So sánh hai số\(\frac{1001}{4005}\)và\(\frac{1002}{4007}\)
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
\(A=\frac{1001^{1001}}{1002^{1002}}=\frac{1001^{1000}.1001}{1002^{1001}.1002}\)
\(B=\frac{1001^{1001}+101101}{1002^{1002}+101202}=\frac{1001.1001^{1000}+1001.101}{1002.1002^{1001}+1002.101}\)
\(=\frac{1001\left(1001^{1000}+101\right)}{1002\left(1002^{1001}+101\right)}\)
Xét \(\frac{1001^{1000}+101}{1002^{1001}+101}\)\(-\frac{1001^{1000}}{1002^{1001}}\)
\(=\frac{1002^{1001}\left(1001^{1000}+101\right)-1001^{1000}\left(1002^{1001}+101\right)}{\left(1002^{1001}+101\right).1002^{1001}}\)
\(=\frac{1002^{1001}.1001^{1000}+1002^{1001}.101-1001^{1000}.1002^{1001}-1001^{1000}.101}{\left(1002^{1001}+101\right).1002^{1001}}\)
\(=\frac{101\left(1002^{1001}-1001^{1000}\right)}{\left(1002^{1001}+101\right).1002^{1001}}>0\)
=> \(\frac{1001^{1000}+101}{1002^{1001}+101}\)\(>\frac{1001^{1000}}{1002^{1001}}\)
=> \(\frac{1001\left(1001^{1000}+101\right)}{1002\left(1002^{1001}+101\right)}>\frac{1001^{1000}.1001}{1002^{1001}.1002}\)
=> \(B>A\)
Ta có:
A=-2012/4025=>-2012/4025x2=-4024/4025
B=-1999/3997=>-1999/3997x2=-3998/3997
Ta có: 4024/4025<1<3998/3997
=>4024/4025<3998/3997
=>-4024/4025>-3998/3997
=>-2012/4025>-1999/3997
1)Ta có: A= 2004/2005=1- 1/2005 B=2005/2006=1- 1/2006 1/2005>1/2006 =>1- 1/2005 < 1- 1/2006
Vậy A<B.
2)Tương tự như trên,1001/1002<1002/1003
\(\frac{1001}{1000}\)và \(\frac{1002}{1003}\)
Giải
Vì
\(\frac{1001}{1000}\)\(>1\)
\(\frac{1002}{1003}\)\(< 1\)
Nên
\(\frac{1001}{1000}\)\(>\frac{1002}{1003}\)
Hok tốt
1001/4005 < 1002/4007