lim _(harrow 0)dfrac (f({x)_(0)+h)-f((x)_(0)-h)}(h) 存在是f(x)在x 0点可导的 () 条件.-|||-(A)充分必要;(B )必要非充分;(C )充分非必要;(D )即非充分也非必要.

(f(x)在 _{0)=(x)_(0) 处可导,且 lim _(harrow 0)dfrac (f({x)_(0)+2h)-f((x)_(0)-h)}(2h)=

(6)设f(x)在x0处可导,则 lim _(harrow 0)dfrac (f({x)_(0)+h)-f((x)_(0)-h)}(h)= () ;-|||-(

(1)若f(x)在 =(x)_(0) 处可导,则 () .-|||-(A) lim _(harrow 0)dfrac (f({x)_(0)+2h)-f((x)_

若极限lim _(harrow 0)dfrac (f({x)_(0)+2h)-f((x)_(0))}(h)=dfrac (1)(2)，则导数值lim _(har

(2)已知f(x)在 =(x)_(0) 处可导,且有 lim _(harrow 0)dfrac (2h)(f({x)_(0))-f((x)_(0)-4h)}=-

已知函数f(x)在点x0处可导,则下列极 限 中 () 等于导数值f`(x0).-|||-(A) lim _(harrow 0)dfrac (f({x)_(0)

6、单选-|||-f-|||-A .lim _(harrow 0)dfrac (f({x)_(0)+5h)-f((x)_(0)+2h)}(h)=f((x)_(0

(1)f(x)在 =(x)_(0) 处左导数f`(x0)和右导数f`(x0)存在且相等,是-|||-f(x)在 =(x)_(0) 处可导的 () .-|||-A

若函数f（x）在点x0处可导，则极限underset(lim)(h→0)(f（(x)_(0)+3h）-f（(x)_(0)-h）)/(2h)=（ ）A. 4f′（

如果f(x)在点x₀处可导，则lim_(hto0)(f(x_(0)+2h)-f(x_(0)))/(h)=（）填空题（共15题，30.0分）题型说明：共15题，每