\(A=\frac{3^{100}+1}{3^{99}+1}=\frac{\left(3^{99}+1\right)\times3-2}{3^{99}+1}=3-\frac{2}{3^{99}+1}\)

\(B=\frac{3^{99}+1}{3^{98}+1}=\frac{\left(3^{98}+1\right)\times3-2}{3^{98}+1}=3-\frac{2}{3^{98}+1}\)

Do 3⁹⁸ + 1 < 3⁹⁹ + 1 

=> \(\frac{2}{3^{98}+1}>\frac{2}{3^{99}+1}\)

=> A > B

Bài 1:

Ta thấy A < 1

=> A = \(\frac{17^{18}+1}{17^{19}+1}< \frac{17^{18}+1+16}{17^{19}+1+16}=\frac{17^{18}+17}{17^{19}+17}=\frac{17\left(17^{17}+1\right)}{17\left(17^{18}+1\right)}=\frac{17^{17}+1}{17^{18}+1}=B\)

Vậy A < B

Bài 2:

Ta thấy C < 1

=> C = \(\frac{98^{99}+1}{98^{89}+1}< \frac{98^{99}+1+97}{98^{89}+1+97}=\frac{98^{99}+98}{98^{89}+98}=\frac{98\left(98^{98}+1\right)}{98\left(98^{88}+1\right)}=\frac{98^{98}+1}{98^{88}+1}=D\)

Vậy C < D

Vì C= \(\dfrac{98^{99}+1}{98^{89}+1}\)>1 thì nên áp dụng tính chất . Nên \(\dfrac{a}{b}\)>1 thì \(\dfrac{a}{b}\)>\(\dfrac{a+m}{b+m}\) ( a∈ N , b và m ∈ N^✳) Ta có : C= \(\dfrac{98^{99}+1}{98^{89}+1}\)> \(\dfrac{98^{99}+1+97}{98^{89}+1+97}\)= \(\dfrac{98^{99}+98}{98^{89}+98}\) = \(\dfrac{98.98^{98}+98.1}{98.98^{88}+98.1}\) = \(\dfrac{98.\left(98^{98}+1\right)}{98.\left(98^{88}+1\right)}\)= \(\dfrac{98^{98}+1}{98^{88}+1}\)= B ⇔ Vậy \(\dfrac{98^{99}+1}{98^{89}+1}\)< \(\dfrac{98^{89}+1}{98^{88}+1}\) nên C<D

D > C

Lấy C - D

\(C-D=\frac{\left(98^{99}+1\right)\left(98^{88}+1\right)-\left(98^{98}+1\right)\left(98^{89}+1\right)}{\left(98^{89}+1\right)\left(98^{88}+1\right)}\)

Tử số bằng:

\(98^{187}+98^{99}+98^{88}+1-98^{187}-98^{98}-98^{89}-1\)

=\(98^{99}+98^{88}-98^{98}-98^{89}\)

= \(98^{99}-98^{98}+98^{88}-98^{89}\)

= \(98^{98}\left(98-1\right)+98^{88}\left(1-98\right)\)

= \(98^{98}.97-98^{88}.97=97\left(98^{98}-98^{88}\right)>0\)

Vậy C - D > 0 => C > D

Do C>1 nên ta có:

C=98⁹⁹+1/98⁸⁹+1>98⁹⁹+1+97/98⁸⁹+1+97=98⁹⁹+98/98⁸⁹+98=98(98⁹⁸+1)/98(98⁸⁸+1)=98⁹⁸+1/98⁸⁸+1=D

suy ra C>D

 D lớn hơn C nhiều lắm

Bạn giải được không ?

ta có

x+y+y+z+z+x=\(\frac{13}{12}\)

2(x+y+z)=\(\frac{13}{12}\)

=>x+y+z=\(\frac{13}{24}\)

z=(x+y+z)-(x+y)

y=y+z-z

x=x+Y-y