题目内容
证明:(1)已知x,y都是正实数,求证:x3+y3≥x2y+xy2,
(2)已知a,b,c∈R+,且a+b+c=1,求证:a2+b2+c2 ≥
| 1 | 3 |
分析:(1)用比较法证明不等式,(x3+y3 )-(x2y+xy2)=(x+y)(x-y)2,分析符号可得结论.
(2)由题意得,1=(a+b+c)2=a2+b2+c2+2ab+2bc+2ac≤3(a2+b2+c2),结论得证.
(2)由题意得,1=(a+b+c)2=a2+b2+c2+2ab+2bc+2ac≤3(a2+b2+c2),结论得证.
解答:证明:(1)∵(x3+y3 )-(x2y+xy2)=x2 (x-y)+y2(y-x)=(x-y)(x2-y2 )
=(x+y)(x-y)2.
∵x,y都是正实数,∴(x-y)2≥0,(x+y)>0,∴(x+y)(x-y)2≥0,
∴x3+y3≥x2y+xy2.
(2)∵a,b,c∈R+,且a+b+c=1,∴1=(a+b+c)2=a2+b2+c2+2ab+2bc+2ac
≤3(a2+b2+c2),∴a2+b2+c2≥
,当且仅当a=b=c 时,等号成立.
=(x+y)(x-y)2.
∵x,y都是正实数,∴(x-y)2≥0,(x+y)>0,∴(x+y)(x-y)2≥0,
∴x3+y3≥x2y+xy2.
(2)∵a,b,c∈R+,且a+b+c=1,∴1=(a+b+c)2=a2+b2+c2+2ab+2bc+2ac
≤3(a2+b2+c2),∴a2+b2+c2≥
| 1 |
| 3 |
点评:本题考查用比较法证明不等式,基本不等式的应用,将式子变形是证明的关键.
练习册系列答案
阅读快车系列答案
相关题目
.
.
.
.