且2a1?1?2?0, ?????????3分 ∴?2an?1?是“2级创新数列” ?????????4分 (2)由正数数列?bn?是“k级创新数列”,得bn+1?bkn?k?0,1?,且bn?0
∴lgbn+1?klgbn, ?????????6分 ∴?lgbn?是等比数列,且首项lgb1?1,公比q?k; ∴lgbn?lgb1?qn?1?kn?1; ?????????7分
由Tn?bb12?bn?lgTn?lgb1?lgb2???lgbn
?????????9分
1?kn?1?k?k2???kn?1?1?kn1?k,∴T?101?k?n?N?n? ????????10分
1?kn(3)由k???,cn?1n?1lgTnn??logbnTn??lgb??n?11?kn?1 nkn?1n?????n?11?k?1????n??????????n??nkn?1?kn??; ????????12分????n?1???n???? ??????????2由?,?是方程x2?x?1?0的两根,∴???????12?1;????????14分
????? ∴c?n?1??n?1?n??n11n?1?cn??????????????n?1??n???n??n? ?1?n?2??n?2n?????????1???n???1????????cn?2.???????16分
21、(本题满分18分,第1小题满分4分,第2小题满分6分,第3小题满分8分)
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对于定义域为R的函数g?x?,若函数sin??g?x???是奇函数,则称g?x?为正弦奇函数. 已知f?x?是单调递增的正弦奇函数,其值域为R,f?0??0.
(1)已知g?x?是正弦奇函数,证明:“u0为方程sin??g?x????1的解”的充要条件是
“?u0为方程sin??g?x?????1的解”; (2)若f?a??π2,f?b???π2,求a?b的值;
(3)证明:f?x?是奇函数. 证明:(1) 必要性:
u0为方程sin??g?x????1的解,即sin??g?u0????1,故sin??g??u0?????sin??g?u0?????1,即?u0为方程sin??g?x?????1的解.???????????????????2分
充分性:
?u0为方程sin??g?x?????1的解,即sin??g??u0?????1,故?sin??g?u0?????1,
sin??g?u0????1,即u0为方程sin??g?x????1的解. ????????????4分
(2)因为f?b??f?0??f?a?,由f?x?单调递增,可知b?0?a. ????????5分
由(1)可知,若函数f?x?是正弦奇函数,
则当a为方程sin??f?x????1的解,必有?a为方程sin??f?x?????1的解,
?sin??f??a?????1,即f??a??2mπ?π2?m?Z?, 而?a?0,故f??a??f?0??0,从而f??a???π2?f?b???a?b, 即a?b?0; ????????7分 同理f??b??2nπ?π2?n?Z?,f??b??f?0?,故f??b??π2?f?a???b?a, 即a?b?0; ??????????9分 综上,a?b?0. ??????????10分
(3)f?x?的值域为R且单调递增,故对任意c?R,存在唯一的x0,使得f?x0??c.
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????11分
可设f?aπ2f?b?π?n??nπ?,n?????nπ?2???n?N*?,下证an?bn?0?n?N*?.
当n?1时,由(2)知a1?b1?0,命题成立; ????????????12分 假设n?k时命题成立,即a1?b1?0,?,ak?bk?0,而由f?x?的单调性 知bk?1?bk???b1?0?a1???ak?ak?1,知?ak?1?bk,?bk?1?ak,
则当n?k?1时,ak?1为方程sinf?x???1的解,故?ak?1为方程sinf?x???1的解, 且由单调性知f??ak?1??f?bk?,故f??ak?1??f?bk?1?,得?ak?1?bk?1;
同理?bk?1?ak?1,故ak?1?bk?1?0. ?????????????????14分 要证f?x?是奇函数,只需证:对任意x?0,都有f??x???f?x?.
记a?0,若x?a?*??x???????0?b0nn?N,则?x?bn,f??n??2????f?an???f?x?;
????????????????????15分
若x??a?ππ?2n,a2n?1??n?N?,则f?x????2n??2,2n??2??,
?f?x?????????2nπ?π?2??,????2nπ?π?2????,?x??b??π??π??2n?1,b2n?,f??x?????2nπ??,??2nπ???,
???2??2??而正弦函数在???????2n??π?2??,????2n??π??2???上单调递增,
?故由sinf??x???sinf?x??sin??f?x??得f??x???f?x?.
若x??a2n?1,a2n?2??n?N?,同理可证得f??x???f?x?. ???????17分 综上,对任意x?0,都有f??x???f?x?.故f?x?是奇函数. ?????18分 13

