Tá»· sá»‘ thá»ƒ tÃch Ä‘Æ¡n hÃ¬nh

**buratinogigle** · 25-01-2016, 06:48 PM

Cho Ä‘Æ¡n hÃ¬nh $A_0A_1A_2...A_n$ trong khÃ´ng gian Euclide $\Bbb E^n$. Thá»ƒ tÃch Ä‘Æ¡n hÃ¬nh nÃ y Ä‘á»‹nh nghÄ©a lÃ $[A_0A_1...A_n]=|\frac{1}{n!}\det(\vec{A_0A_1},\vec{A_0A_2},..., \vec{A_0A_n})|$. Gá»i $\mathcal{S}$ lÃ siÃªu cáº§u ngoáº¡i tiáº¿p Ä‘Æ¡n hÃ¬nh $A_0A_1A_2...A_n$ vÃ $P$ lÃ má»™t Ä‘iá»ƒm náº±m trong $A_0A_1A_2...A_n$. Gá»i giao Ä‘iá»ƒm cá»§a cÃ¡c Ä‘Æ°á»ng tháº³ng $PA_0,PA_1,...,PA_n$ vá»›i $\mathcal{S}$ lÃ $B_0,B_1,...,B_n$. Chá»©ng minh ráº±ng $$\frac{[A_0A_1...A_n]}{[B_0B_1...B_n]}=\frac{PA_0.PA_2....PA_n}{PB_0.PB_1...PB_n}.$$

25-01-2016, 06:48 PM	#1
buratinogigle Administrator : Jan 2016 : 50 : 57	Tá»· sá»‘ thá»ƒ tÃch Ä‘Æ¡n hÃ¬nh Cho Ä‘Æ¡n hÃ¬nh $A_0A_1A_2...A_n$ trong khÃ´ng gian Euclide $\Bbb E^n$. Thá»ƒ tÃch Ä‘Æ¡n hÃ¬nh nÃ y Ä‘á»‹nh nghÄ©a lÃ $[A_0A_1...A_n]=\|\frac{1}{n!}\det(\vec{A_0A_1},\vec{A_0A_2},..., \vec{A_0A_n})\|$. Gá»i $\mathcal{S}$ lÃ siÃªu cáº§u ngoáº¡i tiáº¿p Ä‘Æ¡n hÃ¬nh $A_0A_1A_2...A_n$ vÃ $P$ lÃ má»™t Ä‘iá»ƒm náº±m trong $A_0A_1A_2...A_n$. Gá»i giao Ä‘iá»ƒm cá»§a cÃ¡c Ä‘Æ°á»ng tháº³ng $PA_0,PA_1,...,PA_n$ vá»›i $\mathcal{S}$ lÃ $B_0,B_1,...,B_n$. Chá»©ng minh ráº±ng $$\frac{[A_0A_1...A_n]}{[B_0B_1...B_n]}=\frac{PA_0.PA_2....PA_n}{PB_0.PB_1...PB_n}.$$ __________________ Blog hÃ¬nh há»c sÆ¡ cáº¥p [Only registered and activated users can see links. ]