y=fx由方程xy 2lnx=y4
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函数y=arctane^x求dyy'=e^x/(1+e^2x)dy=e^xdx/(1+e^2x)函数y=y(x)由方程x-y-e^y=0确定,求y'(0)两边对x求导:1-y'-y'e^y=0y'=1
当x>0时,f(x)=x+lnx是增函数,又f(1/e)=1/e-10从而 f(x)在(0,+∞)上有唯一的零点,且零点在(1/e,1)内.因为 f(x)是奇函数,图像关于原点对称,所以f(x)在(-
f'(x)=1-1/xf'(2)=1-1/2=1/2f(2)=2-1-ln2=1-ln2由点斜式得切线方程:y=1/2*(x-2)+1-ln2即y=x/2-ln2由f'(x)=0,得x=1x0因此f(
lny+x/y=0等式两边求导:y'*1/y+1/y+x*y'(-1/y²)=0(1/y-x/y²)y'=-1/y∴y'=(-1/y)/(1/y-x/y²)=-y/(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=-(&
两边同时对X求导y+xy`=e^x+y`y`=(e^x-y)/(x-1)
证明:由于:f(x+y)=f(x)+f(y)则:令x=y=0则有:f(0+0)=f(0)+f(0)f(0)=2f(0)则:f(0)=0再令:y=-x则有:f[x+(-x)]=f(x)+f(-x)f(0
f'(x)=e^x(lnx-1)+(e^x+1)*(1/x)f'(1)=e+1f(1)=0切线方程:y=(e+1)*x如果不是e的x次方,而是e乘x那么f'(x)=e(lnx-1)+(ex+1)*(1
f(x)=-x^2+ax+lnx+b,f'(x)=-2x+a+1/x,由已知得,f(1)=2,所以-1+a+b=2,--------(1)同时f'(1)=0,所以-2+a+1=0,-------(2)
y'=-2sin2(x+y)-2y'sin2(x+y)(1+2sin2(x+y))y'=-2sin2(x+y)y'=-2sin2(x+y)/(1+2sin2(x+y))
a=-1f(x)=-x^2+lnxf'(x)=-2x+1/xk=y'|(x=1)=-1x=1f(x)=-1切线斜率k=-1切点(1,-1)切线方程y+1=-(x-1)整理得x+y=0再问:主要是第二问
解由函数y=fx是偶函数,在x属于(0,正无穷)上递减,则函数y=f(x)在x属于(负无穷大,0)是增函数,即当x1,x2属于(负无穷大,0)且x1<x2时,f(x1)<f(x2),且f(x1),f(
y=3x-1再问:完整点?再答:
方程y=sin(x+y)两边对x求导数有:y'=cos(x+y)(x+y)'=cos(x+y)(1+y')移项整理得:[1-cos(x+y)]y'=cos(x+y)因此:y'=cos(x+y)/[1-
y'=-e^y-xe^y*y'(1+xe^y)y'=-e^yy'=-e^y/(1+xe^y)
y'=(x)'e^y+x(e^y)'y'=e^y+xe^y*y'再问:x(e^y)'=xe^y*y'?再答:对,因为y是x的函数,根据复合函数求导法,可得
ln(x+y)=x·lny(1+y‘)/(x+y)=lny+x/y·y‘y+y·y‘=y(x+y)lny+x(x+y)·y‘y‘=【y(x+x)lny-y】/【y-x(x+y)】再问:лл����
两边对x求导xy^2+sinx=e^yy^2+2xyy'+cosx=e^y*y'y'(e^y-2xy)=y^2+cosxy'=(y^2+cosx)/(e^y-2xy)