limx→0 (2^x 3^x-2) x=
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limx→0[(x-sinx)/x²](0/0型)=limx→0[(1-cosx)/2x](0/0型)=limx→0(1/2)sinx=0.
limx/ln(1+x²)[分子分母都趋向于0]x→0=lim1/[2x/1+x²][运用罗毕达法则,分子分母分别各自求导了一次]x→0=lim(1+x²)/2x[分子趋
利用洛比达法则limx^(1/2)lnx=limlnx/x^(-1/2)=lim(1/x)/(-1/2)x^(-3/2)=-1/2*limx^(1/2)=0
limx→0x^2/(x-1)=limx→0[(x^2-1)+1]/(x-1)=limx→0[(x-1)(x+1)+1]/(x-1)=limx→0(x+2)=2
lim(x→0){(tanx-x)/[xtan(x^2)]}=lim(x→0){(tanx-x)/[x(x^2)]}=lim(x→0){(tanx-x)/(x^3)}(0/0)=lim(x→0){(s
limx→0arctanx-xln(1+2x3)=limx→0arctanx-x2x3=limx→011+x2-16x2=limx→0-x26x2(1+x2)=-16limx→011+x2=-16
再问:第三题里面的a和c都能算出来了。那么b怎么算再答:我看错了,以为是趋于无穷大。再问:第2题最后一步(2/x)/e^x的极限为什么为0,2/x的极限是0,e^x的极限不是不存在吗?这种情况下怎么算
x趋于零时,1-cosx等价于x^2/2,直接就可得出答案是1/2,这是考研的送分题呀!再说明白点,1-cosx=1-(1-2(sin(x/2))^2)=2sin(x/2)^2等价于x^2/2.老兄,
lim(x→0)(2sinx-sin2x)/x^3=lim(x→0)(2sinx-2sinxcosx)/x^3=lim(x→0)2sinx(1-cosx)/x^3=lim(x→0)2x*x^2/2*1
limx→0(x-1)/x^2=-1/0=-无穷
lim(x→0)sin3x/2x=lim(x→0)(sin3x/3x)*(3/2)=lim(3x→0)(sin3x/3x)*(3/2)lim(x→0)sinx/x=1=3/2
=e^lim(1/sin²x)·lncosx=e^lim(cosx-1)/x²=e^lim-(1/2)x²/x²=e^-(1/2)
再答:望采纳
到底是什么?再答:
应该是f'(x)=lim(x→0)[f(2x)/(2x)]=(1/2)lim(x→0)[f(2x)/x]=(1/2)*2=1.f'(x)=lim(x→无穷)[f(1/2x)/(1/2x)=2lim(x
lim(x→0)f(x)/x^2=2则lim(x→0)f(x)/x=lim(x→0)f(x)/x^2*x=lim(x→0)f(x)/x^2*lim(x→0)x=0*2=0
limx→0x/Sin(x/2)=2limx→0(x/2)/Sin(x/2)=2*1=2再问:为什么是2乘以1啊再答:x/2趋于0sin(x/2)/(x/2)极限是1
1.上下同乘e^-x2.lim(x→0)(x-arcsinx)/x^3 (0/0,洛必达法则)=lim(x→0)[1-1/√(1+x^2)]/(3x^2)(通分)=lim(x→0)[√(1+x^2)-
替换原则:(1)首先要保证当x趋于某一个常数时,函数是无穷小量(2)加减不能替换,乘除能替换;(3)看代换后四则运算下来的最小量的阶是否与分母可比 &nb