皮皮学,免费搜题
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搜题
【单选题】
Which of the following pumps is most suitable for an oily water separator?A.
reciprocating pump
B.
vane pump
C.
mono pump
D.
axial-flow pump
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反馈参考答案:
举一反三
【简答题】已知函数 φ(x)= a x+1 ,a为正常数. (Ⅰ)若f(x)=lnx+φ(x),且 a= 9 2 ,求函数f(x)的单调减区间; (Ⅱ)若g(x)=|lnx|+φ(x),且对任意x 1 ,x 2 ∈(0,2],x 1 ≠x 2 ,都有 g( x 2 )-g( x 1 ) x 2 - x 1 <-1 ,求a的取值范围.
【单选题】To my surprise, the manager ______ 30 dollars from my salary without any good reason.
A.
cut off
B.
held up
C.
brought down
D.
kept back
【简答题】已知函数 f(x)= 1 x +ax+lnx , g(x)= a+1 x +3lnx,(a∈R) . (I)当a=2时,求函数f(x)的单调区间; (II)若函数F(x)=f(x)-g(x)在区间[1,+∞)上单调递增,求实数a的取值范围; ( III)证明: 2 n+1 + 1 2 n ≥n(n+1)ln2+3 对任意的n∈N * 成立.
【简答题】已知函数 φ(x)= a x+1 ,a为正常数. (1)若f(x)=lnx+φ(x),且 a= 9 2 ,求函数f(x)的单调增区间; (2)若g(x)=|lnx|+φ(x),且对任意x 1 ,x 2 ∈(0,2],x 1 ≠x 2 ,都有 g( x 2 )-g( x 1 ) x 2 - x 1 <-1 ,求a的取值范围.
【简答题】设函数f(x)=lnx,g(x)=e2x+1,则f[g(x)]=______。
【单选题】The reason for my absence was ______ I had fallen ill.
A.
why
B.
because
C.
for
D.
that
【单选题】I have enjoyed my visit here. I'll be very sorry ______.
A.
for leaving
B.
to leave
C.
of leaving
D.
with leaving
【简答题】设函数f(x)=(x+a)lnx-x+a. (Ⅰ)设g(x)=f'(x),求g(x)函数的单调区间; (Ⅱ)若 a≥ 1 e ,试研究函数f(x)=(x+a)lnx-x+a的零点个数.
【简答题】已知函数 (x)= ,a是正常数。(1)若f(x)= (x)+lnx,且a= ,求函数f(x)的单调递增区间;(2)若g(x)=∣lnx∣+ (x),且对任意的x ,x ∈(0,2〕,且x ≠x ,都有 <-1,求a的取值范围
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