So sánh:
\(A=\dfrac{1999^{1999}+1}{1999^{1998}+1}\) ; \(B=\dfrac{1999^{2000}+1}{1999^{1999}+1}\)
Giúp với!
SO sánh A và B Biết A=1999^1999+1/1999^2000 +1va B=1999^1998+1/1999^1999+1
3k cho câu trả lời đúng
ta thấy 19991999 + 1 / 19992000 + 1 < 1 và 1998 > 0
nên ta có: A < 19991999 + 1 + 1998 / 19992000 + 1 + 1998
< 19991999 + 1999 / 19992000 + 1999
< 1999(19991998 + 1) / 1999(19991999 + 1)
< 19991998 + 1 / 19991999 + 1
< B
Vậy A < B
để tui xem lại đã hink như tui làm bài này zùi
So sánh: C=\frac{1999^2000+1/1999^1999+1} và D=\frac{1999^1999+1/1999^1998+1}
So sánh; A =19991999 + 1/ 19991998 + 1 và B = 19992000 + 1/ 19991999 +1
ta có: \(A=\frac{1999^{1999}+1}{1999^{1998}+1}=\frac{1999.\left(1999^{1998}+1\right)-1998}{1999^{1998}+1}=\frac{1999.\left(1999^{1998}+1\right)}{1999^{1998}+1}-\frac{1998}{1999^{1998}+1}\)
\(=1999-\frac{1998}{1999^{1998}+1}\)
\(B=\frac{1999^{2000}+1}{1999^{1999}+1}=\frac{1999.\left(1999^{1999}+1\right)-1998}{1999^{1999}+1}=\frac{1999.\left(1999^{1999}+1\right)}{1999^{1999}+1}-\frac{1998}{1999^{1999}+1}\)
\(=1999-\frac{1998}{1999^{1999}+1}\)
mà \(\frac{1998}{1999^{1998}+1}>\frac{1998}{1999^{1999}+1}\Rightarrow1999-\frac{1998}{1999^{1998}+1}< 1999-\frac{1998}{1999^{1999}+1}\)
\(\Rightarrow A< B\)
so sánh các biểu thức sau:
A = \(\dfrac{1999^{1999}+1}{1999^{1998}+1}\) và B = \(\dfrac{1999^{2000}+1}{1999^{1999}+1}\)
Ta có:
\(A-B=\dfrac{1999^{1999}+1}{1999^{1998}+1}-\dfrac{1999^{2000}+1}{1999^{1999}+1}\)
\(=\dfrac{\left(1999^{1999}+1\right)^2-\left(1999^{1998}+1\right)\left(1999^{2000}+1\right)}{\left(1999^{1998}+1\right)\left(1999^{1999}+1\right)}\)
\(=\dfrac{1999^{3998}+2\cdot1999^{1999}+1-\left(1999^{3998}+1999^{1998}+1999^{2000}+1\right)}{1999^{3997}+1999^{1998}+1999^{1999}+1}\)
\(=\dfrac{2\cdot1999^{1999}-1999^{1998}-1999^{2000}}{1999^{3997}+1999^{1998}+1999^{1999}+1}\)
Mà \(2\cdot1999^{1999}-1999^{1998}-1999^{2000}=-\left[\left(1999^{999}\right)^2-2\cdot1999^{999}\cdot1999^{1000}+\left(1999^{1000}\right)^2\right]\)
\(=-\left(1999^{999}-1999^{1000}\right)^2< 0\)
Mà mẫu số > 0
\(\Rightarrow A-B< 0\Leftrightarrow A< B\)
A=\(\dfrac{1999^{1999}+1999-1998}{1999^{1998}+1}\) B=\(\dfrac{1999^{2000}+1999-1998}{1999^{1999}+1}\)
A=1999-\(\dfrac{1998}{1999^{1998}+1}\) B=1999-\(\dfrac{1998}{1999^{1999}+1}\)
Vì 19991998+1<19991999+1 nên
\(\dfrac{1}{1999^{1998}+1}\)>\(\dfrac{1}{1999^{1999}+1}\) nên \(\dfrac{-1}{1999^{1998}+1}< \dfrac{-1}{1999^{1999}+1}\)
A=1999+\(\dfrac{-1}{1999^{1998}+1}< 1999+\dfrac{-1}{1999^{1999}+1}\)=B
A<B
So sánh: C=1999^2000+1/1999^1999+1và D=1999^1999+1/1999^1998+1
Giúp với mình đang cần gấp
SO SÁNH A VÀ B
A= 13^16 + 1/13^17+1 VÀ B=13^15 +1 /13^16+1
A=1999^2000 +1 / 1999^1999 +1 VÀ B=1999^1999+1/1999^1998 +1
So sánh: 1998/1999+1999/2000 va 1998+1999/1999+2000
Đặt A=1998/1999+1999/2000 B=1998+1999/1999+2000 =1998/1999+2000 + 1999/1999+2000 Vì 1998/1998>1998/1999+2000 1999/2000>1999/1999+2000 Nên A>B
So sánh: 1998/1999+1999/2000 va 1998+1999/1999+2000
Đặt A=1998/1999+1999/2000
B=1998+1999/1999+2000
=1998/1999+2000 + 1999/1999+2000
Vì 1998/1998>1998/1999+2000
1999/2000>1999/1999+2000
Nên A>B
So sánh
\(C=\frac{1999^{2000}+1}{1999^{1999}+1}\)và \(D=\frac{1999^{1999}+1}{1999^{1998}+1}\)
\(C=\frac{1999^{2000}+1}{1999^{1999}+1}< \frac{1999^{1999}+1+1998}{1999^{2000}+1+1998}\)
\(=\frac{1999^{1999}+1999}{1999^{2000}+1999}\)
\(=\frac{1999\cdot(1999^{1998}+1)}{1999\cdot(1999^{1999}+1)}\)
\(=\frac{1999^{1999}+1}{1999^{1998}+1}=D\)
Vậy...