a)M=2005+2005² +.....+2005¹⁰ 

=>M=(2005+2005² )+.....+(2005⁹ +2005¹⁰ )

=>M=2005(1+2005)+.....+2005⁹ (1+2005)

=>M=2005*2006+.....+2005⁹ *2006

=>M=2006(2005+...+2005⁹ ) chia hết cho 2006(đpcm)

b)A=3+3² +....+3¹⁰⁰ 

=>A=(3+3² +3³  +3⁴)+....+(3⁹⁷ +3⁹⁸ +3⁹⁹ +3¹⁰⁰ )

=>A=3(1+3+3² +3³ )+....+3⁹⁷ (1+3+3² +3³ )

=>A=3*40+...+3⁹⁷ *40

=>A=40(3+...+3⁹⁷ ) chia hết cho 40(đpcm)

2005+2005²+2005³+...+2005¹⁰

=2005.(1+2005)+2005³.(1+2005)+...+2005⁹.(1+2005)

=2005.2006+2005³.2006+...+2005⁹.2006

=2006.(2005+2005³+...+2005⁹)

=>2005+2005²+2005³+...+2005¹⁰ chia hết cho 2006

= 2005.(1+2005)+2005².(1+2005)+...+2005⁹.(1+2005)

= 2006.(2005+2005²+...+2005⁹) 

=> tổng trên chia hết cho 2006

nhầm chút

2005 (1+2005)+2005³ (1+2005)+..+2005⁹ .(1+2005)

=2005.2006+ 2005³.2006+...+2005⁹ .2006

=2006 (2005+2005³+...+2005⁹) chia het cho 2006

Bài 2 thôi em dùng đồng dư cho chắc:v

a) \(21^2\equiv41\left(mod200\right)\Rightarrow21^{10}\equiv41^5\equiv1\left(mod200\right)\)

Suy ra đpcm.

b) \(39^2\equiv1\left(mod40\right)\Rightarrow39^{20}\equiv1\left(mod40\right)\)

Mặt khác \(39^2\equiv1\left(mod40\right)\Rightarrow39^{12}\equiv1\Rightarrow39^{13}\equiv39\left(mod40\right)\)

Suy ra \(39^{20}+39^{13}\equiv1+39\equiv40\equiv0\left(mod40\right)\)

Suy ra đpcm

c) Do 41 là số nguyên tố và (2;41) = 1 nên:

\(2^{20}\equiv1\left(mod41\right)\) suy ra \(2^{60}\equiv1\left(mod41\right)\)

Dễ dàng chứng minh \(5^{30}\equiv40\left(mod41\right)\)

Suy ra đpcm.

d) Tương tự