解析:电视塔高h =??1
2gt d t =? ????12gt 221=32g . 4.已知f (x )=????? 2x +1,x ∈[-2,2],1+x 2,x ∈[2,4]. 若??k
3f (x )d x =403,则k 的值为( ) A .0
B .0或-1
C .0或1
D .-1
答案:B 解析:∵??23f (x )d x =??23(1+x 2)d x =223<403,∴当k ≥2时,??k 3f (x )d x <403,∴k <2,∴??k
3
f (x )d x =??k 2(2x +1)d x +??23(x 2+1)d x =403
,化简得k 2+k =0,解得k =0或k =-1. 5.若f (x )=?????
lg x ,x >0,x +??0
a 3t 2d t ,x ≤0,f (f (1))=1,则a 的值为( ) A .1
B .2
C .-1
D .-2 答案:A 解析:因为f (1)=lg 1=0,f (0)=??0a 3t 2d t =t 3a 0=a 3,由f (f (1))=1,得a 3=1,a =1.
6.若S 1=??12x 2d x ,S 2=??121x d x ,S 3=??1
2e x d x ,则S 1,S 2,S 3的大小关系为( ) A .S 1<S 2<S 3
B .S 2<S 1<S 3
C .S 2<S 3<S 1
D .S 3<S 2<S 1
答案:B 解析:S 1=??12x 2d x =13x 321=73,S 2=??121x d x =ln 2,S 3=??1
2e x d x =e 2-e ,∵e 2-e =e(e -1)>e >73
>ln 2,∴S 2<S 1<S 3. 7.设f (x )=????? x 2,x ∈[0,1],1x
,x ∈,e](其中e 为自然对数的底数),则??0e f (x )d x 的值为( )
A.43 B .2