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題目列表(包括答案和解析)

已知函數(shù)f(x)=4sin(2x-
π
3
)+1,給定條件p:
π
4
≤x≤
π
2
,條件q:-2<f(x)-m<2,若p是q的充分條件,則實(shí)數(shù)m的取值范圍為
 

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已知△ABC的外接圓的圓心O,BC>CA>AB,則
OA
OB
OA
OC
,
OB
OC
的大小關(guān)系為
 

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已知函數(shù)f(x)是定義在實(shí)數(shù)集R上的不恒為零的偶函數(shù),且對任意實(shí)數(shù)x都有xf(x+1)=(1+x)f(x),則f(f(
52
))的值是
 

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15、已知y=2x,x∈[2,4]的值域?yàn)榧螦,y=log2[-x2+(m+3)x-2(m+1)]定義域?yàn)榧螧,其中m≠1.
(Ⅰ)當(dāng)m=4,求A∩B;
(Ⅱ)設(shè)全集為R,若A⊆CRB,求實(shí)數(shù)m的取值范圍.

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已知y=f(x)是定義在[-1,1]上的奇函數(shù),x∈[0,1]時(shí),f(x)=
4x+a
4x+1

(Ⅰ)求x∈[-1,0)時(shí),y=f(x)解析式,并求y=f(x)在x∈[0,1]上的最大值;
(Ⅱ)解不等式f(x)>
1
5

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一.選擇題

1―5  CBABA   6―10  CADDA

二.填空題

11.       12.()       13.2          14.         15.

16.(1,4)

三.解答題

數(shù)學(xué)理數(shù)學(xué)理17,解:①         =2(1,0)                      (2分)             

        ?,                                        (4分)

?

        cos              =

 

        由,  ,    即B=              (6分)

                                               (7分)

                                                        (9分)

,                                                         (11分)

的取值范圍是(,1                                                      (13分)

18.解:①設(shè)雙曲線方程為:  ()                                 (1分)

由橢圓,求得兩焦點(diǎn),                                           (3分)

,又為一條漸近線

, 解得:                                                     (5分)

                                                    (6分)

②設(shè),則                                                      (7分)

      

?                             (9分)

,  ?              (10分)

                                                (11分)

  ?

?                                        (13分)

    1. <menuitem id="fpkdm"></menuitem>
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      <blockquote id="fpkdm"></blockquote>
      
   
      
    
    
      
    
        單減區(qū)間為[]        (6分)
       
      ②(i)當(dāng)                                                      (8分)
      (ii)當(dāng),
      ,  (),,
      則有                                                                     (10分)
      ,
                                                    
(11分)
        在(0,1]上單調(diào)遞減                     (12分)
                                                      
(13分)
      20.解:①        
                                                             
(2分)
      從而數(shù)列{}是首項(xiàng)為1,公差為C的等差數(shù)列
        即                               
(4分)
        
         即………………※             
(6分)
      當(dāng)n=1時(shí),由※得:c<0                                                   
(7分)
      當(dāng)n=2時(shí),由※得:                                                
(8分)
      當(dāng)n=3時(shí),由※得:                                                
(9分)
      當(dāng)
          (
                         
                      (11分)
                               (12分)
      綜上分析可知,滿足條件的實(shí)數(shù)c不存在.                                   
(13分)
      21.解:①設(shè)過A作拋物線的切線斜率為K,則切線方程: 
                                                                       (2分)
          即
                                                                                                         (3分)
      ②設(shè)   又
           
                                                               (4分)
      同理可得  
                                                      (5分)
      又兩切點(diǎn)交于  , 
                                     (6分)
      ③由  可得:
        
              
                                       (8分)
                       
(9分)
        
      當(dāng)  
      當(dāng)  
                                                          
(11分)
      當(dāng)且僅當(dāng),取 “=”,此時(shí)
                                            
(12分)
      22.①證明:由    
        即證
        ()                                   
(1分)
      當(dāng)   
            即:                         
(3分)
        ()     
      當(dāng)    
          
                                  
                            (6分)
      ②由      
      數(shù)列
                                                   
(8分)
      由①可知,  
                         
(10分)
      由錯位相減法得:                                      
(11分)
                                         
(12分)
       
       
      		
      
	
	
      
		
      


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