-
已知f(x)是二阶可导的函数,,则为()。
A .https://assets.asklib.com/psource/2015102916141715901.jpg
B .https://assets.asklib.com/psource/201510291614306496.jpg
C .https://assets.asklib.com/psource/2015102916144264232.jpg
D .https://assets.asklib.com/psource/2015102916145569686.jpg
-
由于函数在某点可导与解析是不等价的,所以函数在区域内解析与区域内可导也不等价的
-
函数的曲线在拐点处二阶可导且导数为0.
-
设函数fz)在[0,1]上连续,在(0,1)内可导,且证明在(0,1)内存在一点c,使得f'(c)=0.
设函数fz)在[0,1]上连续,在(0,1)内可导,且<img src='https://img2.soutiyun.com/ask/2020-12-27/977943646888836.png' />证明在(0,1)内存在一点c,使得f'(c)=0.
-
设f(x)∈C[a,b],在(a,b)内二阶可导,且f(a)=f(b)=0,f'<sub>+</sub>(a)>0,证明:存在ξ∈(a,b),使得f"(ξ)< 0。
-
设函数f(x)二阶连续可导,且f(0)=0,f'(0)=1,求
设函数f(x)二阶连续可导,且f(0)=0,f'(0)=1,求<img src='https://img2.soutiyun.com/ask/2020-12-08/976282425721188.png' />
-
设函数f(x)在[a,b]上二阶可导,且f(A)= f(b)=0,令F(x)=(x-(A)f(x),证明:在(a,b) 内至少存在一点ξ,使得F"(ξ)=0.
-
设曲线y=f(x)在[a,b]上二阶可导,连接点A(a,f(a)),B(b,f(b))的直线交曲线于点C(c,f(c))(a<c<b)。证明:存在ξ∈(a,b),使得fˈˈ(ξ)=0。
-
设(x)在[a,b]上连续,在(a,b)内可导且f'(x)≤0,证明在(a,b)内有F'(x)≤0.
设(x)在[a,b]上连续,在(a,b)内可导且f'(x)≤0,
<img src='https://img2.soutiyun.com/ask/2020-08-06/965576645302938.png' />
证明在(a,b)内有F'(x)≤0.
-
设f(x)在[0,1]上连续,在(0,1)内可导,且f(0)=0,f(1)=1/3,证明:存在ξ∈(0,1/2),η∈(1/2,1),使得f'(ξ)+f'(η)=ξ<sup>2</sup>+η<sup>2</sup>。
-
设f(x)在[a, b]上连续,在(a, b)内可导且f'(x)≤0,证明:在(a, b)内有F'(a)≤0
设f(x)在[a, b]上连续,在(a, b)内可导且f'(x)≤0,
<img src='https://img2.soutiyun.com/ask/2020-12-14/976805726019948.png' />
证明:在(a, b)内有F'(a)≤0
-
已知,效用函数U=U(X<sub>l</sub>,X<sub>2</sub>)连续可导,请证明,在商品X<sub>l</sub>,X<sub>2</sub>之间存在边际替代率递减
已知,效用函数U=U(X<sub>l</sub>,X<sub>2</sub>)连续可导,请证明,在商品X<sub>l</sub>,X<sub>2</sub>之间存在边际替代率递减关系的条件之一是<img src='https://img2.soutiyun.com/ask/2020-09-18/969286214872727.png' />
-
设f(x)∈C[0,2],在(0,2)内二阶可导,f(0)<f(1),f(1)>,证明:存在ξ∈(0,2),使得f"(ξ)<0。
设f(x)∈C[0,2],在(0,2)内二阶可导,f(0)<f(1),f(1)><img src='https://img2.soutiyun.com/ask/2020-12-07/976198980993149.jpg' />,证明:存在ξ∈(0,2),使得f"(ξ)<0。
-
设f(x)在[a,b]上连续,在(a,b)内可导,且f(a)=f(b)=0.证明:存在ξ∈(a,b),使f'(ξ)=f(ξ)成立.
-
已知函数f(x)在[0,1]上连续,在(0,1)内可导,且f(0)=0,f(1)=1.证明:(I)存在ξ∈(0,1),使得f(ξ)=1-ξ;(
已知函数f(x)在[0,1]上连续,在(0,1)内可导,且f(0)=0,f(1)=1.证明:
(I)存在ξ∈(0,1),使得f(ξ)=1-ξ;
(Ⅱ)存在两个不同的点η,ζ∈(0,1),使得fˊ(η)fˊ(ζ)=1.
-
设ƒ(χ)在[a,b]上连续,在(a,b)内可导,证明至少存在一点ξ∈(a,b),使2ξ[ƒ(a)-ƒ(b)]=(a<sup>2</sup>-b<sup>2</sup>)ƒ'(ξ).
-
设f(x)二阶连续可导,且,则()。
设f(x)二阶连续可导,且<img src='https://img2.soutiyun.com/ask/2020-12-04/975952141695317.jpg' />,则()。
A.f(0)是f(x)的极小值
B.f(0)是f(x)的极大值
C.(0,f(0))是曲线y=f(x)的拐点
D.x=0是f(x)的驻点但不是极值点
-
设函数f(x)在[0,1]上连续,在(0,1)内可导,且证明在(0,1)内存在一点ξ,使f'(ξ)=0。
设函数f(x)在[0,1]上连续,在(0,1)内可导,且<img src='https://img2.soutiyun.com/ask/2020-08-07/965639441738848.png' />证明在(0,1)内存在一点ξ,使f'(ξ)=0。
-
设函数f在点x=1处二阶可导,证明:若f'(1)=0,f"(1)=0,则在x=1处有
设函数f在点x=1处二阶可导,证明:若f'(1)=0,f"(1)=0,则在x=1处有<img src='https://img2.soutiyun.com/ask/2020-11-28/975441569605878.png' />
<img src='https://img2.soutiyun.com/ask/2020-11-28/97544157767434.png' />
-
设(1)证明f(x)在[0,+∞)上可导,且一致连续;(2)证明反常积分发散。
设<img src='https://img2.soutiyun.com/ask/2021-01-28/980692750486118.png' />
(1)证明f(x)在[0,+∞)上可导,且一致连续;
(2)证明反常积分<img src='https://img2.soutiyun.com/ask/2021-01-28/980692795149672.png' />发散。
-
证明:(1)若函数f在[a,b]上可导,且f'(x)≥m,则(2)若函数f在[a,b]上可导,且(3)对任意实数x<sub>1
证明:(1)若函数f在[a,b]上可导,且f'(x)≥m,则
<img src='https://img2.soutiyun.com/ask/2021-02-04/98128598322409.png' />
(2)若函数f在[a,b]上可导,且
<img src='https://img2.soutiyun.com/ask/2021-02-04/981285989538451.png' />
(3)对任意实数x<sub>1</sub>,x<sub>2</sub>,都有
<img src='https://img2.soutiyun.com/ask/2021-02-04/981286001647143.png' />
-
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' />
-
设f(x)在[a,b]上连续,在(a,b)内可导且f'(x)≤0,证明在(a,b)内有F'(x)<0.
设f(x)在[a,b]上连续,在(a,b)内可导且f'(x)≤0,
<img src='https://img2.soutiyun.com/ask/2020-12-04/975925572077622.png' />
证明在(a,b)内有F'(x)<0.
-
设f(x)在[a,b]连续,在(a,b)二阶可导,证明存在η∈(a,b),成立
设f(x)在[a,b]连续,在(a,b)二阶可导,证明存在η∈(a,b),成立
<img src='https://img2.soutiyun.com/ask/2020-12-16/976959532122463.png' />