bài tập vi mô thị trường cạnh tranh hoàn hảo

... ậ ấ . ❏ Các hãng c nh tranh v i nhau b ng vi c bán ra các s n ạ ớ ằ ệ ả ph m riêng bi tẩ ệ . Các s n ph m này có th thay th cho ả ẩ ể ế nhau m c cao nh ng không ph i là hoàn h oở ứ độ ư ả ả . ... nh tranh hoàn ấ ớ ị ườ ạ h o.ả  Tuy nhiên, ph n t n th t này s c ầ ổ ấ ẽ đượ bù p do hai lý do.đắ 16 B ng ả 6.2. C c u th tr ngơ ấ ị ườ 8 Hi u qu kinh tê c a th tr ng c nh ệ ả ủ ị ườ ạ tranh ... ố H n n a, các hãng s không s n lòng cung c p. ơ ữ ẽ ẵ ấ ♦ Mô hình cartel, v c b n, không b n v ng. B i vì m i ề ơ ả ề ữ ở ỗ thành vi n cartel s s n xu t m t m c s n l ng mà ẽ ả ấ ộ ứ ả ượ ở ó...

... HẠN x y MC AC P q P 1 P 1 P 2 P 2 S 1 S 2 DP Q THỊ TRƯỜNGDOANH NGHIỆP CÁC CẤU TRÚC THỊ TRƯỜNG CÁC CẤU TRÚC THỊ TRƯỜNG Các tiêu thức Cạnh tranh hoàn hảo Cạnh tranh độc quyền Độc quyền nhóm Độc quyền hoàn toàn Số lượng ... TRONG DÀI HẠN & HIỆU QUẢ CỦA THỊ TRƯỜNG CẠNH TRANH HIỆU QUẢ CỦA THỊ TRƯỜNG CẠNH TRANH DOANH THU CỦA DOANH NGHIỆP DOANH THU CỦA DOANH NGHIỆP CẠNH TRANH CẠNH TRANH  Đường tổng doanh thu TR q TR 1 TR 2 TR 3 *Giá ... được suy ra từ đường chi phí nào? Nhánh nào? TÓM TẮT TÓM TẮT THỊ TRƯỜNG THỊ TRƯỜNG CẠNH TRANH HOÀN HẢO CẠNH TRANH HOÀN HẢO ỨNG XỬ CỦA DOANH NGHIỆP ỨNG XỬ CỦA DOANH NGHIỆP TRONG NGẮN...

... trường rất đầy đủ Sự gia nhập và rút lui khỏi thị trường hoàn toàn dễ dàng 2. Đặc trưng 1. Khái niệm. Thị trường cạnh tranh hoàn hảo là thị trường mà trong đó có rất nhiều người mua và ... nghiệp cạnh tranh hoàn hảo là đường nằm ngang song song với trục hoành và bằng mức giá cân bằng của thị trường. Vớ d ã Vo nhng ngy u mựa, lng cu cà phê mỗi tuần trên thị trường Vi t Nam ... hoá lợi nhuận 3. Với mức giá trên thị trường là bao nhiêu DN sẽ đóng cửa? 23 2 15 7TC Q Q Q    Bài 5 CÂN BẰNG NGẮN HẠN THỊ TRƯỜNG CẠNH TRANH HOÀN HẢO GIẢ ĐỊNH: sản lượng của mỗi người...

... T Ế Ế VI MÔ VI MÔ Bài giảng 8 Quyết định cung của doanh nghiệp trên thị trường cạnh tranh hoàn hảo DOANH THU C DOANH THU C Ủ Ủ A DOANH NGHI A DOANH NGHI Ệ Ệ P P C C Ạ Ạ NH TRANH NH TRANH  ... TR U TR Ú Ú C TH C TH Ị Ị TRƯ TRƯ Ờ Ờ NG NG Các tiêu thức Cạnh tranh hoàn hảo Cạnh tranh độc quyền Độc quyền nhóm Độc quyền hoàn toàn Số lượng người mua Rất nhiều Rất nhiều Rất nhiều Rất ... NGHIỆP THỊ TRƯỜNG CÂN B CÂN B Ằ Ằ NG C NG C Ủ Ủ A NG A NG À À NH TRONG D NH TRONG D À À I H I H Ạ Ạ N N NG NG À À NH C NH C Ó Ó CHI PH CHI PH Í Í KHÔNG Đ KHÔNG Đ Ổ Ổ I THEO QUI MÔ I THEO QUI MÔ x y MC AC P q P 1 P 1 P 2 P 2 SS 1 SS 2 D 1 P Q THỊ...

... tổng quan về thị trường, hang cạnh tranh hoàn hảo phục vụ nghiên cứu và học tập. 4.Đối tượng và pham vi nghiên cứu Đối tượng: Thị trường cạnh tranh hoàn hảo, hãng cạnh tranh hoàn hảo kinh doanh ... năng khống chế được thị trường, làm ảnh hưởng đến giá cả. Cạnh tranh hoàn hảo được cho là sẽ dẫn đến hiệu quả kinh tế cao. Những nghiên cứu về các thị trường cạnh tranh hoàn hảo cung cấp cơ sở ... trong ngắn hạn và dài hạn.” 2. Câu hỏi nghiên cứu Thị trường cạnh tranh hoàn hảo là gì? Các đặc trưng cơ bản của thị trường cạnh tranh hoàn hảo? Thực trạng mặt hàng khoai tây hiện nay? Cách thức...

... nhau, · dể dàng thâm nhập hay rút khỏi thị trường. Không có rào cản thị trường. · [Cạnh tranh hoàn hảo bao gồm cả thông tin hoàn hảo] 2005 Kinh tế vi mô Slide 13 $ Q X (triệu) D tt S Q ME P E ... Q 3 và Q* là nhỏ hơn giá thị trường [ MR = P]: TR tăng “nhanh” hơn TC, Lợi nhuận tối đa tại Q*! Q* 2005 Kinh tế vi mô Slide 2 Cạnh tranh hoàn hảo · Từ ngữ cạnh tranh có thể vận dụng theo ... quả về giá. D* D* dn P L Cạnh tranh hoàn hảo 2005 Kinh tế vi mô Slide 15 Q $ Trong cạnh tranh hoàn hảo, mỗi doanh nghiệp đều bán với mức giá thị trường. TR là tuyến tính với hệ số góc =...

... lớn Cân bằng ngắn hạn của thị trường cạnh tranh hoàn hảo P Q D S P P Q P D ≡ MR = P Thị trường Doanh nghiệp Qm MC Q1 AC Bài tập 1. Một DN nhỏ bán hàng theo giá thị trường có hàm chi phí ngắn ... khỏi thị trường Chương 5. Thị trường cạnh tranh hoàn hảo Th trng c quyn monopoly ã Cú duy nht mt ngi bỏn ã Khụng cú sn phm thay th gn gi (close substitution) ã Ro cn tham gia thị trường ... lợi nhuận của DN khi giá thị trường là: a) P = 20 b) P = 40 c) P = 60 PS = TR - VC P S ≡ MC 0 A P n 1 2 MC1 MC2 B PS Q Bài tập 2. Một thị trường cạnh tranh hoàn hảo có 80 người mua và 60...

... trong thị trường cạnh tranh. Chúng ta quay trở lại với đồ thị 4.9 đã được mô tả. Bất kỳ mức đầu ra nào khác sản lượng Q * là không có hiệu quả, 1 Chương 4 THỊ TRƯỜNG CẠNH TRANH HOÀN HẢO ... phí không đổi Cân bằng thị trường Hình 4.6 mô tả cân bằng thị trường trong trường hợp chi phí không đổi. Trong hình 4.6b, đường cầu thị trường là D, đường cung thị trường là S. Giá cân bằng ... bằng dài hạn là khả năng đi vào thị trường của các hãng mới và đi ra của những hãng phải rời ngành. Mô hình cạnh tranh hoàn hảo giả định rằng vi c đi vào đi ra hoàn toàn là dựa vào chi phí riêng....

... Hằng Các nội dung  Thị trường cạnh tranh hoàn hảo.  Tối đa hoá trong thị trường cạnh tranh hoàn hảo  Đường cung ngắn hạn của doanh nghiệp  Đường cung ngắn hạn của ngành ( thị trường)  Thặng ... xuống Kinh tế vi mô Năm học 2008 - 2009 1 Chương 1: Thị trường cạnh tranh hoàn hảo Biên soạn: Ths Nguyễn Thuý Hằng Khoa kinh tế & QTKD, ĐHCT Tháng 9/2008 Phần 3: Các dạng thị trường Tháng ... phí cơ hội của vi c sử dụng tiền để đầu tư cho mục đích khác.  Điểm cân bằng trong dài hạn của thị trường cạnh tranh hoàn hảo. Tháng 9/2008 Ths Nguyễn Thuý Hằng Cân bằng cạnh tranh trong dài...

... quan đến vi c so sánh sản lượng cung cấp trong thị trường cạnh tranh hoàn hảo và độc quyền đó là qui mô kinh tế. Mặt khác, nếu xét về qui mô kinh tế thì doanh nghiệp cạnh tranh hoàn hảo có thể ... co giãn hơn so với đường cung ngắn hạn. Minh họa mô hình cạnh tranh hoàn hảo Một thị trường cạnh tranh hoàn hảo có hàm cung và cầu thị trường như sau: Hàm cầu: Q D = 250 - 10P Hàm cung: ... cạnh tranh được đặc tính bởi: - Nhiều người mua và bán, - Sản phẩm phân biệt, - Dễ dàng thâm nhập và rút khỏi thị trường. Thị trường bán cạnh tranh cũng tương tự như thị trường cạnh tranh hoàn...

... hàng hóa đó. Chapter 1 9 Hiệu quả của thị trường cạnh tranh  Lưu ý: Không phải lúc nào can thiệp của Nhà nước cũng làm giảm hiệu quả. Khi có thất bại thị trường (Ngoại tác, thiếu thông tin, độc ... các chính sách của chính - Thặng dư tiêu dùng và Thặng dư sản xuất  Tính hiệu quả của thị trường cạnh tranh  Giá trần và giá sàn  Trợ giá và hạn ngạch sản xuất  Hạn ngạch nhập khẩu và thuế ... 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7VI5 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...

... Các đặc trưng chủ yếu của thị trường cạnh tranh hoàn toàn  Định nghĩa: Thị trường cạnh tranh hoàn toàn là thị trường trong đó cả người mua và người bán đều cho rằng ... để thay đổi qui mô sản xuất CHƯƠNG V THỊ TRƯỜNG CẠNH TRANH HOÀN TOÀN Cân bằng trong ngắn hạn đối với ngành Đường cung ngắn hạn của ngành: hay còn gọi là đường cung thị trường trong ngắn ... xí nghiệp trong ngành cùng tung ra thị trường ở mọi mức giá có thể có. Như vậy chúng ta có thể thiết lập đường cung của ngành bằng cách tổng cộng theo hoành độ các đường cung ngắn hạn của...

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