a) ta thấy 

26³⁸=(2.13)³⁸=2³⁸.13³⁸

64²⁵=(2³.8)²⁵=2²⁸.8²⁵

ta dễ dàng nhận thấy: 2²⁸<2³⁸ và 8²⁵<13³⁸ nên: 

26³⁸>64²⁵

>                                

A = 2⁰ + 2¹ + 2² + ... + 2⁶³

=> 2A = 2( 2⁰ + 2¹ + 2² + ... + 2⁶³ )

           = 2¹ + 2² + ... + 2⁶⁴

=> A = 2A - A

= 2¹ + 2² + ... + 2⁶⁴ - ( 2⁰ + 2¹ + 2² + ... + 2⁶³ )

= 2¹ + 2² + ... + 2⁶⁴ - 2⁰ - 2¹ - 2² - ... - 2⁶³

= 2⁶⁴ - 2⁰ = 2⁶⁴ - 1 < 2⁶⁴

=> A < B 

a, \(8^3=\left(2^3\right)^3=2^9>2^7\)

b, \(64^3=\left(4^3\right)^3=4^9\)

\(25^9=\left(5^2\right)^9=5^{18}\)

Vì \(4^9< 5^{18}\)nên \(64^3< 25^9\)

c, \(3^{74}=\left(3^2\right)^{37}=9^{37}\)

\(2^{111}=\left(2^3\right)^{37}=8^{37}\)

Vì \(9^{37}>8^{37}\) nên \(3^{74}>2^{111}\)

chuyen chug thah chug so mu

          Có: \(A=1+2+2^2+...+2^{64}\)

             \(2A=2\left(1+2+2^2+...+2^{64}\right)\)

                   \(=2+2^2+2^3+...+2^{65}\)

\(2A-A=2+2^2+2^3+...+2^{65}-1-2-2^2-...-2^{64}\)

             \(A=2^{65}-1< 2^{65}-0=2^{65}=B\)

Vậy\(A< B\)

a)\(5^{30}=\left(5^2\right)^{15}=25^{15}\)

Ta có: \(25^{15}< 124^{15}< 124^{18}\)

\(\Rightarrow5^{30}< 124^{18}\)

b) \(4^{21}=\left(4^3\right)^7=64^7\)

c) \(874^2=\left(870+4\right).874=870.874+4.874\)

\(870.878=870.\left(874+4\right)=870.874+870.4\)

Ta có: \(\left(870+4\right).874>870.874+4.870\)

\(\Rightarrow874^2>870.878\)

Tham khảo nhé~

a) \(5^{30}\) và    \(124^{18}\)

\(5^{30}=\left(5^5\right)^6=3125^6\)

\(124^{18}=\left(124^3\right)^6=1906624^6\)

Vì \(3125< 1906624\)

Vậy \(5^{30}< 124^{18}\)

b) \(4^{21}\)  và      \(64^7\)

\(4^{21}=\left(4^3\right)^7=64^7\)

Vì \(64=64\)

Vậy \(4^{21}=64^7\)

c) \(874^2\) và      \(870.878\)

\(874^2=874.874=763876\)

\(870.878=763860\)

Vì \(763876>763860\)

Vậy \(874^2>870. 878\)

Dễ thấy:64^{12}=\left(4^3\right)^{12}=4^{3.12}=4^{36}6412=(43)12=43.12=436
Ta có: 4S=4\left(4^0+4^1+4^2+4^3+...+4^{35}\right)4(40+41+42+43+...+435)
=4^1+4^2+4^3+4^4+...+4^{36}=41+42+43+44+...+436
=>4S-S=4^{36}-4^0436−40
Hay 3S=4^{36}-1< 4^{36}=64^{12}436−1<436=6412
Vậy 3S<64^{12}6412

Ta có

S=4⁰+4¹+4²+...+4³⁴+4³⁵

=>4S=4¹+4²+4³+...+4³⁵+4³⁶

=> 4S-S=(4⁰+4¹+4²+...+4³⁴+4³⁵)- (4¹+4²+4³+...+4³⁵+4³⁶)

=> 3S=4³⁶-4⁰=4³⁶-1=64¹²-1

=> 3S<64¹²