通用版2018学高考数学二轮复习练酷专题课时跟踪检测二十二不等式选讲理20180206296

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课时跟踪检测(二十二) 不等式选讲
1.(2017·邢台模拟)设函数f (x )=|x +2|-|x -2|. (1)解不等式f (x )≥2;
(2)当x ∈R,0<y <1时,证明:|x +2|-|x -2|≤1y +1
1-y .
解:(1)当x ≥2时,由f (x )≥2,得4≥2,故x ≥2; 当-2<x <2时,由f (x )≥2,得2x ≥2,故1≤x <2; 当x ≤-2时,由f (x )≥2,得-4≥2,无解. 所以f (x )≥2的解集为{x |x ≥1}. (2)证明:因为|x +2|-|x -2|≤4, 1
y

11-y =⎝ ⎛⎭⎪⎫1y +11-y [y +(1-y )]=2+1-y y +y 1-y ≥4⎝ ⎛⎭
⎪⎫当且仅当y =12时取等号, 所以|x +2|-|x -2|≤1y +1
1-y
.
2.(2017·成都模拟)已知函数f (x )=x +1+|3-x |,x ≥-1. (1)求不等式f (x )≤6的解集;
(2)若f (x )的最小值为n ,正数a ,b 满足2nab =a +2b ,求2a +b 的最小值. 解:(1)当-1≤x <3时,f (x )=4; 当x ≥3时,f (x )=2x -2.
∴不等式f (x )≤6等价于⎩
⎪⎨
⎪⎧
-1≤x <3,
4≤6或⎩
⎪⎨
⎪⎧
x ≥3,
2x -2≤6.
∴-1≤x <3或3≤x ≤4. ∴-1≤x ≤4.
∴原不等式的解集为{x |-1≤x ≤4}.
(2)由(1),得f (x )=⎩
⎪⎨
⎪⎧
4,-1≤x <3,
2x -2,x ≥3.可知f (x )的最小值为4,∴n =4.
∴8ab =a +2b ,变形得1b +2
a
=8.
∵a >0,b >0,
∴2a +b =18(2a +b )⎝ ⎛⎭⎪⎫1b +2a =18⎝ ⎛⎭⎪⎫5+2a b +2b a ≥18⎝ ⎛⎭⎪⎫5+2
2a
b ·2b a =98
. 当且仅当2a b =2b a ,即a =b =3
8时取等号.
∴2a +b 的最小值为9
8
.
3.(2017·全国卷Ⅱ)已知a >0,b >0,a 3+b 3
=2.证明: (1)(a +b )(a 5
+b 5
)≥4; (2)a +b ≤2.
证明:(1)(a +b )(a 5
+b 5
)=a 6
+ab 5
+a 5
b +b 6
=(a 3
+b 3)2
-2a 3b 3
+ab (a 4
+b 4
) =4+ab (a 2
-b 2)2
≥4.
(2)因为(a +b )3
=a 3
+3a 2
b +3ab 2
+b 3
=2+3ab (a +b )≤2+a +b
2
4
(a +b )
=2+
a +b
3
4

所以(a +b )3
≤8,因此a +b ≤2.
4.(2017·沈阳模拟)已知函数f (x )=|x -a |-1
2x (a >0).
(1)若a =3,解关于x 的不等式f (x )<0;
(2)若对于任意的实数x ,不等式f (x )-f (x +a )<a 2
+a
2恒成立,求实数a 的取值范围.
解:(1)当a =3时,f (x )=|x -3|-12x ,即|x -3|-12x <0,原不等式等价于-x
2<x -3
<x
2
,解得2<x <6,故不等式的解集为{x |2<x <6}.
(2)f (x )-f (x +a )=|x -a |-|x |+a
2,
原不等式等价于|x -a |-|x |<a 2
, 由绝对值三角不等式的性质, 得|x -a |-|x |≤|(x -a )-x |=|a |, 原不等式等价于|a |<a 2
, 又a >0,∴a <a 2
,解得a >1. ∴实数a 的取值范围为(1,+∞).
5.(2017·开封模拟)设函数f (x )=|x -a |,a <0.
(1)证明:f (x )+f ⎝ ⎛⎭
⎪⎫-1x ≥2;
(2)若不等式f (x )+f (2x )<1
2的解集非空,求a 的取值范围.
解:(1)证明:函数f (x )=|x -a |,a <0,
设f (x )+f ⎝ ⎛⎭⎪⎫-1x =|x -a |+⎪⎪⎪⎪
⎪⎪-1x
-a
=|x -a |+⎪⎪⎪⎪⎪⎪1x
+a ≥⎪⎪
⎪⎪
⎪⎪x -a +⎝ ⎛⎭⎪⎫1
x +a
=⎪⎪⎪⎪
⎪⎪x +1x =|x |+1|x |≥2|x |·1
|x |
=2(当且仅当|x |=1时取等号). (2)f (x )+f (2x )=|x -a |+|2x -a |,a <0. 当x ≤a 时,f (x )+f (2x )=a -x +a -2x =2a -3x , 则f (x )+f (2x )≥-a ;
当a <x <a
2时,f (x )+f (2x )=x -a +a -2x =-x ,
则-a
2
<f (x )+f (2x )<-a ;
当x ≥a
2时,f (x )+f (2x )=x -a +2x -a =3x -2a ,
则f (x )+f (2x )≥-a
2

则f (x )的值域为⎣⎢⎡⎭⎪⎫-a 2,+∞,若不等式f (x )+f (2x )<12的解集非空,则需12>-a 2, 解得a >-1,又a <0,所以-1<a <0, 故a 的取值范围是(-1,0).
6.(2017·洛阳模拟)已知f (x )=|2x -1|-|x +1|. (1)将f (x )的解析式写成分段函数的形式,并作出其图象;
(2)若a +b =1,对∀a ,b ∈(0,+∞),1a +4
b
≥3f (x )恒成立,求x 的取值范围.
解:(1)由已知,得f (x )=⎩⎪⎨
⎪⎧
-x +2,x <-1,
-3x ,-1≤x ≤12,
x -2,x >1
2

函数f (x )的图象如图所示.
(2)∵a ,b ∈(0,+∞),且a +b =1, ∴1a +4b =⎝ ⎛⎭⎪⎫1a +4b (a +b )=5+⎝ ⎛⎭
⎪⎫b a +4a b ≥5+2
b a ·4a b =9,当且仅当b a =4a b ,即a =1
3
,b =2
3
时等号成立. ∵1a +4
b
≥3(|2x -1|-|x +1|)恒成立,
∴|2x -1|-|x +1|≤3, 结合图象知-1≤x ≤5, ∴x 的取值范围是[-1,5].。