bai tap ve duong tron ngoai tiep duong tron noi tiep

... ).2/4sin(5   . Hãy xét xem vật đi qua vị trí cân bằng bao nhiêu lần trong các khoảng thời gian sau và tính quãng đường đi được trong khoảng thời gian đó a) t= 5s b ) t= 8,2s c) t= 10,6s Bài 12 ... đường dài nhất và quãng đường nhỏ nhất mà vật đi trong một phần tư chu kì ? Bài 14 : Một vật dao động điều hòa với chu kì T. Khoảng thời gian trong 1 chu kì, thời gian vận tốc của vật lớn hơn ... biên độ A. Quãng đường vật đi được tối đa trong thời gian 5T/3 là ? Bài 16 : Một vật dao động điều hòa với phương trình tx  4cos4 cm. Quãng đường vật đi trong 2,875s là ? Câu 17: Vật dao động...

... đờng tròn thì Ã Ã BMD BCD+ không đổi c) DB . DC = DN . AC Cõu2 : Cho tứ giác ABCD nội tiếp trong đờng tròn tâm O . Gọi I là giao điểm của hai đờng chéo AC và BD , còn M là trung điểm của...

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...

... bài tập công suất trong mạch điện RLC nối tiếp SV thực hiện: Lê Anh, Tố Ái, Quốc Khánh, Phương Dung, Hữu Cầu, Ngọc Diểm, Minh Khánh │Trang 1/16 Lời mở đầu Điện học là một trong những phần ... chiếm khá nhiều điểm trong các bài kiểm tra, đơn giản bởi vì nó chứa khá nhiều dạng bài tập hay và rất phong phú. Ở chương trình 12, Điện xoay chiều là phần không thể thiếu trong các kì thì học ... “Phân loại các dạng bài tập Công suất trong mạch RLC nối tiếp” để giúp các bạn học sinh có một cái nhìn tổng quát hơn về công suất – một phần đặc thù trong dòng điện xoay chiều. Dù chỉ xoáy...

... của đoạn AB. BT 48: Trong mặt phẳng Oxy cho họ đường tròn: Chứng minh rằng học luôn tiếp xúc với hai đường thẳng cố định. BT 49: Trong mặt phẳng Oxy cho họ đường tròn: b) Trong trường hợp (C') ... R = nằm trong góc nhọn của hai đường thẳng (d) và ( ) và tiếp xúc với chúng. BT 74 : Trong không gian Oxy cho 2 đường tròn : .Lập phương trình tiếp tuyến chung của 2 đường tròn BT 75: Trong mặt ... đường tròn (C) qua đường thẳng (d): . BT28: Trong mặt phẳng Oxy cho đường tròn (C) : .Viết phương trình các tiếp tuyến của (C) đi qua điểm F (0; 3) BT29: Trong mặt phẳng với hệ tọa độ Oxy, cho đường...

... tròn cắt nhau 2 R r < d < R + r * Hai đờng tròn tiếp xúc nhau - Tiếp xúc ngoài - Tiếp xúc trong 1 d = R + r d = R - r * Hai đờng tròn không giao nhau - ở ngoài nhau - (O) đựng (O / ) Đặc ... R r OO / = 0 3. Giao điểm của hai tiếp tuyến chung ngoài , giao điểm của hai tiếp tuyến chung trong (nếu có) đều nằm trên đờng nối tâm . Các dạng bài tập Dạng 1: Các bài toán cho hai đờng ... 1 c 1 j 2 2 1 2 1 O / O A C B y x B Trờng THCS An Đà Tam giác BCK vuông tại C , đờng cao CA nên CA 2 = AB . AK ( HTL trong tam giác vuông ) Suy ra AK = 9 4 6.6 2 == AB CA (cm) Do đó KE = AK = 9 cm Tứ giác BDEK có...

... a) nêu cách dựng đờng tròn (O) đi qua B , D và có tâm nằm trên cạnh AB. b) Nêu cách dựng đờng trond (O / ) di qua C , D và có tâm nằm trên cạnh AC. c) Tứ giác AODO / là hình gì ? d) Chứng minh...

... đặc tính nhiên liệu của ng c l: G T = Qì n t (3) => g e = G T N e = Qì n N e ìt (4) Trong đó: N e là công suất có ích của động cơ (kw) n e là số vòng quay trục khuỷu ứng với ... M e , G T và g e ( ở đây ta chọn xe có số vòng quay cực đại là 5600 vòng/ph và cho xe đi trong 1h với lượng tiêu hao nhiên liệu là 10L/100km) Ứng với mỗi giá trị n e thì ta có các kết...

... để sử dụng lại sau này. Các bạn có thể lấy ý tưởng trong phần hướng dẫn và tiến hành vẽ bằng CorelDraw để ôn tập thêm cho chương trình này. Trong phim hoạt hình, chúng ta cần phải xử lý ảnh của ... bạn một nhân vật trông thật vui nhộn. Nếu cố gắng luyện tập giỏi môn này, trong tương lai bạn sẽ là một chuyên gia trong lãnh vực vẽ và làm phim hoạt hình trên máy tính. Nhớ lưu lại kết quả! ... các bài tập vẽ các đoạn thẳng trong 5 bài tập trước đã được thực hiện thì bài tập kế tiếp này sẽ dễ dàng với bạn. Bài tập này các bạn vẽ một hình khối chữ nhật trong không gian. Đầu tiên...

... suy ra 3 7 5 2 2 HM = − = . Trong tam giác vuông HAM ta có 2 2 2 2 49 3 13 ' 4 4 4 AB MA IH R= + = + = = Vậy (C') : ( ) ( ) 2 2 5 1 13x y + = . BT29. Trong mặt phẳng với hệ tọa độ ... thẳng chứa cạnh (BC). Giải Do là các đường cao cho nên tứ giác AC'IB' là từ giác nội tiếp trong đường tròn có đường kính là AI, C'B' là một dây cung vì vậy AA' vuông góc ... lập luận trên ta tìm ra phương trình các cạnh của tam giác ABC : ( ) : 3 2 2 0AB x y− + = BT78. Trong (Oxy) cho hai điểm ( ) ( ) 2 3;2 , 2 3; 2A B − a) Chứng tỏ tam giác OAB là tam giác đều b)...

... đều. Bài 3. Cho hai dây bằng nhau và cắt nhau tại một điểm I nằm trong đường tròn. Chứng minh rằng: a. IO là tia phân giác của một trong hai góc tạo bởi hai dây AB và CD. b. Điểm I chia hai dây...

... cho và đều cắt b. Gọi và lần lượt là giao điểm của với ( nằm trong góc phần tư thứ nhất). Gọi và lần lượt là giao điểm của với ( nằm trong góc phần tư thứ hai).Hãy tìm sao cho hình thoi có diện ... phân giác trong của góc 24. Cho hypebol Hãy tìm quỹ tích những điểm trên mặt phẳng sao cho từ ta kẻ được hai tiếp tuyến tới m 2 tià ếp tuyến đó vuông góc với nhau 25. Cho hypebol 1.Trong mặt ... giác MNPQ nhỏ nhất. 3.Trong mặt phẳng với hệ tọa độ Oxy cho elip (E) : Viết phương trình tiếp tuyến với (E) biết tiếp tuyến qua điểm M(6; 0). Tìm tọa độ tiếp điểm . 4.Trong mặt phẳng với hệ...