đề thi môn luật và chính sách môi trường

... Các hướng nghiên cứu chính: Khoa học Môi trường; Quản lý môi trường ; Quản lý tài nguyên môi trường. 2. Thông tin chung về môn học - Tên môn học: Luật & Chính Sách Môi Trường/ Environmental ... sách môi trường từ 1993 đến nay. 01 02 02 05TS: Nguyễn Vinh Quy- Thảo luận và xác định một vấn đề môi trường cần phải ban hành chính sách. - Thảo luận mục tiêu của chính sách môi trường ... do - Hạnh phúc ĐỀ CƯƠNG MÔN HỌC(LUẬT & CHÍNH SÁCH MÔI TRƯỜNG) 1. Thông tin về giảng viên:- Họ và tên: NGUYỄN VINH QUY- Chức danh, học hàm, học vị: Tiến sĩ – Giảng viên chính - Thời gian,...

... học 5 CRES Luật và Chính sách Môi trường 3. Nghị định 21/2008/NĐ-CP, sửa đổi bổ sung 1 số điều của quy định 80/2006/NĐ-CP về quy định chi tiết và thi hành một số điều luật bảo vệ môi trường năm ... về ĐTM đã được luật hóa và quy định bởi Luật Bảo vệ Môi trường của Việt Nam từ năm 1993 và cụ thểhơn trong luật môi trường năm 2005. Với 16 năm thực hiện công tác ĐTM đã giúp Chính Học viên: ... vấn đề được phân tích từ đó có một số đề xuất mang tính thamkhảo nhằm khắc phục nhược điểm.1.3. Nội dung nghiên cứu• Từ các chính sách về luật chính sách môi trường liên quan đến vấn đề đánhgiá...

... độngbảovệmôitrường: Phòngngừacácnguồntác độngxấulênmôitrường; Hạnchế,giảmthiểucácnguồntác độngxấulênmôi trường;  Khắcphụcônhiễm,phụchồivàcảithiệnmôitrường.- Chínhsách,biệnphápvànguồnlựcđể bảovệmôitrường;- ... kinhtếđểlàmcăncứlậpquyhoạchsửdụngvàxác địnhmứcđộgiớihạnchophép khaithác,mứcthuế môitrường,phíbảovệmôitrường,kýquỹ phụchồimôitrường,bồithườngthiệthạivềmôitrường vàbiệnphápkhácvề bảovệmôitrường.2.Quyhoạchsửdụngtàinguyênthiênnhiênphảigắnvớiquyhoạchbảotồnthiênnhiên.3.Tráchnhiệm ... TỐ CÁO VÀ BỒI THƯỜNG THI T HẠI VỀ MÔI TRƯỜNGBồithườngthiệthạidoÔNvàsuythoáiMT(M2)•Xác địnhthiệthạidoônhiễm,suythoáimôi trường •Giám địnhthiệthạidosuygiảmchứcnăng,tínhhữuíchcủamôitrường•GiảiquyếtbồithườngthiệthạivềmôitrườngTÌM...

... tới môi trường bị gây ra do thi u các quyền sở hữu tư với các nguồn tài sản phổ biến. Như được lưu ý trước đó trong khoá học này, thi u quyền sở hữu tài sản tư tại các nơi đánh cá như sông và ... sách giáo khoa của bạn. Chính phủ có thể cố sửa chữa thất bại này của thị trường bằng cách sử dụng thuế hoặc các quy tắc kiểm soát (chẳng hạn quy định về các tiêu chuẩn ô nhiễm). Một vấn đề ... cung trong tương lai sẽ tăng cho tới khi tỷ lệ tăng giá bằng với tỷ lệ lãi suất thị trường) . Các vấn đề môi trường Khi cung của nguồn tài nguyên này bị cạn kiệt theo thời gian, chi phí chiết...

... mô: Thị trường tài nguyên thi n nhiên và chính sách môi trường Nguồn: www.saga.vn Các nguồn tài nguyên thi n nhiên được phân chia thành hai hạng mục: nguồn tài nguyên có thể phục hồi và không ... chuẩn ô nhiễm). Một vấn đề liên quan tới môi trường bị gây ra do thi u các quyền sở hữu tư với các nguồn tài sản phổ biến. Như được lưu ý trước đó trong khoá học này, thi u quyền sở hữu tài ... quan hệ này được hiển thị trong biểu đồ ở trang 405 trong sách giáo khoa của bạn. Chính phủ có thể cố sửa chữa thất bại này của thị trường bằng cách sử dụng thuế hoặc các quy tắc kiểm soát...

... tế học vi mô: Thị trường tài nguyên thi n nhiên và chính sách môi trường Các nguồn tài nguyên thi n nhiên được phân chia thành hai hạng mục: nguồn tài nguyên có thể phục hồi và không thể phục ... tới môi trường bị gây ra do thi u các quyền sở hữu tư với các nguồn tài sản phổ biến. Như được lưu ý trước đó trong khoá học này, thi u quyền sở hữu tài sản tư tại các nơi đánh cá như sông và ... sách giáo khoa của bạn. Chính phủ có thể cố sửa chữa thất bại này của thị trường bằng cách sử dụng thuế hoặc các quy tắc kiểm soát (chẳng hạn quy định về các tiêu chuẩn ô nhiễm). Một vấn đề...

... Logo61245AndersonQuy trình thi t kế chính sách côngXác định vấn đề XHxtSắp xếp đưa vào nghị trình3 Thi t kế giải phápThông qua chính sách Thi hành chính sách Củng cố và phát triểnGiai đoạn ... nổi bật và diễn biến csmt- Lý thuyết EM và Agenda 21 trong nghiên cứu csmt cụ thểGiới thi u quá trình xây dựng chính sách nhà nước và chính sách môi trường của Hoa Kỳ- Chính sách công ... LogoNội dung trình bàyGiới thi u chung1Quá trình xây dựng chính sách công2 Chính sách môi trường3 Trường hợp chính sách “ Bảo tồn không gian mở”4Kết luận và kiến nghị5Giới thi u chungNước cộng...

... GIỚI THI U VỀ MÔN HỌC I/ Tên môn học: LUẬT VÀ CHÍNH SÁCH QUẢN LÝ KIẾN TRÚC ĐÔ THỊ II/ Đối tượng: Nghiên cứu sinh (tiến sĩ) và cao học (thạc sĩ) III/ Mục đích, yêu cầu và cấu trúc của môn học ... gồm: + Luật quy hoạch xây dựng; + Luật xây dựng và Luật về nhà ở. 25 LUẬT VÀ CHÍNH SÁCH QUẢN LÝ KIẾN TRÚC ĐÔ THỊ TS.KTS. LÊ TRỌNG BÌNH c/ Thi t kế và phát triển kiến trúc công nghiệp ... quan và môi trường đô thị; e/ Quản lý việc sử dụng và khai thác cơ sở hạ tầng đô thị; 27 LUẬT VÀ CHÍNH SÁCH QUẢN LÝ KIẾN TRÚC ĐÔ THỊ TS.KTS. LÊ TRỌNG BÌNH Đổi mới công nghệ thi t...

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MPP4 12/2011 Luật và chính sách côngThực thi QSH đối với DNNNMPP4 – L822/12/2011MPP4 12/2011 Luật và chính sách côngQuyền tài sản: Phi tập trung hóa QSD đất-Miền Bắc: Luật cải cách ruộng ... dụng chung, chấm dứt hiệu lực Luật DNNN vào 01/07/2010NĐ 101/2009 05/11/2009 về thí điểm TĐ => 17 tập đoàn 1300 DNNNMPP4 12/2011 Luật và chính sách công

... chỉ việc thi hành hoặc bÃi bỏ những QĐ, chỉ thị, thông t của Bộ trởng và các thành viên của chính phủ : TT CP.- Thực hiện chính sách XH, chính sách dân tộc, chính sách tôn giáo: CP.- Đề nghi ... quy phạm pháp luật đợc ghi nhận trong các văn bản pháp luật điều chỉnh các quan hệ xà hội.Mối quan hệ giữa nhà nớc và pháp luật: Nhà nớc phụ thuộc vào PL và không thể tồn tại nếu thi u PL, ngợc ... +Cải cách và hoàn thi n hệ thống thuế phù hợp với tình hình đất nớc và Quốc tế.+Tiếp tục đổi mới chính sách tài chính áp dụng cho doanh nghiệp.+Triển khai mạnh các công cụ tài chính, các trung...

... lĩnh vực như: ổn định kinh tế vĩ mô thông qua chính sách tài chính và tiền tệ. - Chính sách tài chính bao gồm các chính sách thuế và chi tiêu ngân sách của Nhà nước nhằm điều tiết chu kỳ kinh ... Cân bằng trên thị trường tiền tệ- Tìm hiểu khái quát về ngân hàng- Chính sách tiền tệ của ngân hàng trung ương- Phối hợp chính sách tiền tệ và chính sách tài chính - Chính sách tiền tệ năm ... đổi trên thị trường ngoại hối.Sau đây em xin trình bày những vấn đề chính của chính sách tiền tệ. Mục tiêu là tìm hiểu về thị trường tiền tệ; Tìm hiểu chính sách tiền tệ mà chính phủ đã sử...

... trung điểm các cạnh AB và B’C’ . a. Viết phương trình mặt phẳng (P) đi qua M và song song với hai đường thẳng AN và BD’ b. Tính góc và khoảng cách giữa hai đường thẳng AN và BD’ .Câu V.b ( 1,0 ... 2Ôn Thi TNPT Năm 2009ĐỀ 6( Thời gian làm bài 150 phút )I . PHẦN CHUNG CHO TẤT CẢ THÍ SINH (7điểm) Câu I (3,0 điểm) Cho hàm số 4 2y x 2x 1= − − có đồ thị (C)a) Khảo sát sự biến thi n và ... M(1;0;5) và hai mặt phẳng (P) : − + + =2x y 3z 1 0 và (Q) : + − + =x y z 5 0 . a. Tính khoảng cách từ M đến mặt phẳng (Q) . b. Viết phương trình mặt phẳng ( R ) đi qua giao tuyến (d) của (P) và...

... ABCA1B1C1 có tất cả các cạnh đều bằng a. M là trung điểm của đoạn AA1. Chứng minh BM ⊥ B1C và tính d(BM, B1C).ĐỀ THI DỰ TRỮ KHỐI A − NĂM 2008ĐỀ THI ĐẠI HỌC KHỐI A - NĂM 2004Câu ... ABC∧=, ABC và SBC là các tam giác đều cạnh a. Tính theo a khoảng cách từ đỉnh B đến mp(SAC).ĐỀ THI DỰ TRỮ KHỐI B − NĂM 2007 Đề ICâu I: Cho hàm số y = –2x3 + 6x2 – 51. Khảo sát và vẽ đồ ... của A trên SB, SC. Chứng minh ∆AHK vuông và tính VSABC?ĐỀ THI DỰ TRỮ KHỐI D − NĂM 2007 Đề ICâu I: Cho hàm số 12 1xyx− +=+ (C)1. Khảo sát và vẽ đồ thị hàm số.2. Viết phương trình...