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设f(x),g(x)在[0,1]上的导数连续,且f(0)=0,f′(x)≥0,g′(x)≥0。证明:对任何a∈[O,1],有https://assets.asklib.com/psource/2016030616211474049.jpg
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设y=e2x, 则y在x=0处的二阶导数为_______.
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设fn-2(x)=e2x+1,则fn(x)|x=0=0A.4eB.2eC.eD.1
设fn-2(x)=e2x+1,则fn(x)|x=0=0
A.4e
B.2e
C.e
D.1
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设f(x)在区间[0,1]上连续,证明:
设f(x)在区间[0,1]上连续,证明:<img src='https://img2.soutiyun.com/ask/2020-12-15/976873792952469.png' />
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设f(x)连续,且对一切的x有f(x+1)=2f(x),又当x∈[0,1]时,f(x)=x(1-x<sup>2</sup>),讨论f(x)在x=0处的可导性。
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设f(x)=e2x-1/e2x+1,则()。A.f(x)为偶函数,值域为(-1,1)B.f(x)为奇函数,值域为(-∞
设f(x)=e2x-1/e2x+1,则()。
A.f(x)为偶函数,值域为(-1,1)
B.f(x)为奇函数,值域为(-∞,0)
C.f(x)为奇函数,值域为(-1,1)
D.f(x)为奇函数,值域为(0,+∞)
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设f(x)是[0,1]上的可测函数,记F(t)为其分布函数,求下列函数在[0,1]上的分布函数: (i)f(x)+c;(ii)cf(x)(c>0
设f(x)是[0,1]上的可测函数,记F(t)为其分布函数,求下列函数在[0,1]上的分布函数:
(i)f(x)+c;(ii)cf(x)(c>0);(iii)f<sup>3</sup>(x).
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设f(x)=(x-1)(x-2)(x-3)(x-4),方程f'(x)=0().
A.有四个实根,分别为1、2、3、4
B.有三个实根,分别位于(1,2),(2,3)和(3,4)之内
C.有两个实根,分别位于(2,3),(3,4)之内
D.有一个实根,位于(2,3)之内
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设函数f(x)在(0,+∞)内连续,f(1)=5/2,且对任何正数x和t,满足条件则f(x)=().
设函数f(x)在(0,+∞)内连续,f(1)=5/2,且对任何正数x和t,满足条件
<img src='https://img2.soutiyun.com/ask/2020-12-13/976721902069037.png' />
则f(x)=().
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y&39;-3y=e2x,y|x=0=0;
y&39;-3y=e<sup>2x</sup>,y|<sub>x=0</sub>=0;
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设函数f(x)在[0,1]上连续,且f(0)= f(1),证明一定存在x∈(0,)使得f(x<sub>0</sub>)= f(x<sub>0</sub>+).
设函数f(x)在[0,1]上连续,且f(0)= f(1),证明一定存在x∈(0,<img src='https://img2.soutiyun.com/ask/2020-12-20/977320815878019.png' />)使得f(x<sub>0</sub>)= f(x<sub>0</sub>+<img src='https://img2.soutiyun.com/ask/2020-12-20/977320902712985.png' />).
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设函数f(x)和g(x)在[0,1]上有连续导数,且f(0)=0,f'(x)≥0,g'(x)≥0.证明:对任何a∈[0,1]
设函数f(x)和g(x)在[0,1]上有连续导数,且f(0)=0,f'(x)≥0,g'(x)≥0.证明:对任何a∈[0,1],都有
<img src='https://img2.soutiyun.com/ask/2020-12-13/97672399961901.png' />
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设函数f(x)=x/x-1,则当x≠0时,且x≠1时,f[1/f(X)]=()
A.x-1/x
B.x/x-1
C.1-x
D.x
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(1)研究在点(0,0)是否存在偏导数f<sub>x</sub>(0,0)及f<sub>y</sub>(0,0);(2)设函数f(x,y)=|x-y|g(x,y),其中
(1)研究<img src='https://img2.soutiyun.com/ask/2020-08-19/966676318036981.png' />在点(0,0)是否存在偏导数f<sub>x</sub>(0,0)及f<sub>y</sub>(0,0);
(2)设函数f(x,y)=|x-y|g(x,y),其中函数g(x,y)在点(0,0)的某邻域内连续.试问g(0,0)为何值时,f在点(0,0)的两个偏导数均存在?g(0,0)为何值时,f在点(0,0)处可微?
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设函数f(x)在闭区间[0,1]上连续,在开区间(0,1)上大于零,并满足进一步,假设曲线y=f(x)与直线x=
设函数f(x)在闭区间[0,1]上连续,在开区间(0,1)上大于零,并满足
<img src='https://img2.soutiyun.com/ask/2020-12-16/976979475299148.png' />
进一步,假设曲线y=f(x)与直线x=1和y=0所围的图形S的面积为2.
(1)求函数f(x);
(2)当a为何值时,图形S绕x轴旋转一周所得旋转体的体积最小?
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设f(x)在x=0处满足f(0)=f"(0)=…=f(n)(0)=0,f(n+1)(0)>0,则().A.当n为偶数时,x=0是f(x)的
设f(x)在x=0处满足f(0)=f"(0)=…=f(n)(0)=0,f(n+1)(0)>0,则().
A.当n为偶数时,x=0是f(x)的极大值点
B.当n为偶数时,x=0是f(x)的极小值点
C.当n为奇数时,x=0是f(x)的极火值点
D.当n为奇数时,x=0是f(x)的极小值点
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设f(x)在[0,1]上连续,且0≤f(x)≤1,试证在[0,1]内至少存在—个ξ,使f(ξ)=ξ.
设f(x)在[0,1]上连续,且0≤f(x)≤1,试证在[0,1]内至少存在—个ξ,使f(ξ)=ξ.
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设f(x)在(0,+∞)内有定义,且f'(1)=a(≠0),又对,y∈(0,+∞),有f(xy)=f(x)+f(y),求f'(x).
设f(x)在(0,+∞)内有定义,且f'(1)=a(≠0),又对<img src='https://img2.soutiyun.com/ask/2021-01-13/979379872126164.png' />,y∈(0,+∞),有f(xy)=f(x)+f(y),求f'(x).
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设(f(x)=ln(1+x),x∈(-1,1).由拉格朗日中值定理得: .使得ln(1+x)-In(1+0)=证明:
设(f(x)=ln(1+x),x∈(-1,1).由拉格朗日中值定理得:<img src='https://img2.soutiyun.com/ask/2021-01-13/97939236664681.png' />.<img src='https://img2.soutiyun.com/ask/2021-01-13/979392378464486.png' />使得ln(1+x)-In(1+0)=<img src='https://img2.soutiyun.com/ask/2021-01-13/979392393557349.png' />证明:<img src='https://img2.soutiyun.com/ask/2021-01-13/979392405881054.png' />
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设随机变量(X,Y)在区域D={(x,y)| 0 < x < 1,0 < y < 1,}上服从均匀分布,则P{X < 0.5,Y <0.6} =()
A.0.3
B.0.5
C.0.6
D.1
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设f(x)在(0,+∞)上有意义,x<sub>1</sub>>0,x<sub>2</sub>>0.求证:(1)若单调减少,则;(2)若单调增加,则.
设f(x)在(0,+∞)上有意义,x<sub>1</sub>>0,x<sub>2</sub>>0.求证:
(1)若<img src='https://img2.soutiyun.com/ask/2021-01-12/979302582932847.png' />单调减少,则<img src='https://img2.soutiyun.com/ask/2021-01-12/979302592723407.png' />;
(2)若<img src='https://img2.soutiyun.com/ask/2021-01-12/979302582932847.png' />单调增加,则<img src='https://img2.soutiyun.com/ask/2021-01-12/97930261113346.png' />.
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设函数f(x)在[01]上二阶可导,且f"(x)≤0,x∈[0,1],证明:
设函数f(x)在[01]上二阶可导,且f"(x)≤0,x∈[0,1],证明:
<img src='https://img2.soutiyun.com/ask/2020-12-16/976976979900419.png' />
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设二维随机变量(X,Y)在区域D:0<x<1,|y|<x内服从均匀分布,则D(2X+1)=1.
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12、设随机变量(X,Y)在区域D={(x,y)| 0 < x < 1,0 < y < 1,}上服从均匀分布,则P{X < 0.5,Y <0.6} =().
A.0.3
B.0.5
C.0.6
D.1