mô phỏng mạng thông tin

... Hình 1.2: Mô hình thông tin hình lưới. 1.1.3 Mô hình thông tin sao lưới hỗn hợp Mô hình này là sự kết hợp của hai kiểu tổ chức thông tin trên. Mạng sẽ gồm phần mạng hình sao và mạng hình ... 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ƯƠNG 1 LỰA CHỌN MÔ HÌNH TỔ CHỨC VÀ CÔNG NGHỆ TRUY NHẬP MẠNG THÔNG TIN VỆ TINH. 1.1 Các mô hình tổ chức mạng TTVT 1.1.1 Mô hình thông tin hình sao Mô hình này gồm trạm trung ... thu tin hiệu này từ Hub và lọc lấy dữ liệu dành cho chúng. Quá trình liên lạc phải qua 2 bước nhảy vệ tinh nên có độ trễ cao. Hình 1.1: Mô hình thông tin hình sao 1.1.2 Mô hình thông tin...

... ảo của mạng của tôi với Boson Designer, 25 Hình 3.1. Mô hình mô phỏng mạng truyền dẫn giữa 2 miền Bắc và Nam 3.2Cấu hình mô hình mô phỏng mạng truyền dẫn giữa 2 miền 3.2.1 Cấu hình cho mạng tổng ... của chúng vào ngành công nghệ thông tin của Việt Nam. Nghiên cứu luôn khả năng truyền tải thông tin trong mạng qua mô hình truyền dẫn của Viện Công nghệ thông tin. 23 Nhờ công nghệ ISDN và Frame ... Công nghệ thông tin, được thầy giáo Hà Hải giúp đỡ, tôi đã quyết định chọn đề tài “Thiết kế và xây dựng mô hình mô phỏng mạng truyền dẫn giữa hai miền Bắc – Nam viện Công nghệ thông tin bằng...

... KẾ VÀ XÂY DỰNG MÔ HÌNH MÔ PHỎNG MẠNG TRUYỀN DẪN GIỮA 2 MIỀN BẮC – NAM 3.1 Mô hình Sau khi tìm hiểu tại Viện Công nghệ thông tin - Bộ quốc phòng tôi xin đưa ra mô hình mô phỏng mạng truyền dẫn ... 0918.775.368 Hình 3.1. Mô hình mô phỏng mạng truyền dẫn giữa 2 miền Bắc và Nam 3.2 Cấu hình mô hình mô phỏng mạng truyền dẫn giữa 2 miền 3.2.1 Cấu hình cho mạng tổng thể kết nối giữa 2 miền Mạng tổng thể ... của chúng vào ngành công nghệ thông tin của Việt Nam. Nghiên cứu luôn khả năng truyền tải thông tin trong mạng qua mô hình truyền dẫn của Viện Công nghệ thông tin. Nhờ công nghệ ISDN và Frame...

... I TIN TIN A .Mô phỏng mạng sử dụng Network Simulation. 18 18 MÔ PH MÔ PH Ỏ Ỏ NG VI NG VI Ệ Ệ C TRUY C TRUY Ề Ề N G N G Ó Ó I TIN I TIN   Ta Ta c c ó ó th th ể ể th th ấ ấ y y Source, destination, ... 255.255.255.0 A .Mô phỏng mạng sử dụng Network Simulation. 10 19 19 MÔ PH MÔ PH Ỏ Ỏ NG VI NG VI Ệ Ệ C TRUY C TRUY Ề Ề N G N G Ó Ó I I TIN TIN   Hub Hub s s ẽ ẽ chuy chuy ể ể n n g g ó ó i i tin tin ... v v à à Window. Window. B.Chứcnăng bắt gói tin Ethereal 8 15 15 SƠ Đ SƠ Đ Ồ Ồ M M Ạ Ạ NG NG A .Mô phỏng mạng sử dụng Network Simulation. 16 16 MÔ PH MÔ PH Ỏ Ỏ NG VI NG VI Ệ Ệ C TRUY C TRUY Ề Ề N G N G Ó Ó I I TIN TIN   Click...

... http://www.lrc-tnu.edu.vn 27 mô hình mô phỏng. Khi có mô hình mô phỏng sẽ tiến hành làm các thực nghiệm để thu đƣợc kết quả mô phỏng. Thông thƣờng kết quả mô phỏng có tính trừu tƣợng của toán học nên phải thông qua ... hoặc xây dựng mô Mô hình hệ thống Mô hình vật lý Mô hình toán học Mô hình thu nhỏ Mô hình tƣơng tự Mô hình giải tích Mô hình số Mô hình mô phỏng Hình 1.3. Sơ đồ phân loại mô hình Số hóa ... sau: Mô hình tiền định - Mô hình ngẫu nhiên Mô hình tĩnh - Mô hình động Mô hình tuyến tính - Mô hình phi tuyến Mô hình liên tục - Mô hình gián đoạn Mô hình vật lý - Mô hình toán học Mô hình...

... thể khác dựa trên thông tin tìm được trong bản tin như tên miền đích đến của bản tin. Thông tin định tuyến này được thực hiện dựa vào bảng định tuyến được lưu trữ tại các nút mạng. Bảng định ... Protocol. Do đó nảy sinh vấn đề cần một giao thức truyền thông đáng tin cậy để trao đổi thông tin giữa máy chủ truy cập và máy lưu thông tin về user name và password. Vì thế, vào 1995 RADIUS ... trình này, cả UE và mạng sẽ trao đổi các thông số phục vụ cho việc chứng thực, mã hóa và nén dữ liệu. Thông qua giao diện này, UE sẽ được nhà khai thác mạng cung cấp những thông tin về yêu cầu đăng...

... xung của bộ lọc thông dải lý tưởng là hiệu đáp ứng xung của hai bộ lọc thông thấp lý tưởng. Dùng hàm ideal_lp đã được viết ở trên là có thể tính được đáp ứng xung của bộ lọc thông dải lý tưởng. ... độ gợn sóng của dải thông và dải chắn, là: () ⎪ ⎩ ⎪ ⎨ ⎧ = ch¾n id¶ ë th«ng id¶ ë 1 W 1 2 δ δ ω thì hàm sai số ở cả dải thông và dải chắn đều không vượt quá 2 δ ở cả dải thông và dải chắn. ... phương trình toán học và tính toán • Phát triển các giải thuật • Thu thập dữ liệu • Mô hình hoá, mô phỏng và tạo các mẫu theo thiết kế • Phân tích, khảo sát và thể hiện dữ liệu bằng hình...

... tiện để hiển thị và nạp và thông tin chương trình. Chuyển mạch DIP8 có chức năng đưa 8 bit vào cấu hình DSP. Phụ thuộc vào chương trình đang được sử dụng, thông tin có thể được xử lý theo ... vào được cho với các ký hiệu như sau ¾ Tần số cắt dải thông ω p ¾ Tần số cắt dải thông ω s ¾ Bề rộng dải quá độ ∆ω ¾ Độ gợn sóng dải thông δ 1 ¾ Độ gợn sóng dải chắn δ 2 Ngoài ra các ... 20MHZ b. DSP dùng bộ tạo dao động bên ngoài 40MHZ c. Thông qua kết nối nối tiếp, DSP dùng bộ tạo dao động bên trong 33.3MHz CODEC d. Thông qua kết nối bo mạch SERIAL PORT, DSP dùng bộ dao...

... có mạch mô phỏng lại. 4.4. Sau đây là một số hình ảnh về chương trình (xem trang bên) 34 34 Hình 5 Kết quả mô phỏng (hình 6) Hình 6 15 Begin Alter Table CollectingTable ... Hình 4 d. Mô phỏng với máy ảo SQL Server: thiết lập cấu hình máy ảo SQL Server Chọn menu Simulation/Simulate (Ctrl F5) (hình 5) 27 Cấu trúc của file qugate a. Phần thông tin thu được ... với hướng tiếp cận dùng Java,… Trong nghiên cứu mô phỏng tính toán lượng tử có hai xu hướng chính: thứ nhất là viết các chương trình mô phỏng cho t ừng thuật toán cụ thể, thứ hai là nghiên...

... (7.4.11) Mô phỏng M-QAM ắ Lập mô hình mô phỏng Mô hình mô phỏng hiệu năng BER đối với hệ thống truyền tin tín hiệu 16-QAM qua kênh AWGN đợc cho ở hình 7.4 Mô phỏng hệ thống truyền tin đối ... bởi (5.2.23). Lập mô hình mô phỏng v chơng trình mô phỏng Đới đây, trình by tóm tắt quá trình mô phỏng BER cho hệ thống truyền tín hiệu trực giao. Sử dụng mô hình mô phỏng đợc cho trên hình ... bộ tách sóng Mô phỏng hệ thống truyền tin đối với kênh AWGN Eng. Nguyễn Viết Đả m -12- Hình 5.5 Mô hình mô phỏng hệ thống truyền tin BPSK dùng tín hiệu đối cực Quá trình mô phỏng hiệu năng...

... doanh nghiệp nhà nước. 3.3.2. Với Bộ Thông tin và truyền thông - Bộ Thông tin và truyền thông cần có các biện pháp cải cách doanh nghiệp Bưu chính Viễn thông trong ngành. - Sớm ban hành các ... công ty Dịch vụ viễn thông và các giải pháp huy động vốn công ty đã sử dụng để phát triển mạng thông tin di động VINAPHONE . Bốn là: Định hướng phát triển của mạng thông tin di động VINAPHONE ... trên mạng lưới đảm bảo thông tin trong mọi tình huống. công tác quốc phòng, an ninh cũng như khắc phục thiên tai, bão lụt. 3.1.2. Nhu cầu vốn phục vụ cho mục tiêu phát triển mạng thông tin di...

... KỸ THUẬT VÀ HẠ TẦNG MẠNG THÔNG TIN DI ĐỘNG (MOBITECHS) (Ban hành kèm theo Quyết định số ……/QĐ ngày …… của Công ty CP Dịch vụ Kỹ thuật và Hạ tầng mạng thông tin di động) I. MÔ HÌNH TỔ CHỨC PHÒNG ... các đơn thư khiếu nại, tố cáo trong việc thực hiện CÔNG TY CP DỊCH VỤ KỸ THUẬT VÀ HẠ TẦNG MẠNG THÔNG TIN DI ĐỘNG (MOBITECHS) CỘNG HÒA XÃ HỘI CHỦ NGHĨA VIỆT NAM Độc lập - Tự do - Hạnh phúc QUY ... bổ sung, sửa đổi qui định phải được Tổng Giám Đốc Công ty CP Dịch vụ Kỹ thuật và Hạ tầng mạng thông tin di động phê duyệt, quyết định mới có hiệu lực thi hành./. Hà nội, ngày….tháng….năm 2014 TỔNG...

... vào được cho với các ký hiệu như sau ¾ Tần số cắt dải thông ω p ¾ Tần số cắt dải thông ω s ¾ Bề rộng dải quá độ ∆ω ¾ Độ gợn sóng dải thông δ 1 ¾ Độ gợn sóng dải chắn δ 2 Ngoài ra các ... năm 1998, các DSP sử dụng xử lý song song đã đạt tới tốc độ tính toán 1600MIPS. 15 BÀI 1. Mô phỏng hệ thống và tín hiệu rời rạc bằng MATLAB A. Tín hiệu và hệ thống rời rạc ở miền n 1.1. ... phép chương trình ex1_1.dsk vận hành đúng đắn. 24 Các DSP đã làm cuộc cách mạng trong công nghệ điện tử viễn thông. DSP có thể coi như trái tim trong hàng loạt các thiết bị hiện đại như điện...