10.已知直线m和平面α,β,若α⊥β,m⊥α,则( )
| A. | m⊥β | B. | m∥β | C. | m?β | D. | m∥β或m?β |
9.直线x+y-3=0的倾斜角是( )
| A. | $\frac{π}{6}$ | B. | $\frac{π}{4}$ | C. | $\frac{π}{3}$ | D. | $\frac{3π}{4}$ |
8.若x∈(0,$\frac{1}{2}$]时,恒有4x<logax,则a的取值范围是( )
| A. | $(0,\frac{{\sqrt{2}}}{2})$ | B. | $(\frac{{\sqrt{2}}}{2},1)$ | C. | $(1,\sqrt{2})$ | D. | $\sqrt{2},2)$ |
7.已知f(x)是区间(-∞,+∞)上的偶函数,且是[0,+∞)上的减函数,则( )
| A. | f(-3)<f(-5) | B. | f(-3)>f(-5) | C. | f(-3)<f(5) | D. | f(-3)=f(-5) |
6.函数y=ax在[0,1]上最大值与最小值的和为3,则a=( )
| A. | 2 | B. | $\frac{1}{2}$ | C. | 4 | D. | $\frac{1}{4}$ |
5.若f(x)=x${\;}^{{{log}_2}3}}$,则f(2)=( )
| A. | 3 | B. | -3 | C. | $\frac{1}{3}$ | D. | $-\frac{1}{3}$ |
4.函数f(x)=kx+b(k>0),若x∈[0,1],y∈[-1,1],则函数y=f(x)的解析式是( )
| A. | y=2x-1 | B. | $y=\frac{1}{2}(x-1)$ | C. | y=2x-1或y=-2x+1 | D. | y=-2x-1 |
3.
如图,棱长为2的正方体ABCD-A1B1C1D1中,E为边AA1的中点,P为侧面BCC1B1上的动点,且A1P∥平面CED1.则点P在侧面BCC1B1轨迹的长度为( )
如图,棱长为2的正方体ABCD-A1B1C1D1中,E为边AA1的中点,P为侧面BCC1B1上的动点,且A1P∥平面CED1.则点P在侧面BCC1B1轨迹的长度为( )| A. | 2 | B. | $\sqrt{3}$ | C. | $\sqrt{5}$ | D. | $\sqrt{2}$ |
2.设常数a>0,若9x+$\frac{a^2}{4x}$≥a2-4对一切正实数x成立,则a的取值范围是( )
| A. | [-1,4] | B. | [-4,1] | C. | (0,1] | D. | (0,4] |
1.不等式1≤|2x-1|<2的解集为( )
0 233475 233483 233489 233493 233499 233501 233505 233511 233513 233519 233525 233529 233531 233535 233541 233543 233549 233553 233555 233559 233561 233565 233567 233569 233570 233571 233573 233574 233575 233577 233579 233583 233585 233589 233591 233595 233601 233603 233609 233613 233615 233619 233625 233631 233633 233639 233643 233645 233651 233655 233661 233669 266669
| A. | $({-\frac{1}{2},0})∪[{1,\frac{3}{2}})$ | B. | $({-\frac{1}{2},\frac{3}{2}})$ | C. | $({-\frac{1}{2},0}]∪[{1,\frac{3}{2}})$ | D. | (-∞,0]∪[1,+∞) |