设x y =ln z y 求

左右对x求导有y'/y=sec²(xy)(y+xy')整理有y'=y²/(cos(xy)-xy)所以dy=(y²/(cos(xy)-xy))dx

设x2-xy+y2=Ax2-xy+y2=A与x2+xy+y2=1相加可以得到：2（x2+y2）=1+A（1）x2-xy+y2=A与x2+xy+y2=1相减得到：2xy=1-A（2）（1）+（2）×2得

xy-12=4x+y≥2√(4xy)=4√(xy)xy-4√(xy)-12≥0(√(xy)-6)(√(xy)+2)≥0√(xy)≤-2,√(xy)≥6因为√(xy)≥0所以√(xy)≥6xy≥36所以

x+y=5xy=-3(2x-3y-2xy)-(x-4y+xy)=2x-3y-2xy-x+4y-xy=x+y-3xy=5-3×(-3)=5+9=14

e^(x+y)-xy=1两边同时求导,e^(x+y)*(1+dy/dx)-y-xdy/dz=0(1)验证x=0,y=0在原曲线上.令x=0,y=0代入到（1）e^0*(1+dy/dz)-0-0*dy/

e^(xy)+sin(xy)=y(y+xy')e^(xy)+(y+xy')cos(xy)=y'y'=(ye^(xy)+ycos(xy))/(1-xe^(xy)-xcos(xy))

原式=2x-3y-2xy-x+4y-xy=x+y-3xy=5-3*3=5-9=-4

z=arctan(x*e^x)z'={1/[1+(x*e^x)^2]}*(x*e^x)'(x*e^x)'=x'*e^x+x*(e^x)'=e^x+x*e^x=(x+1)*e^x所以dz/dx=(x+1

因为X平方,y平方一定大于等于0将等式变换为：x平方+y平方=1-xy可得：xy=0所以：xy>=-1综上所述可得：-1

cos(x+y)(1+y')=y+xy'dy/dx=y'=[y-cos(x+y)]/[cos(x+y)-x]

（2x-3y-2xy）-（x-4y+xy）=2x-3y-2xy-x+4y-xy=（2-1)x+(-3+4)y+(-2-1)xy=x+y-3xy因为x+y=5,xy=-3所以原式=5+9=14

两边同时求导..得：y-e^xy(yx')=0x'=y/(ye^xy)所以dy/dx=y/(ye^xy)

x=1则y+lny+0=1y+lny=1所以y=1dxy+dlny+dlnx=0xdy+ydx+(1/y)dy+(1/x)dx=0(x+1/y)dy=-(y+1/x)dxx=y=1所以2dy=2dx所

x²+xy=3xy+y²=-22x²-xy-3y²=2（x²+xy）-3（xy+y²）=6+6=12

分数可以打清楚点吗?不然不知道到底哪几项在分子上再问：/前面都是分子再答：图片传不上来，我在贴吧发给你行不行？再问：行~~

你好!两边对x求导：e^(xy)*(y+xy')-y^2=y'cosy解得y'=(y^2-ye^(xy))/(xe^(xy)-cosy)

dy/dx=dy/du*du/dx+dy/dv*dv/dx=v*e^(x+y)+u*y/x=ln(xy)*e^(x+y)+e^(x+y)*y/x=e^(x+y)[ln(xy)+y/x]所以dy=e^(

设x2-xy+y2=M①，x2+xy+y2=3②，由①、②可得：xy=3−M2，x+y=±9−M2，所以x、y是方程t2±9−M2t+3−M2=0的两个实数根，因此△≥0，且9−M2≥0，即（±9−M

x=0时,代入方程得：1+1=y,得：y=2对x求导：(y+xy')e^xy-sin(xy)*(y+xy')=y'将x=0,y=2代入得：2=y'故dy(0)=2dx

z=x^2+2xy两边同时求导数,得到：dz=2xdx+2ydx+2xdy即：dz=2(x+y)dx+2xdy.