\(A=\frac{19^{30}+5}{19^{31}+5}=>19A=\frac{19^{31}+95}{19^{31}+5}=1+\frac{90}{19^{31}+5}\left(1\right)\)

\(B=\frac{19^{31}+5}{19^{32}+5}=>19B=\frac{19^{32}+95}{19^{32}+5}=1+\frac{90}{19^{32}+5}\left(2\right)\)

từ (1) and (2)

=>19A>19B

=>A>B

Ta có: a<b, c<d =>a+c<b+d.

a+c<b+d

vì a với c nhỏ hơn hơn b với d

nên a + c<b+d

Ta có : \(A=\frac{19^{30}+15}{19^{31}+15}\)

\(\Rightarrow19A=\frac{19^{31}+285}{19^{31}+15}=\frac{19^{31}+15+270}{19^{31}+15}=1+\frac{270}{19^{31}+15}\)

Lại có \(B=\frac{19^{31}+15}{19^{32}+15}\)

\(\Rightarrow19B=\frac{19^{32}+285}{19^{32}+15}=\frac{19^{32}+15+270}{19^{32}+15}=1+\frac{270}{19^{32}+15}\)

Vì \(\frac{270}{19^{32}+15}< \frac{270}{19^{31}+15}\Rightarrow1+\frac{270}{19^{32}+5}< 1+\frac{270}{19^{31}+15}\Rightarrow19B< 19A\Rightarrow B< A\)

a, 8^5=8192;3.4^7=3.16384=49152

=>8^5<3.4^7

b,cái nè dài quá nên chị viết ngắn gọn thôi ha!^.^

31^11>17^14

c,5^333<3^555

Ta có: \(A=\frac{19^{30}+5}{19^{31}+5}\Rightarrow19A=\frac{19.\left(19^{30}+5\right)}{19^{31}+5}=\frac{19^{31}+95}{19^{31}+5}=\frac{19^{31}+5+90}{19^{31}+5}=1+\frac{90}{19^{31}+5}\)

    \(B=\frac{19^{31}+5}{19^{32}+5}\Rightarrow19B=\frac{19.\left(19^{31}+5\right)}{19^{32}+5}=\frac{19^{32}+95}{19^{32}+5}=\frac{19^{32}+5+90}{19^{32}+5}=1+\frac{90}{19^{32}+5}\)

Nên  \(19A< 19B\Rightarrow A< B\)

Nhầm: Vì \(\frac{90}{19^{31}+5}>\frac{90}{19^{32}+5}\Rightarrow1+\frac{90}{19^{31}+5}>1+\frac{90}{19^{32}+5}\Rightarrow A>B\)

giải 

tha thấy 

48 = 9+9+9+9+9+3  từ đó suy ra số bé nhất có tổng = 48 là : 399999

Ta có :

\(\frac{102}{97}>1;\frac{99}{101}< 1\) nên \(\frac{102}{97}>\frac{99}{101}\)

Hok tốt

ta có: 102/97 > 99/97> 99/101

suy ra: 102/97> 99/101

ta có : -5.11 = -55 > 14. -4 = -56

suy ra -5/14 > -4/11

C = 19³⁰+5/19³¹+5

=>19C = 19³¹+95/19³¹+5 = 1+ [90/19³¹+5]

D = 19³¹+5/19³²+5

=>19D = 19³²+95/19³²+5 = 1 + [90/19³²+5]

ma 90/19³¹+5 > 90/19³²+5

=>19C > 19D

=>C > D