正实数x,y,z满足xy yz=10,求 的最小值.
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1/x=p1/y=q1/z=rpq+qr+pr=1(y+x)/z+(y+z)/x+(z+x)/y≥2(1/x+1/y+1/z)^2为(pq+qr+pr)[r/p+r/q+q/r+q/p+p/r+p/q
x+2y-z=6①x-y+2z=3②,①×2+②,得x+y=5,则y=5-x③,①+2×②,得x+z=4,则z=4-x④,把③④代入x2+y2+z2得,x2+(5-x)2+(4-x)2=3x2-18x
实数x,y,z,满足那么x+y=6,z^2=xy-9,∴xy=z^+9,(x-y)^=(x+y)^-4xy=-4z^>=0,∴z=0,(x+y)^z=6^0=1.
我再来凑凑热闹……根据柯西不等式:(1/x+1/y+1/z)(x+y+z)>=(1+1+1)^2因为x+y+z=1所以1/x+1/y+1/z>=9又因为1/x+1/y+1/z≥㏒m〔m-2〕+10所以
xyz(x+y+z)=1y^2+(x+z)y-1/xz=0y=0.5(sqrt((x+z)^2+4/xz)-(x+z))(因为y>0)(x+y)(y+z)=0.25(sqrt(x+z)^2+4/xz)
x=6-3y &nbs
证 (1)记t=xy+yz+xz3,∵x,y,z>0.由平均不等式xyz=(3xy•yz•xz)32≤(xy+yz+zx3)32于是4=9xyz+xy+yz+xz≤9t3+3t2,∴(
z=x²+4y²-3xy≥4xy-3xy=xy所以xy/z≤1.xy/z取得最大值时xy=z且x=2y,所以z=2y².2/x+1/y-2/z=1/y+1/y-1/y
3^x=4^y=6^zln(3^x)=ln(4^y)=ln(6^z)xln3=yln4=zln6xln3=2yln2=z(ln2+ln3)设xln3=2yln2=z(ln2+ln3)=tln3=t/x
由题意得,y=x+2z,∵x,y,z为正实数,∴y=x+2z≥22xz,∴y2≥8xz,∴y2xz的最小值是8,故答案为8.
题目有点问题,z/(xy)没有最大值.由条件z=x²+4y²-3xy,故z/(xy)=x/y+4y/x-3.取x=1,当y趋于0时,可知右端趋于正无穷.正确的说法可能是z/(xy)
由正实数x,y,z满足x2-3xy+4y2-z=0,∴z=x2-3xy+4y2.∴xyz=xyx2−3xy+4y2=1xy+4yx−3≤12xy•4yx−3=1,当且仅当x=2y>0时取等号,此时z=
该题可以进行图形辅助解析由x²+y²+xy=25/4x²+z²+xz=169/4y²+z²+yz=36=144/4 &
等于0.x/(y+z)=1-[y/(z+x)+z/(x+y)]y/(z+x)=1-[x/(y+z)+z/(x+y)]z/(x+y)=1-[x/(y+z)+y/(z+x)]x2/(y+z)+y2/(z+
∵xy+z=(x+z)(y+z),∴z=(x+y+z)z∴x+y+z=1故xyz≤[13(X+Y+Z)]3=127当且仅当 x=y=z=13取等号即xyz的最大值是127;
∵正实数x,y,z满足2x(x+1y+1z)=yz,∴x2+x(1y+1z)=12yz,∴(x+1y)(x+1z)=x2+x((1y+1z)+1yz=12yz+1yz≥212=2.当且仅当yz=2,取
∵正实数x,y,z满足x+2y+z=1,∴1x+y+9(x+y)y+z=x+y+y+zx+y+9(x+y)y+z=1+y+zx+y+9(x+y)y+z≥1+2y+zx+y×9(x+y)y+z=7,当且
3^x=4^y=6^zln(3^x)=ln(4^y)=ln(6^z)xln3=yln4=zln6xln3=2yln2=z(ln2+ln3)设xln3=2yln2=z(ln2+ln3)=tln3=t/x
x²+5y²+4z²=(x²+4y²)+(y²+4z²)≥4xy+4yz=4(xy+yz)=40
因为xyz=1,所以z=1/(xy),带入到代数式,得:2+(x+1/x)+(y+1/y)+[xy+1/(xy)];在以上3个括号中两个正数积为1,显然他们相等时和最小;所以有x=1/x;y=1/y;