Tham khảo : 

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\(\dfrac{2001+2002}{2002+2003}< \dfrac{2001}{2002}+\dfrac{2002}{2003}\)

A=2001/2002+2002/2003

B=2001/2002+2003+2002/2002+2003

(tớ tách B ra đấy)

mà 2001//2002+2002/2003>2001/2002+2003+ 202/2002+2003

A>B

B = \(\frac{2001}{2002}+\frac{2002}{2003}\)

có: \(\frac{2000}{2001}>\frac{2000}{2001}+2002\)

\(\frac{2001}{2002}>\frac{2001}{2001}+2002\)

Vậy A>B

Ta có \(B=2002^2\)

\(=2002.2002\)

\(=2002.\left(2003-1\right)\)

\(=2002.2003-2002>2003.2002-2003=2001.2003\)

Khi đó A < B 

Vậy....

Mình cảm ơn nha :3

ta có \(\frac{2000+2002}{2001+2003}\)= \(\frac{2000}{2001+2003}\)+ \(\frac{2002}{2001+2003}\)=\(\frac{2000}{4004}\)+\(\frac{2002}{4004}\)

ta có \(\frac{2000}{2001}\)>\(\frac{2000}{4004}\) và \(\frac{2002}{2003}\)> \(\frac{2002}{4004}\)

 nên \(\frac{2000}{2001}\)+\(\frac{2002}{2003}\)>\(\frac{2000}{4004}\)+\(\frac{2002}{4004}\)

vậy \(\frac{2000}{2001}\)+\(\frac{2002}{2003}\)>\(\frac{2000+2002}{2001+2003}\)

\(\frac{2000+2002}{2001+2003}=\frac{2000}{2001+2003}+\frac{2002}{2001+2003}< \frac{2000}{2001}+\frac{2002}{2003}\)

Ta có:
\(\dfrac{2001}{2002}< 1\)
\(1< \dfrac{2021}{2003}\)
\(\Rightarrow\dfrac{2001}{2002}< \dfrac{2021}{2003}\)

#Đang Bận Thở

a) 2001 : 2002

b) 2021 : 2003

Ta có:  10 *(10^2001+1)/10^2002+1 = 10^2002+10/10^2002+1 = (10^2002+1)+9/10^2002+1 = 1+9/10^2002+1

           10*(10^2002+1)/10^2003+1 = 10^2003+10/10^2003+1 = (10^2003+1)+9/10^2003+1 = 1+9/10^2003+1

 Vì 9/10^2002+1>9/10^2003+1 nên 1+9/10^2002+1>1+9/10^2003+1

    Vậy: 10^2001+1/10^2002+1>10^2002+1/10^2003+1

B lon hon nha