作业帮当x,y,z>0时x+2y+3z=1u=x*x/(x+1)+4y*ysup2/(2y+1)+9z*z/(3z+1)的最小值
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当x,y,z>0时x+2y+3z=1u=x*x/(x+1)+4y*ysup2/(2y+1)+9z*z/(3z+1)的最小值
当x,y,z>0时x+2y+3z=1u=x*x/(x+1)+4y*ysup2/(2y+1)+9z*z/(3z+1)的最小值
当x,y,z>0时x+2y+3z=1u=x*x/(x+1)+4y*ysup2/(2y+1)+9z*z/(3z+1)的最小值
已知x+2y+3z=1,求求u=x²/(x+1)+4y²/(2y+1)+9z²/(3z+1)最小值
根据柯西不等式,[x²/(x+1)+4y²/(2y+1)+9z²/(3z+1)]·[(x+1)+(2y+1)+(3z+1)]≥(x+2y+3z)²
∴[x²/(x+1)+4y²/(2y+1)+9z²/(3z+1)]·[(x+2y+3z)+3]≥(x+2y+3z)²
即4u≥1,从而u≥1/4
等号成立条件:[x/√(x+1)]:[√(x+1)]=[2y/√(2y+1)]:[√(2y+1)]=[3z/√(3z+1)]:[√(3z+1)]
即[x/(x+1)]=[2y/(2y+1)]=[3z/(3z+1)],[(x+1)/x]=[(2y+1)/2y]=[(3z+1)/3z]
1+1/x=1+1/2y=1+1/3z,即x=2y=3z,代入x+2y+3z=1得x=1/2,y=1/3,z=1/6
代入u后经验证u=1/4,故u最小值为1/4
当x,y,z>0时x+2y+3z=1u=x*x/(x+1)+4y*ysup2/(2y+1)+9z*z/(3z+1)的最小值
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x+y+z=6 x+2y+3z=14 y+1=z
方程组 (1) x+2y-3z=12 x-3y+2z= - 13 x-y-z=0 (2) x+ y=z 5x-y+z=18 2x+5y+3z= -1
(1)X+Y=15,Y+Z=-6,Z+X=7.(2)X+Y=-14,Y+Z=-7,Z+X=9.(3)X+Y=0,Y+Z=-1,Z+X=-1.