求曲面x=0 y=0 z=0 x y z=0的 曲面xyz积分
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X+Y-Z=6①Y+Z-X=2②Z+X-y=0③①+②+③得x+y+z=8④④-①得2z=2z=1④-②得2x=6x=3④-③得2y=8y=4即x=3y=4z=1
(x+y-z)/z=(y+z-x)/x=(z+x-y)/y[x+y]/z-1=[y+z]/x-1=[z+x]/y-1[x+y]/z=[y+z]/x=[z+x]/y设[x+y]/z=[y+z]/x=[z
设(y+z)/x=(x+z)/y=(x+y)/z=k;y+z=kx;x+z=ky;y+z=kx;2(x+y+z)=k(x+y+z);k=2或x+y+z=0;所以,(y+z)(x+z)(x+y)/xyz
由|3x-2y+z|≥0,|2x+y+2z|≥0,且|3x-2y+z|+|2x+y+2z|=0,得|3x-2y+z|=|2x+y+2z|=0∴3x-2y+z=2x+y+2z=0由3x-2y+z=2x+
是X+Y/5=Y+X/6=Z+X/7吧由X+Y/5=Y+X/6解得,X=24Y/25把上式代入:Y+X/6=Z+X/7解得Z=179Y/175所以X:Y:Z=(24Y/25):Y:179Y/175=1
不妨用特殊代入法啊令a=b=c=0或者a=1,b=-1,c=0结果都是x^3+x^2z-xyz+y^3=0
设(y+z)/x=(z+x)/y=(y+x)/z=k则y+z=kx,z+x=ky,y+x=kz三式相加2(x+y+z)=k(x+y+z)故当x+y+z=0时,k=-1,但xy-z不等于0,可知x+y+
因为:X+Y+Z=0得:Z+Y=-X------(1)X+Y=-Z------------(2)Z+Y=-X------------(3)X^3+X^2Z-XYZ+Y^2Z+Y^3=X^3+XZ(X+
令(y+z)/x=(z+x)/y=(x+y)/z=t∴y+z=xt,z+x=yt,x+y=zt三式相加得:2(x+y+z)=(x+y+z)t∴(2-t)(x+y+z)=0∴2-t=0或x+y+z=0若
x+y+z=0所以x+y=-zx+z=-yy+z=-xx(1/y+1/z)+y(1/x+1/z)+z(1/x+1/y)=x/y+x/z+y/x+y/z+z/x+z/y=(x+y)/z+(x+z)/y+
又题意可知:x+y+z=4x-5z可以得出3x=y+6z.(1)4x-5z=y-x+6z可以得出5x=y+11z.(2)由(2)-(1)得出2x=5z即X=2.5Z.(3)(3)代入(1)可得Y=1.
∂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/&
因为x+2y-z=0,7x-y-z=0两式相减,得:6x-3y=0,所以y=2x代入x+2y-z=0中,得:x+4x-z=0,那么z=5x那么(x+y+z)÷(2x-y-z)=(x+2x+5x)÷(2
(x+y)/z=(x+z)/y=(z+y)/xx,y,z等价x=y=z(x+y)(x+z)(z+x)/xyz=8
设x+y-z/z=x-y+z/y=y+z-x/x=k有x+y-z=kzx-y+z=kyy+z-x=kx三式相加得x+y+z=k(x+y+z)k=1得x+y=(k+1)zx+z=(k+1)yy+z=(k
(y+z)/x=(z+x)/y=(x+y)/z=ty+z=tx①z+x=ty②x+y=tz③①+②+③得(x+y+z)*2=t(x+y+z)t=2①*②*③得(y+z)(z+x)(x+y)/(xyz)
由2x+3y-3z=0得:z-y=2x/3(2x+y-z)/(2x-y+z)=(2x-(z-y))/(2x+(z-y))将z-y=2x/3代入上式得:(2x+y-z)/(2x-y+z)=(2x-(2x
4x-3y+z=0(1)x+2y-8z=0(2)(1)-(2)×4得-11y+33z=0∴y=3z把y=3z代入(2)得x=2z把x=2z,y=3z代入x+y-z/x-y+2z得原式=(2z+3z-z
x*x+y*y+2z*z-2x+4y+4z+7=0(x*x-2x+1)+(y*y+4y+4)+2(z*z+2z+1)=0(x-1)^2+(y+2)^2+2(z+1)^2=0x=1,y=-2,z=-1x
x+y-7z=0①x-2y+5z=0②①-②得:3y-12z=0,即y=4z,2①+②得:3x-9z=0,即x=3z所以x+2y-z/y-2x+12z=11/10,再来题难点的.