设y=f(arctanx),且f(x)二阶导数可连续
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对函数求导,令导函数值等于0,求出极值(其中arctanx求导=1/1+x22是平方);二次求导,令导函数等于0,求出拐点,导函数值大于0,凹,小于0,凸
①首先,我们可以认为tan(π/2)=+∞,这是自然的,因此可以说arctan(+∞)=π/2第一问的π/2就是这么来的,把x、y都带成+∞,然后分布函数的意思就是x
y'=1/(1+x²)
(1)limA(B+arctanx/2)(C+arctany/2)=0-无穷limA(B+arctanx/2)(C+arctany/2)=1+无穷所以A=1/πB=π/2C=π/2(2)接下去就是求导
F(x,y)=A(B+arctanx/2)(C+arctany/3)F(-∞,-∞)=A(B-π/2)(C-π/2)=0F(-∞,+∞)=A(B-π/2)(C+π/2)=0F(+∞,-∞)=A(B+π
∫x(上标)0(下标)tf(2x-t)dt=(arctanx^2)/2两边对x求导再问:我导好之后就变成了f(x)=1/(1+x4),可他题目里说f(1)=1再答:是你求导求错了,注意f(2x-t)里
1.f(x)+f(-x)=2(arccosx+arccos-x)+arctanx+arctan-x-2pi=2pi+0-2pi=0,得证.2.arctanx+arctan1/y=arctan3tan(
记g(x)=f(x^2+sin^2x)+f(arctanx)=yg'(x)=f'(x^2+sin^2x)(2x+sin2x)+f'(arctanx)/(x2+1)dy/dx|x=0,即g'(0)代入得
解f[x]=arctanxf'[x]=1/[1+x^2]f'[0]=1不懂追问
y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy两边对x求导:dy/dx=f'[(x-1)/(x+1)]*2/(x+1)^2=arctan[(x-1)/(x+1)]
请问题目写对了吗?sin^2后面是不是有个X再问:再问:y=sin的平方(e的arctanx次幂)求dy/dx见照片中列9再答:
[kpi,kpi+pi/4](k属于Z)再问:难道不是0
令u=x+arctanx,则u'=1+1/(1+x^2)则y=f^2(u)dy/dx=2f(u)f'(u)u'=2f(u)f'(u)[1+1/(x+x^2)]
是求f'(a).f(a)=0,当x趋于a时:lim(f(x)-f(a))/(x-a)=lim(arctanx-arctana))g(x)/(x-a)=g(a)lim(arctanx-arctana))
F(-∞,-∞)=A(B-π/2)(C-π/2)=0F(-∞,+∞)=A(B-π/2)(C+π/2)=0F(+∞,-∞)=A(B+π/2)(C-π/2)=0F(+∞,+∞)=A(B+π/2)(C+π/
利用概率分布函数特性F(正无穷,正无穷)=1,F(负无穷,负无穷)=0,带入就是A(B+π/2)(C+π/2)=1A(B-π/2)(C-π/2)=0展开后,两式相加:ABC=1/2-(π^2)/4再问
y'=2xarctanx+1y''=2arctanx+2x/(1+x^2)y''/x=1=π/2+1
f(x)=arctanxf(-x)=arctan(-x)=-arctanx=-f(x)所以,函数为奇函数判断函数奇偶性的基本就是判断f(x)与f(-x)是相等(偶函数)、相反(奇函数)、还是没有特定关
dy/dx|x=0=df[(3x-2)/(3x+2)]/dx|x=0=arctan[(3x-2)/(3x+2)]^2*[(3x-2)/(3x+2)]'|x=0=3π/4
zx=1/(1+(x/y)²)*1/y=y/(x²+y²)zy=1/(1+(x/y)²)*(-x/y²)=-x/(x²+y²)所以