\(A=1+5+5^2+5^3+...+5^{100}\)

\(5A=5+5^2+5^3+...+5^{100}+5^{101}\)

\(5A-A=5+5^2+5^3+...+5^{100}+5^{101}-\left(1+5+5^2+5^3+...+5^{100}\right)\)

\(4A=5^{101}-1\)

\(A=\frac{5^{101}-1}{4}\)

A = 1+5+5²+5³+...+5¹⁰⁰

5A = 5+5²+5³+5⁴+....+5¹⁰¹

4A = 5A - A = 5¹⁰¹ - 1

=> A = \(\frac{5^{101}-1}{4}\)

\(1+5+5^2+...5^{100.}\)

\(=1+5+5^{2+...+100}\)

\(=1+5+5^{99}\)

\(=1+5^1+5^{99}\)

\(=1+5^{1+99}\)

\(=1+5^{100}\)

\(=1+500\)

\(=501\)

Vậy, 5A = 5¹ + 5² + 5³ +... + 5⁵⁰ + 5⁵¹. 

5A - A = 4A = (5¹ + 5² + 5³ +... + 5⁵⁰) + 5⁵¹ - 5⁰ + (5¹ + 5² + 5³ +... + 5⁴⁹ + 5⁵⁰) = 5⁵¹ - 1. 

Tức, A = \(\frac{\left(5^{51}-1\right)}{4}\)

A=1+2^2+...+2^100

2A=2+2^2+2^3+...+2^101

2A=2^101-1

A=(2^101-1):2

\(B=5^1+5^2+...+5^{199}\)

\(\Rightarrow5B=5^2+5^3+...+5^{200}\)

\(\Rightarrow5B-B=\left(5^2+5^3+...+5^{200}\right)-\left(5^1+5^2+...+5^{199}\right)\)

\(\Rightarrow4B=5^{200}-5\)

\(\Rightarrow B=\frac{5^{200}-5}{4}\)

A=1+5+5²+...+5¹⁰⁰

=>5A=5+5²+5³+...+5¹⁰¹

_

A=1+5+5²+....5¹⁰⁰

^{___________________________________}

4A=5¹⁰¹-1

=>A=5¹⁰¹-1/4

5A=5+5^2+5^3+.....+5^101

5A-A=5^101-1

A=\(\frac{5^{101}-1}{4}\)

Ta có:

\(K=1+5^2+5^3+...+5^{100}\)

\(\Rightarrow5K=5+5^3+5^4+...+5^{101}\)

\(\Rightarrow5K-K=5+5^3+5^4+...+5^{101}-1-5^2-5^3-...-5^{100}\)

\(\Rightarrow4K=5^{101}-4\)

\(\Rightarrow K=\frac{5^{101}-4}{4}\)

Ta có K = 1 + 5² + 5⁴ + 5⁶ + ... + 5¹⁰⁰

=> 5².K = 25K =  5² + 5⁴ + 5⁶ + 5⁸ + ... + 5¹⁰²

Khi đó 25K - K = (5² + 5⁴ + 5⁶ + 5⁸ + ... + 5¹⁰²) - (1 + 5² + 5⁴ + 5⁶ + ... + 5¹⁰⁰)

           => 24K = 5¹⁰² - 1

           =>     K = \(\frac{5^{102}-1}{24}\)

Vậy K = \(\frac{5^{102}-1}{24}\)

\(A=2^0+2^1+2^2\)\(+2^3+...+\)\(2^{50}\)

\(2A=2+2^2+2^3+...+2^{51}\)

\(2A-A=A=2^{51}-2^0\)

\(B=5+5^2+5^3+...+5^{99}+5^{100}\)

\(5B=5^2+5^3+5^4+...+5^{100}+5^{101}\)

\(5B-B=4B=5^{101}-5\)

\(B=\frac{5^{101}-5}{4}\)

\(C=3-3^2+3^3-3^4+...+\)\(3^{2007}-3^{2008}+3^{2009}-3^{2010}\)

\(3C=3^2-3^3+3^4-3^5+...-3^{2008}+3^{2009}-3^{2010}+3^{2011}\)

\(3C+C=4C=3^{2011}+3\)

\(C=\frac{3^{2011}+3}{4}\)

\(S_{100}=5+5\times9+5\times9^2+5\times9^3+...+5\times9^{99}\)

\(S_{100}=5\times\left(1+9+9^2+9^3+...+9^{99}\right)\)

\(9S_{100}=5\times\left(9+9^2+9^3+...+9^{99}+9^{100}\right)\)

\(9S_{100}-S_{100}=8S_{100}=5\times\left(9^{100}-1\right)\)

\(S_{100}=\frac{5\times\left(9^{100}-1\right)}{8}\)

$A=2^0+2^1+2^2$$+2^3+...+$$2^{50}$

$2A=2+2^2+2^3+...+2^{51}$

$2A-A=A=2^{51}-2^0$

$B=5+5^2+5^3+...+5^{99}+5^{100}$

$5B=5^2+5^3+5^4+...+5^{100}+5^{101}$

$5B-B=4B=5^{101}-5$

$B=\genfrac{}{}{0ex}{}{5^{101}-5}{4}$

$C=3-3^2+3^3-3^4+...+$$3^{2007}-3^{2008}+3^{2009}-3^{2010}$

$3C=3^2-3^3+3^4-3^5+...-3^{2008}+3^{2009}-3^{2010}+3^{2011}$

$3C+C=4C=3^{2011}+3$

$C=\genfrac{}{}{0ex}{}{3^{2011}+3}{4}$

$S^{100}=5+5\times 9+5\times 9^2+5\times 9^3+...+5\times 9^{99}$

$S^{100}=5\times \left(1+9+9^2+9^3+...+9^{99}\right)$

$9S^{100}=5\times \left(9+9^2+9^3+...+9^{99}+9^{100}\right)$

$9S^{100}-S^{100}=8S^{100}=5\times \left(9^{100}-1\right)$

$S^{100}=\genfrac{}{}{0ex}{}{5\times \left(9^{100}-1\right)}{8}$

\(A=1+2+2^2+...+2^{51}\)

\(2A=2+2^2+2^3+...+2^{52}\)

\(2A-A=\left(2+2^2+2^3+...+2^{52}\right)-\left(1+2+2^2+...+2^{51}\right)\)

\(A=2^{52}-1\)

\(B=5+5^2+5^3+...+5^{100}\)

\(5B=5^2+5^3+5^4+...+5^{101}\)

\(5B-B=\left(5^2+5^3+5^4+...+5^{101}\right)-\left(5+5^2+5^3+...+5^{100}\right)\)

\(4B=5^{101}-5\)

\(B=\frac{5^{101}-5}{4}\)