Diễn Đàn MathScope - Xem bài viết đơn - Tim Max $(3\sqrt{2}y-\sqrt{11}z)^2+(\sqrt{7}z-3\sqrt{2}x)^2+(\sqrt{11}x-\sqrt{7}y)^2$

man111 · 09-05-2019, 08:30 PM

Lagrange Identity:

$\displaystyle (bc'-b'c)^2+(ca'-a'c)^2+(ab'-a'b)^2=(a^2+b^2+c^2)(a'^2+b'^2+c'^2)-(aa'+bb'+cc')^2$

$(3\sqrt{2}y-\sqrt{11}z)^2+(\sqrt{7}z-3\sqrt{2}x)^2+(\sqrt{11}x-\sqrt{7}y)^2=(18+11+7)-(\sqrt{7}x+\sqrt{11}y+3\sqrt{2}z)^2\leq 36.$

Dấu bằng xảy ra khi $(\sqrt{7}x+\sqrt{11}y+3\sqrt{2}z)=0$

09-05-2019, 08:30 PM	#2
man111 +Thành Viên+ Tham gia ngày: Nov 2010 Bài gởi: 280 Thanks: 152 Thanked 77 Times in 49 Posts	Lagrange Identity: $\displaystyle (bc'-b'c)^2+(ca'-a'c)^2+(ab'-a'b)^2=(a^2+b^2+c^2)(a'^2+b'^2+c'^2)-(aa'+bb'+cc')^2$ $(3\sqrt{2}y-\sqrt{11}z)^2+(\sqrt{7}z-3\sqrt{2}x)^2+(\sqrt{11}x-\sqrt{7}y)^2=(18+11+7)-(\sqrt{7}x+\sqrt{11}y+3\sqrt{2}z)^2\leq 36.$ Dấu bằng xảy ra khi $(\sqrt{7}x+\sqrt{11}y+3\sqrt{2}z)=0$ thay đổi nội dung bởi: man111, 09-05-2019 lúc 10:01 PM