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 nghiệ p 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...

Ngày tải lên: 12/12/2013, 20:15

... VAO TP? A. ĐÚNG B. SAI BÀI TẬP DẠNG DỄ Hãy 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 DỄ MỌI DOANH NGHIỆP SẢN XUẤT ĐỀU CÓ 3 LOẠI SẢN PHẨM TỒN KHO CHÍNH LÀ NVL, SPDD, TP? A. ĐÚNG B.SAI BÀI TẬP DẠNG DỄ NHỮNG DOANH NGHIỆP HÀNG KHÔNG, VỚI TỶ ... B.SAI BÀI TẬP DẠNG DỄ KHI 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 DỄ CHI PHÍ CƠ HỘI LÀ CHI PHÍ MÀ DOANH NGHIỆP...

Ngày tải lên: 27/06/2014, 09:20

... 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: ... CN Yêu 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...

Ngày tải lên: 05/07/2014, 15:20

... 36.000 Cộng : 160.000 97.000 340.00 0 190.000 9 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...

Ngày tải lên: 05/07/2014, 15:20

Ngày tải lên: 30/10/2014, 09:24

Ngày tải lên: 30/10/2014, 17:01

Ngày tải lên: 30/10/2014, 17:01

Ngày tải lên: 20/11/2014, 21:59

... tiền lương và các khoản cho các đối tượng sử dụng lao động. 2 Chương 6: KẾ TOÁN CÁC KHOẢN NỢ PHẢI TRẢ TRONG DOANH NGHIỆP 38 1.5.3- Quỹ bảo hiểm y tế (BHYT). Quỹ bảo hiểm y tế (BHYT) là gì? Quỹ ... lương phải trả trong kỳ. 12 1.3- 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...

Ngày tải lên: 23/10/2013, 22:15

... - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - Bài tập TNKQ LTĐH pH của dung dịch 9 BÀI TẬP pH CỦA DUNG DỊCH Câu 1: Câu nào sau đây sai A. 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...

Ngày tải lên: 26/10/2013, 10:11

... 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 2log 3 = x có nghiệm x bằng: A. 1 B. 9 C. 2 D. 3 Câu 2. Một hình ... trị lớn nhất của hàm số 23 32 xxy += trên đoạn [ ] 1;0 bằng: A. 0 B. 1 C. 5 D. 6 Câu 29. Tập xác định của hàm số )42(log 2 += xy là: A. );0( +∞ B. );2( +∞ C. R D. );2( +∞− Câu ... phẳng (P) tính theo dm là: A. 3 B. 2 33 C. 2 35 D. 3 Câu 3. Phương trình 1255 72 = + x có nghiệm x bằng: A. 2 B. -2 C. 5 D. -5 Câu 4. Cho mặt phẳng ( ) α cắt mặt cầu );( ROS theo...

Ngày tải lên: 09/11/2013, 10:11

... 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,...

Ngày tải lên: 19/03/2014, 15:20

... 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 khác Câu 7: Đề bài tơng tự câu 6 Thể tích khí thoát ra tại anot ở đktc là (lít) A. 0,112 B. 0,224 C. 0,672 D. 0,56E. Kết quả khác Câu 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 (C 2 H 5 O) n . Vậy công thức phân tử của rợu: A. C 6 H 15 O 3 B. C 4 H 10 O 2 C. C 4 H 10 O D. C 6 H 14 O 3 E. Kết quả khác. Câu...

Ngày tải lên: 04/07/2014, 14:00

Ngày tải lên: 07/07/2014, 11:00

... lời. 38 2014 Bài tập trắc nghiêm ,bài tập và bài giải MÔN: NGHIỆP VỤ NGÂN HÀNG THƯƠNG MẠI Câu 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 động kinh doanh) . C. Các ... dịch. Kết thúc thanh toán được thực hiện trong vòng 2 ngày làm việc 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...

Ngày tải lên: 12/07/2014, 11:21

... 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...

Ngày tải lên: 22/07/2014, 10:20

Ngày tải lên: 06/08/2014, 07:20