1. 5³⁶ = (5³)¹² = 125¹²

11²⁴ = (11²)¹² = 121¹²

Vì 125 > 121 và 12 = 12 => 125¹² > 121¹² => 5³⁶ > 11²⁴

2. 3²ⁿ = (3²)ⁿ = 9ⁿ

2³ⁿ = (2³)ⁿ = 8ⁿ. Vì 9 > 8 ; n = n => 9ⁿ > 8ⁿ => 3²ⁿ > 2³ⁿ

3. 5²³ = 5.5²²

Vì 5 < 6 ; 5²² = 5²² => 5.5²² < 6.5²² =>5²³ < 6.5²²

4. Có: 2¹⁶ = 2¹³.2³ = 2¹³.8

Vì 7 < 8 => 7.2¹³ < 2¹⁶

5. 27⁵.49⁸ = 3¹⁵.7¹⁶ = 3¹⁵.7¹⁵.7 = 21¹⁵.7 > 21¹⁵ => 21¹⁵ < 27⁵.49⁸

Câu bổ sung: 72⁵⁵ - 72⁴⁴ = 72⁴⁴.(72 - 1) = 72⁴⁴.71

72⁴⁴ - 72⁴³ = 72⁴³.(72 - 1) = 72⁴³.71 < 72⁴⁴.71 => 72⁴⁵ - 72⁴⁴ > 72⁴⁴ - 72⁴³

Thanks bạn nhé!!

21^15  =  ( 7. 3) ^15  = 7^15 . 3^15

27^5    = ( 3^3) ^ 5  = 3^15

49^8     = ( 7^2) ^8  = 7^ 16

=> 7^15 . 3^15 > 7^16 > 3^15

Vậy 21^15 > 49^8 > 27^5

\(21^{15}=3^{15}.7^{15}\)

\(27^5.49^8=\left(3^3\right)^5.\left(7^2\right)^8=3^{15}.7^{16}\)

Vì \(3^{15}.7^{17}< 3^{15}.7^{16}\)Nên \(21^{15}< 27^5.49^8\)

\(21^{15}=\left(3.7\right)^{15}=3^{15}.7^{15}\)

\(27^5.49^8=\left(3^3\right)^5.\left(7^2\right)^8=3^{15}.7^{16}\)

Mà \(3^{15}.7^{15}< 3^{15}.7^{16}\Rightarrow21^{15}< 27^5.49^8\)

Trl :

1/ 21¹⁵ và 27⁵.49⁸

  21¹⁵ = 3¹⁵.7¹⁵

  27⁵.49⁸ = (3³)⁵.(7²)⁸ = 3¹⁵.7¹⁶

=>  3¹⁵.7¹⁵ < 3¹⁵.7¹⁶

=> 21¹⁵ < 27⁵.49⁸

Ta có:

\(27^5.49^8=\left(3^3\right)^5.\left(7^2\right)^8=3^{15}.7^{16}=\left(3.7\right)^{15}.7=21^{15}.7\)

Vì \(21^{15}< 21^{15}.7\) nên \(21^{15}< 27^5.49^8\)

Vậy \(21^{15}.27^5.49^8\)

bn ơi mk hởi so sánh

a.21¹⁵ = 3¹⁵ x 7¹⁵  (1)

27⁵ x 49⁸ = (3³)⁵ x (7²)⁸ = 3¹⁵x7^16.  (2)

 Từ (1) và (2) suy ra 21¹⁵ < 27⁵ x 49⁸

a)     \(21^{15}\)\(=\left(3.7\right)^{15}\) \(=3^{15}.7^{15}\)

\(27^5.49^8\) \(=\left(3^3\right)^5.\left(7^2\right)^8\)\(=3^{15}.7^{16}\)

Ta thấy    \(7^{15}< 7^{16}\)\(\Rightarrow\)\(21^{15}< 27^5.49^8\)

b)     \(3^{30}\)\(=3^{2.15}\)\(=\left(3^2\right)^{15}\)\(=9^{15}\)

Ta thấy     \(8^{15}< 9^{15}\)

\(\Rightarrow\)\(8^{15}< 3^{30}\)

Ta có: \(21^{15}=\left(3.7\right)^{15}=3^{15}.7^{15}\)

\(27^5.49^8=3^{3.5}.7^{2.8}=3^{15}.7^{16}\)

Vì \(15< 16\)nên \(7^{15}< 7^{16}\Rightarrow3^{15}.7^{15}< 3^{15}.7^{16}\)

Hay \(21^{15}< 27^5.49^8\)

Ta có: \(3^{30}=3^{2.15}=9^{15}\)

Vì \(8< 9\)nên \(8^{15}< 9^{15}\)

Hay \(8^{15}< 3^{30}\)