CHƯƠNG I: ĐỘNG LỰC HỌC VẬT RẮN docx

... thứcA. 212211IIII++=ωωω. B. 212211IIII+−=ωωω. C. 211221IIII++=ωωω. D. 211221IIII+−=ωωω. I 1ω1 I 2ω2ω I 1ω1 I 2ω2 A. tăng ba lần. B. giảm bốn lần. ... hệ hai đĩa quay v i tốc độ góc ω xác định bằngcông thứcA. 212211IIII++=ωωω. B. 212211IIII+−=ωωω. C. 221121ωωωIIII++=. D. 211221IIII++=ωωω.Câu 3: Hai đĩa ... biến đ i theo th i gian. B. vận tốc góc không biến đ i theo th i gian.C. gia tốc góc biến đ i theo th i gian. D. gia tốc góc có độ lớn khác không và không đ i theo th i gian.Câu 5: Một vật rắn...

... v i tốc độ góc ω. Có độ lớn xác định bằng côngthức nào sau đây? A. ω= 1 2 1 1 2 2 I I I I+ω + ω B. ω = 1 1 2 2 1 2 I I I Iω + ω+ C. ω = 1 2 2 1 1 2 I I I Iω + ω+ D. ω= 1 1 2 2 1 ... tuyến.25. Kim giê của một chiếc đồng hồ có chiều d i bằng 3/4 chiều d i kim phút. Coi nh các kim quay đều. Tỉ số gia tốchớng tâm của đầu kim phút và đầu kim giờ làA. 92. B. 10 8. C. 19 2. D. 204.Trang ... tính I 2 ban đầu đang đứng yên. Thả nhẹ đĩa 2 xuống đĩa 1 sau một khoảngth i gian ngắn hai đĩa cùng quay v i tốc độ góc A. 02 1 ωω I I= B. 0 1 2ωω I I= C. 0 21 2ωωII I += D.0 21 1ωωII I +=24....

...

...

... D. hiệu i n thế hiệu dụng giữa hai đầu đoạn mạch lớn hơn hiệu i n thế hiệu dụng giữa hai đầu i n trở 2 lần. E. Hiệu i n thế giữa hai đầu i n trở sớm pha π/4 đ i v i hiệu i n thế giữa ... Phát biểu nào sau đây là không đúng?A. Hiệu i n thế biến đ i i u hoà theo th i gian g i là hiệu i n thế xoay chiều.B. Dòng i n có cường độ biến đ i i u hoà theo th i gian g i là dòng i n ... i n n i tiếp v i i n trở.B. ngư i ta ph i mắc thêm vào mạch một cuộn cảm n i tiếp v i i n trở.C. ngư i ta ph i thay i n trở n i trên bằng một tụ i n.D. ngư i ta ph i thay i n trở nói...

... Định Giáo án Vật Lý 12 Nâng Cao 1 Chương I. ĐỘNG LỰC HỌC VẬT RẮN MỤC TIÊU - Hiểu được khái niệm vật rắn và chuyển động của một vật rắn. - Biết cách xác định vị trí của vật rắn ... dao động tự do. 2) Hệ dao động: -Là hệ vật gồm vật dao động cùng với vật tác dụng lực kéo về lên vật dao động. -Dao động của hệ xảy ra dưới tác dụng chỉ có nội lực gọi là dao động ... vật rắn quay (quanh một trục) thì nó có động năng. Hiểu và thuộc công thức tính động năng của vật rắn là tổng động năng của các phần tử của nó. - Hiểu được động năng của vật rắn bằng tổng động...

... vectơ gia tốc tiếp tuyến và vectơ gia tốc hướng tâm) của i m ấy:A. có độ lớn không đ i. B. Có hướng không đ i. C. có hướng và độ lớn không đ i. D. Luôn luôn thay đ i. D4 2 Một chất i m chuyển ... dần.B. Vật quay theo một chiều nhất định và tọa độ góc thay đ i theo th i gian thì vật chuyển động quay là nhanh dần.C. Vật quay theo một chiều nhất định và tốc độ góc không đ i theo th i gian ... cố đinh thì m i i m của vật rắn có cùng góc quay.B. Trong chuyển động của vật rắn quay quanh một trục cố định thì m i i m của vật rắn có cùng chiều quay.C. Trong chuyển động quay của vật...

... phát biểu saiA. Hai lực cân bằng ph i cùng phươngB. Hai lực cân bằng ph i cùng chiềuC. Hai lực cân bằng ph i cùng độ lớnD. Hai lực cân bằng ph i cùng đặt vào một vật rắn 5. Chọn phát biểu đúng ... khi kh i lượng tăng gấp đ i, tốc độ giảm một nửaC. Giảm i hai lần khi kh i lượng giảm i một nửa, tốc độ tăng gấp đ i D. Tăng lên hai lần khi kh i lượng và tốc độ đều tăng gấp đ i 42. Một vật ... kh i lượng tăng hai lần và khoảng cách t i trục quay tăng hai lầnB. Tăng hai lần khi kh i lượng tăng hai lần và khoảng cách t i trục quay giảm hai lầnC. Tăng hai lần khi kh i lượng giảm hai...

... Cần Giuộc GV : Vương Nhứt Trung . Tổng hợp từ đề của các trung tâm và trường chuyên Chương 1 , 2 , 3 1 ÔN LUYỆN THI TUYỂN C - H BAN NÂNG CAO  CHƯƠNG I : ĐỘNG LỰC HỌC VẬT RẮN  ... th i gian. C. độ lớn gia tốc d i biến đ i theo th i gian. D. vận tốc góc biến đ i theo th i gian.* Câu 6 : Một vật rắn đang quay đều quanh một trục cố định ∆ thì một i m xác định trên vật ... vận tốc góc biến đ i. C. độ lớn vận tốc d i biến đ i. D. vectơ vận tốc d i biến đ i. * Câu 2 : Một vật rắn đang quay quanh một trục cố định i qua vật, một i m xác định trên vật rắn ở cách trục...

... chuyên Chương 1 , 2 , 3 1 LUYỆN THI TUYỂN C - H BAN NÂNG CAO  CHƯƠNG I : ĐỘNG LỰC HỌC VẬT RẮN  Lý thuyết : Câu 1 : Khi một vật rắn quay đều quanh một trục cố định i qua vật thì ... i qua vật. Một i m xác định trên vật rắn cách trục quay khoảng r ≠ 0 có A. vận tốc góc không biến đ i theo th i gian. B. gia tốc góc biến đ i theo th i gian. C. độ lớn gia tốc d i biến ... src="data:image/png;base64,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 2I8 nXu8qy1e/np0r5OwEhYAoJ 7i9 ehUPPfRwkTYax3aFgMb6jdhNR8AQLNIz8W//m6FeL 3i6 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 1I2 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 1I2 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 5i8 HI9fs8dBNsLK2JGTl+O7bxfx+PK+ekWl5+LeX+YefL43tm+8 8i8 TCQAAiu/XwfY4OhAPbM7t14joXhevfCOGN+cePzcdO0bLNi+2e11Ba8QufvWkzCh45ZPcI32pxf0qYQEAivHLS/P9ur93uRHN1pb44db 8i5 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 2i3 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 2i/ 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 6i8 2LvmtPrNFkbAAoF+L7dcqVOy2G5b81rdu9HtDwgKAfi1V5Sp209JTXXd0+NUhYQFAv65CpWcUXOuu9X571Im1LgEA1KxfB9vjv2yOnlRERGpN/P2ncWCyuIqNKPPdXUvdrT+82bL/SFgAaPp+3d0dD918VRfu2hL/qSsen4jxdM0qNj2X/7hZBNQTEwkAoCrSc/Hgrxb69fne2LUlz7hm97p45Rsx1FnEM5d3RsGnl/Mc7EvFwAa/QyQsADSZ1Jr4zh8GMg9ti+1Lr13V2hLP9MTu7tpU7Ol8Cfuj2/wCqSsmEgBAtWT/3D94Y0Ejmru2xOCNsfNEERUb5ZhR8MaF3COGYKk/ducCgDo2eqmIio1V792Vd4PZQ9skLPXGRAIAqGMDG+LQtiIev8oZBf/023zPeToOn42J9JJ3ekHVGYUFgIrJ1uTq/7hfnbHY2Uzc/3acm17uMX2p+E5H9N8Q/eujw3REJCwANF6/ZuenDnXGj7+62kVVq1Cxr5+PJ08W9yNDnXHvxuhNRc/1Vo1FwgJAo/Rr1mB77O9dbeRNpOOR8RVGSUuu2KmZ2DG6qtMzQIuEBYDG6dcrFftMz2rbbmomhsfKX7Hl2vP2iq62+PaNce/GuGdD3NRWwQHabNbvu8MNZxIWACh3v14Ju5H+eqzYw2dj36kKXpPB9viLjbHthrjzhiU3sC3B4tO2bIKEBQDK369XKvblr0f3ujqq2GJn2a5Sdr7B 4I2 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 1I5 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 1i0 gYQFYsl+zf75/dCJeP6 9i9 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 0i2 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 9i2 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 9i4 HxCvD59R2rzMos2RGj4NaceO7PUfIwi+hVAwgLl9esTQwmx1dcWz34x/cS8GrKlPOSU9Qv70NvJszL0K4CEBVbkmeGER6+qPV114nLcsL7UabXZNZSP/lP6FYAC68JCSo6MJvTr0Z1Vf9yqsIhBw+vKRf9W/QqAhIX0vHUx4ZGjel6UdGbuytJdGfL4bfoVAAkLKRmZSlj46WBnXffrE0Px6C8jP5ul67zYYLN+BZCwQNk5+O0F/bq/Y9G19+ukX09Oxth0/PCjzF9//QogYYGy/eOFOJOfd6Q7F9/YVu/9WufnqV8BkLBQLROXE7YweOXuOl2itWjNr+9nbSnZmbnozulXACQsrMwzw8VHDnbWaVQV9Wv/1ujYlLGr/eq5awPe+hVAwgKVGMoX72LQ3hR7WjPQr+1NSz3dX58GL11b80G/AkhYlwAq9INzxUeevL0efzW/cM+w+2/O2FKyE5dj72n9CoCEhZXJzyZsZFCHQ7CL7XmbrX69ui+XfgVAwkLlFi5H1b+17oZgF+vXictZ+k+F/lMxNq1fAZCwsGI/vlB8pN6GYJcYfz05mZmKza2Ph7foVwCK+P8DKN /I1 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 9i8 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 5I1 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 1I7 duRrLa+fj0Nnigyd66rq0ZubiiaGEvXCX0NcWz3WmeQ6Dl2Lv6TJer18BoKaMwjaWwU8TDqY4ZlkNhbHY7lwZn3J8PLXVCQp6muNgyU2sXwFAwpKmn32SydPesC5eubu8NQpSfK6r4MG2kpZu0K8AIGHXrpGpODYex8bjrYsxMpXawkwLn+XKinJX2jo5mf5+WgfuXOYE9CsA1AdzYVddYUn84+PFbXTorpVuQDAzF3/484Tjr++u/e6ypV+cPYOlvrg7Fz/alfIJHBu/9sCWfgWAemUUdtUdHS3u14gYm469p+OxMzFxufJ3/miRIdhfXMrMxWndmLw+QKIz+fQHYu9t1q8AIGGZLz8bA+cX/ejJyXjsV+nv9vTmxSxdorKerHrtwmqckn4FAAm7pv18ucetzuTjxETKX/T4eMY2QX2wLfq3lvqtrWTcWr8CgIRleZ+UsBnpgeH 0i/ 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 9I9 vMXtAwASlpr2a0Q8eXvKK5Lm 1i+ 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 2i+ VNii04MBxHRqv7zFnpfvpx8ZG/2ebWA4A1xUSCVBWe4vp1PgZ2RevGkl6c+MjXwc54sK1aJ1k01aF0vS3xUleNn5qamYuH 3i4 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 1I7 4yy0mDwAAErb8fo16Wki/5hV79TQOj1ZrjmxE9G+Nx2/z5BYAIGEr7df2pvjJPXWUU4tV7KG7VnuoOD8bP/04/tfHi64hUK72pnh4S3z9VvEKAEjYMs3MxQsfxMD5K399fXfdzcVcbPeBWk14mLgcpz6Nf5uMExOVzDFob4o9rbGntbzlYwEACcu1fn 1i6 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...

... T i liệu học thêm Vật lý 12A 1 CHƯƠNG I - ĐỘNG LỰC HỌC VẬT RẮN B I 1 . CHUYỂN ĐỘNG CỦA VẬT RẮN QUAY QUANH MỘT TRỤC CỐ ĐỊNH Câu1. Chọn phương án Đúng. Trong chuyển động quay biến đ i ... ≠ 0 có: T i liệu học thêm Vật lý 12A 2 A. vận tốc góc biến đ i theo th i gian. B. vận tốc góc không biến đ i theo th i gian. C. gia tốc góc biến đ i theo th i gian. D. gia tốc góc có ... một th i i m, cỏc i m của vật rắn cú cựng vận tốc d i. * C. Ở cựng một th i i m, cỏc i m của vật rắn cú cựng vận tốc gúc. D. Ở cựng một th i i m, cỏc i m của vật rắn cú cựng gia tốc...

... lượng véctơ CHƯƠNG I: ĐỘNG LỰC HỌC VẬT RẮN 1. Toạ độ góc Là toạ độ xác định vị trí của một vật rắn quay quanh một trục cố định bởi góc  (rad) hợp giữa mặt phẳng động gắn với vật và mặt phẳng ... Lưu ý: Vật rắn quay đều thì at = 0  a = na 6. Phương trình động lực học của vật rắn quay quanh một trục cố định MM I hayI   Trong đó: + M = Fd (Nm)là mômen lực đối ... trình động học của chuyển động quay * Vật rắn quay đều ( = 0)  = 0 + t + 2i iiI m r (kgm2)là mômen quán tính của vật rắn đối với trục quay Mômen quán tính I của một số vật...

... đòn của lực) CHƯƠNG I: ĐỘNG LỰC HỌC VẬT RẮN 1. Toạ độ góc Là toạ độ xác định vị trí của một vật rắn quay quanh một trục cố định bởi góc  (rad) hợp giữa mặt phẳng động gắn với vật và mặt ... Lưu ý: Vật rắn quay đều thì at = 0  a = na 6. Phương trình động lực học của vật rắn quay quanh một trục cố định MM I hayI   Trong đó: + M = Fd (Nm)là mômen lực đối ... phương trình động lực học của vật rắn quay quanh một trục cố định dLMdt 9. Định luật bảo toàn mômen động lượng Trường hợp M = 0 thì L = const Nếu I = const   = 0 vật rắn không quay...