作业帮高数可导性设f(0)=0,则f(x)在x=0可导的充要条件为( ).(A)lim(h→0)f(1-cosh)/(h^2)存在(B)lim(h→0)f(1-e^h)/h存在(C)lim(h→0)f(h-sinh)/(h^2)存在(D)lim(h→0)[f(2h)-f(h)]/h存在在下苦手中```
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![高数可导性设f(0)=0,则f(x)在x=0可导的充要条件为( ).(A)lim(h→0)f(1-cosh)/(h^2)存在(B)lim(h→0)f(1-e^h)/h存在(C)lim(h→0)f(h-sinh)/(h^2)存在(D)lim(h→0)[f(2h)-f(h)]/h存在在下苦手中```](/uploads/image/z/2732162-50-2.jpg?t=%E9%AB%98%E6%95%B0%E5%8F%AF%E5%AF%BC%E6%80%A7%E8%AE%BEf%280%29%3D0%2C%E5%88%99f%28x%29%E5%9C%A8x%3D0%E5%8F%AF%E5%AF%BC%E7%9A%84%E5%85%85%E8%A6%81%E6%9D%A1%E4%BB%B6%E4%B8%BA%28+%29.%28A%29lim%28h%E2%86%920%29f%281-cosh%29%2F%28h%5E2%29%E5%AD%98%E5%9C%A8%28B%29lim%28h%E2%86%920%29f%281-e%5Eh%29%2Fh%E5%AD%98%E5%9C%A8%28C%29lim%28h%E2%86%920%29f%28h-sinh%29%2F%28h%5E2%29%E5%AD%98%E5%9C%A8%28D%29lim%28h%E2%86%920%29%5Bf%282h%29-f%28h%29%5D%2Fh%E5%AD%98%E5%9C%A8%E5%9C%A8%E4%B8%8B%E8%8B%A6%E6%89%8B%E4%B8%AD%60%60%60)
高数可导性设f(0)=0,则f(x)在x=0可导的充要条件为( ).(A)lim(h→0)f(1-cosh)/(h^2)存在(B)lim(h→0)f(1-e^h)/h存在(C)lim(h→0)f(h-sinh)/(h^2)存在(D)lim(h→0)[f(2h)-f(h)]/h存在在下苦手中```
高数可导性
设f(0)=0,则f(x)在x=0可导的充要条件为( ).
(A)lim(h→0)f(1-cosh)/(h^2)存在
(B)lim(h→0)f(1-e^h)/h存在
(C)lim(h→0)f(h-sinh)/(h^2)存在
(D)lim(h→0)[f(2h)-f(h)]/h存在
在下苦手中```
高数可导性设f(0)=0,则f(x)在x=0可导的充要条件为( ).(A)lim(h→0)f(1-cosh)/(h^2)存在(B)lim(h→0)f(1-e^h)/h存在(C)lim(h→0)f(h-sinh)/(h^2)存在(D)lim(h→0)[f(2h)-f(h)]/h存在在下苦手中```
f(x)在x=0可导等价于lim(t→0)f(t)/t存在.
A中取t=1-cosh>0,这样t就不能从0-趋近
C中h-sinh与h^2非等价无穷小.收敛速度不一样.
D的命题等价为f(x)在f(h),h→0时可导,原命题为f(x)在x=0,不等价
A的反例为f(x)=x^(1.5),满足A,但不满足原命题.
C的反例为f(x)=x^(2/3),可知lim(h→0)f(h-sinh)/(h^2)=6^(-2/3),但在原命题中不可导.
D的反例为f(x)=xF(x),(F(x)=1若x是有理数,F(x)=-1若x是无理数),易证f(x)仅在x=0时可导,而D中D=lim(h→0)f(h),极限不存在.
如还有疑问欢迎交流.