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Website : luyenthithukhoa.vn luyenthithukhoa.vn - 1 - CHUYÊN ĐỀ 2 : HIĐROCACBON NO Câu 1: - clo - 3 - A. CH 3 CH 2 CH(Cl)CH(CH 3 ) 2 . B. CH 3 CH(Cl)CH(CH 3 )CH 2 CH 3 . C. CH 3 CH 2 CH(CH 3 )CH 2 CH 2 Cl. D. CH 3 CH(Cl)CH 3 CH(CH 3 )CH 3 . 2 - clo - 3 - - Em Bón Phân Hóa - - Ngoài 1 2 3 4 5 CH3 CH(Cl) CH(CH3) CH2 CH3 Câu 2: 5 H 12 ? A. B. C. D. CH3 CH2 CH2 CH2 CH3 ; CH3 CH(CH3) CH2 CH3 ; CH3 (CH3)C(CH3) CH3; Câu 3: 6 H 14 ? A. B. C. D. CH3 CH2 CH2 CH2 CH2 CH3 ; CH3 CH(CH3) CH2 CH2 CH3 ; CH3 CH2 CH(CH3) CH2 CH3; CH3 CH(CH3) CH(CH3)-CH3 ; CH3 (CH3)C(CH3) - CH2 Câu 4: 4 H 9 Cl ? A. B. C. D. C4H9Cl có k = (2.4 9 +2 - C x H y O z N t X u Na k =(2x-y+t+2 u òng CH2(Cl) CH2 CH2 CH3 ; CH3 CH(Cl) CH2 CH3 ; CH2Cl CH(CH3) CH3 ; CH3 (CH3)CCl Câu 5: 5 H 11 Cl ? A. B. C. D. C5H11Cl có k = (2.5 11 + 2 CH2(Cl) CH2 CH2 CH2 CH3 ; CH3 CH(Cl) CH2 CH2 CH3 ; CH3 CH2 CH(Cl) CH2 CH3 ; CH2(Cl) CH(CH3) CH2 CH3 ; CH2(Cl) CH2 (CH3)CH CH3 ; CH2(Cl) CH2 CH(CH3) CH3 ; CH3 CH(Cl) CH(CH3) CH3 ; CH2(Cl) (CH3)C(CH3) CH3 ; Câu 6: A. C 2 H 6 . B. C 3 H 8 . C. C 4 H 10 . D. C 5 H 12 . Cách 2: Ankan => CTTQ: CnH2n+2 => %C = MC/MY = 12n . 100% / (14n+2) = 83,33% 14,4n = 14n +2 Câu 7: n H 2n+1 A. ankan. B. C. D. xicloankan. (CnH2n+1)m CnmH2nm + m Câu 8: a. 2,2,3,3- A. 8C,16H. B. 8C,14H. C. 6C, 12H. D. 8C,18H. 2,2,3,3 tetrametyl butan ; tetrametyl 1 2 3 4 CH3 (CH3)C(CH3) (CH3)C(CH3) CH3 b. Cho ankan có CTCT là: (CH 3 ) 2 CHCH 2 C(CH 3 ) 3 . là: A. 2,2,4-trimetylpentan. B. 2,4-trimetylpetan. C. 2,4,4-trimetylpentan. D. 2--4-metylpentan. 5 4 3 2 1 Website : luyenthithukhoa.vn luyenthithukhoa.vn - 2 - (CH 3 ) 2 CHCH 2 C(CH 3 ) 3 Hay CH3 (CH3)CH CH2 (CH3)C(CH3) CH3 Q- trimetyl pentan =>A Câu 9: A. B. C. D. Câu 10: Cho iso- 2 A. 2. B. 3. C. 5. D. 4. Iso CH(CH3) CH3 CH(CH3) CH2 CH3 tác CH3 CH CH2 CH3 - 1 Câu 11:- A. 3. B. 4. C. 5. D. 6 Iso hexan => CH3 CH(CH3) CH2 CH CH3 CH CH2 CH2 CH3 Câu 12: Khi cho 2- 2 A. 1-clo-2-metylbutan. B. 2-clo-2-metylbutan. C. 2-clo-3-metylbutan. D.1-clo-3-metylbutan. 2 metyl butan : CH3 CH(CH3) CH2 CH3 I III II I CH3 CH CH2 CH3 Cl 1 2 3 4 CH3 C CH2 CH3 CH3 => 2 clo 2 metyl butan => B Câu 13: Khi clo hóa C 5 H 12 A. 2,2- B. 2-metylbutan. C. pentan. D.2- A. 2,2 (CH3)C(CH3)- CH3 CH3 C CH3 B. 2 metylbutan : CH3 CH(CH3) CH2 C. Pentan : CH3 CH2 CH2 CH2 D. 2 - 139 Câu 14: K A. CH 3 Cl. B. CH 2 Cl 2 . C. CHCl 3 . D. CCl 4 . n : CnH2n+2 +xCl2 => CnH2n+2-xClx + xHCl CH4 + xCl2 => CH4--xClx Website : luyenthithukhoa.vn luyenthithukhoa.vn - 3 - % Cl(CH4-xClx) = 35,5.x .100% / (16 + 34,5x) = 89,12% x = 3 - Câu 15: : metan, etan, propan và n- A. 1. B. 2. C. 3. D. 4. CH2 n CH2 CH2 Câu 16: 6 H 14 A. 2,2- B. 2-metylpentan. C. n-hexan. D. Xét A. 2,2 (CH3)C(CH3) CH2 CH3 CH3 CH3 C CH2 CH3 B.2 metyl pentan : CH3 CH(CH3) CH2 CH2 hexan => sp = 6 C. n hexan : CH3 CH2 CH2 CH2 CH2 CH3 CH CH CH3 CH3 Câu 17: Khi A. etan và propan. B. propan và iso-butan. C. iso-butan và n-pentan. D. neo-pentan và etan. Câu 18: A. 3,3- C. isopentan. B. 2,2-. D. 2,2,3-trimetylpentan Xem bài 13 => B . 2,2 Câu 19: A. 3-metylpentan. B. 2,3- C. 2-metylpropan. D. butan. Ankan : CnH2n+2 =>%C = MC / MX = 12n .100% / (14n + 2) = 83,72% n = 6 => C6H14 Xét A. 3 metylpentan : CH3 CH2 CH CH2 CH3 B.2,3 CH3 CH CH CH3 CH3 Câu 20: 2 Cl 2 A. 3. B. 4. C. 2. D. 5. VX = 6 => C6H14 2,3 CH3 CH CH CH3 CH3 Câu 21: A. 2,2- B. 2-metylbutan. C. pentan. D. etan. Website : luyenthithukhoa.vn luyenthithukhoa.vn - 4 - PT : CnH2n+2 +xCl2 => CnH2n+2--xClx và HCl 1mol CnH2n +2 nCnH2n+2-xCl = 1 ; nHCl = x mol M hh Y = (mCnH2n+2-xClx + mHCl) / (nCnH2n+2 xClx + nHCl) 35,75.2 = (14n+2 +34,5x + 35,5x) / (1 + x) 0,5x + 69,5 = 14n => n> 69,5/14 =4,96 mono => A: 2,2 - CH3 CH3 C CH3 => A Câu 22: 2 CH 3 CH 2 CH 3 (a), CH 4 (b), CH 3 C(CH 3 ) 2 CH 3 (c), CH 3 CH 3 (d), CH 3 CH(CH 3 )CH 3 (e) A. (a), (e), (d). B. (b), (c), (d). C. (c), (d), (e). D. (a), (b), (c), (e), (d) CH4(b) ; c là neo- Câu 23: A. metan. B. etan C. neo-pentan D. Chính là bài 22 => D Câu 24: - (1) CH 3 C(CH 3 ) 2 CH 2 Cl; (2) CH 3 C(CH 2 Cl) 2 CH 3 ; (3) CH 3 ClC(CH 3 ) 3 A. (1); (2). B. (2); (3). C. (2). D. (1) Chính là neo (CH3)C(CH3)-CH2CL => D Câu 25: Có bao nhiêu ankan A. 4. B. 2. C. 5. D. 3. - Xem bài 15: CH4 => có 1 ; C2H6 có 1 ; C3H8 có 2 ;C4H10 có n butan có 1 ; CH3 CH(CH3)-CH3 có 1 Câu 26: Ankan Y 2 A. butan. B. propan. C. Iso-butan. D. 2-metylbutan. PT : 2CnH2n+2 + 2xBr2 => CnH2n+2 xBrx + CnH2n+2-xBrx + 2xHBr M CnH2n+1Br= 61,5.2 14n + 81 = 123 Câu 27: 2 O > 2 A. C n H n B. C n H 2n+2 C. C n H 2n-2 D. Ta luôn có x : y = nCO2 : 2nH2O 2x : y = nCO2 : nH2O C.CnH2n-2 => 2x : y = 2n / (2n- y + 2)/2 => nH2O > nCO2 và nX = nH2O nCO2 9O2 - TH3 : CT : CnH2n-2Oz ; có k =2 => nH2O < nCO2 và nX = nCO2 nH2O nCO2 nH2O = nCO2 ; nX = nCO2 nH2O TH1 : CnH2n+2Oz + O2 => nCO2 + (n+1)H2O ol => nH2O > nCO2 [...]... nH2O = nCO2 trường hợp anken đốt cháy => trừ cho nhau triệt tiêu => còn lại nH2O – nCO2 = n ankan” => nhỗn hợp ankan = 0,7 – 0,5 = 0,2 mol n hỗn hợp anken = nhỗn hợp A – nhỗn hợp Ankan = 0,3 – 0,2 = 0,1 mol => V = 2,24 lít Bài tập tương tự trong tờ phương pháp giải nhanh hóa hữu cơ” Câu 62: Đốt cháy hoàn toàn hỗn hợp A gồm CH4, C2H2, C3H4, C4H6 thu được x mol CO2 và 18x gam H2O Phần trăm thể tích... nCO2 = nhỗn hợp 0,4 – nCO2 = 0,1 nCO2 = 0,3 => V = 6,72 lít => B “Xem lại CT bài 27” Câu 61: Đốt cháy hoàn toàn 6,72 lít hỗn hợp A (đktc) gồm CH4, C2H6, C3H8, C2H4 và C3H6, thu được 11,2 lít khí CO2 (đktc) và 12,6 gam H2O Tổng thể tích của C2H4 và C3H6 (đktc) trong hỗn hợp A là: A 5,60 B 3,36 C 4,48 D 2,24 Hỗn hợp A gồm ankan “CH4;C2H6;C3H8” và anken “C2H4 và C3H6” nH2O – nCO2 = nhỗn hợp ankan... mol 2 (3n+1) Sau khi ngưng tụ hơi nước => n hỗn hợp sau = nO2 dư + nCO2 tạo thành = 4 – + n 2 n trước pứ = nAnkan + nO2 = 1 + 4 = 5 mol Ta có : n hỗn hợp ban đâu / n hỗn hợp sau = P1.V n1 T.0,082 P1 P1 = = = =2 P2.V n2 P2 P1 T.0,082 2 “Vì thể tích không thay đổi + Nhiệt độ không thay đổi + Áp suất giảm 1 nửa” 5 10 => =2 =2 n= 2 => C2H6 Bài này tổng quát mình quên là 1 chất => không phải n mà... Hỗn hợp khí đều là ankan => n hỗn hợp = nH2O – nCO2 = 1,6 – 1 = 0,6 => V = 13,44 lít = > C luyenthithukhoa.vn - 11 - Website : luyenthithukhoa.vn Câu 66: Khi đốt cháy hoàn toàn 7,84 lít hỗn hợp khí gồm CH4, C2H6, C3H8 (đktc) thu được 16,8 lít khí CO2 (đktc) và x gam H2O Giá trị của x là: A 6,3 B 13,5 C 18,0 D 19,8 Tương tụ bài 65 => D “nH2O = nhỗn hợp ankan + nCO2” Câu 67: Khi đốt cháy hoàn toàn hỗn hợp. .. - nCO2 Câu 68: Nạp một hỗn hợp khí có 20% thể tích ankan A và 80% thể tích O2 (dư) vào khí nhiên kế Sau khi cho nổ rồi cho hơi nước ngưng tụ ở nhiệt độ ban đầu thì áp suất trong khí nhiên kế giảm đi 2 lần Thiết lập công thức phân tử của ankan A A CH4 B C2H6 C C3H8 D.C4H10 Hỗn hợp 20% V ankan A và 80% V O2 => Tỉ lệ thể tích = tỉ lệ số mol => 4nA = nO2 chọn nA = 1 mol => nO2 = 4 mol (3n+1) PT : CnH2n+2... 2 / (3-2) =2 => C2H6 “Hoặc thấy cùng số C => n=2” =>D Câu 70: Nung m gam hỗn hợp X gồm 3 muối natri của 3 axit no đơn chức với NaOH dư thu được chất rắn D và hỗn hợp Y gồm 3 ankan Tỷ khối của Y so với H2 là 11,5 Cho D tác dụng với H2SO4 dư thu được 17,92 lít CO2 (đktc) a Giá trị của m là: A 42,0 B 84,8 C 42,4 D 71,2 Axit no đơn chức => k = 0 “Gốc hidrocabon” ; m = 1 “Số chức” => CnH2n +2 - 1 COOH “... 30% B 40% C 50% D 60% Thu được x mol CO2 và 18x g H2O => nCO2 = nH2O = x mol => giống trường hợp k = 1 Hỗn hợp A chứa ankan là CH4 “k=0” và ankin :C2H2 ; C3H4 ; C4H6 “k=2” Để thành k =1 => nCH4 = nC2H2 + nC3H4 + nC4H6 => %CH4 = 50% “Một nửa” Câu này mày không rõ cách giải thích Câu 63: Đốt cháy hoàn toàn hỗn hợp khí X gồm 2 hiđrocacbon A và B là đồng đẳng kế tiếp thu được 96,8 gam CO 2 và 57,6 gam H2O... và H2O bị hấp thụ hết khi qua Ca(OH)2 còn lại O2” nO2 dư = PV/T.0,082 = 0,4.11,2 / 273.0,082 = 0,2 mol => nO2 pứ = 2 – 0,2 = 1,8 mol Đáp án => A, B đều là Ankan ; nCO2 = nCaCO3 = 1 mol (3n+1) O2 => n CO2 + (n+1)H2O PT : CnH2n+2 + 2 Ta có: 1,8 1 (3n+1) => 1 = 1,8n n=1,67=>n=1và n =2 =>A “Nhân chéo” 2 Câu 65: Khi đốt cháy hoàn toàn V lít hỗn hợp khí gồm CH4, C2H6, C3H8 (đktc) thu được 44 gam CO2... hồ quang được V lít hỗn hợp A (đktc) chứa 12% C2H2 ;10% CH4 ; 78%H2 (về thể tích) Giả sử chỉ xảy ra 2 phản ứng: 2CH4 C2H2 + 3H2 (1) CH4 C + 2H2 (2) Giá trị của V là: A 407,27 B 448,00 C 520,18 D 472,64 Câu 60: Đốt cháy hoàn toàn 2,24 lít hỗn hợp A (đktc) gồm CH4, C2H6 và C3H8 thu được V lít khí CO2 (đktc) và 7,2 gam H2O Giá trị của V là: A 5,60 B 6,72 C 4,48 D 2,24 Hỗn hợp A đều là ankan hay có... B 84,8 C 42,4 D 71,2 Axit no đơn chức => k = 0 “Gốc hidrocabon” ; m = 1 “Số chức” => CnH2n +2 - 1 COOH “ Xác định theo cách 1” Hay CnH2n +1 COOH => Muối : CnH2n +1 COONa “SGK 11 nc – 252” “Tính chất hóa học như axit” luyenthithukhoa.vn - 12 - Website : luyenthithukhoa.vn PT : CnH2n +1 COONa +NaOH => CnH2n +2 (hhY) + Na2CO3 (D) (1) “Pứ điều chế ankan –SGK 11nc – 146” Ta có Na2CO3 + H2SO4 => Na2SO4 + . 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 7No0 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. 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