a) 5²⁰<3³⁰<3³⁴

5²⁰=(5²)¹⁰=25¹⁰

3³⁰=(3³)¹⁰=27¹⁰

vi 25¹⁰ <27¹⁰ nen 5²⁰ <3³⁰ va3³⁰<3³⁴

=> 5²⁰<3³⁴

B) 5^299 < 5^300 = (5^2)^150 = 25^150 

3^501 = (3^3)^167 = 27^167 

=> 27^167 > 25^150 => 3^501 > 5^299

C) Ta có 3^23=3^21.3^2=(3^3)^7.9=27^7.9 
5^15=5^14.5=(5^2)^7.5=25^7.5 
vì 27^7>25^7;9>5 nên 27^7.9>25^7.5 
vậy 3^23>5^15

5^3=125

3^5=3.3.3.3.3

=> 5^3<3^5

b) \(64^7=\left(4^3\right)^7=4^{21}\)

Vậy \(4^{21}=64^7\)

a) 5²⁸ và 26¹⁴

   5²⁸ = (5²)¹⁴

    (5²)¹⁴ = 25¹⁴

    Vì 25¹⁴ < 26¹⁴ nên 5²⁸ < 26¹⁴ 

b) 4²¹ và 64⁷

    64⁷ = (4³)⁷ = 4²¹ = 4²¹

    Vậy 4²¹ = 64⁷ 

c) 31¹¹ và 17¹⁴

    31¹¹ < 32¹¹ = (2⁵)¹¹ = 2⁵⁵ 

    17¹⁴ > 16¹⁴ = (2⁴)¹⁴ = 2⁵⁶

    Vì 31¹¹ < 2⁵⁵ < 2⁵⁶ < 17¹⁴  nên 31¹¹ < 17¹⁴

d) 3²¹ và 2³¹

   3²¹ = 3x3²⁰ = 3x(3²)¹⁰ = 3x9¹⁰

    2³¹ = 2x2³⁰ = 2x(2³)¹⁰ = 2x8¹⁰

    3x9¹⁰ = 3x10x8¹⁰ = 30x8¹⁰

    => 3²¹ > 2³¹

   e) 3²ⁿ và 2³ⁿ

      3²ⁿ = (3²)ⁿ = 9ⁿ

      2³ⁿ = (2³)ⁿ = 8ⁿ 

      => 3²ⁿ > 2³ⁿ

1. Tính giá trị biểu thức:

\(777:7+1331:11^3\)

\(=111+11^3:11^3\)

\(=111+1\)

\(=112\)

1.

\(777:7+1331:11^3=111+1331:1331=111+1=112\)

2.

\(2^{x+3}+2^x=36\\ 2^x\left(1+2^3\right)=36\\ 2^x\cdot9=36\\ 2^x=4\\ x=2\)

\(3^{x+4}+3^{x+2}=270\\ 3^{x+2}\cdot\left(3^2+1\right)=270\\ 3^{x+2}\cdot10=270\\ 3^{x+2}=27\\ x+2=3\\ x=1\)

\(\left(2x-5\right)^5=3^{10}\\ \left(2x-5\right)^5=3^{2\cdot5}\\ \left(2x-5\right)^5=\left(3^2\right)^5\\ \left(2x-5\right)^5=9^5\\ 2x-5=9\\ 2x=14\\ x=7\)

3.

\(31^{11}< 32^{11}=\left(2^5\right)^{11}=2^{55}\\ 17^{14}>16^{14}=\left(2^4\right)^{14}=2^{56}>2^{55}\\ \Rightarrow31^{11}< 17^{14}\)

\(5^{300}=5^{2\cdot150}=\left(5^2\right)^{150}=25^{150}\\ 3^{453}=3^{3\cdot151}=\left(3^3\right)^{151}=27^{151}\\ 25^{150}< 25^{151}< 27^{151}\\ \Leftrightarrow5^{300}< 3^{453}\)

A=\(8^2.32^2=8.8.32.32.32.32=2^3.2^3.2^5.2^5.2^5.2^5=2^{\left(3+3+5+5+5+5\right)}=2^{26}\)

A=8^2 x 32^2x2=8^2x(32^2)^2=8^2x1024^2=(8x1024)^2=8192^2=(2^13)^2=2^13x2=2^26