bài tập vật lý bậc đại học tham khảo

... gian là lúc vật thứ nhất qua A a. Viết phương trình tọa độ của hai vật. b. Khi hai vật gặp nhau thì vật thứ nhất còn chuyển động không? Xác định thời điểm và vị trí gặp nhau. c. Khi vật thứ hai ... của một vật chuyển động thẳng là: X = 80t 2 + 50t + 10 (cm; s) a. Tính gia tốc của chuyển động. b. Tính vận tốc lúc t = 1s. c. xác định vị trí vật lúc vật có vận tốc là 130cm/s. 8. Một vật chuyển ... thứ ba 14. Một vật chuyển động nhanh dần đều với vận tốc đầu 36 km/h. Trong giây thứ tư kể từ lúc vật bắt đầu chuyển động vật đi được quãng đường 13,5m. Tìm gia tốc chuyển động của vật và quãng...

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ỄN VĂN TRUNG : 0915192169 BÀI TẬP ÔN THI HỌC SINH GIỎI QUỐC GIA VÀ QUỐC TẾ Bài 1: Sự phân hạch của các hạt nhân nặng Sự phân hạch là quá trình trong ... có A nuclon. Khối lượng riêng của một nuclon là 1.67∙10 -27 kg. Bài 5: Các phản ứng chuyển tải a. Trong vật lí hiện đại, năng lượng của các hạt nhân và các phản ứng của chúng được mô tả ... kết, bao gồm số hạng chính (thể tích), số hạng bổ chính bề mặt và bổ chính tĩnh điện thu được. Bài 3: Năng lƣợng liên kết của các hạt nhân nguyên tử – các số hạng thể tích và diện tích bề mặt....

... PHƯƠNG TRÌNH VÀ BẤT PHƯƠNG TRÌNH BÀI TẬP PHƯƠNG TRÌNH BẬC HAI CHỨA THAM SỐ – ĐỊNH LÝ VIETE (PHẦN 1) Bài 1. Giải và biện luận các phương trình sau theo tham số m 1.     2 2 4 2 2 1 ...    . Bài 167. Cho tam thức bậc hai   2 f x ax bx c    thỏa mãn     1 1;1 f x x    . Tìm giá trị lớn nhất của biểu thức 2 2 4 3 T a b   . Bài 168. Cho tam thức bậc hai   2 f ... định dấu của hệ số a. Bài 169. Cho tam thức bậc hai   2 f x ax bx c    thỏa mãn     1 1;1 f x x    . Chứng minh rằng 3 a b c    . Bài 170. Cho tam thức bậc hai   2 f x ax...

... VÀ BẤT PHƯƠNG TRÌNH BÀI TẬP PHƯƠNG TRÌNH BẬC HAI CHỨA THAM SỐ – ĐỊNH LÝ VIETE (PHẦN 3) Bài 1. Cho phương trình:   2 2 2 1 1 0 x m x m      (1); với m là tham số thực. 1. Giải ... 4. Thiết lập hệ thức liên hệ giữa các nghiệm độc lập với tham số m. Bài 66. Cho phương trình: 2 2 2 2 1 0 x mx m     (1); với m là tham số thực. 1. Tìm m để phương trình đã cho có nghiệm. ... Thiết lập hệ thức liên hệ giữa hai nghiệm độc lập với tham số m. Bài 7. Cho phương trình: 2 2 6 9 2 2 0 x mx m m      (1); với m là tham số thực. 1. Tìm m để phương trình đã cho có nghiệm...

... được ảnh của vật ta cần điều chỉnh A. tiêu cự của vật kính B. khoảng cách từ vật kính đến phim C. khoảng cách từ vật đến vật kính D. khoảng cách từ vật đến vật kính và khoảng cách từ vật kính đến ... 29 B 39 A 49 A 59 D 10 A 20 B 30 A 40 D 50 C 60 C 10 ĐỀ THI THỬ ĐẠI HỌC SỐ 8 ĐỀ THI THỬ ĐẠI HỌC MÔN VẬT LÝ KHỐI A Thời gian làm bài: 90 phút; (50 câu trắc nghiệm) Họ, tên thí sinh: Số báo danh: ... gian của momen động lượng của vật rắn là đại lượng A. Mômen lực tác dụng vào vật B. Động lượng của vật C. Hợp lực tác dụng vào vật D. Mômen quán tính tác dụng lên vật Câu 50: Một momen lực có...

... .Từ VTCB kéo vật ra 1 đoạn 6cm rồi truyền cho vật vận tốc 20 14 cm/s hướng về VTCB .Biết rằng hề số ma sát giữa vật và mặt phẳng ngang là 0.4 ,lấy g = 10m/s 2 . Tốc độ cực đại của vật sau khi ...  2 = 12 k m +m LÀ LẠ & KHO KHÓ Phiên bản 1.0 Tuyển tập các câu hỏi vật lý khó nhằn từ các đề thi thử đại học trên toàn quốc – kèm lời giải chi tiết và bình luận. GSTT GROUP ... là 4cm nên suy ra biên độ A = 2cm. Khi vật m dao động hợp của lực điện trường và lực đàn hồi gây gia tốc a cho vật. Tại vị trí biên, vật có gia tốc cực đại. Khi đó ta có: F đ – F đh = m.a max ...

... ra đ- ợc gọi là hoạ âm bậc 2 + Khi n = 3 31 3v f 3f 2 : âm phát ra đ- ợc gọi là hoạ âm bậc 3 + Khi n = k k1 kv f kf 2 : âm phát ra đ- ợc gọi là hoạ âm bậc k - Nh- vậy: mỗi dây ... nhờ cộng h- ởng Tách sóng: tách sóng âm tần ra khỏi sóng cao tần biến điệu Khuếch đại âm tần: khuếch đại âm tần rồi đ- a ra loa để tái lập âm thanh Loa: chuyển dao động điện thành dao động ... khi = 0 thì biên độ dao động điện(I 0 ) trong khung đạt cực đại hiện t- ợng này gọi là sự cộng h- ởng. Giá trị cực đại của biên độ cộng h- ởng phụ thuộc vào điện trở thuần R: - Nếu...

... kéo về phụ thuộc vào khối lượng của vật nặng. C. Gia tốc của vật phụ thuộc vào khối lượng của vật. D. Tần số góc của vật phụ thuộc vào khối lượng của vật. Câu 98. Con lắc đơn dao động điều ... năng đạt giá trị cực đại khi vật chuyển động qua VTCB. B. Động năng đạt giá trị cực tiểu khi vật ở một trong hai vị trí biên. C. Thế năng đạt giá trị cực đại khi gia tốc của vật đạt giá trị cực ... với biên độ A. Khi vật có li độ 2 3A thì vận tốc của nó bằng A. độ lớn vận tốc cực đại B. bằng không C. một nữa vận tốc cực đại D. 2 3 độ lớn vận tốc cực đại Câu 61.Một vật dao động điều...

... dời của vật . . . . . . 64 2.Hệqủa 64 Chủ đề 7. Cho biết tiêu cự f và một điều kiện nào đó về ảnh, vật: xác định vị trí vật dvà vị trí ảnh d ′ 64 Th.s Trần AnhTrung 7 Luyện thi đại học www.VNMATH.com Phương ... về điện. Xác định điện thế cực đại của qủa cầu: . . . . . . . . . . . . . . 105 Th.s Trần AnhTrung 12 Luyện thi đại học www.VNMATH.com Phương pháp giải toán Vật Lý 12 Trường THPT - Phong Điền Chủ ... ( hay ω) để hiệu thế hiệu dụng ở hai đầu tụ điện cực đại: Th.s Trần AnhTrung 49 Luyện thi đại học www.VNMATH.com Phương pháp giải toán Vật Lý 12 Trường THPT - Phong Điền 2.Nối quả cầu với một...

... đề vật lý 12 - 12 - GV : Nguyễn Hữu Lộc + vật 2 lần liên tiếp đi qua x = ± A 2 2 thì Δt = T 4 Vận tốc trung bình của vật dao dộng lúc này : v = S t ∆ ∆ , ΔS được tính như dạng 3. 4 − Bài tập ... 2 1 2 1 1 1 T T T = + 2 – Bài tập : a – Ví dụ : 1. Con lắc lò xo gồm vật m và lò xo k dao động điều hòa, khi mắc thêm vào vật m một vật khác có khối lượng gấp 3 lần vật m thì chu kì dao động ... 5 6 π . 3 – Bài tập : a – Ví dụ : 1. Một vật dao động điều hòa với biên độ A = 4cm và T = 2s. Chọn gốc thời gian là lúc vật qua VTCB theo chiều dương của quỹ đạo. Phương trình dao động của vật là...

... sáng bậc 4 và bậc 5 nhưng không có bức xạ tạo vân sáng bậc 6 là: A. B. C. D. Trên hình vẽ ta có: NP là vùng phủ nhau của quang phổ bậc 5 và bậc 4 OP là vùng phủ nhau của quang phổ bậc 5, bậc ... năng cực đại của cả 2 vật là E0=0,18J. Hỏi trong quá trình dao động 2 vật tiến tới khoảng cách gần nhau nhất là bao nhiêu? Biết khi ở vị trí cân bằng của mỗi vật thì khoảng cách của 2 vật là l0=12cm A. ... thời thả nhẹ cả ba vật thì trong quá trình dao động cả ba vật luôn thẳng hàng? Giải Do AB=BC nên 3 vật luôn thẳng hàng khi 3 vật dao động cùng pha. Khi ở vị trí biên thì 3 vật thẳng hàng do...

... 30. Một vật đang đứng yên chịu tác dụng của ngoại lực biến đổi theo thời gian nên vật bắt đầu dao động cưỡng bức với đặc điểm giá trị cực đại của li độ sau gấp đôi cực đại trước. Đến khi vật có ... 20. Một vật đang đứng yên chịu tác dụng của ngoại lực biến đổi theo thời gian nên vật bắt đầu dao động cưỡng bức với đặc điểm giá trị cực đại của li độ sau gấp đôi cực đại trước. Đến khi vật có ... ĐỀ SỐ 2 ĐỀ THI THỬ ĐẠI HỌC NĂM 2012 Câu 14. Một vật dao động điều hòa theo phương trình x = Acosωt. Sau khi đi được quãng đường S = (5 − √ 2 2 ).A, kể từ thời điểm t = 0, vật có vận tốc là? ☛ ✡ ✟ ✠ A 2ω 2 A √ 2 . ☛ ✡ ✟ ✠ B −ωA √ 2 . ☛ ✡ ✟ ✠ C ωA 2 √ 2 . ☛ ✡ ✟ ✠ D 3ωA √ 5 . Câu...