Câu hỏi của Lê Hồng Ngọc

Question

Cho a,b,c thuộc R. Cm: (a+b+c/3 )^2 lớn hơn hoặc bằng ab+bc+ca

Vu Huy · Accepted Answer

(a+b+c/3)2= a2+b2+(c/3)2+2ab+2/3ac+2/3bc* a2+b2+(c/3)2 $\ge$0=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc$\ge$2ab+2/3ac+2/3bcmà 2ab+2/3ac+2/3bc$\ge$ab+bc+ca=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc$\ge$ab+bc+ca=> (a+b+c/3)2$\ge$ab+bc+caCâu trả lời: (a+b+c/3)2= a2+b2+(c/3)2+2ab+2/3ac+2/3bc* a2+b2+(c/3)2 $\ge$0=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc$\ge$2ab+2/3ac+2/3bcmà 2ab+2/3ac+2/3bc$\ge$ab+bc+ca=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc$\ge$ab+bc+ca=> (a+b+c/3)2$\ge$ab+bc+ca

Hoàng hôn ( Cool Team ) · Answer

trả lời:(a+b+c/3)2= a2+b2+(c/3)2+2ab+2/3ac+2/3bc* a2+b2+(c/3)2 \ge≥0=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc\ge≥2ab+2/3ac+2/3bcmà 2ab+2/3ac+2/3bc\ge≥ab+bc+ca=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc\ge≥ab+bc+ca=> (a+b+c/3)2\ge≥ab+bc+caCâu trả lời: trả lời:(a+b+c/3)2= a2+b2+(c/3)2+2ab+2/3ac+2/3bc* a2+b2+(c/3)2 \ge≥0=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc\ge≥2ab+2/3ac+2/3bcmà 2ab+2/3ac+2/3bc\ge≥ab+bc+ca=> a2+b2+(c/3)2+2ab+2/3ac+2/3bc\ge≥ab+bc+ca=> (a+b+c/3)2\ge≥ab+bc+ca

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