设函数f(x)具有二阶连续导数,且limf(x) x=0
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∫xf''(x)dx=∫xdf'(x)=xf'(x)-∫f'(x)dx=xf'(x)-∫df'(x)=xf'(x)-f(x)+C
令u=x+y+z,v=xyzf/u=f'1,f/v=f'2w/x=f/u*u/x+f/v*v/x(∵u/x=1,v/x=yz)=f'1+yzf'22w/
f(0)=f(x)+f'(x)(0-x)+0.5f''(a)(0-x)^2f(1)=f(x)+f'(x)(1-x)+0.5f''(b)(1-x)^2两式相减,移项,取绝对值得|f'(x)|=|f(1)
令u=x-y,v=y/xaz/ax=az/au×au/ax+az/av×av/ax=fu-y/x^2×fva^2z/axay=a(az/ax)/ay=a(fu-y/x^2×fv)/ay=a(fu)/a
1)证存在:因为f''(x)不等于0所以f'(x)在定义域内单调且原函数f(x)在定义域内连续可导令x属于(0,1),则在0的区间(0,x)内必有一点ζ,满足f'(ζ)=[f(x)-f(0)]/(x-
limf''(x)/|x|=1表明在x=0附近(即某邻域)f''(x)/|x|>0,从而f''(x)>0,从而f'(x)递增,从而当x0时,f'(x)>f'(0)=0,所以f(0)是极小值
z=f(x,x/y),x与y无关因此,z'x=f'1*(x)'+f'2*(x/y)'=f'1+f'2/yz''xy=(z'x)'y=(f'1+f'2/y)'y=f''11(x)'+f''12*(x/y
求导F'(x)=F(1-x)变换变量F'(1-x)=F(x)在对F'(x)=F(1-x)求导F''(x)=-F'(1-x)=-F(x)解得F(x)=Acosx+Bsinx∵F(0)=1,F'(1)=F
首先要说明:不是求“在x→0时的极限值”,而是求“在h→0时的极限值”因为设f(x)在点a的某领域内具有二阶连续导数,所以:lim(h→0){[f(a+h)+f(a-h)-2f(a)]/h^2}.是(
由x趋于0时,f(x)/x=0,知道f(0)=0,f'(0)=limf(x)/xlim(1+f(x)/x)^(x/f(x))=e所求lim(1+f(X)/X)^(1/X)=lim(1+f(x)/x)^
∵z=f(x,xy),令u=x,v=xy∴∂z∂x=f′1+yf′2∴∂2z∂x∂y=∂∂y(f′1+yf′2)=∂f′1∂y+∂∂y(yf′2)═(∂f′1∂u∂u∂y+∂f′1∂v∂v∂y)+f′
设u=sinx,v=xydz/dx=dz/du*du/dx+dz/dv*dv/dx=cosxf1'+yf2'd^2z/dxdy=d(dz/dx)/dy=(-sinx)f1'+cosx*df1'/dx+
设u=xy,v=y/x,则z=f(u,v),所以ðz/ðx=f'1*ðu/ðx+f'2*ðv/ðx=yf'1-yf'2/x^2,注意到f'1
f后面的1与2是下标.∂z/∂x=f1'+yzf2'
Dz/Dx=2f'+g1+yg2,DDz/DxDy=-2f"+yg12+y^2*g22.
设u=xy,v=y/x,则z=x³f(u,v),au/ax=y,av/ax=-y/x²故az/ax=3x²f(u,v)+x³f'u(u,v)(au/ax)+x&
根据泰勒公式f(x+h)=f(x)+f'(x)h+(1/2)f''(x)h^2+o(h^2)于是:f(x)+hf'(x+θh)=f(x)+f'(x)h+(1/2)f''(x)h^2+o(h^2)θ{[
再问:请问那个f12的二阶导数是怎么来的啊再答:前面两个都来自f1'对x的偏导数再问:哦再问:再问您一下,还是这道题,先对x再对y求二阶连续偏导怎么做啊再问:u先对x再对y再答:再问:多谢再问:请问最