原式左边两两配对:
x^2b/a+y^2a/b>=2xy
x^2c/a+z^2a/c>=2xz
y^2c/b+z^2b/c>=2yz
累加得证
证明不等式:x,y,z∈R,a,b,c∈R+,则x2(b+c)/a +y2(a+c)/b+z2(b+a)/c≧2(xy+
1个回答
相关问题
-
已知x,y,z∈R,a,b,c∈R+,求证(b+c)/ax^2+(c+a)/by^2+(a+b)/cz^2 ≥2(xy+
-
已知:a/(z-2y+x)=b/(x-2z+y)=c/(y-2x+z),a+b+c≠0.求证:(a+b)(b+c)(c+
-
a=a1*x%+a2*y%+a3*z% b=b1*x%+b2*y%+b3*z% c=c1*x%+c2*y%+c3*z%
-
已知x=2a-b-c,y=2b-c-a,z=2c-a-b,求x(b-c)+y(c-a)+z(a-b)的值
-
1.已知x,y,z∈R,且x+y+z=a 求证x^2+y^2+z^2≥(a^2)/3 2.已知a、b、c>0,a+b+c
-
若x/(a+2b+c)=y/(a-c)=z/(a-2b+c),且a,b,c,x,y,z均不为0,求证a/(x+2y+z)
-
若[a/x]=[b/y]=[c/z],求证:a3x2+b3y2+c3z2=(a+b+c)3(x+y+z)2.
-
已知:a=x2-2y+[π/3],b=y2-2z+[π/6],c=z2-2x+[π/2](x,y,z∈R),证明:a,b
-
证明,若abc属于R,且x=a^2-2*b+1,y=b^2-2*c+1,z=c^2-2*a+1,则x,y,z中至少有一个
-
用反证法若a,b,c属于R且x=a^2-2b+1,y=b^2-2c+1,z=c^2-2a+1.则x,y,z中至少有一个不