摘 要: | 1问题呈现设a,b,c为正实数,且a+b+c=3,求证:√ab/2a+b+c+√bc/2b+c+a+√ca/2c+a+b≤3/2.2问题的证明与推广证明:由已知条件结合均值不等式可得√ab/2a+b+c+√bc/2b+c+a+√ca/2c+a+b=√ab/3+a+√bc/3+b+√ca/3+c≤√ab/44√ a+√bc/44√ b+√ca/44√c=8√a3b4/2+8√b3c4/2+8√c3a4/2≤1+3a+4b/16+1+3b+4c/16+1+3c+4a/16=3+7 (a+b+c)/16=3+7×3/16=3/2,当且仅当a=b=c=1时取等号,则√ab/2a+b+c+√bc/2b+c+a+√ca/2c+a+b≤3/2.
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