\(c^2+d^2+25=6c+8d\)

\(\Leftrightarrow\left(c^2-6c+9\right)+\left(d^2-8d+16\right)=0\)

\(\Leftrightarrow\left(c-3\right)^2+\left(d-4\right)^2=0\)

\(\Leftrightarrow\left\{{}\begin{matrix}c-3=0\\d-4=0\end{matrix}\right.\) \(\Rightarrow\left\{{}\begin{matrix}c=3\\d=4\end{matrix}\right.\)

\(\Rightarrow P=25-3a-4b=25-\left(3a+4b\right)=25-Q\)

Xét \(Q=3a+4b\Rightarrow Q^2=\left(3a+4b\right)^2\le\left(3^2+4^2\right)\left(a^2+b^2\right)=25.2=50\)

\(\Rightarrow Q^2\le50\Rightarrow-5\sqrt{2}\le Q\le5\sqrt{2}\Rightarrow-Q\le5\sqrt{2}\)

\(\Rightarrow P\le25+5\sqrt{2}\)

\(P_{max}=25+5\sqrt{2}\) khi \(\left\{{}\begin{matrix}a^2+b^2=2\\\frac{a}{3}=\frac{b}{4}\\3a+4b=-5\sqrt{2}\end{matrix}\right.\) \(\Rightarrow\left\{{}\begin{matrix}a=-\frac{3\sqrt{2}}{5}\\b=-\frac{4\sqrt{2}}{5}\end{matrix}\right.\)

Ta có \(x^3+y^3\ge\frac{1}{4}\left(x+y\right)^3;xy\le\left(\frac{x+y}{2}\right)^2\) với mọi \(x,y>0\)

Kết hợp với giả thiết suy ra :

\(\frac{1}{4}\left(a+b+c\right)^3\le\left(a+b\right)^3+c^3\le4\left(a^3+b^3\right)+c^3\le2\left(a+b+c\right)\left(\frac{\left(a+b+c\right)^2}{4}-2\right)\)

\(\Rightarrow a+b+c\ge4\)

Khi đó sử dựng bất đẳng thức AM-GM ta có :

\(\frac{2a^2}{3a^2+b^2+2a\left(c+2\right)}=\frac{a}{a+c+2+\left(\frac{b^2}{2a}+\frac{a}{2}\right)}\le\frac{a}{a+c+2+2\sqrt{\frac{b^2}{2a}.\frac{a}{2}}}=\frac{a}{a+b+c+2}\)

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

Suy ra \(P\le\frac{a+b+c}{a+b+c+2}-\frac{\left(a+b+c\right)^2}{32}\)

Đặt \(t=a+b+c\ge4,P\le f\left(t\right)=\frac{t}{t+2}-\frac{t^2}{32}\)

Ta có : \(f'\left(t\right)=\frac{2}{\left(t+2\right)^2}-\frac{t}{16}=\frac{32-t\left(t+2\right)^2}{16\left(t+2\right)^2}<0\) với mọi \(t\ge4\)

Suy ra hàm số \(f'\left(t\right)\) nghịch biến trên \(\left(4;+\infty\right)\). Do đó \(P\le f\left(t\right)\le f\left(4\right)=\frac{1}{6}\)

Dấu = xảy ra khi và chỉ khi \(\begin{cases}a=b;a+b=c\\a+b+c=4\end{cases}\) \(\Leftrightarrow a=b=1,c=2\)

Vậy giá trị lớn nhất của P bằng \(\frac{1}{6}\)

\(\frac{1}{a}\ge1-\frac{2}{2b+1}+1-\frac{3}{3c+2}=\frac{2b-1}{2b+1}+\frac{3c-1}{3c+2}\ge2\sqrt{\frac{\left(2b-1\right)\left(3c-1\right)}{\left(2b+1\right)\left(3c+2\right)}}\)

Tương tự: \(\frac{2}{2b+1}\ge\frac{a-1}{a}+\frac{3c-1}{3c+2}\ge2\sqrt{\frac{\left(a-1\right)\left(3c-1\right)}{a\left(3c+2\right)}}\)

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

Nhân vế với vế:

\(\frac{6}{a\left(2b+1\right)\left(3c+2\right)}\ge\frac{8\left(a-1\right)\left(2b-1\right)\left(3c-1\right)}{a\left(2b+1\right)\left(3c+2\right)}\)

\(\Rightarrow\left(a-1\right)\left(2b-1\right)\left(3c-1\right)\le\frac{3}{4}\)

Ta có:

\(a^3+b^3+c^3=3abc\Rightarrow\left(a+b+c\right)\left(a^2+b^2+c^2-ab-bc-ca\right)=0\)

Do a+b+c khác ) nên:

\(a^2+b^2+c^2-ab-bc-ca=0\)

\(\Leftrightarrow\frac{1}{2}[\left(a-b\right)^2+\left(b-c\right)^2+\left(c-a\right)^2]=0\)

\(\Rightarrow a=b=c\)

Do đó:

Q=\(\frac{a^2+3b^2+5c^2}{\left(a+b+c\right)^2}=\frac{9a^2}{9a^2}=1\)

có giá trị ko đổi

Câu hỏi của Neet - Toán lớp 9 | Học trực tuyến

ta có \(T=\frac{1}{2}\left(1-\frac{a^2}{2+a^2}+1-\frac{b^2}{2+b^2}+1-\frac{c^2}{2+c^2}\right)=\frac{1}{2}\left[3-\left(\frac{a^2}{2+a^2}+\frac{b^2}{2+b^2}+\frac{c^2}{2+c^2}\right)\right]\)

ta chứng minh rằng \(\frac{a^2}{2+a^2}+\frac{b^2}{2+b^2}+\frac{c^2}{2+c^2}\ge1\)khi đó ta sẽ có \(T\le1\)

thật vậy, áp dụng Bất Đẳng Thức Cauchy-Schwarz ta có \(\frac{a^2}{2+a^2}+\frac{b^2}{2+b^2}+\frac{c^2}{2+c^2}\ge\frac{\left(a+b+c\right)^2}{a^2+b^2+c^2+6}\)

ta cần chứng minh rằng \(\frac{\left(a+b+c\right)^2}{a^2+b^2+c^2+6}\ge1\)

\(\Leftrightarrow a^2+b^2+c^2+2ab+2bc+2ac\ge a^2+b^2+c^2+6\)

\(\Leftrightarrow ab+bc+ca\ge3\)

thật vậy, từ giả thiết ta có: \(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\le a+b+c\Leftrightarrow ab+bc+ca\le abc\left(a+b+c\right)\left(1\right)\)

mà \(abc\left(a+b+c\right)\le\frac{\left(ab+bc+ca\right)^2}{3}\)

từ (1) ta có \(\frac{ab+bc+ca}{3}\le\frac{\left(ab+bc+ca\right)^2}{3}\Leftrightarrow ab+bc+ca\ge3\left(đpcm\right)\)

vậy maxT=1 khi a=b=c=1