\(A=7+7^2+7^3+...+7^{120}\\ A=\left(7+7^2+7^3\right)+...+\left(7^{118}+7^{119}+7^{120}\right)\\ A=7\times\left(1+7+7^2\right)+...+7^{118}\times\left(1+7+7^2\right)\\ A=7\times57+7^4\times57+...+7^{118}\times57\\ A=57\times\left(7+7^4+...+7^{118}\right)\\ \Rightarrow A⋮57\)

\(A=7\left(1+7+7^2\right)+7^4\left(1+7+7^2\right)+...+7^{118}\left(1+7+7^2\right)=7.57+7^4.57+...+7^{118}.57=57\left(7+7^4+...+7^{118}\right)⋮57\)

Lời giải:
$A=(7+7^2+7^3)+(7^4+7^5+7^6)+....+(7^{118}+7^{119}+7^{120})$
$=7(1+7+7^2)+7^4(1+7+7^2)+...+7^{118}(1+7+7^2)$

$=7.57+7^4.57+...+7^{118}.57$

$=57(7+7^4+...+7^{118})\vdots 57$ 

Ta có đpcm.

 á à thg hếu cx hỏi trên này cơ à XDDD

bn k trả lời đc thì thoi, cứ smap báo cáo h!

a: 43/52>26/52=1/2=60/120

b: 17/68=1/4<1/3=35/105<35/103

c: \(\dfrac{2018\cdot2019-1}{2018\cdot2019}=1-\dfrac{1}{2018\cdot2019}\)

\(\dfrac{2019\cdot2020-1}{2019\cdot2020}=1-\dfrac{1}{2019\cdot2020}\)

2018*2019<2019*2020

=>-1/2018*2019<-1/2019*2020

=>\(\dfrac{2018\cdot2019-1}{2018\cdot2019}< \dfrac{2019\cdot2020-1}{2019\cdot2020}\)

\(\dfrac{19}{19}\) = 1 < \(\dfrac{2005}{2004}\) vậy \(\dfrac{19}{19}\) < \(\dfrac{2005}{2004}\)

\(\dfrac{72}{73}\) = 1 - \(\dfrac{1}{73}\) 

\(\dfrac{98}{99}\) = 1 - \(\dfrac{1}{99}\)

Vì \(\dfrac{1}{73}\) > \(\dfrac{1}{99}\) nên \(\dfrac{72}{73}\) < \(\dfrac{98}{99}\) 

1) 19/19 < 2005/2004

2)72/73 > 98/99

a) ta có:  \(1-\frac{2012}{2013}=\frac{1}{2013}\)

                 \(1-\frac{2013}{2014}=\frac{1}{2014}\)

mà \(\frac{1}{2013}>\frac{1}{2014}\) nên   \(\frac{2013}{2014}>\frac{2012}{2013}\)

sao giống lớp 4 thế ta

2²²⁵ = (2³)⁷⁵ = 8⁷⁵

3¹⁵¹ > 3¹⁵⁰ = (3²)⁷⁵ = 9⁷⁵

=> 3¹⁵¹ > 9⁷⁵ > 8⁷⁵

=> 3¹⁵¹ > 2²²⁵

4n - 5 chia hết cho 2n - 1

=> 4n - 2 - 3 chia hết cho 2n - 1

=> 2.(2n - 1) - 3 chia hết cho 2n - 1

Do 2.(2n - 1) chia hết cho 2n - 1 => 3 chia hết cho 2n - 1

Mà n thuộc N => 2n - 1 > hoặc = -1

=> 2n - 1 thuộc {-1 ; 1 ; 3}

=> 2n thuộc {0 ; 2 ; 4}

=> n thuộc {0 ; 1 ; 2}

Ta thấy : \(2222^{3333}vs2^{300}:\hept{\begin{cases}2222>2\\3333>300\end{cases}\Rightarrow2222^{3333}>2^{300}}\)

Ta thấy : \(2222^{1111}=1111^{1111}.2^{1111}< 1111^{1111}.1111^{1110}=1111^{2221}\)

Ta thấy : \(54^{10}=\left(3^3\right)^{10}.2^{10}=3^{30}.2^{10}=3^{12}.3^{18}.2^{10}>3^{12}.7^{12}=21^{12}.\)