- 分式不等式设x、y、z∈R+,且x+y+z=1.证明:x/(x+
- 设x、y、z∈R+,且x+y+z=1.
证明:x/(x+yz)+y/(y+zx)+z/(z+xy)≤9/4.
- 证明:∑x/(x+yz)≤9/4
<==>∑[x(x+y+z)/(x(x+y+z)+yz)]≤9/4
<==>∑[x(x+y+z)/(x+y)(x+z)]≤9/4
<==>(x+y+z)∑x(y+z)≤9(x+y)(y+z)(z+x)/4
<==>8(x+y+z)(xy+yz+zx)≤9(x+y)(y+z)(z+x)
<==>∑(x(y-z)^2≥0.
此式显然成立,故原不等式成立。