2002A= 2002 + \(2002^2+2002^3+2002^4+.....+2002^{100}\)

2002A - A= \(\left(2002+2002^2+2002^3+2002^4+....+2002^{100}\right)-\left(1+2002+2002^2+.....+2002^{99}\right)\)

2001A= \(2002^{100}-1\)

Vì \(2002^{100}\) > \(2002^{100}-1\) nên B > 2001A

a. 20​01^​2002 ​+2002^​2003​=[....1]+2002^​4.500​.2002^​3​=[..1]+[...6].[...8]=[...9].Vay 2001^​2002​+2002²⁰⁰³ k​o chia het cho2.

b.  861^​7​+972​^​2​=[....1]+[....4]=[....5].Vay 861^​7​+972^​2 chia het cho 5.​

2002a = \(2002+2002^2+...+2002^{100}\)

=> 2002a -a = \(2002^{100}-1<2002^{100}\)

=> 2001 a< 2002= b

=> 2001a < b

đúng cái nhé

  Ta có \(B=2002^{100}\)

Ta có \(A=1+2002+2002^2+...+2002^{99}\)

         \(\Rightarrow2002A=2002+2002^3+...+2002^{100}\)

\(\Rightarrow2002A-A=\left(2002+2002^2+2002^3+...+2002^{100}\right)-\left(1+2002+2002^2+...+2002^{99}\right)\)

\(\Rightarrow2002A-A=2002+2002^2+2002^3+...+2002^{100}-1-2002-2002^2-...-2002^{99}\)

\(2001A=2002^{100}-1\)

                           vÌ 2002¹⁰⁰-1<2002¹⁰⁰ nên => A<B

                              ĐÚNG NHÉ

16866807962

2001 . 2022 + 1981+2003 . 21/ 2002 . 2003 - 2001. 2002

= ( 2001. 2002 - 2001 . 2022 ) + ( 1981 + 2003 . 21/ 2002 . 2003)

= 0+( 1981 + ( 2003 .  21 / 2002 + 1)

= 0 + 1981+( 2002 . 21/2002+1+1)

= 1981 + ( 21+2)

= 1981+ 23

=  2004