a) \(11^{1979}<11^{1980}=\left(11^3\right)^{660}=1331^{660}\)

\(37^{1320}=\left(37^2\right)^{600}=1369^{600}\)

\(1369^{660}>1331^{660}\Rightarrow11^{1979}<37^{1320}\)

b) \(1990^{10}+1990^9=1990^9\left(1990+1\right)=1990^9.1991<1991^9.1991\)

\(\Rightarrow1990^{10}+1990^9<1991^{10}\)

Vậy \(1990^{10}+1990^9<1991^{10}\)

a)11¹⁹⁷⁹<37¹³²⁰

b)1990¹⁰+1990⁹<1991¹⁰

1; 11¹⁹⁷⁹ > 37¹³²⁰

2; 1990¹⁰ + 1990⁹ > 1991¹⁰

quá dễ

Lời giải:

$A=1990^{10}+1990^9=1990^9(1990+1)=1990^9.1991< 1991^9.1991=1991^{10}$

Hay $A< B$

\(1990^{10}>1990^9\left(1\right)\)

Ta có  \(1991^1=1990^1+1990^0\)

mà \(\)\(1990^1+1990^0< 1990^9\left(1990>1\right)\)

\(\Rightarrow1990^9>1991^1\left(2\right)\)

\(\left(1\right),\left(2\right)\Rightarrow1991^1< 1990^9< 1990^{10}\)

Ta có:

\(1990^{10}+1990^9=1990^9.\left(1990+1\right)=1990^9.1991\)

\(1991^{10}=1991^9.1991\)

Vì 1990⁹<1991⁹ => 1990⁹.1991<1991⁹.1991

=>1990¹⁰+1990⁹<1991¹⁰

Ta có:\(1990^{10}+1990^9\)

\(=1990^9.1990+1990^9\)

\(=1990^9.\left(1990+1\right)\)

\(=1990^9.1991< 1991^9.1991=1991^{10}\)

\(\Rightarrow1990^{10}+1990^9< 1991^{10}\)

1990¹⁰ + 1990⁹ và 1991¹⁰ = (1990.1990.......1990)+(1990.1990.....1990) và (1991.1991.....1991) Vì có 10 số 1991 nhân nhau nên nó lớn hơn 10 số 1990 và 10 số 1991 nhân nhau lớn hơn 9 số 1990 nhân nhau

1991¹⁰ >1990¹⁰

1991¹⁰>1990⁹