求所在的y^2 e^xy=2所确定的曲线在x=0处的切线
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xy+e^y=y+1(1)求d^2y/dx^2在x=0处的值:(1)两边分别对x求导:y+xy'+e^yy'=y'y/y'+x+e^y=1(2)(2)两边对x再求导一次:(y'y'-yy'')/y'^
如图所示,最后求解是自上而下带入的
隐函数求导,两边同时求导,此题是对X求导!两边同时求导:y+xy'=e^x-y'y'=(e^x-y)/(x+1)由XY=e^X-y解出yy=e^x/x+1,带入上式y'=(e^x-y)/(x+1)=[
方程两边对x求导:e^y×y'=y+xy'得y'=y/(e^y-x)
方程两边对x求导,得:y+xy'+y'e^y=2y+2xy'y'e^y-xy'=y得y'=y/(e^y-x)因此dy=ydx/(e^y-x)
两边对x求导,e^(2y)*2y'+3y+3xy'-2x=0,故dy/dx=y'=2x/[2e^(2y)+3x].
e^y+xy-e=0d(e^y)+d(xy)-d(e)=0e^ydy+xdy+ydx=0(e^y+x)dy=-ydxdy/dx=-y/(e^y+x)
e^y-e^x=xy两边求导,得e^y*y'-e^x=y+xy'(e^y-x)y'=(e^x+y)所以y'=(e^x+y)/(e^y-x)x=0时,e^y-e^0=0,则e^y=1,则y=0所以y'(
这个题目要用到微分的形式不变性e^y*dy+d(xy)=0e^y*dy+xdy+ydx=0-ydx=(x+e^y)dydy=-y*dx/(x+e^y)
你明白复合函数吗?你的求导是对x求导,然后y是关于x的函数,y可以x表示,所以e^y=e^y*(y'),因为是对x求导,所以要加上dy/dx..类比于e^x对x求导,是e^x*(dx/dx)=e^x
对方程取导数y+x(dy/dx)+(dy/dx)=0(dy/dx)(x+1)=-ydy/dx=(-y)/(x+1)
该题为隐函数求导.xy+e^(xy)=1则y+xy'+e^(xy)(y+xy')=0解得:y'=-y/x解答完毕.
先对X求导y+xy'-e^x+e^yy'=0y'=(e^x-y)/(x+e^y)再问:主要是e^y我不懂,答案是对的,老师。还有y'=0是为什么?
3、e^(xy)=2x+y^3,两边取微分d[e^(xy)]=d[2x+y^3]ye^(xy)dx+xe^(xy)dy=2dx+3y^2dy[xe^(xy)-3y^2]dy=[2-ye^(xy)]dx
两边求导e^y×y'=xy'+yy'=y/(e^y-x)dy/dx=y/(e^y-x)
两边分别求x的导数得:e^x+(y+xy')=0,即y'=-(e^x+y)/x,即:dy/dx=-(e^x+y)/x
e^y-e^x=xy两边求导,得e^y*y'-e^x=y+xy'(e^y-x)y'=(e^x+y)所以y'=(e^x+y)/(e^y-x)x=0时,e^y-e^0=0,则e^y=1,则y=0所以y'(
一阶线性微分方程dy/dx+P(x)y=Q(x)通解y=e^-∫P(x)dx{∫Q(x)[e^∫P(x)dx]dx+C}代进去就可以了y=e^-∫2xdx{2e^(-x^2)[e^∫2xdx]dx+C
e^(x+y)=xy两边对x求导:e^(x+y)*(1+y')=y+xy'解得:y'=[y-e^(x+y)]/(e^(x+y)-x]=(y-xy)/(xy-x)