đề thi thử chuyên vinh 2014

... www.MATHVN.com – Toán học Việt Nam DeThiThuDaiHoc.com fb.com/ThiThuDaiHoc 1 TRƯỜNG ĐẠI HỌC VINH TRƯỜNG THPT CHUYÊN ĐỀ KHẢO SÁT CHẤT LƯỢNG LỚP 12, LẦN 1 - NĂM 2014 Môn: TOÁN; Khối: A và A1; ... www.MATHVN.com – Toán học Việt Nam DeThiThuDaiHoc.com fb.com/ThiThuDaiHoc 2 TRƯỜNG ĐẠI HỌC VINH TRƯỜNG THPT CHUYÊN ĐÁP ÁN ĐỀ KHẢO SÁT CHẤT LƯỢNG LỚP 12, LẦN 1 - NĂM 2014 Môn: TOÁN – Khối A, A1; ... www.MATHVN.com – Toán học Việt Nam DeThiThuDaiHoc.com fb.com/ThiThuDaiHoc 5 Tâm mặt cầu (S) là ( 2; 1; 2 2) .I t t t d− − + + ∈ Vì (S) tiếp...

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... www.MATHVN.com – www.DeThiThuDaiHoc.com www.MATHVN.com – www.DeThiThuDaiHoc.com 1 Sở GD&ĐT Vĩnh Phúc Trường THPT Bình Xuyên ĐỀ THI KHẢO SÁT ĐẠI HỌC LẦN 3 NĂM 2014 Môn thi: TOÁN 12 - KHỐI ... không sử dụng tài liệu, cán bộ coi thi không giải thích gì thêm. Họ tên thí sinh: SBD: www.MATHVN.com – www.DeThiThuDaiHoc.com www.MATHVN.com – www.DeThiThuDaiHoc.com 3 24sinx.sin x ... www.MATHVN.com – www.DeThiThuDaiHoc.com www.MATHVN.com – www.DeThiThuDaiHoc.com 4 A'OA∠là góc giữa mp(A'BD) với đáy →oA 'OA 60∠ =. Do oABC 60∠ = nên tam giác ABC đều→aAO2=....

... trình đã cho tương đương: 0,25www.DeThiThuDaiHoc.comwww.MATHVN.com SỞ GIÁO DỤC VÀ ĐÀO TẠO CẦN THƠTRƯỜNG THPT CHUYÊN LÝ TỰ TRỌNGĐỀ THI TUYỂN SINH ĐẠI HỌC NĂM 2014 Môn: TOÁN; Khối A và khối A1Thời ... làm bài: 180 phút, không kể phát đề ĐỀ THI THỬPHẦN CHUNG CHO TẤT CẢ THÍ SINH (7,0 điểm)Câu 1 (2,0 điểm). Cho hàm số 3 22 3 5y x x= - +(1)a) Khảo sát sự biến thi n và vẽ đồ thị (C) của hàm ... )id({1;2; 3}i Œ) thỏa mãn khoảng cách từ A đến các đường thẳng ( )idđều bằng 4 và khoảng cách từ B đến các đường thẳng ( )idđều bằng 6.Câu 8.a (1,0 điểm). Trong không gian với hệ tọa độ Oxyz...

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 TRƯỜNG THPT CHUYÊN NGUYÊN TẤT THÀNH (Đề có 01 trang) ĐỀ THI THỬ ĐẠI HỌC LẦN THỨ 2 NĂM 2014 Môn: TOÁN Thời gian làm bài: 180 phút, không kể giao đề. I. PHẦN CHUNG CHO TẤT ... 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TẤT CẢ THÍ SINH (7 điểm) Câu 1. (2 điểm) Cho hàm số x 2yx 1. (1) a) Khảo sát sự biến thi n và vẽ đồ thị hàm số (1). b) Tìm m để đường thẳng d: y = -x + m cắt đồ thị hàm số (1) tại...

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... = −. 0,25 HẾT www.DeThiThuDaiHoc.comwww.MATHVN.com TRƯỜNG THPT CHUYÊN QUỐC HỌC – HUẾ ĐỀ THI THỬ ĐẠI HỌC LẦN 2 Tổ Toán Môn: TOÁN; khối D – Năm học: 2013 - 2014 Thời gian: 180 phút ... Gọi G là hình chiếu vuông góc của S trên mặt phẳng (ABCD). Vì tứ diện SABD đều nên G là trọng tâm của tam giác đều ABD. Ta có 2322ABCD ABDaS S∆= = . 0,25 Trong tam giác vuông ... (không kể thời gian phát đề) I. PHẦN CHUNG CHO TẤT CẢ THÍ SINH (7,0 điểm) Câu 1 (2,0 điểm). Cho hàm số 3 23 2 (1)= − +y x mx , m là tham số thực. a) Khảo sát sự biến thi n và vẽ đồ thị của...

... − + − a. TXĐ D= ℝ b. Giới hạn lim ; limx xy y→−∞ →+∞= +∞ = −∞ 0.25 c. Chiều biến thi n 2' 3 3y x= − +;' 0 1y x= ⇔ = ± Hàm số nghịch biến trên các khoảng ( ; 1);(1; ... số đạt cực tiểu tại 1; 4CTx y= − = −, đạt cực đại tại 1; 0CÐx y= = 0.25 d. Bảng biến thi n x −∞ 1− 1 +∞ y’ - 0 + 0 - y 0 -4 −∞ 0.25 I.1 e. Đồ thị Điểm ... ≥ Biến đổi phương trình sau thành 1 3xy xy x x xy+ = + rồi thế 1x xy xy= + + (cả hai vế đều dương) vào pt ta được 1 1 3(1 )xy xy xy xy xy xy xy+ = + + + + + 0.25 Biến đổi phương trình...