Cho a,b,c>0:
CMR: $\frac{1}{a(b+1)}+\frac{1}{b(c+1)}+\frac{1}{c(a+1)}\geq \frac{3}{abc+1}$
Mình làm theo cách khác nha
Ta có:
$\dfrac{1+abc}{a(b+1)}=\dfrac{1+a+abc+ab-a-ab}{a(b+1)}=\dfrac{(1+a)+ab(1+c)-a(1+b)}{a(b+1)}=\dfrac{1+a}{a(1+b)}+\dfrac{b(1+c)}{1+b}-1$
Làm tương tự ta có: $\dfrac{1+abc}{b(c+1)}=\dfrac{1+b}{b(1+c)}+\dfrac{c(1+a)}{1+c}-1$
$\dfrac{1+abc}{c(a+1)}=\dfrac{1+c}{c(1+a)}+\dfrac{a(b+1)}{1+a}-1$
Áp dụng Cô-si có:
$\dfrac{1+abc}{a(b+1)}+\dfrac{1+abc}{b(c+1)}+\dfrac{1+abc}{c(a+1)}$
$=\dfrac{1+a}{a(1+b)}+\dfrac{b(1+c)}{1+b}-1+\dfrac{1+b}{b(1+c)}+\dfrac{c(1+a)}{1+c}-1+\dfrac{1+c}{c(1+a)}+\dfrac{a(b+1)}{1+a}-1$
$=[\dfrac{1+a}{a(1+b)}+\dfrac{a(b+1)}{1+a}]+[\dfrac{b(1+c)}{1+b}+\dfrac{1+b}{b(1+c)}]+[\dfrac{c(1+a)}{1+c}+ \dfrac{1+c}{c(1+a)}]-3 \geq 2\sqrt{\dfrac{1+a}{a(1+b)}.\dfrac{a(b+1)}{1+a}}+2\sqrt{\dfrac{b(1+c)}{1+b}.\dfrac{1+b}{b(1+c)}}+2\sqrt{\dfrac{c(1+a)}{1+c}. \dfrac{1+c}{c(1+a)}}-3 =2+2+2-3=3 $
=>$\dfrac{1+abc}{a(b+1)}+\dfrac{1+abc}{b(c+1)}+\dfrac{1+abc}{c(a+1)} \geq 3$
$<=>\dfrac{1}{a(b+1)}+\dfrac{1}{b(c+1)}+\dfrac{1}{c(a+1)} \geq \dfrac{3}{abc+1} (đpcm)$