Z=根号x^2 y^2与z=x^2 y^2两个曲面围成的立体体积
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![Z=根号x^2 y^2与z=x^2 y^2两个曲面围成的立体体积](/uploads/image/f/921850-34-0.jpg?t=Z%3D%E6%A0%B9%E5%8F%B7x%5E2+y%5E2%E4%B8%8Ez%3Dx%5E2+y%5E2%E4%B8%A4%E4%B8%AA%E6%9B%B2%E9%9D%A2%E5%9B%B4%E6%88%90%E7%9A%84%E7%AB%8B%E4%BD%93%E4%BD%93%E7%A7%AF)
(y-z)^2+(z-x)^2+(x-y)^2=(x+y-2z)^2+(y+z-2x)^2+(z+x-2y)^2[(y-z)^2-(y+z-2x)^2]+[(z-x)^2-(x+z-2y)^2]+[(
2(√x+√(y-1)+√(z-2)=x+y=zy+x-2√x-2√(y-1)-2√(z-2)=0(x-2√x+1)+[(y-1)-2√(y-1)+1]-2√(z-2)-1=0(√x-1)^2+[√(
√x+√(y-1)+√(z-2)=1/2(x+y+z)变形后得[x-2√x+1]+[(y-1)-2√(y-1)+1]+[(z-2)-2√(z-2)+1=0即(√x-1)^2+[√(y-1)+1]^2+
设根号x=a根号下y-1=b根号下z-2=cx=a^2y=b^2+1z=c^2+22a+2b+2c=a^2+b^2+c^2+3(a-1)^2+(b-1)^2+(c-1)^=0a=1b=1c=1x=1y
令k=x/2=y/3=z/4x=2k,y=3k,z=4k令a=√(x+2y+3z+2)则a²=x+2y+3z+2x+2y+3z=a²-2所以a²-2=a+4a²
有这样的公式:a^3+b^3+c^2-3abc=(a+b+c)(a^2+b^2+c^2-ab-bc-ca)左边减右边,证明:(x+y-2z)^3+(y+z-2x)^3+(z+x-2y)^3-3(x+y
由第一个式子的定义域x-5≥0,x-5≤0可得x=5|y²-36|+根号(2x-y-z)=0两项都大于等于0,只有各项都等于0等式才成立所以y²-36=0y=6或者y=-6舍去2x
x²+y²+xy=x²+y²-2xycos120度同理y²+z²+yz=y²+z²-2yzcoa120度x²+
∂z/∂x把y看成常数所以1+0+∂z/∂x-2/[2√(xyz)]*y*(1*z+x*∂z/∂x)=01+∂z/&
1.z²-z+1/4=(z-1/2)².绝对值、根号、平方数都是非负的,而相加为0.所以都为0.即x=y,2y=z,z=1/2.所以x=y=1/4,z=1/2.2.2002x200
原题即:2[√x+√(y-1)+√(z-2)]=(x+y+z)2√x+2√(y-1)+2√(z-2)=x+y+z移项,得x+y+z-2√x-2√(y-1)-2√(z-2)=0(x-2√x+1)+[(y
经配方得(根号下x-1)²+(根号下y-1-1)²+(根号下z-2-1)²=0∴x=y-1=z-2=0∴x=0,y=1,z=2
根号x-3+|y-2|+z^2=2z-1根号x-3+|y-2|+(z^2-2z+1)=0根号x-3+|y-2|+(z-1)^2=0由于数值开根号,绝对值和平方数均为大于等于0的数则上式要成立只有X-3
两边取e的指数:e^(x+y²+z)=(x+y²+z)/2对x求导:[e^(x+y²+z)]*(1+ðz/ðx)=(1+ðz/ðx
∵2x-4y-z≥0z-2x+4y≥0∴2x-4y-z=0∴√﹙3x-2y-4﹚+√﹙2x-7y+3﹚=0则有:3x-2y-4=02x-7y+3=0解得:x=2y=1.∴z-2x+4y=0z=2x-4
=x²(y-z)+y²(z-x)+z²(x-z+z-y)=(y-z)(x²-z²)+(z-x)(y²-z²)=(y-z)(x-z)
把x=y+根号2代入得2y^2+2根号2y+2根号2*z^2+1=02[y+(根号2)/2]^2+2根号2*Z^2=0∴y+(根号2)/2=02根号2*z^2=0∴y=-(根号2)/2z=0x=(根号
根据公式(a+b+c)^2=a^2+b^2+c^2+2ab+2bc+2ac公式展开:得到(x^2+y^2+z^2=2xy-2yz-2xz)-(x^2+y^2+z^2-2xy-2yz+2xz)合并同类项