27401: Difference between revisions

27401 (Radu Pop)

Fie ${\displaystyle n\in \mathbb {N} }$. Să se arate că

$${\displaystyle (n+1)ab(a+b)-(4n^{3}+13n+10)ab+(n+2)^{3}(a+b)\geq (n+2)^{3},}$$

oricare ar fi ${\displaystyle a,b\in [1,\infty )}$

Soluție:

Fie ${\displaystyle x,y\in [0,\infty )}$. Avem

$${\displaystyle (x+1)(y+1)(x+y+n^{2}+n)=(n+1){\biggl (}\underbrace {{\frac {x}{n+1}}+{\frac {x}{n+1}}+\ldots +{\frac {x}{n+1}}} _{(n+1){\text{ ori}}}+1{\biggr )}\cdot }$$

$${\displaystyle \cdot {\biggl (}\underbrace {{\frac {y}{n+1}}+{\frac {y}{n+1}}+\cdots +{\frac {y}{n+1}}} _{(n+1){\text{ ori}}}+1{\biggr )}\cdot {\biggl (}{\frac {x}{n+1}}+{\frac {y}{n+1}}+\underbrace {1+1+\cdots +1} _{n{\text{ ori}}}{\biggr )}\geq }$$

$${\displaystyle \geq (n+1){\sqrt[{n+2}]{\frac {x^{n+1}}{(n+1)^{n+1}}}}\cdot {\sqrt[{n+2}]{\frac {y^{n+1}}{(n+1)^{n+1}}}}\cdot {\sqrt[{n+2}]{\frac {xy}{(n+1)^{2}}}}\cdot (n+2)^{3}=}$$

$${\displaystyle ={\frac {xy}{n+1}}(n+2)^{3}.}$$

Rezultă că

$${\displaystyle (n+1)(x+1)(y+1)(x+y+n^{2}+n)\geq (n+2)^{3}xy.}$$

${\displaystyle x=a-1\geq 0}$

${\displaystyle y=b-1\geq 0}$

Obţinem

$${\displaystyle (n+1)ab(a+b+n^{2}+n-2)\geq (n+2)^{3}(a-1)(b-1),}$$

$${\displaystyle (n+1)ab(a+b)+(n^{3}+2n^{2}-n-2)ab\geq (n+2)^{3}ab-(n+2)^{3}(a+b)+(n+2)^{3}}$$

$${\displaystyle (n+1)ab(a+b)-(4n^{2}+13n+10)ab+(n+2)^{3}(a+b)\geq (n+2)^{3}.}$$