Lời giải:
Do $abc=1$ nên đặt:

\((\sqrt{a}, \sqrt{b}, \sqrt{c})=(\frac{x}{y}, \frac{y}{z}, \frac{z}{x})\) với $x,y,z>0$

Khi đó, bài toán trở thành: Cho $x,y,z>0$. CMR:

\(\frac{xz^2}{2z^2y+xy^2}+\frac{yx^2}{2x^2z+yz^2}+\frac{zy^2}{2y^2x+zx^2}\geq 1\)

Thật vậy, áp dụng BĐT Cauchy-Schwarz:

\(\frac{xz^2}{2z^2y+xy^2}+\frac{yx^2}{2x^2z+yz^2}+\frac{zy^2}{2y^2x+zx^2}=\frac{(xz)^2}{2xyz^2+(xy)^2}+\frac{(xy)^2}{2x^2yz+(yz)^2}+\frac{(yz)^2}{2xy^2z+(xz)^2}\)

\(\geq \frac{(xz+xy+yz)^2}{2xyz^2+(xy)^2+2x^2yz+(yz)^2+2xy^2z+(xz)^2}=\frac{(xy+yz+xz)^2}{(xy+yz+xz)^2}=1\)

Ta có đpcm.

Dấu "=" xảy ra khi $x=y=z$ hay $a=b=c=1$

thank you

giải phương trình nghiệm nguyên :
\(\sqrt{x-2008}+\sqrt{y-2009}+\sqrt{z-2010}+3012=\frac{1}{2}\left(x+y+z\right)\)

hello nha

2k? vậy ạ

\(VT=\dfrac{a}{a+b}+\dfrac{b}{b+c}+\dfrac{c}{a+c}\)

\(VT< \dfrac{a+c}{a+b+c}+\dfrac{b+a}{a+b+c}+\dfrac{c+b}{a+b+c}=2\)

\(VP=\dfrac{a}{\sqrt{a\left(b+c\right)}}+\dfrac{b}{\sqrt{b\left(c+a\right)}}+\dfrac{c}{\sqrt{c\left(a+b\right)}}\)

\(VP\ge\dfrac{2a}{a+b+c}+\dfrac{2b}{a+b+c}+\dfrac{2c}{a+b+c}=2\)

\(\Rightarrow VP>VT\) (đpcm)

Ta có:

\(\frac{2}{\sqrt{a}}+\frac{2}{\sqrt{b}}+\frac{2}{\sqrt{c}}=\left(\frac{1}{\sqrt{a}}+\frac{1}{\sqrt{b}}\right)+\left(\frac{1}{\sqrt{b}}+\frac{1}{\sqrt{c}}\right)+\left(\frac{1}{\sqrt{c}}+\frac{1}{\sqrt{a}}\right)\)

\(\ge\frac{\left(1+1\right)^2}{\sqrt{a}+\sqrt{b}}+\frac{\left(1+1\right)^2}{\sqrt{b}+\sqrt{c}}+\frac{\left(1+1\right)^2}{\sqrt{c}+\sqrt{a}}\)

\(=\frac{4}{\sqrt{a}+\sqrt{b}}+\frac{4}{\sqrt{b}+\sqrt{c}}+\frac{4}{\sqrt{c}+\sqrt{a}}\)

=> \(2\left(\frac{1}{\sqrt{a}}+\frac{1}{\sqrt{b}}+\frac{1}{\sqrt{c}}\right)\)\(\ge4\left(\frac{1}{\sqrt{a}+\sqrt{b}}+\frac{1}{\sqrt{b}+\sqrt{c}}+\frac{1}{\sqrt{c}+\sqrt{a}}\right)\)

=> \(\frac{1}{\sqrt{a}}+\frac{1}{\sqrt{b}}+\frac{1}{\sqrt{c}}\)\(\ge2\left(\frac{1}{\sqrt{a}+\sqrt{b}}+\frac{1}{\sqrt{b}+\sqrt{c}}+\frac{1}{\sqrt{c}+\sqrt{a}}\right)\)

"=" xảy ra <=> a =b =c.