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1) Áp dụng bđt Cauchy cho 3 số dương ta có

 \(\dfrac{1}{x}+\dfrac{1}{x}+\dfrac{1}{x}+x^3\ge4\sqrt[4]{\dfrac{1}{x}.\dfrac{1}{x}.\dfrac{1}{x}.x^3}=4\) (1)

\(\dfrac{3}{y^2}+y^2\ge2\sqrt{\dfrac{3}{y^2}.y^2}=2\sqrt{3}\) (2)

\(\dfrac{3}{z^3}+z=\dfrac{3}{z^3}+\dfrac{z}{3}+\dfrac{z}{3}+\dfrac{z}{3}\ge4\sqrt[4]{\dfrac{3}{z^3}.\dfrac{z}{3}.\dfrac{z}{3}.\dfrac{z}{3}}=4\sqrt{3}\) (3)

Cộng (1);(2);(3) theo vế ta được

\(\left(\dfrac{3}{x}+\dfrac{3}{y^2}+\dfrac{3}{z^3}\right)+\left(x^3+y^2+z\right)\ge4+2\sqrt{3}+4\sqrt{3}\)

\(\Leftrightarrow3\left(\dfrac{1}{x}+\dfrac{1}{y^2}+\dfrac{1}{z^3}\right)\ge3+4\sqrt{3}\)

\(\Leftrightarrow P\ge\dfrac{3+4\sqrt{3}}{3}\)

Dấu "=" xảy ra <=> \(\left\{{}\begin{matrix}\dfrac{1}{x}=x^3\\\dfrac{3}{y^2}=y^2\\\dfrac{3}{z^3}=\dfrac{z}{3}\end{matrix}\right.\Leftrightarrow\left\{{}\begin{matrix}x=1\\y=\sqrt[4]{3}\\z=\sqrt{3}\end{matrix}\right.\) (thỏa mãn giả thiết ban đầu)

2) Ta có \(4\sqrt{ab}=2.\sqrt{a}.2\sqrt{b}\le a+4b\)

Dấu"=" khi a = 4b

nên \(\dfrac{8}{7a+4b+4\sqrt{ab}}\ge\dfrac{8}{7a+4b+a+4b}=\dfrac{1}{a+b}\)

Khi đó \(P\ge\dfrac{1}{a+b}-\dfrac{1}{\sqrt{a+b}}+\sqrt{a+b}\)

Đặt \(\sqrt{a+b}=t>0\) ta được

\(P\ge\dfrac{1}{t^2}-\dfrac{1}{t}+t=\left(\dfrac{1}{t^2}-\dfrac{2}{t}+1\right)+\dfrac{1}{t}+t-1\)

\(=\left(\dfrac{1}{t}-1\right)^2+\dfrac{1}{t}+t-1\)

Có \(\dfrac{1}{t}+t\ge2\sqrt{\dfrac{1}{t}.t}=2\) (BĐT Cauchy cho 2 số dương)

nên \(P=\left(\dfrac{1}{t}-1\right)^2+\dfrac{1}{t}+t-1\ge\left(\dfrac{1}{t}-1\right)^2+1\ge1\)

Dấu "=" xảy ra <=> \(\left\{{}\begin{matrix}\dfrac{1}{t}-1=0\\t=\dfrac{1}{t}\end{matrix}\right.\Leftrightarrow t=1\)(tm)

khi đó a + b = 1

mà a = 4b nên \(a=\dfrac{4}{5};b=\dfrac{1}{5}\)

Vậy MinP = 1 khi \(a=\dfrac{4}{5};b=\dfrac{1}{5}\)

Đặt \(\left\{{}\begin{matrix}\sqrt{y+z-4}=a>0\\\sqrt{z+x-4}=b>0\\\sqrt{x+y-4}=c>0\end{matrix}\right.\Rightarrow\left\{{}\begin{matrix}x=\dfrac{b^2+c^2-a^2+4}{2}\\y=\dfrac{c^2+a^2-b^2+4}{2}\\z=\dfrac{a^2+b^2-c^2+4}{2}\end{matrix}\right.\).

\(2P=\dfrac{b^2+c^2-a^2+4}{a}+\dfrac{c^2+a^2-b^2+4}{b}+\dfrac{a^2+b^2-c^2+4}{c}=\dfrac{a^2}{b}+\dfrac{b^2}{c}+\dfrac{c^2}{a}+\dfrac{b^2}{a}+\dfrac{c^2}{b}+\dfrac{a^2}{c}+\dfrac{4}{a}+\dfrac{4}{b}+\dfrac{4}{c}-a-b-c\).

Áp dụng bất đẳng thức AM - GM:

\(\dfrac{a^2}{b}+\dfrac{b^2}{c}+\dfrac{c^2}{a}=\left(\dfrac{a^2}{b}+b\right)+\left(\dfrac{b^2}{c}+c\right)+\left(\dfrac{c^2}{a}+a\right)-\left(a+b+c\right)\ge2a+2b+2c-a-b-c=a+b+c\).

Tương tự, \(\dfrac{b^2}{a}+\dfrac{c^2}{b}+\dfrac{a^2}{c}\ge a+b+c\).

Do đó \(2P\ge a+b+c+\dfrac{4}{a}+\dfrac{4}{b}+\dfrac{4}{c}=\left(a+\dfrac{4}{a}\right)+\left(b+\dfrac{4}{b}\right)+\left(c+\dfrac{4}{c}\right)\ge4+4+4=12\Rightarrow P\ge6\).

Đẳng thức xảy ra khi a = b = c = 2 hay x = y = z = 4.

Vậy Min P = 6 khi x = y = z = 4.

\(P=\dfrac{4x}{2.2.\sqrt{y+z-4}}+\dfrac{4y}{2.2.\sqrt{x+z-4}}+\dfrac{4z}{2.2.\sqrt{x+y-4}}\)

\(P\ge4\left(\dfrac{x}{y+z}+\dfrac{y}{z+x}+\dfrac{z}{x+y}\right)\ge4.\dfrac{3}{2}=6\)

Dấu "=" xảy ra khi \(x=y=z=4\)

Lời giải:

Bạn cần bổ sung điều kiện $x,y,z>0$

\(P=\frac{1}{x.\frac{y^2+z^2}{y^2z^2}}+\frac{1}{y.\frac{z^2+x^2}{z^2x^2}}+\frac{1}{z.\frac{x^2+y^2}{x^2y^2}}=\frac{1}{x(\frac{1}{y^2}+\frac{1}{z^2})}+\frac{1}{y(\frac{1}{z^2}+\frac{1}{x^2})}+\frac{1}{z(\frac{1}{x^2}+\frac{1}{y^2})}\)

\(=\frac{1}{x(3-\frac{1}{x^2})}+\frac{1}{y(3-\frac{1}{y^2})}+\frac{1}{z(3-\frac{1}{z^2})}=\frac{x}{3x^2-1}+\frac{y}{3y^2-1}+\frac{z}{3z^2-1}\)

Vì $\frac{1}{x^2}+\frac{1}{y^2}+\frac{1}{z^2}=3\Rightarrow x^2, y^2, z^2>\frac{1}{3}$

Xét hiệu:

\(\frac{x}{3x^2-1}-\frac{1}{2x^2}=\frac{(x-1)^2(2x+1)}{2x^2(3x^2-1)}\geq 0\) với mọi $x>0$ và $x^2>\frac{1}{3}$

$\Rightarrow \frac{x}{3x^2-1}\geq \frac{1}{2x^2}$

Hoàn toàn tương tự với các phân thức còn lại và cộng theo vế ta có:

$P\geq \frac{1}{2}(\frac{1}{x^2}+\frac{1}{y^2}+\frac{1}{z^2})=\frac{3}{2}$

Vậy $P_{\min}=\frac{3}{2}$ khi $x=y=z=1$

\(x+y+z=xyz\Leftrightarrow\dfrac{1}{xy}+\dfrac{1}{yz}+\dfrac{1}{zx}=1\)

Đặt \(\left(\dfrac{1}{x};\dfrac{1}{y};\dfrac{1}{z}\right)=\left(a;b;c\right)\Rightarrow ab+bc+ca=1\)

\(Q=\dfrac{b^2}{a}+\dfrac{c^2}{b}+\dfrac{a^2}{c}+2\left(a^2+b^2+c^2\right)\)

\(Q\ge\dfrac{\left(a+b+c\right)^2}{a+b+c}+2\left(ab+bc+ca\right)=a+b+c+2\)

\(Q\ge\sqrt{3\left(ab+bc+ca\right)}+2=2+\sqrt{3}\)

Dấu "=" xảy ra khi \(a=b=c=\dfrac{1}{\sqrt{3}}\) hay \(x=y=z=\sqrt{3}\)