CHUYÊN MỤC: CÂU HỎI HAY
Đề bài: Chứng minh rằng:
\(\dfrac{1}{2^3}+\dfrac{1}{3^3}+...+\dfrac{1}{2009^3}< \dfrac{1}{4}\)
Phần thưởng: 2GP
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
Ta có các số trong dãy đều có dạng 1/[ (n + 1)√n ]
Ta có: 1/[ (n + 1)√n ] = (√n)/[ (n + 1)√n.√n ] = (√n)/[ (n + 1)n ] = (√n).1/[ (n + 1)n ]
Do 1/[ (n + 1)n ] = 1/n - 1/(n + 1) (mình nghĩ bạn biết cái này)
=> (√n).1/[ (n + 1)n ] = (√n).[ 1/n - 1/(n + 1) ]
Ta có 1/n - 1/(n + 1) = (1/√n)² - [ 1/√(n + 1) ]²
= [ 1/√n + 1/√(n + 1) ]. [ 1/√n - 1/√(n + 1) ]
=> 1/n - 1/(n + 1) = [ 1/√n + 1/√(n + 1) ]. [ 1/√n - 1/√(n + 1) ]
=> (√n).[ 1/n - 1/(n + 1) ] = (√n).[ 1/√n + 1/√(n + 1) ]. [ 1/√n - 1/√(n + 1) ]
Nhân √n với [ 1/√n + 1/√(n + 1) ] ta được
(√n).[ 1/√n + 1/√(n + 1) ]. [ 1/√n - 1/√(n + 1) ] = [ 1 + (√n)/√(n + 1) ].[ 1/√n - 1/√(n + 1) ]
=> 1/[ (n + 1)√n ] = [ 1 + (√n)/√(n + 1) ].[ 1/√n - 1/√(n + 1) ] (1)
Do (√n)/√(n + 1) < √(n + 1)/√(n + 1)
=> (√n)/√(n + 1) < 1
=> 1 + (√n)/√(n + 1) < 1 + 1
=> 1 + (√n)/√(n + 1) < 2
=> [ 1 + (√n)/√(n + 1) ].[ 1/√n - 1/√(n + 1) ] < 2.[ 1/√n - 1/√(n + 1) ] (2)
Từ (1) và (2) => 1/[ (n + 1)√n ] < 2.[ 1/√n - 1/√(n + 1) ]
Áp dụng ta được
1/2 < 2( 1 - 1/√2)
1/3√2 < 2(1/√2 - 1/√3)
....
1/(n+1)√n < 2(1/√n - 1/√(n + 1) )
=> 1/2 + 1/3√2 + 1/4√3 +.....+ 1/(n+1)√n < 2( 1 - 1/√2) + 2(1/√2 - 1/√3) + ... + 2(1/√n - 1/√(n + 1) )
=> 1/2 + 1/3√2 + 1/4√3 +.....+ 1/(n+1)√n < 2( 1 - 1/√2 + 1/√2 - 1/√3 + ... + 1/√n - 1/√(n + 1) )
=> 1/2 + 1/3√2 + 1/4√3 +.....+ 1/(n+1)√n < 2(1 - 1/√(n + 1) ) (3)
Do 1√(n + 1) > 0
=> -1√(n + 1) < 0
=> 1 -1√(n + 1) < 1
=> 2(1 - 1/√(n + 1) ) < 2 (4)
Từ (3) và (4) => 1/2 + 1/3√2 + 1/4√3 +.....+ 1/(n+1)√n < 2
\(\dfrac{1}{\left(n+1\right)\sqrt{n}}=\dfrac{1}{\sqrt{n\left(n+1\right)}}.\dfrac{1}{\sqrt{n+1}}\) . Do \(\sqrt{n+1}>\dfrac{\sqrt{n}+\sqrt{n+1}}{2}\)
\(\Rightarrow\dfrac{1}{\sqrt{n\left(n+1\right)}}.\dfrac{1}{\sqrt{n+1}}< \dfrac{1}{\sqrt{n\left(n+1\right)}}.\dfrac{2}{\left(\sqrt{n}+\sqrt{n+1}\right)}=\dfrac{2\left(\sqrt{n+1}-\sqrt{n}\right)}{\sqrt{n\left(n+1\right)}}=2\left(\dfrac{1}{\sqrt{n}}-\dfrac{1}{\sqrt{n+1}}\right)\)
Vậy \(\dfrac{1}{\left(n+1\right)\sqrt{n}}< 2\left(\dfrac{1}{\sqrt{n}}-\dfrac{1}{\sqrt{n+1}}\right)\)
Áp dụng vào bài toán:
\(\dfrac{1}{2\sqrt{1}}+\dfrac{1}{3\sqrt{2}}+...+\dfrac{1}{2009\sqrt{2008}}< 2\left(\dfrac{1}{\sqrt{1}}-\dfrac{1}{\sqrt{2}}+\dfrac{1}{\sqrt{2}}-\dfrac{1}{\sqrt{3}}+...+\dfrac{1}{\sqrt{2008}}-\dfrac{1}{\sqrt{2009}}\right)\)
\(\Rightarrow VT< 2\left(1-\dfrac{1}{\sqrt{2009}}\right)< 2-\dfrac{2}{\sqrt{2009}}< 2\) (đpcm)
\(\dfrac{1}{3^2}>\dfrac{1}{3\cdot4}=\dfrac{1}{3}-\dfrac{1}{4}\)
\(\dfrac{1}{4^2}>\dfrac{1}{4\cdot5}=\dfrac{1}{4}-\dfrac{1}{5}\)
...
\(\dfrac{1}{100^2}>\dfrac{1}{100}-\dfrac{1}{101}\)
Do đó: \(\dfrac{1}{3^2}+\dfrac{1}{4^2}+...+\dfrac{1}{100^2}>\dfrac{1}{3}-\dfrac{1}{4}+\dfrac{1}{4}-\dfrac{1}{5}+...+\dfrac{1}{100}-\dfrac{1}{101}=\dfrac{1}{3}-\dfrac{1}{101}=\dfrac{98}{303}>\dfrac{90.9}{303}=\dfrac{3}{10}\)(1)
\(\dfrac{1}{3^2}< \dfrac{1}{2\cdot3}=\dfrac{1}{2}-\dfrac{1}{3}\)
\(\dfrac{1}{4^2}< \dfrac{1}{3}-\dfrac{1}{4}\)
...
\(\dfrac{1}{100^2}< \dfrac{1}{99}-\dfrac{1}{100}\)
Do đó: \(\dfrac{1}{3^2}+\dfrac{1}{4^2}+...+\dfrac{1}{100^2}< \dfrac{1}{2}-\dfrac{1}{3}+\dfrac{1}{3}-\dfrac{1}{4}+...+\dfrac{1}{99}-\dfrac{1}{100}\)
=>\(\dfrac{1}{3^2}+\dfrac{1}{4^2}+...+\dfrac{1}{100^2}< \dfrac{1}{2}-\dfrac{1}{100}=\dfrac{49}{100}< \dfrac{50}{100}=\dfrac{1}{2}\)(2)
Từ (1),(2) suy ra \(\dfrac{3}{10}< \dfrac{1}{3^2}+\dfrac{1}{4^2}+...+\dfrac{1}{100^2}< \dfrac{1}{2}\)
1.
\(\dfrac{1}{2!}+\dfrac{2}{3!}+\dfrac{3}{4!}+...+\dfrac{99}{100!}\)
\(=\dfrac{2-1}{2!}+\dfrac{3-1}{3!}+\dfrac{4-1}{4!}+...+\dfrac{100-1}{100!}\)
\(=\dfrac{1}{1!}-\dfrac{1}{2!}+\dfrac{1}{2!}-\dfrac{1}{3!}+\dfrac{1}{3!}-\dfrac{1}{4!}+...+\)\(\dfrac{1}{99!}-\dfrac{1}{100!}\)
\(=1-\dfrac{1}{100!}< 1\)
2.
\(\dfrac{1.2-1}{2!}+\dfrac{2.3-1}{3!}+\dfrac{3.4-1}{4!}+...+\)\(\dfrac{1}{100!}\)
Ta có:
\(=\dfrac{1.2}{2!}-\dfrac{1}{2!}+\dfrac{2.3}{3!}-\dfrac{1}{3!}+\dfrac{3.4}{4!}-\dfrac{1}{4!}+...+\)\(\dfrac{99.100}{100!}-\dfrac{1}{100}\)
\(=\left(\dfrac{1.2}{2!}+\dfrac{2.3}{3!}+\dfrac{3.4}{4!}+...+\dfrac{99.100}{100!}\right)\)\(-\left(\dfrac{1}{2!}+\dfrac{1}{3!}+...+\dfrac{1}{100!}\right)\)
\(=\left(1+1+\dfrac{1}{2!}+...+\dfrac{1}{98!}\right)\)\(-\left(\dfrac{1}{2!}+\dfrac{1}{3!}+...+\dfrac{1}{100!}\right)\)
\(=2-\dfrac{1}{99!}-\dfrac{1}{100!}< 2\)
Lời giải:
$A< \frac{1}{2^2}+\frac{1}{2.3}+\frac{1}{3.4}+..+\frac{1}{99.100}$
$A< \frac{1}{4}+\frac{3-2}{2.3}+\frac{4-3}{3.4}+...+\frac{100-99}{99.100}$
$A< \frac{1}{4}+\frac{1}{2}-\frac{1}{3}+\frac{1}{3}-\frac{1}{4}+...+\frac{1}{99}-\frac{1}{100}$
$A< \frac{1}{4}+\frac{1}{2}-\frac{1}{100}< \frac{1}{4}+\frac{1}{2}$
Hay $A< \frac{3}{4}$
1)\(\dfrac{A}{B}=\dfrac{\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}}{\dfrac{2008}{1}+\dfrac{2007}{2}+\dfrac{2006}{3}+...+\dfrac{2}{2007}+\dfrac{1}{2008}}\)
\(\dfrac{A}{B}=\dfrac{\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}}{2008+\dfrac{2007}{2}+\dfrac{2006}{3}+...+\dfrac{2}{2007}+\dfrac{1}{2008}}\)
\(\dfrac{A}{B}=\dfrac{\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}}{1+\left(\dfrac{2007}{2}+1\right)+\left(\dfrac{2006}{3}+1\right)+...+\left(\dfrac{2}{2007}+1\right)+\left(\dfrac{1}{2008}+1\right)}\)
\(\dfrac{A}{B}=\dfrac{\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}}{\dfrac{2009}{2009}+\dfrac{2009}{2}+\dfrac{2009}{3}+...+\dfrac{2009}{2007}+\dfrac{2009}{2008}}\)
\(\dfrac{A}{B}=\dfrac{\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}}{2009\left(\dfrac{1}{2}+\dfrac{1}{3}+\dfrac{1}{4}+...+\dfrac{1}{2007}+\dfrac{1}{2008}+\dfrac{1}{2009}\right)}\)
\(\dfrac{A}{B}=\dfrac{1}{2009}\)
2) \(A=\dfrac{3}{1^2.2^2}+\dfrac{5}{2^2.3^2}+\dfrac{7}{3^2.4^2}+...+\dfrac{19}{9^2.10^2}\)
\(A=\dfrac{2^2-1^2}{1^2.2^2}+\dfrac{3^2-2^2}{2^2.3^2}+\dfrac{4^2-3^2}{3^2.4^2}+...+\dfrac{10^2-9^2}{9^2.10^2}\)
\(A=1-\dfrac{1}{2^2}+\dfrac{1}{2^2}-\dfrac{1}{3^2}+\dfrac{1}{3^2}-\dfrac{1}{4^2}+...+\dfrac{1}{9^2}-\dfrac{1}{10^2}\)
\(A=1-\dfrac{1}{10^2}< 1\left(đpcm\right)\)
Câu a :
Chưa nghĩ ra! Sorry nhé!!
Câu b :
Câu hỏi của Trần Thùy Linh - Toán lớp 6 | Học trực tuyến
Câu c :
Câu hỏi của Trần Thùy Linh - Toán lớp 6 | Học trực tuyến
Vào link đó mà xem, t ngại chép lại
Đặt \(A=\dfrac{1}{2^3}+\dfrac{1}{3^3}+...+\dfrac{1}{2009^3}\)
Ta CM công thức sau :
\(\dfrac{1}{n^3}< \dfrac{1}{\left(n-1\right).n.\left(n+1\right)}\)
Thật vậy ta có : \(\left(n-1\right).n.\left(n+1\right)=\left(n-1\right)\left(n+1\right).n=\left(n^2-1\right).n=n^3-n< n^3\\ \Rightarrow\dfrac{1}{n^3}< \dfrac{1}{\left(n-1\right).n.\left(n+1\right)}\)
Áp dụng công thức trên vào biểu thức A ; ta có :
\(A=\dfrac{1}{2^3}+\dfrac{1}{3^3}+...+\dfrac{1}{2009^3}\\ < \dfrac{1}{1.2.3}+\dfrac{1}{2.3.4}+...+\dfrac{1}{2008.2009.2010}\\ =\dfrac{1}{2}\left(\dfrac{1}{1.2}-\dfrac{1}{2.3}+\dfrac{1}{2.3}-\dfrac{1}{3.4}+...+\dfrac{1}{2008.2009}-\dfrac{1}{2009.2010}\right)\\ =\dfrac{1}{2}\left(\dfrac{1}{2}-\dfrac{1}{2009.2010}\right)\\ =\dfrac{1}{4}-\dfrac{1}{2.2009.2010}< \dfrac{1}{4}\)
Anh Tú xem xét bài e nhé !!
vâng ạ !!