设函数y=f(x)由方程sin(x2 y)-3=xy所确定,求dy dx
来源:学生作业帮助网 编辑:作业帮 时间:2024/04/30 10:47:33
设F(x,y,z)=sinz-xyz则F′(X)=-yzF′(y)=-xzF′(z)=cosz-xyz对x的谝导数等于-yz/(cosz-xy)z对y的谝导数等于-xz/(cosz-xy)dz=[-y
1)x=0代入方程:1-e^y=0,得y(0)=0两边对X求导:e^x-y'e^y=cos(xy)(y+xy')y'=[e^x-ycos(xy)]/[xcos(xy)+e^y]代入x=0,y(0)=0
这个题目要利用隐函数的求导法则.则sin(x^2+y)=xy(两边同时求导,还要结合复合函数的求导法则)cos(x^2+y)*(2x+y′)=y+xy′2xcos(x^2+y)-y=xy′-y′cos
y'=cos(x+y)(1+y')y'=cos(x+y)/(1-cos(x+y))
两边对x求导:y'e^y+(1+y')cos(x+y)=0,1)这里可得到y'=-cos(x+y)/[e^y+cos(x+y)]再对1)求导:y"e^y+(y')^2e^y+y"cos(x+y)-(1
设函数f(x,y)=sin(x+y),那么f(0,xy)=(sinxy)应该是sin0+sinsy=0+sinxy=sinxy再问:limsinxy\2x=()补充x→0,y→3另外一道题
先对x求偏导数得z'(x)cosz=yz+z'(x)y所以z'(x)=yz/(cosz-y)同理对y求偏导数得z'(y)=xz/(cosz-x)所以dz=yz/(cosz-y)dx+xz/(cosz-
xy+y^2-2x=0y+xy'+2yy'-2=0(x+2y)y'=2-yy'=(2-y)/(x+2y)dy/dx=(2-y)/(x+2y)
再问:是否还能给出一种利用题目所给的条件(关于x,y,z的函数)去证明的方法吗?再答:这就是课本上隐函数求导公式的应用,你想得太多了,没有必要的!
两端对x求导数(把y看作x的函数),则1-y'=e^(xy)*(1*y+x*y')y'[xe^(xy)+1]=1-ye^(xy)dy/dx=y'=[1-ye^(xy)]/[xe^(xy)+1]
dz=-dx-dy
Fx=e^x-y^2Fy=cosy-2xydy/dx=-Fx/Fy=(y^2-e^x)/(cosy-2xy)
f(x)=sin2(x+y/2)由于sin2x对称轴为π/4+kπ/2;故x+y/2=π/4+kπ/2x=π/4+kπ/2-y/2;将x=x=π/8代入,得y=π/4+kπ,根据y的范围可知:y=-3
两边对x求导得:2yy'*f(x)+y^2f'(x)+f(x)+xf'(x)=2x得:y'=[2x-xf'(x)-y^2f'(x)]/(2yf(x)]dy=[2x-xf'(x)-y^2f'(x)]/(
(cos(x+y)-y)\(x-cos(x+y))
F(x,y)=x^2+y^2-ln(x+2y)Fx=2x-1/(x+2y)Fy=2y-2/(x+2y)F(x)=-Fx/Fy=-[2x(x+2y)-1]/[2y(x+2y)-2]
两边对x求导:1+y'=y'e^y得dy/dx=y'=1/(e^y-1)
化为:e^(ylnx)-e^y=sin(xy)两边对x求导:e^(ylnx)(y'lnx+y/x)-y'e^y=cos(xy)(y+xy')y'[lnxe^(ylnx)-e^y-xcos(xy)]=[