Cho \(\hept{\begin{cases}a_1>a_2>...>a_n>0\\1\le k\in Z\end{cases}}\)
CMR : \(a_1+\frac{1}{a_n\left(a_1-a_2\right)^k\left(a_2-a_3\right)^k...\left(a_{n-1}-a_n\right)^k}\ge\frac{\left(n-1\right)k+2}{\sqrt[\left(n-1\right)k+2]{k^{\left(n-1\right)k}}}\)
cho n số thực dương \(a_{_{ }1},a_2,...,a_n\)có tổng bằng 1. Chứng minh rằng:
a) \(\left(a_1+\frac{1}{a_2}\right)^2+\left(a_2+\frac{1}{a_3}\right)^2+...+\left(a_n+\frac{1}{a_1}\right)^2\ge\left(\frac{n^2+1}{n}\right)^2\)
b) \(\left(a_1+\frac{1}{a_1}\right)^2+\left(a_2+\frac{1}{a_2}\right)^2+...+\left(a_n+\frac{1}{a_n}\right)^2\ge\left(\frac{n^2+1}{n}\right)^2\)
Cho các số:\(a_1,a_2,a_3,...,a_{2009}\) được xác định theo công thức sau:
\(a_n=\frac{2}{\left(2n+1\right)\left(\sqrt{n}+\sqrt{n+1}\right)}\) với n=1,2,3,...,2008
Chứng minh rằng :\(a_1+a_2+a_3+...+a_{2009< \frac{2008}{2010}}\)
Tính \(S=a_1+a_2+a_3+......+a_{99}\)
với \(a_n=\frac{1}{\left(n+1\right)\sqrt{n}+n\sqrt{n+1}};n=1,2,3,4,.....,99\)
a, Cm công thức
\(\forall n\ge1\) ta có \(\frac{2}{\left(2n+1\right)\left(\sqrt{n}-\sqrt{n+1}\right)}< \frac{1}{\sqrt{n}}-\frac{1}{\sqrt{n+1}}\)
b, áp dụng tính
\(\frac{1}{3\left(1+\sqrt{2}\right)}+\frac{1}{5\left(\sqrt{2}+\sqrt{3}\right)}+...+\frac{1}{4023\cdot\left(\sqrt{2011}+\sqrt{2012}\right)}< \frac{2011}{2013}\)
Chứng minh rằng
\(2\left(\sqrt{n+1}-\sqrt{n}\right)< \frac{1}{\sqrt{n}}< 2\left(\sqrt{n}-\sqrt{n-1}\right)\)với \(n\inℕ^∗\)
Áp dụng cho \(S=1+\frac{1}{\sqrt{2}}+\frac{1}{\sqrt{3}}+...+\frac{1}{\sqrt{100}}\)
chứng minh rằng 18<S<19
Bài 1: CMR
\(\frac{1}{2\sqrt{1}}+\frac{1}{3\sqrt{2}}+\frac{1}{4\sqrt{3}}+........+\frac{1}{\left(n+1\right)\sqrt{n}}>2,n\varepsilonℕ^∗\)
Bài 2: Cho S= \(\frac{1}{3\left(1+\sqrt{2}\right)}+\frac{1}{3\left(\sqrt{2}+\sqrt{3}\right)}+...+\frac{1}{\left(2n+1\right)\left(\sqrt{n}+\sqrt{n+1}\right)}\)
CMR S<\(\frac{1}{2}\)
Cho \(a_1,a_2,a_3,...,a_n\left(n\ge2\right)\) là các số thực thỏa mãn \(a_1a_2+a_2a_3+...+a_{n-1}a=1\)
Chứng minh rằng : \(a_1^2+a_2^2+a_3^2+...+a_n^2\ge\frac{1}{\cos\frac{\pi}{n+1}}\)
Cho \(n\inℕ^∗\)CMR
\(\sqrt{1+\frac{1}{n^2}+\frac{1}{\left(n+1\right)^2}}=1+\frac{1}{n}-\frac{1}{\left(n+1\right)}\)