x+y+z=a,xy+yz+xz=b,x²+y²+z³=
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=[(X+Z)+(X-Y)]/[X(X-Y)+Z(X-Y)]-[(X+Y)+(X+Z)]/[X(X+Y)+Z(X+Y)]=[(X+Z)+(X-Y)]/[(X+Z)(X-Y)]-[(X+Y)+(X+Z)
xy/(x+y)=1,取倒数(x+y)/xy=1x/xy+y/xy=11/y+1/x=1.1yz/(y+z)=2,取倒数(y+z)/yz=1/2y/yz+z/yz=1/21/z+1/y=1/2.2xz
=-1,-3,7再问:具体步骤再答:x,y,z>0,7两个大于0,一个小于0,=-1两个小于0,一个大于0,=-3三个小于0,=-1再问:能不用因为所以形式啊再答:①∵x,y,z>0∴原式=1+1+1
X^2+Y^2+Z^2=XY+YZ+XZ则有2X^2+2Y^2+2Z^2-2XY-2YZ-2XZ=0==>(X-Y)^2+(Y-Z)^2+(Z-X)^2=0必然X-Y=0,Y-Z=0,Z-X=0==>
本题考查最值不等式:a+b≥2√ab当且仅当a=b时,取等号x√yz+y√zx+z√xy≤x(y+z)/2+y(z+x)/2+z(x+y)/2当且仅当y=z,z=x,x=y,即:x=y=z时,取等号,
(x+y+z)^2=x^2+y^2+z^2+2xy+2yz+2xz>3(xy+yz+zx)所以只要求证x^2+y^2+z^2>xy+yz+zx2(x^2+y^2+z^2)>2(xy+yz+zx)(x^
结果等于:1原式=x/(xy+x+xyz)+y/(yz+y+xyz)+z/(xz+z+xyz)=1/(y+1+yz)+1/(z+1+xz)+1/(x+1+xy)=xyz/(y+xyz+yz)+1/(z
x+y+z=a(x+y+z)^2=a^2(x+y+z)^2=x^2+y^2+z^2+2(xy+yz+zx)x^2+y^2+z^2=(x+y+z)^2-2(xy+yz+zx)=a^2-2
XYZ-XY-XZ+X-YZ+Y+Z-1XYZ,XY提取公因式XY;XZ,X提取公因式X;YZ,Y提取公因式Y=XY(Z-1)-X(Z-1)-Y(Z-1)+(Z-1)提取公因式(Z-1);=(Z-1)
令x/3=y/2=z/5=k则x=3ky=2kz=5k∴(xy+yz+zx)/(x²+y²+z²)=(6+10+15)k²/(9+4+25)l²=31
由题式可以看出当x=y或y=z或x=z时式子为0所以肯定有因式(x-y)(y-z)(z-x)展开后x最高项为-x^2y与x^2z而原式中x最高次项为x^3y和-x^3z所以还差x的1次项因式,所以实际
对称性不妨设:x≥y≥za=|x-y|=x-y,b=|y-z|=y-z,c=|z-x|=x-z有:a、b、c≥0;c=a+b则:c≥a、b≥0A的最大值=c已知得出:16=a^2+b^2+c^2=2c
原式=[(x--y)+(x--z)]/(x--y)(x--z)+[(y--x)+(y--z)]/(y--x)(y--z)+[(z--x)+(z--y)]/(z--x)(z--y)=1/(x--z)+1
xyz-yz-zx-xy+x+y+z-1=yz(x-1)-z(x-1)-y(x-1)+x-1=(x-1)(yz-y-z+1)=(x-1)(y-1)(z-1)
图片中的题可以用琴森不等式构造函数f(x)=e^x/(3e^x+1)^0.5可以验证f``(x)>0对所有x成立因此f(x)是下凸函数有f(x)+f(y)+f(z)>=3f(x+y+z/3)令x=ln
(X+Y+Z)^2=x^2+y^2+z^2+2(xy+yz+xz)=a^2=x^2+y^2+z^2+2b所以x^2+y^2+z^2=a^2-2
原式=xy(z-1)-x(z-1)-y(z-1)+(z-1)=(z-1)(xy-x-y+1)=(x-1)(y-1)(z-1)其中用到了一个公式:ab+a+b+1=(a+1)(b+1)ab-a-b+1=
答案是:(2*X)/((X-Z)*(X+Z))再问:解题过程给我写下1再答:=(2X+Z-Y)/[(x-y)(x+z)]-(y-z)/[(x-z)(x-y)]=[(2x+z-y)(x-z)-(y-z)
通分原式=[(yz+xz+xy)/xyz]×(xy)/(xy+yz+zx)=xy(yz+xz+xy)/[xyz(xy+yz+zx)]=1/z
(x^2-yz)/[x^2-(y+z)x+yz]+(y^2-zx)/[y^2-(z+x)y+zx]+(z^2-xy)/[z^2-(x+y)z+xy]=(yz-x^2)/(x-y)(z-x)+(zx-y