Lời giải:

Từ \(xy+yz+xz=xyz\Rightarrow \frac{1}{x}+\frac{1}{y}+\frac{1}{z}=1\)

Đặt \((a,b,c)=\left(\frac{1}{x}; \frac{1}{y}; \frac{1}{z}\right)\Rightarrow a+b+c=1\)

BĐT cần chứng minh trở thành:

\(P=\frac{c^3}{(a+1)(b+1)}+\frac{a^3}{(b+1)(c+1)}+\frac{b^3}{(c+1)(a+1)}\geq \frac{1}{16}(*)\)

Thật vậy, áp dụng BĐT Cauchy ta có:

\(\frac{c^3}{(a+1)(b+1)}+\frac{a+1}{64}+\frac{b+1}{64}\geq 3\sqrt[3]{\frac{c^3}{64^2}}=\frac{3c}{16}\)

\(\frac{a^3}{(b+1)(c+1)}+\frac{b+1}{64}+\frac{c+1}{64}\geq 3\sqrt[3]{\frac{a^3}{64^2}}=\frac{3a}{16}\)

\(\frac{b^3}{(c+1)(a+1)}+\frac{c+1}{64}+\frac{a+1}{64}\geq 3\sqrt[3]{\frac{b^3}{64^2}}=\frac{3b}{16}\)

Cộng theo vế các BĐT trên và rút gọn :

\(\Rightarrow P+\frac{a+b+c+3}{32}\geq \frac{3(a+b+c)}{16}\)

\(\Leftrightarrow P+\frac{4}{32}\geq \frac{3}{16}\Leftrightarrow P\geq \frac{1}{16}\)

Vậy \((*)\) được chứng minh. Bài toán hoàn tất.

Dấu bằng xảy ra khi \(a=b=c=\frac{1}{3}\Leftrightarrow x=y=z=3\)

Ta có \(P=\frac{x\left(yz+1\right)^2}{z^2\left(zx+1\right)}+\frac{y\left(zx+1\right)^2}{x^2\left(xy+1\right)}+\frac{z\left(xy+1\right)^2}{y^2\left(yz+1\right)}\)

\(=\frac{\frac{\left(yz+1\right)^2}{z^2}}{\frac{zx+1}{x}}+\frac{\frac{\left(zx+1\right)^2}{x^2}}{\frac{xy+1}{y}}+\frac{\frac{\left(xy+1\right)^2}{y^2}}{\frac{yz+1}{z}}\)

\(=\frac{\left(y+\frac{1}{z}\right)^2}{z+\frac{1}{x}}+\frac{\left(z+\frac{1}{x}\right)^2}{x+\frac{1}{y}}+\frac{\left(x+\frac{1}{y}\right)^2}{y+\frac{1}{z}}\)

Áp dụng BĐT \(\frac{a_1^2}{b_1}+\frac{a_2^2}{b_2}+\frac{a_3^2}{b_3}\ge\frac{\left(a_1+a_2+a_3\right)^2}{b_1+b_2+b_3}\)

Dấu "=" xảy ra khi \(\frac{a_1}{b_1}=\frac{a_2}{b_2}=\frac{a_3}{c_3}\)

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

\(P\ge a+y+z+\frac{1}{x}+\frac{1}{y}+\frac{1}{z}\)

Áp dụng BĐT: \(\frac{1}{x}+\frac{1}{y}+\frac{1}{z}\ge\frac{9}{x+y+z}\)

=> \(P\ge x+y+z+\frac{9}{x+y+z}=\left[x+y+z+\frac{9}{4\left(x+y+z\right)}\right]+\frac{27}{4\left(x+y+z\right)}\)

Ta có: \(x+y+z+\frac{9}{4\left(x+y+z\right)}\ge2\sqrt{\frac{9}{4}}=3;\frac{27}{4\left(x+y+z\right)}=\frac{27}{4\cdot\frac{3}{2}}=\frac{9}{2}\)

=> \(P\ge3+\frac{9}{2}=\frac{15}{2}\).

Dấu "=" xảy ra <=> x=y=z=\(\frac{1}{2}\)

Vậy Min_P=\(\frac{15}{2}\)đạt được khi x=y=z=\(\frac{1}{2}\)

Ta có:

\(P=\frac{x\left(yz+1\right)^2}{z^2\left(zx+1\right)}+\frac{y\left(zx+1\right)^2}{x^2\left(xy+1\right)}+\frac{z\left(xy+1\right)^2}{y^2\left(yz+1\right)}\)

\(=\frac{\left(\frac{yz+1}{z}\right)^2}{\left(\frac{zx+1}{x}\right)}+\frac{\left(\frac{zx+1}{x}\right)^2}{\left(\frac{xy+1}{y}\right)}+\frac{\left(\frac{xy+1}{y}\right)^2}{\left(\frac{yz+1}{z}\right)}\)

\(=\frac{\left(y+\frac{1}{z}\right)^2}{z+\frac{1}{x}}+\frac{\left(z+\frac{1}{x}\right)^2}{x+\frac{1}{y}}+\frac{\left(x+\frac{1}{y}\right)^2}{y+\frac{1}{z}}\)

Áp dụng BĐT Bunhiacopxki dạng phân thức, ta có:

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

\(\ge\left(x+y+z\right)+\frac{9}{x+y+z}=\left(x+y+z\right)+\frac{9}{4\left(x+y+z\right)}\)

\(+\frac{27}{4\left(x+y+z\right)}\ge2\sqrt{\left(x+y+z\right).\frac{9}{4\left(x+y+z\right)}}+\frac{27}{4.\frac{3}{2}}=\frac{15}{2}\)(Áp dụng BĐT Cô - si cho 2 số không âm)

Đẳng thức xảy ra khi \(x=y=z=\frac{1}{2}\)

Áp dụng BĐT AM-GM: $VP\leq \frac{25}{yz+zx+xy+4}$

Cần c/m: $\frac{x+1}{y+1}+\frac{y+1}{z+1}+\frac{z+1}{x+1}$\leq \frac{25}{yz+zx+xy+4}$

$\Leftrightarrow (yz+zx+xy)(xy^{2}+yz^{2}+zx^{2})+4(xy^{2}+yz^{2}+zx^{2})\leq 25xyz+4(yz+zx+xy)+16$

BĐT trên sẽ được c/m nếu c/m được: $xy^{2}+yz^{2}+zx^{2}\leq 4$.

KMTTQ, g/sử y nằm giữa x và z. $\Rightarrow x(x-y)(y-z)\geq 0$

$\Leftrightarrow xy^{2}+yz^{2}+zx^{2}\leq y(x^{2}+xz+z^{2})\leq y(x+z)^{2}$

Đến đây áp dụng BĐT AM-GM:

$y(x+z)^{2}=4.y.(\frac{x+z}{2})(\frac{x+z}{2})\leq \frac{4(y+\frac{x+z}{2}+\frac{x+z}{2})^{3}}{27}=\frac{4(x+y+z)^{3}}{27}=4$ (đpcm)

Dấu bằng xảy ra khi, chẳng hạn $x=0;y=1;z=2$

Áp dụng BĐT AM-GM và BĐT Rearrangement  ta có:

\(VT=\frac{x+1}{y+1}+\frac{y+1}{z+1}+\frac{z+1}{x+1}\)

\(=\frac{\left(x+y+z\right)^2+3\left(x+y+z\right)+xy^2+yz^2+zx^2+3}{\left(x+1\right)\left(y+1\right)\left(z+1\right)}\)\(\le\frac{21+y\left(x+z\right)^2}{3\sqrt[3]{4\left(xy+yz+xz\right)}}\le\frac{21+\frac{\left(\frac{2\left(x+y+z\right)}{3}\right)^3}{2}}{3\sqrt[3]{4\left(xy+yz+zx\right)}}=\frac{21+4}{3\sqrt[3]{4\left(xy+yz+zx\right)}}=\frac{25}{3\sqrt[3]{4\left(xy+yz+zx\right)}}\)

Dấu "=" xảy ra <=> (x;y;z)=(2;1;0) và hoán vị của nó

\(yz\le\frac{\left(y+z\right)^2}{4}\Rightarrow\frac{x^2\left(y+z\right)}{yz}\ge\frac{4x^2}{y+z}\)

Do đó \(P\ge\frac{4x^2}{y+z}+\frac{4y^2}{z+x}+\frac{4z^2}{x+y}\ge\frac{4\left(x+y+z\right)^2}{2\left(x+y+z\right)}=2\)(Vì x+y+z = 1)

Vậy Min P= 2. Dấu "=" có <=> x = y = z = 1/3.

\(xy+yz+zx=xyz\)

\(\Leftrightarrow\frac{1}{x}+\frac{1}{y}+\frac{1}{z}=1\)

Đặt \(\frac{1}{x}=a;\frac{1}{y}=b;\frac{1}{z}=c\) thì

\(\hept{\begin{cases}a+b+c=1\\P=\frac{a^3}{\left(1+b\right)\left(1+c\right)}+\frac{b^3}{\left(1+c\right)\left(1+a\right)}+\frac{c^3}{\left(1+a\right)\left(1+b\right)}\ge\frac{1}{16}\end{cases}}\)

Ta co:

\(\frac{a^3}{\left(1+b\right)\left(1+c\right)}+\frac{1+b}{64}+\frac{1+c}{64}\ge\frac{3a}{16}\)

\(\Leftrightarrow\frac{a^3}{\left(1+b\right)\left(1+c\right)}\ge\frac{3a}{16}-\frac{b}{64}-\frac{c}{64}-\frac{1}{32}\)

Từ đây ta co:

\(P\ge\left(a+b+c\right)\left(\frac{3}{16}-\frac{1}{64}-\frac{1}{64}\right)-\frac{3}{32}=\frac{1}{16}\)

Ta đặt: \(\frac{1}{x}=a;\frac{1}{y}=b;\frac{1}{z}=c;\frac{1}{t}=d\)  ( a, b, c, d >0 )

Khi đó ta cần chứng minh:

 \(\frac{a^3}{\frac{1}{bc}+\frac{1}{cd}+\frac{1}{db}}+\frac{b^3}{\frac{1}{ac}+\frac{1}{cd}+\frac{1}{da}}+\frac{c^3}{\frac{1}{ab}+\frac{1}{bd}+\frac{1}{da}}+\frac{d^3}{\frac{1}{ab}+\frac{1}{bc}+\frac{1}{ca}}\ge\frac{1}{3}\left(a+b+c+d\right)\)

\(VT=\frac{a^3}{\frac{b+c+d}{bcd}}+\frac{b^3}{\frac{a+c+d}{acd}}+\frac{c^3}{\frac{a+b+d}{abd}}+\frac{d^3}{\frac{a+b+c}{abc}}\)

\(=\frac{a^3}{\frac{a\left(b+c+d\right)}{abcd}}+\frac{b^3}{\frac{b\left(a+c+d\right)}{abcd}}+\frac{c^3}{\frac{c\left(a+b+d\right)}{abcd}}+\frac{d^3}{\frac{d\left(a+b+c\right)}{abcd}}\)

\(=\frac{a^2}{b+c+d}+\frac{b^2}{a+c+d}+\frac{c^2}{a+b+d}+\frac{d^2}{a+b+c}\)

\(\ge\frac{\left(a+b+c+d\right)^2}{3\left(a+b+c+d\right)}=\frac{a+b+c+d}{3}=VP\)

Vậy ta đã chứng minh được

\(\frac{a^3}{\frac{1}{bc}+\frac{1}{cd}+\frac{1}{db}}+\frac{b^3}{\frac{1}{ac}+\frac{1}{cd}+\frac{1}{da}}+\frac{c^3}{\frac{1}{ab}+\frac{1}{bd}+\frac{1}{da}}+\frac{d^3}{\frac{1}{ab}+\frac{1}{bc}+\frac{1}{ca}}\ge\frac{1}{3}\left(a+b+c+d\right)\)

Dấu "=" xảy ra <=> a = b = c = d 

Vậy : 

\(\frac{1}{x^3\left(yz+zt+ty\right)}+\frac{1}{y^3\left(xz+zt+tx\right)}+\frac{1}{z^3\left(xy+yt+tx\right)}+\frac{1}{t^3\left(xy+yz+zx\right)}\ge\frac{1}{3}\left(\frac{1}{x}+\frac{1}{y}+\frac{1}{z}+\frac{1}{t}\right)\)

Dấu "=" xảy ra <=> x = y = z = t = 1