 Ggi H la giao dilm cua AB vk CD, O la tdm dudng trdn (M/T) thi H la trung dilm cua CD vk O la trung dilm cua //. Tif (*) suy ra ICJD+lCJD = 0 hay {^ - o7).(oD - o7) + (oc - o7).(oD - o7) = 0 > OC .OD + 01 .OJ - OC .OJ - 01 .OD + -i-oc.oD + o7.a7-OD.o7-o7.oc = o -(OC+OD)(O7+O7)-^2(-O7^+OC.OD)=O. Do 0/ + 0 / = 0 ndn 01^ = OC.OD < ^ ^ "!" ^ ^ md ^^^^ ^ = OH ndn 01^ < OH^ hay 01 < OH. Vdy H vk ca dudng thing AB nim ngodi dudng trdn iMIJ). Tit dd suy ra, tir dilm F bdt ki trdn AB, ke dugc hai tilp tuyin den dudng trdn iMIJ). b) Ta cd AF^ = AT'^ = AM. A7 , ma AM.A 7 = AH.'AB khdng ddi (do A, H, 5 cd dinh). vay AT^ = AT'^ = JH.AB khdng ddi, suy ra T vk T' ludn thudc dudng trdn tam A ban kfnh bing y]AH.AB . 73 44. (h. 51) Gia sii tam giac ABC c6AA'±BCvkM,N la trung dilm cua BC vk AC. Ve dudng trdn ico) di qua A, M, N nd'u A' khac M, hodc ico) di qua A^ va tid'p xiic vdi BC tai M nlu A trung vdi M. Ldy giao dilm thii hai 5'cua (a>)va AC. KhiddCA^.CM =CN.CB' hay ^CA'.CB = ^CA .CB', Hinh 51 suyra CA'.CB = CB'.CA. Vdy bdn dilm B, A, B', A ciing thudc mdt dudng trdn. Trong dudng tron nay ^B = AAB = 90°, vdy ico) di qua chdn dudng cao 5 ' ha tir dinh 5 cua tam gidc ABC. Dat K la giao dilm thii hai ciia ico) vdi AA', ta cd AK.AA' = A5'. AA^. Ta lai cd 'AH.'AA' = ~AB'.JC (do HB'CA' ndi tid'p dugc). Tii dd suy ra 'AK.JA' = ^JB'.AC = ^AH.AA' ; do d6 AK = ^AH. Vdy ico) di qua trung dilm K ciia AH. Ggi F la tmng dilm cua AB, ta. cd KPII BB' vk MP II AC, suy ra 'KPM = 90°. Tuong tu ciing cd KNM = 90° nen F nim tren dudng trdn ico) di qua M, N, K. Lf ludn tuong tu nhu trdn ta dugc chdn dudng cao C ha tif dinh C va trung dilm cdc doan HB, HC diu thudc dudng trdn ico). 45. d.b =l.i-3) +2.1 =-I; b.c =10; c.a d.{b+c) = d.b+d.c = -9; a.{b -c) = d.b -d.c = 1. -8; 46. a) cos(a, b)^ 74 -2.4-h 3.1 5 yl2^ +3^.yl4^ +1^ 4221 ' COS {a,i)= -• ; COS (?.;)= 1 Vl3 ' V17 a + S = (2 ; 4); a - S = (-6 ; 2) ; cos(a + b,d- b) = I V22+42.V62+22 5V2 b) c =kd+ib = i-2k + 41 •,3k + I) ; c ^.{a + b) <^ c.{d + b) = Q<^ 2i-2k + 41) + 4i3k + /) = 0 <:>2k + 3l = Q). Vdy vdi 2A: -I- 3/ = 0 thi c 1 (a + b). c) Gia six d = ix; y). Khi dd tif a. ^ = 4 va &. J = -2 , suy ra hd phuong tiinh j-2x+3y = 4 [4x + y = -2. DS:d = (-'-;'-' [ 1 ' 1, 47. a) Gia sii M(x ; 0) e Ox ^ 'AMix + 3 ;- 2) ; Wix - 4 ;- 3) ; Tam giac MAB vudng tai M khi AM 15M hay AM.5M = 0. Tit dd ta cd (x + 3).(x - 4) + (-2).(-3) = 0 hay x^ - x - 6 = 0. Phuang trinh cd hai nghidm Xj = 3, X2 = -2 . Vdy cd hai dilm cdn tim la Mj = (3 ; 0); M2 = (-2 ; 0). b) Gia sit A^(0 ; 3;) G Oy. Khi dd A^A^ = A^S^ <=> (0 + 3)2 + iy- 2f = (0 - 4f +iy- 3f <^9 + y^ -4y + 4 = l6 + y'^ -6y + 9 o J = 6 . Vdy A^ = (0 ; 6). 48. a) AB = V(3 + 1)^ + (1 - 1)^ = 4. BC = V(2 - 3f + (4 - 1)2 = Vio. AC = V(2 + if + (4 - if = 3V2. 75 Chu vi tam giac ABC bing 4 -i- VlO -i- 3V2. Tacd: A5 = (4;0), AC = (3;3) ndn cos 5AC = 12 4.3V2 Vi , suy ra BAC = 45°. Vdy didn tfch tam giac ABC bing ^ AF.AC.sin45° = ^.4.342.-^ = 6. 2 2 ^'2 b) Ggi //(xj ; 3^1) la true tdm tam giac ABC. Tacd CH.AB = 0 , Xi- 2 = 0 . . . Tif dd ddn ddn <^ BH. AC = 0 J^i + >'i - 4 = 0, suy ra i/ = (2 ; 2). Trgng tdm G ciia tam giac ABC cd toa dd -1 -F 3 + 2 _ 4 "~ 3 XQ - 3 yc = 1 + 1 + 4 = 2. Gia sii /(X2 ; J2) ^^ tdm dudng trdn ngoai tilp tam giac ABC. Khi do IA = IBvkIA=IC. Tir IA = IB suy ra (X2 + 1)^ + (^2 - 1) = ix2 - 3f + (3^2 - 1)^. (1) Tit IA = IC suy ra (X2 + if + (J2 - 1)^ = (X2 - 2)^ + (^2 - 4f (2) Tic (1) ta cd X2 = 1, thay vao (2) dugc J2 = 2. Vay / = (1 ; 2). Nhuvay 7^ = (1;0), /G = I ^; 0 . v3 J Tit dd suy ra 7^ = 3/G. 49. A5 = (8 ; 4) ; AD = (5 ;-5); C5 = (-2 ; 4); CD = (-5 ; - 5). ^1^\ _ 8.5 + 4.(-5) 1 {AB,AD]= . ^^--= , cos ^ ^ V82 + 42.V52 + 52 VlO COS ^ ^ V2^+4\V5^+5 2 + 42.V52 + 5^2 VlO => eos(A5,ADJ + COS(C5,CD) = 0 => 5AD + 5CD = 180°. Vdy ABCD la tir gidc ndi tilp. 76 50. Ggi C = (x ; j). Khi dd A5 = (2 ; 1) ; 5C = (x - 3 ; y). Tic ABCD la hinh vudng, ta cd : " ' x = 4 ABIBC 2ix-3) + l.y = 0 [AB = BC [ix -3)^ +y^ =5 Vdi Ci(4 ; -2), ta tfnh dugc dinh Di(2 ; -3). Vdi C2(2 ; 2), ta tfnh dugc dinh D2(0 ; 1). §3. He thurc lirong trong tam giac 51. Cac kit ludn diing la a) va d). [y = -2 (x = 2 \y = 2. 52. a) Tit gia thiet suy rab 0, do dd A < 90°. Theo cdu a) thi 5 vd C ciing la gdc nhgn. 53. a) c'^ = a^ + b^- 2abcosC = 49 + 100 - 140cos56°29' « 71,7 ^ c « 8,47. b) b^ = a^ + c'^- 2accosB « 19,6 ^b« 4,43. c) a^ = b^ + c^ - 2bccosA « 135,35 => a « 11,63. 54. a) A = 180° - (33°24' + 66°59') = 79°37'. ^ . , a.sin33°24' ,, Ta CO o = « 61 ; sin79°37' a b a.sin66°59' ,^^ c = « 102. sin79°37' . „ 13.sm67°23' b) Tit ddng thiic suy ra sm 5 = - »0,6; sin A sin5 " •' " 20 Vi 6 < a ndn 5 < A, suy ra 5 « 36°52'; C « 180° - (67°23' + 36°52')« 75°45'; 20.sin75°45' c = «21. sin67°23' 55. a) Ta cd A = 180° - (60° + 45°) = 75°. Dat AC = b,AB = c. Theo dinh If ham sd sin : b _ a _ c sin 60° ~ sin 75° sin 45° ' 77 e , a43 a42 Suy xa b = — ; c = 2sm75° 2. sin 75° b) Ke AH 1 BC (h. 52), do 5, C diu la gdc nhgn ndn H thudc doan BC, hay BC = HB + HC. Ta ed HC = b42 r7^ UD i->/2 c aV6+aV2 => a = HC + HB = 6—- + - = 2 2 4. sin 75° _ . _.o 46+42 => sm75 =. -. . cos75 = ^ sin2 75° = Jl 46+42 = |V 8 - 2V12 41^:^^= 2 46-42 56. a^ = 6? + c^ - 2&C.C0SA = 20^ + 35^ - 20.35 = 400 + 1225 - 700 = 925. vay a « 30,41. s rr,. , . . t J-. ^ 1 n 1 / , 2S BcsinA a) Tu cong thuc tmh didn tich S = ^ah„, suy ra h^=—= 20.35 ^«19,93. 30,41 b)2F=-^^F=4«^ « 17,56. sin A V3 V3 2 " a a c) Tif cdng thiic S = ^ ^ r vd S = - ^ « 303,06, suy ra r = 2S 606,12 a+Z7+c 30,4 + 20 + 35 «7,1 . 78