Đặt \(\left\{{}\begin{matrix}\frac{x}{y}=a\\\frac{y}{z}=b\\\frac{z}{x}=c\end{matrix}\right.\) \(\Rightarrow abc=1\)

\(P=\frac{2b}{c}+\frac{2c}{a}+\frac{2a}{b}-a-b-c-\frac{1}{a}-\frac{1}{b}-\frac{1}{c}\)

\(P=2ab^2+2bc^2+2a^2c-a-b-c-\frac{1}{a}-\frac{1}{b}-\frac{1}{c}\)

\(ab^2+a\ge2ab\Rightarrow ab^2\ge2ab-a\) ; \(ab^2+\frac{1}{a}\ge2b\Rightarrow ab^2\ge2b-\frac{1}{a}\)

\(\Rightarrow2ab^2\ge2ab+2b-a-\frac{1}{a}\)

Tương tự và cộng lại:

\(\Rightarrow P\ge2\left(ab+ac+bc\right)+2\left(a+b+c\right)-2\left(a+b+c\right)-2\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)\)

\(\Rightarrow P\ge\frac{2\left(ab+ac+bc\right)}{abc}-2\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)=0\) (đpcm)

Dấu "=" xảy ra khi \(a=b=c\) hay \(x=y=z\)

\(\frac{x^2}{y+z}+\frac{y^2}{x+z}+\frac{z^2}{x+y}\ge\frac{\left(x+y+z\right)^2}{2\left(x+y+z\right)}=\frac{x+y+z}{2}\)

Dấu "=" xảy ra khi \(x=y=z\)

Hoặc:

\(\frac{x^2}{y+z}+\frac{y+z}{4}\ge2\sqrt{\frac{x^2\left(y+z\right)}{4\left(y+z\right)}}=x\)

\(\frac{y^2}{x+z}+\frac{x+z}{4}\ge y\) ; \(\frac{z^2}{x+y}+\frac{x+y}{4}\ge z\)

Cộng vế với vế ta có đpcm

\(\Leftrightarrow\frac{x^2}{x+y}+\frac{y^2}{y+z}+\frac{z^2}{z+x}\ge\frac{x+y+z}{2}\)
\(\Leftrightarrow\frac{x\left(x+y\right)-xy}{x+y}+\frac{y\left(y+z\right)-yz}{y+z}+\frac{z\left(z+x\right)-xz}{z+x}\ge\frac{x+y+z}{2}\)
\(\Leftrightarrow x+y+z-\frac{xy}{x+y}-\frac{yz}{y+z}-\frac{xz}{z+x}\ge\frac{x+y+z}{2}\)
\(\frac{xy}{x+y}+\frac{yz}{y+z}+\frac{zx}{z+x}\le\frac{x+y+z}{2}\)
\(x+y\ge2\sqrt{xy}\Rightarrow\frac{xy}{x+y}\le\frac{xy}{2\sqrt{xy}}=\frac{\sqrt{xy}}{2}\le\frac{x+y}{4}\)
tương tự rồi cộng vế với vế suy ra đpcm


 

Bạn kiểm tra lại đề

\(z=max\left\{x;y;z\right\}\)hay \(z=min\left\{x;y;z\right\}\)

Áp dụng bất đẳng thức Cauchy-Schwarz :

\(VT=\frac{x^2}{y+z}+\frac{y^2}{z+x}+\frac{z^2}{x+y}\ge\frac{\left(x+y+z\right)^2}{2\left(x+y+z\right)}=\frac{6^2}{2\cdot6}=3\)

Dấu "=" xảy ra \(\Leftrightarrow x=y=z=2\)

p/s: Đề sai nha bạn. Dạng tổng quát của bài toán :

Cho \(a,b,c>0;a+b+c=p\). Chứng minh rằng :

\(\frac{a^2}{b+c}+\frac{b^2}{c+a}+\frac{c^2}{a+b}\ge\frac{p}{2}\)

chứng minh \(\frac{3}{2}\ge\frac{x}{1+x^2}+\frac{y}{1+y^2}+\frac{z}{1+z^2}\)

ta có \(\left(x-1\right)^2\ge0\Leftrightarrow x^2+1\ge2x\Leftrightarrow\frac{2x}{1+x^2}\le1\)

\(\left(y-1\right)^2\ge0\Leftrightarrow y^2+1\ge2y\Leftrightarrow\frac{2y}{1+y^2}\le1\)

\(\left(z-1\right)^2\ge0\Leftrightarrow z^2+1\ge2z\Leftrightarrow\frac{2z}{1+z^2}\le1\)

\(\Rightarrow\frac{2x}{1+x^2}+\frac{2y}{1+y^2}+\frac{2x}{1+z^2}\le3\Leftrightarrow\frac{x}{1+x^2}+\frac{y}{1+y^2}+\frac{z}{1+z^2}\le\frac{3}{2}\)

chứng minh \(\frac{1}{1+x}+\frac{1}{1+y}+\frac{1}{1+z}\ge\frac{3}{2}\)

áp dụng bất đẳng thức Cauchy ta có: 

\(\frac{1}{1+x}+\frac{1}{1+y}+\frac{1}{1+z}\ge3\sqrt[3]{\frac{1}{\left(1+x\right)\left(1+y\right)\left(1+z\right)}}=\frac{3}{\sqrt{\left(1+x\right)\left(1+y\right)\left(1+z\right)}}\)

ta lại có \(\frac{\left(1+x\right)\left(1+y\right)\left(1+z\right)}{3}\ge\sqrt[3]{\left(1+x\right)\left(1+y\right)\left(1+z\right)}\)

vậy \(\frac{1}{1+x}+\frac{1}{1+y}+\frac{1}{1+z}\ge\frac{3}{\frac{\left(1+x\right)+\left(1+y\right)+\left(1+z\right)}{3}}=\frac{3}{2}\)

kết hợp ta có \(\frac{x}{1+x^2}+\frac{y}{1+y^2}+\frac{z}{1+z^2}\le\frac{3}{2}\le\frac{1}{1+x}+\frac{1}{1+y}+\frac{1}{1+z}\)

Sử dụng BĐT AM-GM, ta có: 

\(x^3+y^2\ge2yx\sqrt{x}\)

\(\Rightarrow\frac{2\sqrt{x}}{x^3+y^2}\le\frac{2\sqrt{x}}{2yx\sqrt{x}}=\frac{1}{xy}\)

Tương tự cộng lại suy ra: 

\(VT\le\frac{1}{xy}+\frac{1}{yz}+\frac{1}{zx}\le\frac{1}{x^2}+\frac{1}{y^2}+\frac{1}{z^2}\)