(人教A版)高中数学【选修2-2】双基限时练(12)及答案

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双基限时练(十二)
1.下列各式中,正确的是( ) A .⎠⎛a
b F ′(x )d x =F ′(b )-F ′(a )
B.⎠⎛a b F ′(x)d x =F ′(a)-F ′(b)
C .⎠⎛a
b F ′(x )d x =F (b )-F (a ) D.⎠⎛a
b F ′(x)d x =F(a)-F(b)
答案 C
2.∫π
20( sin x -cos x)d x =( ) A .0 B .1 C .2
D .π2
解析 ∫π
20(sin x -cos x)d x =∫π20sin x d x -∫π
20cos x d x =(-cos x)
⎪⎪⎪ π20-(sin x)
⎪⎪⎪ π20 =1-1=0. 答案 A
3.若∫a 1(2x +1
x )d x =3+ln 2(a>1),则a 的值为( ) A .6 B .4 C .3 D .2
解析 ∵⎠⎛
1
a (2x +
1x )d x
=(x 2
+ln x)

⎪⎪ a 1=a 2+ln a -1, 又⎠⎛1
a (2x +1
x )d x =3+ln 2,
∴a =2. 答案 D
4.⎠
⎛π-πcos x d x 等于( )
A .2π
B .π
C .0
D .1
解析 ⎠
⎛π-πcos x d x =sin x

⎪⎪ π-π=sinπ-sin (-π)=0. 答案 C
5.设f(x)=⎩
⎪⎨⎪⎧
x 2 (0≤x<1),
2-x (1<x ≤2),则⎠⎛02f(x)d x 等于( )
A .3
4 B .4
5 C .56
D .不存在
解析 ⎠⎛0
2f(x)d x =⎠⎛0
1x 2d x +⎠⎛1
2(2-x)d x =13x 3 ⎪⎪⎪ 10+(2x -12x 2)
⎪⎪⎪ 2
1 =13+2-32=5
6. 答案 C
6.由曲线y =x 2-1,直线x =0,x =2和x 轴围成的封闭图形的面积(如图阴影部分)是( )
A .⎠⎛0
2(x 2-1)d x
B .|⎠⎛0
2(x 2-1)d x |
C.⎠⎛0
2|x 2-1|d x
D .⎠⎛0
1(x 2-1)d x +⎠⎛1
2(x 2-1)d x
答案 C
7.若a =⎠⎛0
2x 2d x ,b =⎠⎛0
2x 3d x ,c =⎠⎛0
2 sin x d x ,则a ,b ,c 的大小
关系是________.
解析 ∵a =⎠⎛
2x 2d x =
13x 3

⎪⎪ 20=8
3, b =⎠⎛
2x 3d x =
14x 4

⎪⎪ 2
0=4, c =⎠⎛0
2 sin x d x =(-cos x )

⎪⎪
20=-cos2+1<2.
∴b >a >c . 答案 b >a >c
8.计算⎠
⎛2-2( sin x +2)d x =________.
解析 ⎠⎛2-2(sin x +2)d x =⎠⎛2-2sin x d x +⎠
⎛2-22d x
=(-cos x ) ⎪
⎪⎪ 2-2
+2x

⎪⎪ 2
-2 =-cos2+cos(-2)+2×2-2×(-2) =8. 答案 8
9.设函数f (x )=ax 2+c (a ≠0),若0≤x 0≤1.且
⎠⎛0
1f (x )d x =f (x 0),则x 0=________.
解析 ∵⎠⎛
1f (x )d x =⎠⎛0
1(ax 2+c )d x =⎝
⎛⎭
⎪⎫a 3x 3+cx ⎪⎪
10=a
3+c ,
又⎠⎛0
1f (x )d x =f (x 0),∴ax 20
+c =a
3+c .
∵a ≠0,∴x 2
0=
1
3,
又0≤x 0≤1,∴x 0=3
3. 答案 3
3
10.计算下列定积分:
(1)⎠⎛1
4x -x 2x +x d x ;
(2)⎠⎛0
2(2-|1-x |)d x ;
(3)∫π2-π
2(sin x -cos x )d x .
解 (1)⎠⎛14x -x 2x +x d x =⎠⎛14(x +x )(x -x )x +x d x = ⎠⎛
1
4(
x -x )d x =⎝ ⎛⎭⎪⎫23x 32-12x 2⎪


4
1=
⎝ ⎛⎭⎪⎫23×432-12×42-⎝ ⎛⎭⎪⎫23-12=163
-8-23+12=-176.
(2)∵y =2-|1-x |=⎩
⎪⎨⎪⎧
1+x ,0≤x ≤1,3-x ,1<x ≤2.
∴⎠⎛
2(2-|1-x |)d x =
⎠⎛0
1(1+x )d x +
⎠⎛1
2(3-x )d x =⎝
⎛⎭⎪⎫x +
12x 2⎪
⎪⎪
10+


⎭⎪⎫3x -12x 2⎪⎪

2
1=
32+4-52=3.
(3)∫π2-π
2(sin x -cos x )d x =(-cos x -sin x )⎪


π2-π
2=-1-1=-
2.
11.f (x )是一次函数,且⎠⎛0
1f (x )d x =5,⎠⎛0
1xf (x )d x =17
6,求f (x )的解
析式.
解 设f (x )=ax +b (a ≠0), 由⎠⎛
1f (x )d x =5,⎠⎛0
1xf (x )d x =
176,
得⎠⎛
1(ax +b )d x =(
12ax 2
+bx )⎪


10=
1
2a +b ,
⎠⎛0
1x (ax +b )d x =(
13ax 3+12bx 2)

⎪⎪ 10=13a +1
2b ,
∴⎩⎪⎨⎪⎧
12a +b =5,13a +b 2=176,解得⎩⎪⎨⎪⎧
a =4,
b =3.
∴f (x )=4x +3.
12.求f (a )=⎠⎛0
1(6x 2+4ax +a 2)d x 的最小值.
解 f (a )=⎠⎛0
1(6x 2+4ax +a 2)d x
=⎠⎛0
16x 2d x +⎠⎛0
14ax d x +⎠⎛0
1a 2d x
=2x 3 ⎪
⎪⎪ 10+2ax 2

⎪⎪ 10
+a 2x

⎪⎪ 1
0 =2+2a +a 2 =(a +1)2+1.
∴当a =-1时,f (a )的最小值为1. 13.设F (x )=⎠⎛0
x (t 2+2t -8)d t .
(1)求F (x )的单调区间; (2)求F (x )在[1,3]上的最值. 解 F (x )=⎠⎛
x (t 2+2t -8)d t =⎝
⎛⎭⎪⎫13t 3+t 2-8t ⎪
⎪⎪
x
0=
13x 3+x 2
-8x ,定
义域是(0,+∞).
(1)F ′(x )=x 2+2x -8=(x +4)(x -2), ∵当x <-4或x >2时,F ′(x )>0; 当-4<x <2时,F ′(x )<0.
又∵x >0,∴函数的增区间为(2,+∞),减区间为(0,2). (2)令F ′(x )=0,得x =2(x =-4舍去).
又F (1)=-203,F (2)=-28
3,F (3)=-6, ∴F (x )在[1,3]上的最大值为-6,最小值是-28
3.。