分别求z=x-y和z=0与圆柱面所围成的两个空间几何体的体积
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(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
方程组两边除以z得4x/z-3y/z=3x/z-3y/z=-1解方程组得x/z=4/3y/z=7/9
x+y-z=6y+z-x=2z+x-y=0三式相加得x+y+z=8-得2z=2z=1-得2x=6x=3-得2y=8y=4x=3y=4z=1
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+
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
∵y+z÷x=Z+X÷y=X+Y÷z容易发现x,y,z位置互换也成立∴式子与x,y,z值无关∴x=y=z∴(X+Y-Z)÷(X+Y+z)=x/3x=1/3明教为您解答,请点击[满意答案];如若您有不满
x=z(lnz-lny)=zlnz-zlny令F(x,y,z)=zlnz-zlny-xaF/ax=-1aF/ay=-z/yaF/az=lnz+1-lny所以az/ax=-Fx/Fz=1/(lnz+1-
2x-3y-4z=01式x+y+z=02式1式+2式×4得到:2x-3y-4z+4x+4y+4z=06x+y=06x=-yx:y=(-1):61式-2式×2得到:2x-3y-4z-2x-2y-2z=0
4x-3y-3z=0.1)x-3y+z=0.2)相减:3x=4zx/z=4/31)-2)*4:9y=7zy/z=7/9所以:x/z=4/3,y/z=7/9
令(y+z)/x=(z+x)/y=(x+y)/z=ky+z=kxx+z=kyx+y=kz2(x+y+z)=k(x+y+z)2(x+y+z)=k(x+y+z)(2-k)(x+y+z)=0(x+y+z≠0
4x-3y-3z=0(1)x-3y+z=0(2)(1)-(2):3x-4z=0x=4z/3代入(1):16z/3-3y-3z=0y=7z/9所以:x:z=4:3y:z=7:9
平面x+2y-z+1=0与x-y+z-1=0的法线向量n1={1,2,-1},n2={1,-1,1}所以直线{x+2y-z+1=0x-y+z-1=0}的方向向量s1=n1×n2={1,-2,-3}同理
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
0和-2再答:0和-2再问:说清是X等于几和z等干几
本题F(x,y,z)=y^z-z^x=0Fx=-z^x.lnz(z,y看做常数)Fy= zy^(z-1)(z,x看做常数)Fz=y^z.lny -xz^(x-1) &nb
一式与二式相减.得3X-4Z=03X=4ZX:Z=4:3一式与二式的4倍相减得9Y-7Z=09Y=7ZY:Z=7:9
4x-3y-3z=0①x-3y+z=0②①-②,得3x-4z=03x=4z由于z不等于0,故有x:z=4:3同理可得:①-4②,得9y-7z=09y=7zy:z=7:9
两式相加,得6X-5Z=0即X=5Z/6,即X/Z=5/6.再将X=5Z/6代入式1,得5Y+11Z/2=0得Y/Z=-11/10
两式作差:3x-3z=0,得x=z,带入任意一式得y=-2/3z,从而z不等于0时,x:y:z=3:-2:3