Cho x + y ≥ 6; x, y > 0. Tìm min của P = 5x + 3y + \(\frac{{10}}{x}\,\, + \,\,\frac{8}{y}\).

Áp dụng bất đẳng thức Cô-si ta có:

P = 5x + 3y + \(\frac{{10}}{x}\, + \,\frac{8}{y}\) = \(\left( {5x + \frac{{10}}{x}} \right) + \left( {3y + \frac{8}{y}} \right)\)≥ \(2\sqrt {5x\, \cdot \,\frac{{10}}{x}\,} \, + \,2\sqrt {3y\, \cdot \,\frac{8}{y}\,} \)

= \(2\sqrt {50\,} + \,2\sqrt {24\,} \, = \,4\sqrt 6 \, + 10\sqrt 2 \).

Vậy P_min = \(4\sqrt 6 \, + 10\sqrt 2 \) khi \(\left\{ \begin{array}{l}5x\,\, = \,\,\frac{{10}}{x}\\3y\,\, = \,\,\frac{8}{y}\,\end{array} \right.\,\,hay\,\,\left\{ \begin{array}{l}{x^2}\, = \,2\\{y^2}\, = \,\frac{8}{3}\,\end{array} \right.\,\).

Vì x, y > 0 nên: \(\left\{ \begin{array}{l}x\, = \,\sqrt 2 \\y = \,\frac{{2\sqrt 6 }}{3}\,\end{array} \right.\).