bài tập trắc nghiệm kế toán doanh nghiệp

... Kỹ thuật D. Cả 3 ý trên Câu 59:Trong DN nhân vật trung gian là Bài tập trắc nghiệm Quản trị doanh nghiệp Trần Bảo Loan - 16 - http://www.ebook.edu.vn Câu 90: Tìm ra ... kiếm, thu hút những người có đủ khả năng ( trong và ngoài doanh nghiệp) tới doanh nghiệp để nộp đơn ứng thi vào các vị trí cần thiết mà doanh nghiệp đang cần tuyển C. Tuyển mộ nhân sự là quá ... Đang sửa chữa vừa và lớn do bộ phận sửa chữa của doanh nghiệp đảm nhận D. Hình thức tập trung nhiều bộ phận bị hư hỏng tại cùng 1 lúc và doanh nghiệp tiến hành sửa chữa Câu 209: Khi xác định...

... VAO TP?A. ĐÚNG B. SAI BÀI TẬP DẠNG DỄHãy trả lời cho các câu hỏi sau:a. Hãy phân biệt doanh nghiệp sản xuất và doanh nghiệp thương mại?b. Ba yếu tố chính của doanh nghiệp sản xuất là gì?c. ... ĐỒNG NHAU?A. ĐÚNG B. SAI BÀI TẬP DẠNG DỄMỌI DOANH NGHIỆP SẢN XUẤT ĐỀU CÓ 3 LOẠI SẢN PHẨM TỒN KHO CHÍNH LÀ NVL, SPDD, TP?A. ĐÚNG B.SAI BÀI TẬP DẠNG DỄNHỮNG DOANH NGHIỆP HÀNG KHÔNG, VỚI TỶ ... B.SAI BÀI TẬP DẠNG DỄKHI PHÂN TÍCH TÍNH CÁCH Ứng XỬ CỦA CHI PHÍ NÊN CHÚ TRỌNG VÀO TỔNG ĐỊNH PHÍ TÍNH CHO ĐƠN VỊ SP?A.ĐÚNG B.SAI BÀI TẬP DẠNG DỄCHI PHÍ CƠ HỘI LÀ CHI PHÍ MÀ DOANH NGHIỆP...

... Diễm Hồng-Bộ môn Kế toán, Khoa Kế toán & QTKD Trường Đại học Nông nghiệp 9 BÀI TẬP LÝ THUYẾT KẾ TOÁN DOANH NGHIỆP(Dành cho SV chuyên ngành Kế toán Doanh nghiệp) Các bài tập sau đơn vị tính ... Hồng-Bộ môn Kế toán, Khoa Kế toán & QTKD Trường Đại học Nông nghiệp 10 3) Khóa sổ các TK, lập bảng đối chiếu số phát sinh các tài khoản kế toán 4) Lập bảng cân đối kế toán cuối kỳ BÀI 12: ... CNYêu cầu:1- Tìm X và Lập bảng cân đối kế toán ngày 1-1-2008?2- Lập bảng cân đối kế toán tại ngày 31.1.2008? BÀI 5 : Trích số liệu tại một Doanh nghiệp như sau :- Nguyên vật liệu tồn kho...

... 36.000Cộng : 160.000 97.000 340.000190.0009 BÀI TẬP LÝ THUYẾT KẾ TOÁN DOANH NGHIỆP – Phần 2(Dành cho SV chuyên ngành Kế toán Doanh nghiệp, QTKD, Kinh tế) Bài tập 17: I . Có tình hình số dư đầu kỳ ... các nghiệp vụ kinh tế phát sinh trong tháng 1/2009?.3. Lập bảng đối chiếu số phát sinh các tài khoản kế toán? .4. Lập bảng cân đối kế toán ngày 1/2/2009 ? Bài tập 19: Trích tài liệu tại doanh nghiệp ... cầu:1. Tìm X và định khoản các nghiệp vụ kinh tế phát sinh.2.Lập bảng cân đối số phát sinh tháng 10/2007 của đơn vị. Bài tập 20: Trích tài liệu tại doanh nghiệp PP hạch toán hàng tồn kho theo phương...

... tiền lương và các khoản cho các đối tượng sử dụng lao động. 2Chương 6:KẾ TOÁN CÁCKHOẢN NỢ PHẢITRẢ TRONG DOANH NGHIỆP 381.5.3- Quỹ bảo hiểm y tế (BHYT).Quỹ bảo hiểm y tế (BHYT) là gì?Quỹ ... lương phải trả trong kỳ. 121.3- Nhiệm vụ kế toán tiền lương và các khoản trích theo lương- Hướng dẫn kiểm tra các đơn vị, bộ phận trong doanh nghiệp thực hiện đầy đủ, đúng đắn các chế độ ... lương: Thế nào là quỹ tiền lương?Là toàn bộ tiền lương mà doanh nghiệp tính trả cho cán bộ công nhân viên trong danh sách do doanh nghiệp quản lý và chi trả lương theo số lượng và chất lượng...

... - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - Bài tập TNKQ LTĐH pH của dung dịch 9 BÀI TẬP pH CỦA DUNG DỊCHCâu 1: Câu nào sau đây saiA. pH = - lg[H+]. B. [H+] ... - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - Bài tập TNKQ LTĐH pH của dung dịch 8 Câu 70: Ở một nhiệt độ xác định, độ điện li của dd axit axetic ... - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - Bài tập TNKQ LTĐH pH của dung dịch 1 A. 1. B. 7. C. 8. D. 3.Câu 33: Trộn lẫn 2 dd có thể tích bằng...

... B, C, S có bán kính bằng: 51. A 52. C 53. A 54. C BÀI TẬP TRẮC NGHIỆM HỌC KÌ I TOÁN 12 BAN CƠ BẢN Câu 1. Phương trình 2log3=x có nghiệm x bằng: A.1B.9C.2D.3 Câu 2. Một hình ... trị lớn nhất của hàm số 2332 xxy+= trên đoạn [ ]1;0 bằng:A.0B.1C.5D.6 Câu 29. Tập xác định của hàm số )42(log2+=xy là: A.);0(+∞ B.);2(+∞ C.RD.);2(+∞− Câu ... phẳng (P) tính theo dm là: A.3B.233C.235D.3 Câu 3. Phương trình 125572=+x có nghiệm x bằng: A.2B.-2C.5D.-5 Câu 4. Cho mặt phẳng ( )α cắt mặt cầu );( ROS theo...

... tiên ở: A)Châu Úc B)Nam Phi C)Java(Inđônêxia) D)Bắc kinh(Trung Quốc) Bài tập trắc nghiệm ôn thi tốt nghiệp môn Sinh 12 địa y chuẩn bị là điểm đáng chú ý nhất của đại…….(cổ sinh,...

... hyđrocacbon thì k 0 là:A. Tổng số liên kết đôi.B. Tổng số liên kết đôi bằng 1/2 tổng số liên kết 3.C. Tổng số liên kết .D. Tổng số liên kết và vòng.E. Kết quả khác.Câu 11:Cho hỗn hợp gồm ... 1,08 C. 2,8 D. 4,8 E. Kết quả khácCâu 7:Đề bài tơng tự câu 6Thể tích khí thoát ra tại anot ở đktc là (lít)A. 0,112 B. 0,224 C. 0,672 D. 0,56E. Kết quả khácCâu 8:Đề bài tơng tự câu trên (câu ... D. 8,25g E. Kết quả khác.Câu 9:Một rợu no có công thức thực nghiệm (C2H5O)n. Vậy công thức phân tử của rợu:A. C6H15O3B. C4H10O2C. C4H10OD. C6H14O3E. Kết quả khác.Câu...

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... M(2; –3). Bài tập trắc nghiệm Toán A2–CD – 2009 Trang 11a) =2C(x)yx b) =3C(x)yx c) =C(x)yx d) = −C(x)yx Câu 43. Trong phương pháp biến thiên hằng số ta tìm nghiệm tổng ... (1) Bài tập trắc nghiệm Toán A2–CD – 2009 Trang 8 c) ∫−=ABdxydyxI22 d) ∫+=ABdxydyxI22 Chương 4. PHƯƠNG TRÌNH VI PHÂN Câu 1. Cho biết một phương trình vi phân nào đó có nghiệm ... A vaø B? a) ∫−=ABdyydxxxI )(22 b) ∫+=ABdyydxxI22 Bài tập trắc nghiệm Toán A2–CD – 2009 Trang 15Câu 94. Tìm nghiệm tổng quát của phương trình vi phân =y '' 6x a)...

... lời.38 2014 Bài tập trắc nghiêm ,bài tập và bài giảiMÔN: NGHIỆP VỤ NGÂN HÀNG THƯƠNG MẠICâu 1: Thế nào là nguồn vốn của NHTM?A: Là toàn bộ nguồn tiền tệ được NHTM tạo lập để cho vay, kinh doanh ... hoạt động kinh doanh NH là gì?A. Các cơ chế, chính sách có liên quan đến hoạt động kinh doanh của NH.B. Các số liệu thống kê, kế toán (bảng cân đối kế toán, kết quả hoạt độngkinh doanh) .C. Các ... dịch. Kết thúc thanh toán được thực hiện trong vòng 2 ngày làmviệc kể từ ngày ký kết hợp đồng mua bán giao ngay.D. Là nghiệp vụ mua bán ngoại tệ theo tỷ giá giao ngay. Kết thúc thanh toán trong...

... BÀI TẬP TRẮC NGHIỆM ÔN THI TỐT NGHIỆP VÀ ĐẠI HỌC HTK- 7 A.E tỉ lệ thuận với m B.E là hằng số đối với thời ... 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 BÀI TẬP TRẮC NGHIỆM ÔN THI TỐT NGHIỆP VÀ ĐẠI HỌC HTK- 2 A. (rad) B.2(rad) C.1,5(rad) D.0,5(rad) ... bình phương tốc độ của vật B.thế năng tỉ lệ với bình phương tốc độ góc của vật BÀI TẬP TRẮC NGHIỆM ÔN THI TỐT NGHIỆP VÀ ĐẠI HỌC HTK- 11 A.T=0,63s;A=10cm B.T=0,31s;A=5cm C.T=0,63s;A=5cm...

... phạm.6.19/ Trong thực hành kiểm toán, trắc nghiệm trực tiếp số dư kết hợp với trắc nghiệm độ vững chãi trong trắc nghiệm công việc để hình thành các thủ tục kiểm toán chi tiết.TL : Đúng.GT : ... Chủ thể của kiểm toán nội bộ:a. Nhà nướcb. Công ty cung cấp dịch vụ kiểm toán c. Kế toán viên trong doanh nghiệp d. Do các kiểm toán viên nội bộ trong đơn vị tiến hành13. Kiểm toán báo cáo tài ... bộ không tốt, các lạo nghiệp vụ này dễ xảy ra sai sót, gian lận.Vì vậy cách thức tiếp cận hiệu quả loại nghiệp vụ này phải là trắc nghiệm độ tin cậy trong trắc nghiệm nghiệp vụ.6.18/ Báo cáo...