(4x^2+16)/(x^2+6)=3/(x^2+1)+5/(x^2+3)+7/(x^2+5)
<=>(4x^2+16)/(x^2+6)-3=3/(x^2+1)-1+5/(x^2+3)-1+7/(x^2+5)-1
<=>(4x^2+16)-3(x^2+6)/(x^2+6)=[3-(x^2+1)]/(x^2+1)+[5-(x^2+3)]/(x^2+3)+[7-(x^2+5)]/(x^2+5)
<=>(4x^2+16-3x^2-18)/(x^2+6)=(3-x^2-1)/(x^2+1)+(5-x^2-3)/(x^2+3)+(7-x^2-5)/(x^2+5)
<=>(x^2-2)/(x^2+6)=(2-x^2)/(x^2+1)+(2-x^2)/(x^2+3)+(2-x^2)/(x^2+5)
<=>(x^2-2)/(x^2+6)-(2-x^2)/(x^2+1)-(2-x^2)/(x^2+3)-(2-x^2)/(x^2+5)=0
<=>(x^2-2)/(x^2+6)+(x^2-2)/(x^2+1)+(x^2-2)/(x^2+3)+(x^2-2)/(x^2+5)=0
<=>(x^2-2)[1/(x^2+6)+1/(x^2+1)+1/(x^2+3)+1/(x^2+5)]=0
Ta có: x^2[tex]\geq[/tex]0 =>x^2+6>0
1>0
=>1/(x^2+6)>0
CMTT, ta có:1/(x^2+1)>0
1/(x^2+3)>0
1/(x^2+5)>0
Vậy:1/(x^2+6)+1/(x^2+1)+1/(x^2+3)+1/(x^2+5)>0
=>x^2-2=0
<=>x^2=2
<=>x=[tex]\sqrt{2}[/tex] ; [tex]-\sqrt{2}[/tex]
Vậy nghiệm của BPT là x=[tex]\sqrt{2}[/tex] ; [tex]-\sqrt{2}[/tex]