\(A=-5^{22}\left\{-222\left[-122-\left(100-5^{22}\right)+2022\right]\right\}\)

\(A=-5^{22}\left\{-222\left[1900-\left(100-5^{22}\right)\right]\right\}\)

\(A=-5^{22}\left[-222\left(1900-100+5^{22}\right)\right]\)

\(A=-5^{22}\left[-222\left(1800+5^{22}\right)\right]\)

\(A=-5^{22}\left(-399600-222\cdot5^{22}\right)\)

\(A=399600\cdot5^{22}+222\cdot5^{44}\)

Lời giải:

$=5^{22}-22+[122-(100+5^{22})+2022]$

$=5^{22}-22+122-100-5^{22}+2022$

$=(5^{22}-5^{22})+(-22+122-100)+2022$

$=0+0+2022=2022$

hỏi nhiều quá

a) 5³⁰⁰=(5³)¹⁰⁰=125¹⁰⁰   ; 3⁵⁰⁰=(3⁵)¹⁰⁰=243¹⁰⁰    vì 125¹⁰⁰<243¹⁰⁰ nên 5³⁰⁰<3⁵⁰⁰. còn mấy cậu bạn tự làm nhé !

thanks bn nhé

\(51^{51}=\overline{.....1}\)

\(99^{99}=\left(99^2\right)^{49}\cdot9=\overline{....1}^{49}\cdot9=\overline{....1}\cdot9=\overline{....9}\)

\(22^{22}=\left(22^4\right)^5\cdot2^2=\overline{...6}^5\cdot4=\overline{...6}\cdot4=\overline{....4}\)

\(222^{101}=\left(222^4\right)^2^5\cdot222=\overline{...6}^{25}\cdot222=\overline{....6}\cdot222=\overline{....2}\)

333^⁷⁷⁷ > 777^333

b, 2^222> 22^22

a) Ta có: 333⁷⁷⁷ = 333^111.7 = (777³)¹¹¹

777³³³ = 777^111.3  = (777³)¹¹¹

Vì 777³<333⁷ nên (777³)¹¹¹ < (777³)¹¹¹

Vậy 333^{777 >} 777³³³

b) Ta có: 2²²² = 2^2.111 =(2¹¹¹)²

22²² = 22^11.2 = (22¹¹)² 

Vì 2¹¹¹ > 22¹¹ nên (2¹¹¹)² > (22¹¹)² 

a)17³³>31¹⁸

b)243¹⁷>82²²

c)201⁶⁰<399⁴⁵

d)22³³>33²²

e)222³³³<333²²²

^F)<

^G)>

\(22^{33}=\left(22^3\right)^{11}=10648^{11}\)

\(33^{22}=\left(33^2\right)^{11}=1089^{11}\)

vi \(10648>1089\)nen \(22^{33}>33^{22}\)