【1987-3-4 分】 f ( x ) = ∣ x sin x ∣ e cos x ( − ∞ < x < + ∞ ) \displaystyle f(x)=|x \sin x| e^{\cos x}(-\infty<x<+\infty) f ( x ) = ∣ x sin x ∣ e c o s x ( − ∞ < x < + ∞ ) 是( ).
A. 有界函数 B. 单调函数 C. 周期函数 D. 偶函数
【1988-123-5 分】 已知 f ( x ) = e x 2 \displaystyle f(x)=e^{x^{2}} f ( x ) = e x 2 , f [ φ ( x ) ] = 1 − x \displaystyle f[\varphi(x)]=1-x f [ φ ( x )] = 1 − x ,且 φ ( x ) ≥ 0 \displaystyle \varphi(x) \geq0 φ ( x ) ≥ 0 求 φ ( x ) \displaystyle \varphi(x) φ ( x ) 并写出它的定义域.
【1990-123-3 分】 设函数 f ( x ) = { 1 , ∣ x ∣ ≤ 1 0 , ∣ x ∣ > 1 \displaystyle f(x)= \begin{cases}1,& |x| \leq1 \\ 0,& |x|>1\end{cases} f ( x ) = { 1 , 0 , ∣ x ∣ ≤ 1 ∣ x ∣ > 1 则 f [ f ( x ) ] = \displaystyle f[f(x)]= f [ f ( x )] = _____.
【1990-45-3 分】 设函数 f ( x ) = x ⋅ tan x ⋅ e sin x \displaystyle f(x)=x \cdot \tan x \cdot e^{\sin x} f ( x ) = x ⋅ tan x ⋅ e s i n x ,则 f ( x ) \displaystyle f(x) f ( x ) 是( )
A. 偶函数 B. 无界函数 C. 周期函数 D. 单调函数
【1992-5-3 分】 设 f ( x ) = sin x \displaystyle f(x)=\sin x f ( x ) = sin x , f [ φ ( x ) ] = 1 − x 2 \displaystyle f[\varphi(x)]=1-x^{2} f [ φ ( x )] = 1 − x 2 ,则 φ ( x ) = \displaystyle \varphi(x)= φ ( x ) = ;其定义域为
【1992-3-3 分】 设 f ( x ) = { x 2 , x ≤ 0 x 2 + x , x > 0 \displaystyle f(x)= \begin{cases}x^{2},& x \leq0 \\ x^{2}+x,& x>0\end{cases} f ( x ) = { x 2 , x 2 + x , x ≤ 0 x > 0 则( )
A. f ( − x ) = { − x 2 , x ≤ 0 , − ( x 2 + x ) , x > 0 \displaystyle f(-x)= \begin{cases}-x^{2}, & x \leq 0, \\ -\left(x^{2}+x\right), & x>0\end{cases} f ( − x ) = { − x 2 , − ( x 2 + x ) , x ≤ 0 , x > 0
B. f ( − x ) = { − ( x 2 + x ) , x < 0 , − x 2 , x ≥ 0 \displaystyle f(-x)=\left\{\begin{array}{l}-\left(x^{2}+x\right), x<0, \\ -x^{2}, x \geq 0\end{array}\right. f ( − x ) = { − ( x 2 + x ) , x < 0 , − x 2 , x ≥ 0
C. f ( − x ) = { x 2 , x ≤ 0 , x 2 − x , x > 0 \displaystyle f(-x)=\left\{\begin{array}{cc}x^{2}, & x \leq 0, \\ x^{2}-x, & x>0\end{array}\right. f ( − x ) = { x 2 , x 2 − x , x ≤ 0 , x > 0
D. f ( − x ) = { x 2 − x , x < 0 , x 2 , x ≥ 0 \displaystyle f(-x)=\left\{\begin{array}{l}x^{2}-x, x<0, \\ x^{2}, x \geq 0\end{array}\right. f ( − x ) = { x 2 − x , x < 0 , x 2 , x ≥ 0
【1997-2-3 分】 设 g ( x ) = { 2 − x , x ≤ 0 x + 2 , x > 0 \displaystyle g(x)=\begin{cases}2-x,& x\leq 0\\ x+2,& x>0\end{cases} g ( x ) = { 2 − x , x + 2 , x ≤ 0 x > 0 f ( x ) = { x 2 , x < 0 − x , x ≥ 0 \displaystyle f(x)=\begin{cases}x^{2},& x<0\\ -x,& x\geq 0\end{cases} f ( x ) = { x 2 , − x , x < 0 x ≥ 0 则 g [ f ( x ) ] \displaystyle g[f(x)] g [ f ( x )] 为( )
A. { 2 + x 2 , x < 0 2 − x , x ≥ 0 \displaystyle \left\{\begin{array}{l}2+x^{2}, x<0 \\ 2-x, x \geq 0\end{array}\right. { 2 + x 2 , x < 0 2 − x , x ≥ 0
B. { 2 − x 2 , x < 0 2 + x , x ≥ 0 \displaystyle \left\{\begin{array}{l}2-x^{2}, x<0 \\ 2+x, x \geq 0\end{array}\right. { 2 − x 2 , x < 0 2 + x , x ≥ 0
C. { 2 − x 2 , x < 0 2 − x , x ≥ 0 \displaystyle \left\{\begin{array}{l}2-x^{2}, x<0 \\ 2-x, x \geq 0\end{array}\right. { 2 − x 2 , x < 0 2 − x , x ≥ 0
D. { 2 + x 2 , x < 0 2 + x , x ≥ 0 \displaystyle \left\{\begin{array}{l}2+x^{2}, x<0 \\ 2+x, x \geq 0\end{array}\right. { 2 + x 2 , x < 0 2 + x , x ≥ 0
【2001-2-3 分】 设 f ( x ) = { 1 , ∣ x ∣ ≤ 1 0 , ∣ x ∣ > 1 \displaystyle f(x)= \begin{cases}1,|x| \leq1 \\ 0,|x|>1\end{cases} f ( x ) = { 1 , ∣ x ∣ ≤ 1 0 , ∣ x ∣ > 1 则 f [ f [ f ( x ) ] ] \displaystyle f[f[f(x)]] f [ f [ f ( x )]] 等于( ).
A. 0
B. 1
C. { 1 , ∣ x ∣ ≤ 1 , 0 , ∣ x ∣ > 1 \displaystyle \left\{\begin{array}{l}1,|x| \leq 1, \\ 0,|x|>1\end{array}\right. { 1 , ∣ x ∣ ≤ 1 , 0 , ∣ x ∣ > 1
D. { 0 , ∣ x ∣ ≤ 1 1 , ∣ x ∣ > 1 \displaystyle \left\{\begin{array}{l}0,|x| \leq 1 \\ 1,|x|>1\end{array}\right. { 0 , ∣ x ∣ ≤ 1 1 , ∣ x ∣ > 1
【1987-5-4 分】 求极限 lim x → + ∞ ln ( 1 + 1 x ) arccot x \displaystyle \lim_{x \to +\infty} \dfrac{\ln (1+\frac{1}{x})}{\operatorname{arccot} x} x → + ∞ lim arccot x ln ( 1 + x 1 )
【1991-3-5 分】 求 lim x → 0 x − sin x x 2 ( e x − 1 ) \displaystyle \lim_{x \to 0} \dfrac{x-\sin x}{x^{2}(e^{x}-1)} x → 0 lim x 2 ( e x − 1 ) x − sin x
【1992-5-5 分】 求极限 lim x → 1 ln cos ( x − 1 ) 1 − sin π 2 x \displaystyle \lim_{x \to 1} \dfrac{\ln \cos (x-1)}{1-\sin \frac{\pi}{2} x} x → 1 lim 1 − sin 2 π x ln cos ( x − 1 )
【1992-3-3 分】 lim x → 0 1 − 1 − x 2 e x − cos x = \displaystyle \lim_{x \to 0} \dfrac{1-\sqrt{1-x^{2}}}{e^{x}-\cos x}= x → 0 lim e x − cos x 1 − 1 − x 2 =
【1992-12-5 分】 求 lim x → 0 e x − sin x − 1 1 − 1 − x 2 \displaystyle \lim_{x \to 0} \dfrac{e^{x}-\sin x-1}{1-\sqrt{1-x^{2}}} x → 0 lim 1 − 1 − x 2 e x − sin x − 1
【1994-45-5 分】 设函数 f ( x ) \displaystyle f(x) f ( x ) 可导,且 f ( 0 ) = 0 \displaystyle f(0)=0 f ( 0 ) = 0 , F ( x ) = ∫ 0 x t n − 1 f ( x n − t n ) d t \displaystyle F(x)=\int_{0}^{x} t^{n-1} f(x^{n}-t^{n}) d t F ( x ) = ∫ 0 x t n − 1 f ( x n − t n ) d t 求 lim x → 0 F ( x ) x 2 n \displaystyle \lim_{x \to 0} \dfrac{F(x)}{x^{2 n}} x → 0 lim x 2 n F ( x )
【1994-3-3 分】 设 lim x → 0 ln ( 1 + x ) − ( a x + b x 2 ) x 2 = 2 \displaystyle \lim_{x \to 0} \dfrac{\ln (1+x)-(a x+b x^{2})}{x^{2}}=2 x → 0 lim x 2 ln ( 1 + x ) − ( a x + b x 2 ) = 2 则( )
A. a = 1 \displaystyle a = 1 a = 1 , b = − 5 2 \displaystyle b=-\dfrac{5}{2} b = − 2 5
B. a = 0 \displaystyle a = 0 a = 0 , b = − 2 \displaystyle b =-2 b = − 2
C. a = 0 \displaystyle a = 0 a = 0 , b = − 5 2 \displaystyle b =-\dfrac{5}{2} b = − 2 5
D. a = 1 \displaystyle a = 1 a = 1 , b = − 2 \displaystyle b =-2 b = − 2
【1994-12-3 分】 设 lim x → 0 a tan x + b ( 1 − cos x ) c ln ( 1 − 2 x ) + d ( 1 − e − x 2 ) = 2 \displaystyle \lim_{x \to 0} \dfrac{a \tan x+b(1-\cos x)}{c \ln (1-2 x)+d(1-e^{-x^{2}})}=2 x → 0 lim c ln ( 1 − 2 x ) + d ( 1 − e − x 2 ) a tan x + b ( 1 − cos x ) = 2 其中 a 2 + c 2 ≠ 0 \displaystyle a^{2}+c^{2} \ne0 a 2 + c 2 = 0 ,则必有( ).
A. b = 4 d \displaystyle b=4 d b = 4 d B. b = − 4 d \displaystyle b=-4 d b = − 4 d C. a = 4 c \displaystyle a=4 c a = 4 c D. a = − 4 c \displaystyle a=-4 c a = − 4 c
【1995-3-5 分】 求 lim x → 0 + 1 − cos x x ( 1 − cos x ) \displaystyle \lim_{x \to 0^{+}} \dfrac{1-\sqrt{\cos x}}{x(1-\cos \sqrt{x})} x → 0 + lim x ( 1 − cos x ) 1 − cos x
【1997-1-3 分】 lim x → 0 3 sin x + x 2 cos 1 x ( 1 + cos x ) ln ( 1 + x ) = \displaystyle \lim_{x \to 0} \dfrac{3 \sin x+x^{2} \cos \frac{1}{x}}{(1+\cos x) \ln (1+x)}= x → 0 lim ( 1 + cos x ) ln ( 1 + x ) 3 sin x + x 2 cos x 1 =
【1998-2-5 分】 确定常数a,b,c 的值,使 lim x → 0 a x − sin x ∫ b x ln ( 1 + t 3 ) t d t = c , c ≠ 0. \displaystyle \lim_{x \to 0} \dfrac{a x-\sin x}{\int_{b}^{x} \frac{\ln (1+t^{3})}{t} d t}=c,c \ne0. x → 0 lim ∫ b x t l n ( 1 + t 3 ) d t a x − sin x = c , c = 0.
【1998-12-3 分】 lim x → 0 1 + x + 1 − x − 2 x 2 = \displaystyle \lim_{x \to 0} \dfrac{\sqrt{1+x}+\sqrt{1-x}-2}{x^{2}}= x → 0 lim x 2 1 + x + 1 − x − 2 =
【1999-2-5 分】 求 lim x → 0 1 + tan x − 1 + sin x x ln ( 1 + x ) − x 2 \displaystyle \lim_{x \to 0} \dfrac{\sqrt{1+\tan x}-\sqrt{1+\sin x}}{x \ln (1+x)-x^{2}} x → 0 lim x ln ( 1 + x ) − x 2 1 + tan x − 1 + sin x .
【2000-2-3 分】 若 lim x → 0 sin 6 x + x f ( x ) x 3 = 0 \displaystyle \lim_{x \to 0} \dfrac{\sin 6 x+x f(x)}{x^{3}}=0 x → 0 lim x 3 sin 6 x + x f ( x ) = 0 则 lim x → 0 6 + f ( x ) x 2 \displaystyle \lim_{x \to 0} \dfrac{6+f(x)}{x^{2}} x → 0 lim x 2 6 + f ( x ) 为( )
A. 0 B. 6 C. 36 D. ∞
【2000-2-3 分】 lim x → 0 arctan x − x ln ( 1 + 2 x 3 ) = \displaystyle \lim_{x \to 0} \dfrac{\arctan x-x}{\ln \left(1+2 x^{3}\right)}= x → 0 lim ln ( 1 + 2 x 3 ) arctan x − x =
【2001-2-3 分】 lim x → 1 3 − x − 1 + x x 2 + x − 2 = \displaystyle \lim_{x \to 1} \dfrac{\sqrt{3-x-\sqrt{1+x}}}{x^{2}+x-2}= x → 1 lim x 2 + x − 2 3 − x − 1 + x =
【2002-2-3 分】 设 y = y ( x ) \displaystyle y=y(x) y = y ( x ) 是二阶常系数微分方程 y ′ ′ + p y ′ + q y = e 3 x \displaystyle y^{\prime \prime}+p y'+q y=e^{3 x} y ′′ + p y ′ + q y = e 3 x 满足初始条件 y ( 0 ) = y ′ ( 0 ) = 0 \displaystyle y(0)=y'(0)=0 y ( 0 ) = y ′ ( 0 ) = 0 的特解,则当 x → 0 \displaystyle x \to 0 x → 0 时,函数 ln ( 1 + x 2 ) y ( x ) \displaystyle \dfrac{\ln (1+x^{2})}{y(x)} y ( x ) ln ( 1 + x 2 ) 的极限( ).
A. 不存在 B. 等于1 C. 等于2 D. 等于3
【2002-34-5 分】 求极限 lim x → 0 ∫ 0 x [ ∫ 0 u 2 arctan ( 1 + t ) d t ] d u x ( 1 − cos x ) \displaystyle \lim_{x \to 0} \dfrac{\int_{0}^{x}[\int_{0}^{u^{2}} \arctan (1+t) d t] d u}{x(1-\cos x)} x → 0 lim x ( 1 − cos x ) ∫ 0 x [ ∫ 0 u 2 arctan ( 1 + t ) d t ] d u
【2004-34-4 分】 若 lim x → 0 sin x e x − a ( cos x − b ) = 5 \displaystyle \lim_{x \to 0} \dfrac{\sin x}{e^{x}-a}(\cos x-b)=5 x → 0 lim e x − a sin x ( cos x − b ) = 5 ,则a = _____,b = \displaystyle b= b =
【2006-1-4 分】 lim x → 0 x ln ( 1 + x ) 1 − cos x = \displaystyle \lim_{x \to 0} \dfrac{x \ln (1+x)}{1-\cos x}= x → 0 lim 1 − cos x x ln ( 1 + x ) =
【2007-2-4 分】 lim x → 0 arctan x − sin x x 3 = \displaystyle \lim_{x \to 0} \dfrac{\arctan x-\sin x}{x^{3}}= x → 0 lim x 3 arctan x − sin x =
【2008-2-4 分】 已知函数 f ( x ) \displaystyle f(x) f ( x ) 连续,且 lim x → 0 1 − cos [ x f ( x ) ] ( e x 2 − 1 ) f ( x ) = 1 \displaystyle \lim_{x \to 0} \dfrac{1-\cos [x f(x)]}{(e^{x^{2}}-1) f(x)}=1 x → 0 lim ( e x 2 − 1 ) f ( x ) 1 − cos [ x f ( x )] = 1 ,则 f ( 0 ) = \displaystyle f(0)= f ( 0 ) =
【2009-3-4 分】 lim x → 0 e − e cos x 1 + x 2 3 − 1 = \displaystyle \lim_{x \to 0} \dfrac{e-e^{\cos x}}{\sqrt[3]{1+x^{2}}-1}= x → 0 lim 3 1 + x 2 − 1 e − e c o s x =
【2013-1-4 分】 已知极限 lim x → 0 x − arctan x x k = c \displaystyle \lim_{x \to 0} \dfrac{x-\arctan x}{x^{k}}=c x → 0 lim x k x − arctan x = c ,其中c,k 为常数,且 c ≠ 0 \displaystyle c \ne0 c = 0 ,则 ( )
A. k = 2 , c = − 1 2 \displaystyle k=2, c=-\dfrac{1}{2} k = 2 , c = − 2 1
B. k = 2 , c = 1 2 \displaystyle k=2, c=\dfrac{1}{2} k = 2 , c = 2 1
C. k = 3 , c = − 1 3 \displaystyle k=3, c=-\dfrac{1}{3} k = 3 , c = − 3 1
D. k = 3 , c = 1 3 \displaystyle k=3, c=\dfrac{1}{3} k = 3 , c = 3 1
【2014-2-4 分】 设函数 f ( x ) = arctan x \displaystyle f(x) = \arctan x f ( x ) = arctan x , 若 f ( x ) = x f ′ ( ξ ) \displaystyle f(x) = xf'(\xi) f ( x ) = x f ′ ( ξ ) ,则 lim x → 0 ξ 2 x 2 = ( ) \displaystyle \lim_{x \to 0} \dfrac{\xi^{2}}{x^{2}} = ( ) x → 0 lim x 2 ξ 2 = ( )
A. 1 B. 2 3 \displaystyle \dfrac{2}{3} 3 2
C. 1 2 \displaystyle \dfrac{1}{2} 2 1 D. 1 3 \displaystyle \dfrac{1}{3} 3 1
【2015-13-4 分】 lim x → 0 ln cos x x 2 = \displaystyle \lim_{x \to 0} \dfrac{\ln \cos x}{x^{2}}= x → 0 lim x 2 ln cos x =
【2016-3-4 分】 已知函数 f ( x ) \displaystyle f(x) f ( x ) 满足 lim x → 0 1 + f ( x ) sin 2 x − 1 e 3 x − 1 = 2 \displaystyle \lim_{x \to 0} \dfrac{\sqrt{1+f(x) \sin 2 x}-1}{e^{3 x}-1}=2 x → 0 lim e 3 x − 1 1 + f ( x ) sin 2 x − 1 = 2 ,则 lim x → 0 f ( x ) = \displaystyle \lim_{x \to 0} f(x)= x → 0 lim f ( x ) =
【2016-1-4 分】 lim x → 0 ∫ 0 x t ln ( 1 + t sin t ) d t 1 − cos x 2 = \displaystyle \lim_{x \to 0} \dfrac{\int_{0}^{x} t \ln (1+t \sin t) d t}{1-\cos x^{2}}= x → 0 lim 1 − cos x 2 ∫ 0 x t ln ( 1 + t sin t ) d t =
【2022-1-5 分】 设 lim x → 1 f ( x ) ln x = 1 \displaystyle \lim_{x \to 1} \dfrac{f(x)}{\ln x}=1 x → 1 lim ln x f ( x ) = 1 ,则( ).
A. f ( 1 ) = 0 \displaystyle f(1)=0 f ( 1 ) = 0 B. lim x → 1 f ( x ) = 0 \displaystyle \lim_{x \to 1} f(x)=0 x → 1 lim f ( x ) = 0
C. f ′ ( 1 ) = 1 \displaystyle f'(1)=1 f ′ ( 1 ) = 1 D. lim x → 1 f ′ ( x ) = 1 \displaystyle \lim_{x \to 1} f'(x)=1 x → 1 lim f ′ ( x ) = 1
【2024-1-5 分】 已知 lim x → 0 ( 1 + a x 2 ) sin x − 1 x 3 = 6 \displaystyle \lim_{x \to 0} \dfrac{(1+a x^{2})^{\sin x}-1}{x^{3}}=6 x → 0 lim x 3 ( 1 + a x 2 ) s i n x − 1 = 6 则 a = \displaystyle a= a =
【2025-1-5 分】 lim x → 0 + x x − 1 ln x ⋅ ln ( 1 − x ) = \displaystyle \lim_{x \to 0^{+}} \dfrac{x^{x}-1}{\ln x \cdot \ln (1-x)}= x → 0 + lim ln x ⋅ ln ( 1 − x ) x x − 1 =
【1988-5-4 分】 求极限 lim x → 1 ( 1 − x 2 ) tan π 2 x \displaystyle \lim_{x \to 1}(1-x^{2}) \tan \dfrac{\pi}{2} x x → 1 lim ( 1 − x 2 ) tan 2 π x
【1989-3-3 分】 lim x → 0 x cot 2 x = \displaystyle \lim_{x \to 0} x \cot 2 x= x → 0 lim x cot 2 x =
【1990-5-5 分】 求极限 lim x → ∞ 1 x ∫ 0 x ( 1 + t 2 ) e t 2 − x 2 d t \displaystyle \lim_{x \to \infty} \dfrac{1}{x} \int_{0}^{x}(1+t^{2}) e^{t^{2}-x^{2}} d t x → ∞ lim x 1 ∫ 0 x ( 1 + t 2 ) e t 2 − x 2 d t
【1992-45-3 分】 设 F ( x ) = x 2 x − a ∫ a x f ( t ) d t \displaystyle F(x)=\dfrac{x^{2}}{x-a} \int_{a}^{x} f(t) d t F ( x ) = x − a x 2 ∫ a x f ( t ) d t 其中 f ( x ) \displaystyle f(x) f ( x ) 为连续函数,则 lim x → a F ( x ) \displaystyle \lim_{x \to a} F(x) x → a lim F ( x ) 等于( ).
A. a 2 \displaystyle a^{2} a 2 B. a 2 f ( a ) \displaystyle a^{2} f(a) a 2 f ( a ) C. 0 D. 不存在
【1993-4-3 分】 lim x → ∞ 3 x 2 + 5 5 x + 3 sin 2 x = \displaystyle \lim_{x \to \infty} \dfrac{3 x^{2}+5}{5 x+3} \sin \dfrac{2}{x}= x → ∞ lim 5 x + 3 3 x 2 + 5 sin x 2 =
【1993-3-5 分】 求 lim x → − ∞ x ( x 2 + 100 + x ) \displaystyle \lim_{x \to -\infty} x(\sqrt{x^{2}+100}+x) x → − ∞ lim x ( x 2 + 100 + x ) .
【1993-3-3 分】 lim x → 0 + x ln x = \displaystyle \lim_{x \to 0^{+}}x\ln x= x → 0 + lim x ln x =
【1994-12-3 分】 lim x → 0 cot x ( 1 sin x − 1 x ) = \displaystyle \lim_{x \to 0} \cot x\left(\dfrac{1}{\sin x}-\dfrac{1}{x}\right)= x → 0 lim cot x ( sin x 1 − x 1 ) =
【1996-3-3 分】 lim x → ∞ x [ sin ln ( 1 + 3 x ) − sin ln ( 1 + 1 x ) ] = \displaystyle \lim_{x \to \infty} x[\sin \ln (1+\dfrac{3}{x})-\sin \ln (1+\dfrac{1}{x})]= x → ∞ lim x [ sin ln ( 1 + x 3 ) − sin ln ( 1 + x 1 )] =
【2005-34-4 分】 极限 lim x → ∞ x sin 2 x x 2 + 1 = \displaystyle \lim_{x \to \infty} x \sin \dfrac{2 x}{x^{2}+1}= x → ∞ lim x sin x 2 + 1 2 x =
【2018-2-4 分】 lim x → + ∞ x 2 [ arctan ( x + 1 ) − arctan x ] = \displaystyle \lim_{x \to +\infty} x^{2}[\arctan (x+1)-\arctan x]= x → + ∞ lim x 2 [ arctan ( x + 1 ) − arctan x ] =
【2023-3-5 分】 lim x → ∞ x 2 ( 2 − x sin 1 x − cos 1 x ) = \displaystyle \lim_{x \to \infty} x^{2}(2-x \sin \dfrac{1}{x}-\cos \dfrac{1}{x})= x → ∞ lim x 2 ( 2 − x sin x 1 − cos x 1 ) =
【1987-4-4 分】 求极限 lim x → 0 ( 1 + x e x ) 1 x \displaystyle \lim_{x \to 0}(1+x e^{x})^{\frac{1}{x}} x → 0 lim ( 1 + x e x ) x 1
【1989-3-4 分】 求 lim x → 0 ( 2 sin x + cos x ) 1 x \displaystyle \lim_{x \to 0}(2 \sin x+\cos x)^{\frac{1}{x}} x → 0 lim ( 2 sin x + cos x ) x 1
【1990-3-5 分】 已知 lim x → ∞ ( x + a x − a ) x = 9 \displaystyle \lim_{x \to \infty}(\dfrac{x+a}{x-a})^{x}=9 x → ∞ lim ( x − a x + a ) x = 9 ,求常数 a
【1990-12-3 分】 设 a 为非零常数,则 lim x → ∞ ( x + a x − a ) x = \displaystyle \lim_{x \to \infty}(\dfrac{x+a}{x-a})^{x}= x → ∞ lim ( x − a x + a ) x =
【1991-4-5 分】 求极限 lim x → 0 ( e x + e 2 x + ⋯ + e n x n ) 1 x \displaystyle \lim_{x \to 0}(\dfrac{e^{x}+e^{2 x}+\cdots+e^{n x}}{n})^{\frac{1}{x}} x → 0 lim ( n e x + e 2 x + ⋯ + e n x ) x 1 其中 n 是给定的自然数.
【1991-45-3 分】 下列各式中正确的是( ).
A. lim x → 0 + ( 1 + 1 x ) x = 1 \displaystyle \lim_{x \to 0^{+}}\left(1+\dfrac{1}{x}\right)^{x}=1 x → 0 + lim ( 1 + x 1 ) x = 1
B. lim x → 0 + ( 1 + 1 x ) x = e \displaystyle \lim_{x \to 0^{+}}\left(1+\dfrac{1}{x}\right)^{x}=e x → 0 + lim ( 1 + x 1 ) x = e
C. lim x → ∞ ( 1 − 1 x ) x = − e \displaystyle \lim_{x \to \infty}\left(1-\dfrac{1}{x}\right)^{x}=-e x → ∞ lim ( 1 − x 1 ) x = − e
D. lim x → ∞ ( 1 + 1 x ) − x = e \displaystyle \lim_{x \to \infty}\left(1+\dfrac{1}{x}\right)^{-x}=e x → ∞ lim ( 1 + x 1 ) − x = e
【1991-12-5 分】 求 lim x → 0 + ( cos x ) π x \displaystyle \lim_{x \to 0^{+}}(\cos \sqrt{x})^{\frac{\pi}{x}} x → 0 + lim ( cos x ) x π
【1992-3-5 分】 求 lim x → ∞ ( 3 + x 6 + x ) x − 1 2 \displaystyle \lim_{x \to \infty}(\dfrac{3+x}{6+x})^{\frac{x-1}{2}} x → ∞ lim ( 6 + x 3 + x ) 2 x − 1
【1993-12-5 分】 求 lim x → ∞ ( sin 2 x + cos 1 x ) x \displaystyle \lim_{x \to \infty}(\sin \dfrac{2}{x}+\cos \dfrac{1}{x})^{x} x → ∞ lim ( sin x 2 + cos x 1 ) x .
【1995-12-3 分】 lim x → 0 ( 1 + 3 x ) 2 sin x = \displaystyle \lim_{x \to 0}(1+3 x)^{\frac{2}{\sin x}}= x → 0 lim ( 1 + 3 x ) s i n x 2 =
【1996-12-3 分】 设 lim x → ∞ ( x + 2 a x − a ) x = 8 \displaystyle \lim_{x \to \infty}(\dfrac{x+2 a}{x-a})^{x}=8 x → ∞ lim ( x − a x + 2 a ) x = 8 ,则 a = \displaystyle a= a =
【2000-4-3 分】 若 a > 0 \displaystyle a>0 a > 0 , b > 0 \displaystyle b>0 b > 0 均为常数,则 lim x → 0 ( a x + b x 2 ) 3 x = \displaystyle \lim_{x \to 0}(\dfrac{a^{x}+b^{x}}{2})^{\frac{3}{x}}= x → 0 lim ( 2 a x + b x ) x 3 =
【2003-4-4 分】 极限 lim x → 0 [ 1 + ln ( 1 + x ) ] 2 x = \displaystyle \lim_{x \to 0}[1+\ln (1+x)]^{\frac{2}{x}}= x → 0 lim [ 1 + ln ( 1 + x ) ] x 2 =
【2003-1-4 分】 lim x → 0 ( cos x ) 1 ln ( 1 + x 2 ) = \displaystyle \lim_{x \to 0}(\cos x)^{\frac{1}{\ln \left(1+x^{2}\right)}}= x → 0 lim ( cos x ) l n ( 1 + x 2 ) 1 =
【2010-1-4 分】 极限 lim x → ∞ [ x 2 ( x − a ) ( x + b ) ] x = ( ) \displaystyle \lim_{x \to \infty}[\dfrac{x^{2}}{(x-a)(x+b)}]^{x}=( ) x → ∞ lim [ ( x − a ) ( x + b ) x 2 ] x = ( )
A. 1 B. e C. e a − b \displaystyle e^{a-b} e a − b D. e b − a \displaystyle e^{b-a} e b − a
【2011-2-4 分】 lim x → 0 ( 1 + 2 x 2 ) 1 x = \displaystyle \lim_{x \to 0}\left(\dfrac{1+2^{x}}{2}\right)^{\frac{1}{x}}= x → 0 lim ( 2 1 + 2 x ) x 1 =
【2012-3-4 分】 lim x → π 4 ( tan x ) 1 cos x − sin x = \displaystyle \lim_{x \to \frac{\pi}{4}}(\tan x)^{\frac{1}{\cos x-\sin x}}= x → 4 π lim ( tan x ) c o s x − s i n x 1 =
【2013-2-4 分】 lim x → 0 [ 2 − ln ( 1 + x ) x ] 1 x = \displaystyle \lim_{x \to 0}\left[2-\dfrac{\ln (1+x)}{x}\right]^{\frac{1}{x}}= x → 0 lim [ 2 − x ln ( 1 + x ) ] x 1 =
【2018-2-4 分】 若 lim x → 0 ( e x + a x 2 + b x ) 1 x 2 = 1 \displaystyle \lim_{x \to 0}(e^{x}+a x^{2}+b x)^{\frac{1}{x^{2}}}=1 x → 0 lim ( e x + a x 2 + b x ) x 2 1 = 1 ,则( )
A. a = 1 2 , b = − 1 \displaystyle a=\dfrac{1}{2}, b=-1 a = 2 1 , b = − 1
B. a = − 1 2 , b = − 1 \displaystyle a=-\dfrac{1}{2}, b=-1 a = − 2 1 , b = − 1
C. a = 1 2 , b = 1 \displaystyle a=\dfrac{1}{2}, b=1 a = 2 1 , b = 1
D. a = − 1 2 , b = 1 \displaystyle a=-\dfrac{1}{2}, b=1 a = − 2 1 , b = 1
【2018-1-4 分】 lim x → 0 ( 1 − tan x 1 + tan x ) 1 sin k x = e \displaystyle \lim_{x \to 0}(\dfrac{1-\tan x}{1+\tan x})^{\frac{1}{\sin k x}}=e x → 0 lim ( 1 + tan x 1 − tan x ) s i n k x 1 = e ,则 k = \displaystyle k= k = _____.
【2019-2-4 分】 lim x → 0 ( x + 2 x ) 2 x = \displaystyle \lim_{x \to 0}(x+2^{x})^{\frac{2}{x}}= x → 0 lim ( x + 2 x ) x 2 =
【2022-23-5 分】 lim x → 0 ( 1 + e x 2 ) cot x = \displaystyle \lim_{x \to 0}\left(\dfrac{1+e^{x}}{2}\right)^{\cot x}= x → 0 lim ( 2 1 + e x ) c o t x =