函数的概念2Microsoft Word 文档

  • 格式:doc
  • 大小:47.50 KB
  • 文档页数:2

函数及其表示
1.下列各组函数中,表示同一个函数的是( )
A .y =x -1和y =x 2-1x +1
B .y =x 0和y =1
C .f (x )=x 2和g (x )=(x +1)2
D .f (x )=(x )2x 和g (x )=x (x )2
2.若一系列函数的解析式相同,值域相同,但定义域不同,则称这些函数为“孪生函数”,那么函数解析式为y =2x 2-1,值域为{1,7}的“孪生函数”共有( )
A .10个
B .9个
C .8个
D .4个
3.函数y =1-x +x 的定义域为( )
A .{x |x ≤1}
B .{x |x ≥0}
C .{x |x ≥1或x ≤0}
D .{x |0≤x ≤1}
4.函数y =x +1的值域为( )
A .[-1,+∞)
B .[0,+∞)
C .(-∞,0]
D .(-∞,-1]
5.如果f (1x )=x 1-x ,则当x ≠0时,f (x )等于( ) A.1x B.1x -1
C.11-x
D.1x -1 6.已知f (x )=2x +3,g (x +2)=f (x ),则g (x )等于( )
A .2x +1
B .2x -1
C .2x -3
D .2x +7
7.若g (x )=1-2x ,f [g (x )]=1-x 2x 2,则f (12
)的值为( ) A .1 B .15 C .4 D .30
8.已知函数,使函数值为5的x 的值是( )
A .-2
B .2或-52
C .2或-2
D .2或-2或-52
9.如果函数f (x )满足:对任意实数a ,b 都有f (a +b )=f (a )f (b ),且f (1)=1,则f (2)f (1)+f (3)f (2)+f (4)f (3)
+f (5)f (4)+…+f (2 011)f (2 010)
=________. 10.已知函数f (x )=2x -3,x ∈{x ∈N |1≤x ≤5},则函数f (x )的值域为______________.
11.若函数f (x )的定义域是[0,1],则函数f (2x )+f (x +23
)的定义域为________. 12.已知,则f (7)=____________.
13.设则f {f [f (-34
)]}的值为________,f (x )的定义域是______________.
三、解答题
14.已知函数f (1-x 1+x
)=x ,求f (2)的值.
15.已知二次函数f (x )满足f (0)=f (4),且f (x )=0的两根平方和为10,图象过(0,3)点,求f (x )的解析式.
DBDB BBBA 9.2 010 10.{-1,1,3,5,7} 11.[0,13] 12.6
13.32 {x |x ≥-1且x ≠0} 14.解 由1-x
1+x =2,解得x =-13,所以f (2)=-13.
15.解 设f (x )=ax 2+bx +c (a ≠0).
由f (0)=f (4)知⎩⎪⎨⎪⎧
f (0)=c ,
f (4)=16a +4b +c ,f (0)=f (4),得4a +b =0.①
又图象过(0,3)点,所以c =3.②设f (x )=0的两实根为x 1,x 2,
则x 1+x 2=-b a ,x 1·x 2=c a .
所以x 21+x 22=(x 1+x 2)2-2x 1x 2=(-b a )2-2·c a =10.
即b 2-2ac =10a 2.③
由①②③得a =1,b =-4,c =3.所以f (x )=x 2-4x +3.。