a、b、c属于R+ 求证(b+c)/a+(a+c)/b+(a+b)/c≥6

a、b、c属于R+ 求证(b+c)/a+(a+c)/b+(a+b)/c≥6
a、b、c属于R+ 求证(b+c)/a+(a+c)/b+(a+b)/c≥6

a、b、c属于R+ 求证(b+c)/a+(a+c)/b+(a+b)/c≥6
(b+c)/a+(a+c)/b+(a+b)/c=b/a+c/a+a/b+c/b+a/c+b/c=(a/b+b/a)+(a/c+c/a)+(b/c+c/b) ∵a/b+b/a>=2√(a/b×b/a)=2(取等a/b=b/a,即a=b) a/c+c/a>=2√(a/c×c/a)=2(取等a/c=c/a,即a=c) b/c+c/b>=2√(b/c×c/b)=2(取等b/c=c/b,即b=c) ∴(b+c)/a+(a+c)/b+(a+b)/c=(a/b+b/a)+(a/c+c/a)+(b/c+c/b)>=2+2+2=6 即(b+c)/a+(a+c)/b+(a+b)/c>=6