Áp dụng BĐT Cauchy cho 3 số thực dương \(xy,yz,zx\), ta có \(xy+yz+zx\ge3\sqrt[3]{\left(xyz\right)^2}\). Do \(xy+yz+zx=3xyz\) nên\(3xyz\ge3\sqrt[3]{\left(xyz\right)^2}\) \(\Leftrightarrow3\sqrt[3]{\left(xyz\right)^2}\left(\sqrt[3]{xyz}-1\right)\ge0\) \(\Leftrightarrow\sqrt[3]{xyz}\ge1\) \(\Leftrightarrow xyz\ge1\)

ĐTXR \(\Leftrightarrow\left\{{}\begin{matrix}xy=yz=zx\\xy+yz+zx=3xyz\end{matrix}\right.\) \(\Leftrightarrow x=y=z=1\)

Ta có \(\dfrac{x}{1+y^2}=\dfrac{x\left(1+y^2\right)-xy^2}{1+y^2}=x-\dfrac{xy^2}{1+y^2}\ge x-\dfrac{xy^2}{2y}\)\(=x-\dfrac{xy}{2}\)

Tương tự, ta có \(\dfrac{y}{1+z^2}\ge y-\dfrac{yz}{2}\) và \(\dfrac{z}{1+x^2}\ge z-\dfrac{zx}{2}\). Từ đó suy ra \(\dfrac{x}{1+y^2}+\dfrac{y}{1+z^2}+\dfrac{z}{1+x^2}\ge x+y+z-\dfrac{xy+yz+zx}{2}\) \(=x+y+z-\dfrac{3}{2}xyz\) . Từ đây suy ra \(Q\ge x+y+z\ge\sqrt[3]{xyz}\ge1\). ĐTXR \(\Leftrightarrow x=y=z=1\). 

Vậy GTNN của \(Q\) là \(1\) đạt được khi \(x=y=z=1\)

 Dạ thưa thầy, chỗ kia con sửa là \(Q\ge x+y+z\ge3\sqrt[3]{xyz}\ge3\) ạ. GTNN của Q là 3 khi \(x=y=z=1\)

Lời giải:

Sửa: $x^2\geq y^2+z^2$
Áp dụng BĐT Cauchy-Schwarz:

$P\geq \frac{y^2+z^2}{x^2}+\frac{7x^2}{2}.\frac{4}{y^2+z^2}+2007$

$=\frac{y^2+z^2}{x^2}+\frac{14x^2}{y^2+z^2}+2007$

$=\frac{y^2+z^2}{x^2}+\frac{x^2}{y^2+z^2}+\frac{13x^2}{y^2+z^2}+2007$

$\geq 2+\frac{13x^2}{y^2+z^2}+2007$ (áp dụng BĐT Cô-si)

$\geq 2+13+2007=2022$ (do $x^2\geq y^2+z^2$)

Vậy $P_{\min}=2022$

Hướng dẫn: đặt \(A=\dfrac{y^4}{\left(x^2+y^2\right)\left(x+y\right)}+\dfrac{z^4}{\left(y^2+z^2\right)\left(y+z\right)}+\dfrac{x^4}{\left(z^2+x^2\right)\left(z+x\right)}\)

Khi đó \(F-A=x-y+y-z+z-x=0\Rightarrow F=A\)

\(\Rightarrow2F=F+A=\sum\dfrac{x^4+y^4}{\left(x^2+y^2\right)\left(x+y\right)}\ge\sum\dfrac{\left(x^2+y^2\right)^2}{2\left(x^2+y^2\right)\left(x+y\right)}\ge\sum\dfrac{\left(x+y\right)^2\left(x^2+y^2\right)}{4\left(x^2+y^2\right)\left(x+y\right)}\)

\(\Rightarrow2F\ge\dfrac{x+y+z}{2}\Rightarrow F\ge\dfrac{x+y+z}{4}\)

\(P=\dfrac{1}{2023}\dfrac{1}{z}\left(\dfrac{1}{x}+\dfrac{1}{y}\right)=\dfrac{1}{2023.z}\dfrac{x+y}{xy}\)

Ap dung BDT cosi taco 

\(P\ge\dfrac{1}{2023z}.\dfrac{x+y}{\dfrac{\left(x+y\right)^2}{4}}=\dfrac{4}{2023z}\dfrac{1}{x+y}\)

<->\(P\ge\dfrac{4}{2023}\dfrac{1}{z\left(1-z\right)}=\dfrac{4}{2023}\dfrac{1}{-z^2+z}=\dfrac{4}{2023}\dfrac{1}{-\left(z-\dfrac{1}{2}\right)^2+\dfrac{1}{4}}\)

\(< =>P\ge\dfrac{4}{2023}\dfrac{1}{\dfrac{1}{4}}=\dfrac{16}{2023}\)

\(P_{min}=\dfrac{16}{2023}\Leftrightarrow Z=\dfrac{1}{2},x=y=\dfrac{1}{4}\)

1.

Gọi \(d=ƯC\left(2n^2+3n+1;3n+1\right)\)

\(\Rightarrow2n^2+3n+1-\left(3n+1\right)⋮d\)

\(\Rightarrow2n^2⋮d\Rightarrow2n\left(3n+1\right)-3.2n^2⋮d\)

\(\Rightarrow2n⋮d\Rightarrow2\left(3n+1\right)-3.2n⋮d\Rightarrow2⋮d\Rightarrow\left[{}\begin{matrix}d=1\\d=2\end{matrix}\right.\)

\(d=2\Rightarrow3n+1=2k\Rightarrow n=2m+1\)

\(\Rightarrow n\) lẻ thì A không tối giản

\(\Rightarrow n\) chẵn thì A tối giản

2.

Giả thiết tương đương:

\(xy^2+\dfrac{x^2}{z}+\dfrac{y}{z^2}=3\)

Đặt \(\left(x;y;\dfrac{1}{z}\right)=\left(a;b;c\right)\Rightarrow a^2c+b^2a+c^2b=3\)

Ta có: \(9=\left(a^2c+b^2a+c^2b\right)^2\le\left(a^4+b^4+c^4\right)\left(c^2+a^2+b^2\right)\)

\(\Rightarrow9\le\left(a^4+b^4+c^4\right)\sqrt{3\left(a^4+b^4+c^4\right)}\)

\(\Rightarrow3\left(a^4+b^4+c^4\right)^3\ge81\Rightarrow a^4+b^4+c^4\ge3\)

\(\Rightarrow M=\dfrac{1}{a^4+b^4+c^4}\le\dfrac{1}{3}\)

\(M_{max}=\dfrac{1}{3}\) khi \(\left(a;b;c\right)=\left(1;1;1\right)\) hay \(\left(x;y;z\right)=\left(1;1;1\right)\)