作业帮方程x2 xy y2-1=0所确定的隐函数y=y(x),求dy dx|(0.3)
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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'^
这种题可以直接全微分,即e^xdx+xdy+ydx=0所以dy/dx=(e^x+y)/-x
是把y看作关于x的函数.再问:不是很懂,给个步骤吧。谢谢。再答:1/y-x是(1/y)-x的意思,还是1/(y-x)?再问:1/(y-x)再答:把y看做x的复合函数,两边对x求导,得cos(xy)·(
左右两边对x求导得y+x*y'+1/y*y'-1/x=0则y'=(1/x-y)/(x+1/y)即dy/dx=(1/x-y)/(x+1/y)
y^2/(x+y)=y^2-x^2y^2=(y^2-x^2)(x+y)两边同时求导得到:2yy’=(2yy’-2x)(x+y)+(y^2-x^2)(1+y’)2yy’=2yy’(x+y)-2x(x+y
设y=y(x)由方程ysinx=cos(x-y)所确定,则y'(0)=x=0时cos(-y)=cosy=0,故y=π/2+2kπ,k∈ZF(x,y)=ysinx-cos(x-y)=0dy/dx=-(&
两边对x求导(注意这里的y是关于x的函数)得:y'=-e^y-(xe^y)*y';整理得:y'=-e^y/(1+xe^y)由原式子可知,x=0时,y=1,带入上式得,y‘=-e.-e即为答案.
原方程是xy=1-e^y?如果是的话将等式两边对X求导数得y+xy'=e^y*y'则y‘=y/(e^y-x)y'(0)=y/e^y
xy'+y+sin(πy)πy'=0y'=-y/[x+πsin(πy)]
y+xy'+y'/y=0//对xy和lny分别求导,注意y是x的函数y'(x+1/y)=-y//移项,合并同类项y'=-y²/(xy+1)
xy+lny=1两边求导y+xy'+y'/y=0y'=-y/(x+1/y)=-y^2/(xy+1)
将x=0代入原方程lny(0)=1y(0)=e方程两边对y(x)求导y+xy'+y'/y=0将x=0代入上述方程y(0)+y'(0)/y(0)=0e+y'(0)/e=0y'(0)=-e^2
两边求导:y+xy'+y‘/y=0将x=0带入得到:y'=--y^2
x-y+1/2siny=0F(x,y)=y-x-1/2siny=0F,Fx,Fy在定义域的任意点都是连续的,F(0,0)=0Fy(x,y)>0f'(x)=-Fx(x,y)/Fy(x,y)=1/(1-1
xy+e^y=1e^y(0)=1y(0)=0xy'+y+e^yy'=00+y(0)+y'(0)=0y'(0)=0xy''+y'+y'+e^yy''+(y')^2e^y=00+2y'(0)+y''(0)
两边对x求导:y'=e^y+xy'e^y得:y'=e^y/(1-xe^y)再问:怎么感觉不对捏再答:是不是指数为y+1,而不是y呀?再问:指数就是y吖我题目没错再答:指数是y的话,我做的就没错。
我帮你做一步下面的你应该就会了,
记p=√(x^2+y^2+z^2),则xyz+p=√2,p=√2-xyz两边对x求偏导得:yz+xyz'(x)+[x+zz'(x)]/p=0得:z'(x)=(-yz-x/p)/(xy+z/p)=-(p
交叉相乘,x=ρcosθy=ρsinθ所以,2(x²+y²)+√3y+x=1是个圆再问:能详细点吗?谢谢再答:错了……应该是右边乘过去得ρ(2+√3sinθ+cosθ)=12ρ+√