đặc trưng hình học của mặt cắt ngang

... Đặc tr-ng hình học của mặt cắt ngang Trong ch-ơng kéo nén đúng tâm, ta đà biết khả năng chịu lực của mặt cắt ngang chỉ phụ thuộc vào diện tích của mặt cắt ngang mà không phụ thuộc vào hình ... J p =J đăc -J rỗng =0.1D 4 (1- 4 ) 3 Các phép biến đổi hệ trục toạ độ Hầu hết các mặt cắt ngang ngoài thực tế đều là các hình ghép bởi các hình đơn giản, cho nên khi chuyển về hệ trục toạ độ chung ta phải ... công thức xác định mô men tĩnh của hình phẳng và đồng thời cũng là công thức xác định trong tâm của hình phẳng khi biết mmô men tĩnh và diện tích. Trong tr-ờng hợp hình phẳng bao gồm các hính...

... hình dáng) H ình 4.10 Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 27 Chơng 4. đặc trng hình học của mặt cắt ngang - Các thuyết bền A. Đặc trng hình học của mặt cắt ... bn c vit l: Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 30 = xy xy 2J tg JJ (4.11) VI. Mômen quán tính của một số mặt cắt ngang 1. Hình chữ nhật (hình 4.6) Hệ trục đối ... (m 3 ) (4.2) Hình 4. 2 Hình 4.1 a) c) b) 4a 4a a 0,7D D d a P P Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 33 l những giả thuyết về nguyên nhân phá hoại của vật liệu,...

... Xét mặt cắt ngang có diện tích A . Tại điểm M(x,y) thuộc mặt cắt ngang lấy vi phân diện tích Da. a. Mô men tĩnh của mặt cắt ngang A đối với trục Ox: (4.1) Mô men tĩnh của mặt cắt ngang ... giá trị âm. 4.1.4. Công thức chuyển trục song song Mặt cắt ngang ngang A trong hệ trục ban đầu Oxy có các đặc trưng hình học mặt cắt ngang là S x , S y , I x , I y , I xy . Hệ trục mới O'uv ... diện tích mặt cắt ngang đối với nó bằng 0. 4. Hệ trục quán tính chính trung tâm của diện tích mặt cắt ngang: là hệ trục quán tính chính, có gốc tọa độ trùng với trọng tâm mặt cắt ngang. 4.1.3....

... lớn phụ thuộc vào hình dạng, kích thước của mặt cắt ngang - đặc trưng hình học của mặt cắt ngang F y x z y x z F University of Architechture Chương 4 ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG ... tích mặt cắt ngang • Thanh tiết diện chữ nhật khả năng chịu lực theo hai phương x, y khác nhau • Khả năng chịu lực của thanh phụ thuộc vào diện tích, hình dáng, cách sắp xếp, của mặt cắt ngang • ... 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4. Đặc trưng hình học của mặt cắt ngang 4.1. Khái niệm chung 4.2. Mômen tĩnh và các mô men quán tính 4.3. Mô men quán tính một số hình đơn giản 4.4. Công thức chuyển...

... vào hình dạng, kích thướccủamặtcắt ngang - đặctrưng hình họccủamặtcắt ngang F y x z y x z F (5)25 Jul y 2010 Tran Minh Tu - University of Civil Engineering 4.1. Khái niệm chung Hình dạng các mặt ... d ụ 4.6.1. Cho mặtcắt ngang có hình dạng và kích thướcnhư hình vẽ.Xác định các mô men quán tính chính trung tâm củamặtcắt ngang Gi ả i: Chọn hệ trụctoạ độ ban đầu x 0 y 0 như hình vẽ. Chia mặtcắt ngang làm ... có gốc tọa độ trùng với trọng tâm mặt cắt ngang. Hệ trục quántính chính của diện tích mặt cắt ngang: là hệ trục mà mô men quántính ly tâm của diện tích mặt cắt ngang đối với nó bằng 0. () xy A I...

... trung tâm 4. Trọng tâm mặt cắt ngang III. MOMEN QUÁN TÍNH CỦA MẶT CẮT NGANG IV. MOMEN QUÁN TÍNH CỦA MỘT SỐ MẶT CẮT NGANG 1. Xác định momen quán tính của mặt cắt ngang hình chữ nhật đối với ... dương của các đại lượngĠgọi là bán kính quán tính của mặt cắt đối với các trục tương ứng CHƯƠNG 5 ÐẶC TRƯNG HÌNH HỌC CỦA MẶT CẮT NGANG I. KHÁI NIỆM II. MOMEN TĨNH CỦA MẶT CẮT NGANG ... trưng cho hình dạng của mặt cắt ngang về hình học. Ðó là momen tĩnh và momen quán tính. II- MOMEN TĨNH CỦA MẶT CẮT NGANG 1. Momen tĩnh đối với một trục TOP Ta gọi momen tĩnh của mặt cắt ngang...

... bình của toàn bộ khối nước của sông, hồ. Thông thường ở sông có nước chảy thì nhiệt độ của nước đồng đều hơn ở những sông hồ nước tĩnh, ít lưu động.  Nhiệt độ hồ chứa nước Cấm Sơn ở tầng mặt ... những đặc điểm đầu tiên có lợi về mặt sinh thái học đối với sinh vật và cá. Đối với những hồ cỡ lớn như Cấm Sơn, Thác Bà quanh năm luôn có những tầng nước ổn định thích hợp cho sự sinh sống của ... dần). ở giai đoạn này chất đáy của hồ của hồ đã được tự nhiên hóa (đáy hồ đã có PH biến động theo tầng nước thể hiện tương đối rõ rệt. ở hồ chứa nước Cấm Sơn pH tầng mặt là 7,6- 8,2 nhưng ở tầng...

... do đặc điểm thủy văn và địa hình quyết định, độ trong của các hồ chứa nước ở nước ta nhìn chung lớn hơn ở các hồ thiên nhiên và sông (trung bình khoảng 80-120cm) ĐẶC ĐIỂM LÝ, HÓA HỌC CỦA MẶT ... khí và ở các ao, ruộng nhỏ. Đồng thời một số đặc điểm về sự thay đổi nhiệt độ nước theo tầng là những đặc điểm đầu tiên có lợi về mặt sinh thái học đối với sinh vật và cá. Đối với những hồ ... bình của toàn bộ khối nước của sông, hồ. Thông thường ở sông có nước chảy thì nhiệt độ của nước đồng đều hơn ở những sông hồ nước tĩnh, ít lưu động.  Nhiệt độ hồ chứa nước Cấm Sơn ở tầng mặt...

... số đặc điểm và khả năng sản xuất của các nhóm bò lai giữa bò laisind với bò sữa gốc Hà Lan". Luận án Phó tiến sĩ khoa học Nông nghiệp, 1986. Phạm Ngọc Thiệp, (2003). "Một số đặc ... phú và mất cân đối đà làm cho đàn bò cha phát huy tốt tiềm năng sinh học của chúng. 3.2. Tình hình sức khoẻ và bệnh tật của đàn bò Holstein Frisian 3.2.1. Hàm lợng hồng cầu, bạch cầu và Hemoglobin ... theo phơng pháp thống kê sinh học trên phầm mềm Excel 5.0 3. Kết quả và thảo luận 3.1. Sức sản xuất sữa của đàn bò Holstein Friesian 3.1.1. Thời gian cho sữa của đàn bò Holstein Friesian...

... sinh hoạt của sâu trởng thành Sau khi thu thập mẫu ngoài rừng về chăm sóc nuôi trong phòng hàng ngày theo dõi các tập tính của chúng nh sự di chuyển của sâu, thời gian ăn của sâu, hình thức ... sự lựa chọn thức ăn của loài sâu này. Hình 5.10: Sự lựa chọn loại lá thức ăn của Bọ lá xanh tím 5.4.1.4- Xác định lợng thức ăn của Bọ lá xanh tím Trong vòng đời của Bọ lá xanh tím ... (Chrysomelidae). Để góp phần nhỏ bé của mình vào công tác quản lý bảo vệ rừng của địa phơng, nhằm ngăn chặn dịch sâu hại tôi tiến hành thực hiện đề tài Nghiên cứu đặc điểm sinh học của côn trùng thuộc Bộ...

... số đặc điểm và khả năng sản xuất của các nhóm bò lai giữa bò laisind với bò sữa gốc Hà Lan". Luận án Phó tiến sĩ khoa học Nông nghiệp, 1986. Phạm Ngọc Thiệp, (2003). "Một số đặc ... đến hiệu quả của ngành chăn nuôi bò sữa. 4. Kết luận và đề nghị 4.1. Kết luận Đàn bò sữa HF thuần nuôi tại Trung tâm sữa và giống bò Hà Nội cha phát huy đợc tiềm năng sinh học của chúng. ... 2010. 51 Tạp chí KHKT Nông nghiệp, Tập 2 số 1/2004 Nghiên cứu một số đặc điểm sinh học của đàn bò Holstein Friesian nuôi tại Trung tâm sữa và giống bò Hà Nội Some biological...

... 4.1.2- Đặc điểm hình thái và phân loại của loài chủ yếu - Mô tả đặc điểm hình thái của từng pha - Xác định tên khoa học và vị trí phân loại của loài. 4.1.3- Đặc điểm sinh vật họccủa loài ... Thời gian phát triển của sâu non - Pha nhộng + Quá trình hoá nhộng + Thời gian phát triển của nhộng 4.1.4- Đặc điểm sinh thái họccủa loài chủ yếu 4.1.4.1- Thức ăn của loài chủ yếu - Loài ... ra mà thon dần về phía sau. Mảnh thuỗn hình bán cầu. Hình 5.2: Bọ lá xanh tím trởng thành Chân trớc có đốt chậu hình tròn, các đốt đùi của chân phình ra ở giữa thon về 2 đầu. Đốt ống nhỏ,...

... 4.1.2- Đặc điểm hình thái và phân loại của loài chủ yếu - Mô tả đặc điểm hình thái của từng pha - Xác định tên khoa học và vị trí phân loại của loài. 4.1.3- Đặc điểm sinh vật họccủa loài ... Thời gian phát triển của sâu non - Pha nhộng + Quá trình hoá nhộng + Thời gian phát triển của nhộng 4.1.4- Đặc điểm sinh thái họccủa loài chủ yếu 4.1.4.1- Thức ăn của loài chủ yếu - Loài ... ra mà thon dần về phía sau. Mảnh thuỗn hình bán cầu. Hình 5.2: Bọ lá xanh tím trởng thành Chân trớc có đốt chậu hình tròn, các đốt đùi của chân phình ra ở giữa thon về 2 đầu. Đốt ống nhỏ,...

... chất hoá học của sợi là trọng lợng phân tử polyme, độ định hớng cũng nh độ kết tinh của sợi. Ngoài độ bền của sợi đơn, ngời ta còn đo độ bền nút và độ bền móc của sợi. Độ bềnđứt của nhiều ... xuất sợi hóa học so với sợi thiên nhiên rất cao. Khác với sợi thiên nhiên là sản phẩm của nông nghiệp, còn sợi hóa học là con đẻ của công nghiệp nên chúng mang những thế mạnh của ngành sản ... chất của sợi hóa học trong phạm vi khá rộng bằng cách điều chỉnh thành phần và cấu tạo hóa học của sợi hoặc thay đổi các điều kiện kỹ thuật. Hiện nay ngời ta đà chế tạo đợc các loại sợi hóa học...