ko khó nhưng mà bn đăng từng câu 1 hộ mk mk giải giúp cho

gt <=> \(\frac{1}{ab}+\frac{1}{bc}+\frac{1}{ca}=1\)

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

=> Thay vào thì     \(VT=\frac{\frac{1}{xy}}{\frac{1}{z}\left(1+\frac{1}{xy}\right)}+\frac{1}{\frac{yz}{\frac{1}{x}\left(1+\frac{1}{yz}\right)}}+\frac{1}{\frac{zx}{\frac{1}{y}\left(1+\frac{1}{zx}\right)}}\)

\(VT=\frac{z}{xy+1}+\frac{x}{yz+1}+\frac{y}{zx+1}=\frac{x^2}{xyz+x}+\frac{y^2}{xyz+y}+\frac{z^2}{xyz+z}\ge\frac{\left(x+y+z\right)^2}{x+y+z+3xyz}\)

Có BĐT x, y, z > 0 thì \(\left(x+y+z\right)\left(xy+yz+zx\right)\ge9xyz\)Ta thay \(xy+yz+zx=1\)vào

=> \(x+y+z\ge9xyz=>\frac{x+y+z}{3}\ge3xyz\)

=> Từ đây thì \(VT\ge\frac{\left(x+y+z\right)^2}{x+y+z+\frac{x+y+z}{3}}=\frac{3}{4}\left(x+y+z\right)\ge\frac{3}{4}.\sqrt{3\left(xy+yz+zx\right)}=\frac{3}{4}.\sqrt{3}=\frac{3\sqrt{3}}{4}\)

=> Ta có ĐPCM . "=" xảy ra <=> x=y=z <=> \(a=b=c=\sqrt{3}\) 

Đặt: \(\sqrt{a}=x;\sqrt{b}=y;\sqrt{c}=z\)

=>     \(P=\frac{xy}{z^2+3xy}+\frac{yz}{x^2+3yz}+\frac{zx}{y^2+3zx}\)

=>     \(3P=\frac{3xy}{z^2+3xy}+\frac{3yz}{x^2+3yz}+\frac{3zx}{y^2+3zx}=1-\frac{z^2}{z^2+3xy}+1-\frac{x^2}{x^2+3yz}+1-\frac{y^2}{y^2+3zx}\)

Ta sẽ CM: \(3P\le\frac{9}{4}\)<=> Cần CM: \(\frac{x^2}{x^2+3yz}+\frac{y^2}{y^2+3zx}+\frac{z^2}{z^2+3xy}\ge\frac{3}{4}\)

Có:    \(VT\ge\frac{\left(x+y+z\right)^2}{x^2+y^2+z^2+3\left(xy+yz+zx\right)}\)

Ta sẽ CM: \(\frac{\left(x+y+z\right)^2}{x^2+y^2+z^2+3\left(xy+yz+zx\right)}\ge\frac{3}{4}\)

<=> \(4\left(x+y+z\right)^2\ge3\left(x^2+y^2+z^2\right)+9\left(xy+yz+zx\right)\)

<=> \(4\left(x^2+y^2+z^2\right)+8\left(xy+yz+zx\right)\ge3\left(x^2+y^2+z^2\right)+9\left(xy+yz+zx\right)\)

<=> \(x^2+y^2+z^2\ge xy+yz+zx\)

Mà đây lại là 1 BĐT luôn đúng => \(3P\le\frac{9}{4}\)=> \(P\le\frac{3}{4}\)

Vậy P max \(=\frac{3}{4}\)<=> \(a=b=c\)

Trước hết ta chứng minh bất đẳng thức sau \(\sqrt{a^2+x^2}+\sqrt{b^2+y^2}\ge\sqrt{\left(a+b\right)^2+\left(x+y\right)^2}\)

Thật vậy, bất đẳng thức trên tương đương với \(\left(\sqrt{a^2+b^2}+\sqrt{x^2+y^2}\right)^2\ge\left(a+x\right)^2+\left(b+y\right)^2\)\(\Leftrightarrow2\sqrt{\left(a^2+b^2\right)\left(x^2+y^2\right)}\ge2ax+2by\Leftrightarrow\left(a^2+b^2\right)\left(x^2+y^2\right)\ge\left(ax+by\right)^2\)

Bất đẳng thức cuối cùng là bất đẳng thức Bunyakovsky nên (*) đúng

Áp dụng bất đẳng thức trên ta có \(\sqrt{a^2+\frac{1}{b^2}}+\sqrt{b^2+\frac{1}{c^2}}+\sqrt{c^2+\frac{1}{a^2}}\ge\sqrt{\left(a+b\right)^2+\left(\frac{1}{b}+\frac{1}{c}\right)^2}+\sqrt{c^2+\frac{1}{a^2}}\)\(\ge\sqrt{\left(a+b+c\right)^2+\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)^2}\)

Ta cần chứng minh  \(\left(a+b+c\right)^2+\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)^2\ge\frac{153}{4}\)

Thật vậy, áp dụng bất đẳng thức Cauchy và chú ý giả thiết \(a+b+c\le\frac{3}{2}\), ta được:\(\left(a+b+c\right)^2+\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)^2\ge\left(a+b+c\right)^2+\frac{81}{\left(a+b+c\right)^2}\)\(=\left(a+b+c\right)^2+\frac{81}{16\left(a+b+c\right)^2}+\frac{1215}{16\left(a+b+c\right)^2}\)\(\ge2\sqrt{\left(a+b+c\right)^2.\frac{81}{16\left(a+b+c\right)^2}}+\frac{1215}{16.\frac{9}{4}}=\frac{153}{4}\)

Bất đẳng thức đã được chứng minh

Đẳng thức xảy ra khi \(a=b=c=\frac{1}{2}\)

\(VT\ge\dfrac{a^2}{\sqrt{2\left(b^2+c^2\right)}}+\dfrac{b^2}{\sqrt{2\left(a^2+c^2\right)}}+\dfrac{c^2}{\sqrt{2\left(a^2+b^2\right)}}\)

Đặt \(\left(\sqrt{b^2+c^2};\sqrt{c^2+a^2};\sqrt{a^2+b^2}\right)=\left(x;y;z\right)\Rightarrow x+y+z=\sqrt{2019}\)

\(\Rightarrow\left\{{}\begin{matrix}a^2=\dfrac{y^2+z^2-x^2}{2}\\b^2=\dfrac{x^2+z^2-y^2}{2}\\c^2=\dfrac{x^2+y^2-z^2}{2}\end{matrix}\right.\) \(\Rightarrow2\sqrt{2}VT\ge\dfrac{y^2+z^2-x^2}{x}+\dfrac{z^2+x^2-y^2}{y}+\dfrac{x^2+y^2-z^2}{z}\)

\(\Rightarrow2\sqrt{2}VT\ge\dfrac{y^2+z^2}{x}+\dfrac{z^2+x^2}{y}+\dfrac{x^2+y^2}{z}-\left(x+y+z\right)\)

\(2\sqrt{2}VT\ge\dfrac{\left(y+z\right)^2}{2x}+\dfrac{\left(z+x\right)^2}{2y}+\dfrac{\left(x+y\right)^2}{2z}-\left(x+y+z\right)\)

\(2\sqrt{2}VT\ge\dfrac{4\left(x+y+z\right)^2}{2x+2y+2z}-\left(x+y+z\right)=x+y+z=\sqrt{2019}\)

\(\Rightarrow VT\ge\dfrac{\sqrt{2019}}{2\sqrt{2}}=\sqrt{\dfrac{2019}{8}}\) (đpcm)

Đặt \(\hept{\begin{cases}\sqrt{a^2+b^2}=x\\\sqrt{b^2+c^2}=y\\\sqrt{c^2+a^2}=z\end{cases}}\)\(\Rightarrow\hept{\begin{cases}x,y,z>0\\x+y+z=1\end{cases}}\)

Và \(\hept{\begin{cases}a^2=\frac{x^2+z^2-y^2}{2}\\b^2=\frac{x^2+y^2-z^2}{2}\\c^2=\frac{y^2+z^2-x^2}{2}\end{cases}}\) và \(\hept{\begin{cases}b+c\le\sqrt{2\left(b^2+c^2\right)}=\sqrt{2}y\\a+b\le\sqrt{2}x\\c+a\le\sqrt{2}z\end{cases}}\)

\(\Rightarrow VT\ge\frac{1}{2\sqrt{2}}\left(\frac{x^2+z^2-y^2}{y}+\frac{x^2+y^2-z^2}{2z}+\frac{y^2+z^2-x^2}{x}\right)\)

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

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

Dễ chứng minh được \(b+c\le\sqrt{2\left(b^2+c^2\right)}\) và tương tự....

Đặt \(\left(\sqrt{a^2+b^2};\sqrt{b^2+c^2};\sqrt{c^2+a^2}\right)\rightarrow\left(x;y;z\right)\) thì ta có: 

\(\hept{\begin{cases}x,y,z\ge0\\x+y+z=3\sqrt{2}\\VT\ge\frac{1}{\sqrt{2}}\left(\frac{x^2+z^2-y^2}{2y}+\frac{x^2+y^2-z^2}{2z}+\frac{y^2+z^2-x^2}{2x}\right)\end{cases}}\)

Mà \(\frac{1}{\sqrt{2}}\left(\frac{x^2+z^2-y^2}{2y}+\frac{x^2+y^2-z^2}{2z}+\frac{y^2+z^2-x^2}{2x}\right)\)

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

\(\ge\frac{1}{\sqrt{2}}\left(\frac{4\left(x+y+z\right)^2}{4\left(x+y+z\right)}-\frac{x+y+z}{2}\right)\)

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

Áp dụng bất đẳng thức Cauchy-Schwarz, ta được:

\(3\left(a^2+b^2+c^2\right)=\left(1^2+1^2+1^2\right)\left(a^2+b^2+c^2\right)\ge\left(a+b+c\right)^2\)

\(\Rightarrow\left(a+b+c\right)^2\le3.3=9\)hay \(a+b+c\le3\)(do \(a^2+b^2+c^2=3\))

Theo bất đẳng thức Mincopxki và bất đẳng thức Bunyakovsky dạng phân thức, ta được:

\(\sqrt{\frac{9}{\left(a+b\right)^2}+c^2}+\sqrt{\frac{9}{\left(b+c\right)^2}+a^2}+\sqrt{\frac{9}{\left(c+a\right)^2}+b^2}\)

\(\ge\sqrt{9\left(\frac{1}{a+b}+\frac{1}{b+c}+\frac{1}{c+a}\right)^2+\left(a+b+c\right)^2}\)

\(\ge\sqrt{9\left[\frac{9}{2\left(a+b+c\right)}\right]^2+\left(a+b+c\right)^2}\)

Đến đây, ta cần chứng minh rằng: \(\sqrt{9\left[\frac{9}{2\left(a+b+c\right)}\right]^2+\left(a+b+c\right)^2}\ge\frac{3\sqrt{13}}{2}\)(*)

Đặt \(t=a+b+c\Rightarrow0< t\le3\)

Khi đó, (*) trở thành \(\sqrt{9\left(\frac{9}{2t}\right)^2+t^2}\ge\frac{3\sqrt{13}}{2}\Leftrightarrow9\left(\frac{9}{2t}\right)^2+t^2\ge\frac{117}{4}\)

\(\Leftrightarrow\frac{\left(t-3\right)\left(2t-9\right)\left(t+3\right)\left(2t+9\right)}{4t^2}\ge0\)(đúng với mọi \(0< t\le3\))

Đẳng thức xảy ra khi a = b = c = 1

Ta co:

\(\sqrt{2\left(b+1\right)}\le\frac{b+3}{2}\Rightarrow\frac{a}{\sqrt{2\left(b+1\right)}}\ge\frac{2a}{b+3}\)

Tuong tu:\(\frac{b}{\sqrt{2\left(c+1\right)}}\ge\frac{2b}{c+3};\frac{c}{\sqrt{2\left(a+1\right)}}\ge\frac{2c}{a+3}\)

\(\Rightarrow\frac{1}{\sqrt{2}}\left(\frac{a}{\sqrt{b+1}}+\frac{b}{\sqrt{c+1}}+\frac{c}{\sqrt{a+1}}\right)\ge2\left(\frac{a}{b+3}+\frac{b}{c+3}+\frac{c}{a+3}\right)\)

\(\frac{a}{b+3}+\frac{b}{c+3}+\frac{c}{a+3}\)

\(=\frac{a^2}{ab+3a}+\frac{b^2}{bc+3b}+\frac{c^2}{ca+3c}\ge\frac{\left(a+b+c\right)^2}{ab+bc+ca+9}\ge\frac{\left(a+b+c\right)^2}{\frac{\left(a+b+c\right)^2}{3}+9}=\frac{9}{\frac{9}{3}+9}=\frac{3}{4}\)

\(\Rightarrow2\left(\frac{a}{b+3}+\frac{b}{c+3}+\frac{c}{a+3}\right)\ge\frac{3}{2}\)

Hay \(\frac{a}{\sqrt{b+1}}+\frac{b}{\sqrt{c+1}}+\frac{c}{\sqrt{a+1}}\ge\frac{3\sqrt{2}}{2}\)

Dau '=' xay ra  khi \(a=b=c=3\)

1. Áp dụng Min - cốp - ski, ta được: \(\sqrt{\frac{9}{\left(a+b\right)^2}+c^2}+\sqrt{\frac{9}{\left(b+c\right)^2}+a^2}+\sqrt{\frac{9}{\left(c+a\right)^2}+b^2}\)\(\ge\sqrt{\left(\frac{3}{a+b}+\frac{3}{b+c}+\frac{3}{c+a}\right)^2+\left(a+b+c\right)^2}\)\(\ge\sqrt{\left(\frac{27}{2\left(a+b+c\right)}\right)^2+\left(a+b+c\right)^2}\)(Bunyakovsky dạng phân thức)

Đặt \(t=a+b+c\le\sqrt{3\left(a^2+b^2+c^2\right)}=3\)thì ta cần chứng minh: \(\sqrt{\frac{729}{4t^2}+t^2}\ge\frac{3\sqrt{13}}{2}\Leftrightarrow\frac{729}{4t^2}+t^2\ge\frac{117}{4}\)\(\Leftrightarrow\frac{\left(t+3\right)\left(t-3\right)\left(2t+9\right)\left(2t-9\right)}{4t^2}\ge0\)*đúng bởi \(t-3\le0;t+3>0;2t+9>0;2t-9< 0;4t^2>0\)*

Đẳng thức xảy ra khi t = 3 hay a = b = c = 1

2. Ta có: \(\frac{4x^2y^2}{\left(x^2+y^2\right)^2}+\frac{x^2}{y^2}+\frac{y^2}{x^2}-3=\frac{\left(x^2-y^2\right)^2\left(x^4+y^4+x^2y^2\right)}{x^2y^2\left(x^2+y^2\right)^2}\ge0\)\(\Rightarrow\frac{4x^2y^2}{\left(x^2+y^2\right)^2}+\frac{x^2}{y^2}+\frac{y^2}{x^2}\ge3\)

Đẳng thức xảy ra khi x = y

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

Ta có: \(x^3+\frac{2}{3}+\frac{2}{3}\ge3\sqrt[3]{x^3.\frac{4}{9}}=\sqrt[3]{12}x\)

Tương tự: \(y^3+\frac{2}{3}+\frac{2}{3}\ge\sqrt[3]{12}y\); \(z^3+\frac{2}{3}+\frac{2}{3}\ge\sqrt[3]{12}z\)

\(\Rightarrow x^3+y^3+z^3+4\ge\sqrt[3]{12}\left(x+y+z\right)\)

\(\Rightarrow x+y+z\le\frac{6}{\sqrt[3]{12}}=\sqrt[3]{18}\)

Ta có: \(P=\frac{1}{x}+\frac{1}{y}+\frac{1}{z}\ge\frac{9}{x+y+z}\ge\frac{9}{\sqrt[3]{18}}=\frac{3\sqrt[3]{12}}{2}\)

Dấu "=" xảy ra khi \(x=y=z=\sqrt[3]{\frac{2}{3}}\) hay \(a=b=c=\frac{2}{3}\)