an?1?an?1 ? an?1?an?d?1? an?a1??n?1??1?n?5直线l:y?2x?1, ? bn?2n?1??n?5, ?n为奇数?(Ⅱ)f?n??? 2n?1, n为偶数????
当k为偶数时,k?27为奇数, ? f?k?27??4f?k?? k?27?5?4?2k?1?, ? k?4当k为奇数时,k?27为偶数,? 2?k?27??1?4?k?5?, ? k?综上,存在唯一的k?4符合条件。(Ⅲ)由
35?舍去?2an?1?1??1??1??1???1????1???b1??b2??bn??ann?2?an?0即a??1??1??1?1?1??1???????2n?3?b1??b2??bn?1?1??1??1??1???1????1??2n?3?b1??b2??bn?1?1??1??1??1?1?1??1?1?????????2n?5?b1??b2??bn??bn?1?12n?3?1?2n?32n?42n?4??1?????2n?5?bn?1?2n?52n?32n?5?2n?3 ?1记f?n??? f?n?1??? ?f?n?1?f?n?2?4n2?16n?164n?16n?15? f?n?1??f?n?, 即f?n?递增,? f?n?min?f?1??? 0?a?4515n?1445?,5315?例41 已知等比数列?an?的前n项和为Sn?2?3?k(k?R,n?N) (Ⅰ)求数列?an?的通项公式; (Ⅱ)设数列?bn?满足an?4(5?k)并证明你的结论.
解:(Ⅰ)由Sn?2?3n?k(k?R,n?N?)得:n?2时,an?Sn?Sn?1?4?3n?1anbn,Tn为数列?bn? 的前n项和,试比较3?16Tn 与 4(n?1)bn?1的大小,
??an?是等比数列,?a1?S1?6?k?4?k??2,得 an?4?3n?1(n?N?)
(Ⅱ)由an?4(5?k)anbn和an?4?3n?1得bn?n?1
4?3n?1?Tn?b1?b2?b3??bn?1?bn?12n?2n?1??????(1)2n?2n?14?34?34?34?3
123n?2n?13Tn??????????(2)2n?3n?244?34?34?34?311111n?1??????? 44?34?324?3n?34?3n?24?3n?111111n?132n?1?Tn????????????10分
88?38?328?3n?38?3n?28?3n?11616?3n?1n(n?1)2n?1n(n?1)?3(2n?1)4(n?1)bn?1?(3?16Tn)??n?1? nn333?(2)?(1):2Tn??n(n?1)?3(2n?1)?n2?5n?3?当n?5?375?37?0时 或n?22?有n(n?1)?3(2n?1),所以当n?5(n?N)时有3?16Tn?4(n?1)bn?1那么同理可得:
当
5?375?37??n?时有n(n?1)?3(2n?1),所以当1?n?5(n?N)时有3?16Tn?4(n?1)bn?1 22??综上:当n?5(n?N)时有3?16Tn?4(n?1)bn?1;当1?n?5(n?N)时有3?16Tn?4(n?1)bn?1 例42 已知数列?an?中,a1?3,a2?5,其前n项和Sn满足Sn?Sn?2?2Sn?1?2n?1?n≥3?.令bn?(Ⅰ)求数列?an?的通项公式;
(Ⅱ)若f?x??2x?1,求证:Tn?b1f?1??b2f?2????bnf?n??(Ⅲ)令Tn?1.
an?an?1
1(n≥1); 61b1a?b2a2?b3a3???bnan?(a?0),求同时满足下列两个条件的所有a的值:①对于任意正?21?1?整数n,都有Tn?;②对于任意的m??0,?,均存在n0?N?,使得n≥n0时,Tn?m.
6?6?
n?1n?1解:(Ⅰ)由题意知Sn?Sn?1?Sn?1?Sn?2?2?n≥3?即an?an?1?2?n≥3?
∴an??an?an?1???an?1?an?2?????a3?a2??a2
?2n?1?2n?2???22?5?2n?1?2n?2???22?2?1?2?2n?1?n≥3?
检验知n?1、2时,结论也成立,故an?2n?1.
n?1n11?2?1???2?1?1?11?n?1?2????(Ⅱ)由于bnf?n??n?n? n?1n?1nn?1222?12?12?12?12?12?1??????????故Tn?b1f?1??b2f?2????bnf?n??1??11??11?1???1??????????n?? 2?23?n?12?1?21?21?21?22?12?1????????1?11?111???n?1?. ???2?1?22?1?21?2611,即条件①满足;又0?m?, 661?11?3?3?n?1?n?1?m?2??1?n?log?1??1?0. ∴Tn?m??2??2?1?22?1?1?6m?1?6m??3??1?的最大整数,则当n≥n0时,Tn?m.?9′ 取n0等于不超过log2??1?6m?(Ⅲ)(ⅰ)当a?2时,由(Ⅱ)知:Tn?an?a?aaaa(ⅱ)当a?2时,∵n≥1,n???≥,∴an≥?2n,∴bn?an≥bn??2n??bn?2n.
2?2?2222na1?11??1i?an?n?1?. ∴Tn???bia?≥??bi?2i?1????22?1?22?1??2i?1i?1?21?11?1?n?1由(ⅰ)知存在n0?N?,当n≥n0时,?, ??2?1?22?1?3a故存在n0?N?,当n≥n0时,Tn?na1?11?a11???n?1?,不满足条件. ???22?1?22?1?23a6nan?a?aaaa(ⅲ)当0?a?2时,∵n≥1,n???≤,∴an≤?2n,∴bn?an≤bn??2n??bn?2n.
2?2?2222nn1aa1?11?i?n?1∴Tn???bia?≤??bi2i?1?????.
22221?22?1??i?1i?1a?1?a1?11?a?n?1取m???0,?,若存在n0?N?,当n≥n0时,Tn?m,则????.
12?6?22?1?22?1?12111∴?n?1?矛盾. 故不存在n0?N?,当n≥n0时,Tn?m.不满足条件. 1?22?13综上所述:只有a?2时满足条件,故a?2.
例43 已知数列?an?满足a1?(1)求a2,a3,a4; (2)已知存在实数?,使??n?1??2an?n?n?N?. 1,an?1???2an?4n?an??n??为公差为?1的等差数列,求?的值;
?an?n?23?1. 12(3)记bn?13n?22?n?N??,数列?bn?的前n项和为Sn,求证:Sn??an?2
解:(1)?a1?(2)
138,由数列?an?的递推公式得a2?0,a3??,a4?? 245(n?1)(2an?n)??(n?1)an?4na??n(??2)an?(4??1)nan??n??1an?1??(n?1)an??n?n===???(n?1)(2a?n)an?nan?1?n?1an?n3an?3nan?n3 n?n?1an?4n?a??n???1??1??1,得???2 ?数列?n为公差是的等差数列.由题意,令?3a?n3?n??n2?2nan??na1?2(3)由(2)知 ??(n?1)(?1)??n,所以an?n?1an?na1?1此时bn?1?n?3111==[?], n?22n?2n?2n2?(n?1)?2(n?2)(3)n(n?2)(3)(n?2)(3)n32?n?31111111???Sn?[????????423532(3)?33(3)?4(3)?2(3)?5(3)?3
111111111123?1[?? =>?]??](??)??212 36(3)n?1?(n?1)(3)n?2?(n?2)2(3)n?2?(n?2)(3)n?n36例44 已知数列{an},a1?a2?2,an?1?an?2an?1(n?2) (Ⅰ)求数列{an}的通项公式an (Ⅱ)当n?2时,求证:
2111??...??3 a1a2an*(Ⅲ)若函数f(x)满足:f(1)?a1,f(n?1)?f(n)?f(n).(n?N)求证:解: (1) ?an?1?an?2an?1,两边加an得: an?1?an?2(an?an?1)(n?2),
?k?1n11?.
f(k)?12?{an?1?an} 是以2为公比, a1?a2?4为首项的等比数列. ?an?1?an?4?2n?1?2?2n??① 由an?1?an?2an?1两边减2an得: an?1?2an??(an?2an?1)(n?2) ?{an?1?2an} 是以?1 为公比, a2?2a1??2为首项的等比数列. ?an?1?2an??2?(?1)n?1?2?(?1)n
2①-②得: 3an?2[2n?(?1)n] 所以,所求通项为an?[2n?(?1)n]????5分
31131132n?1?2n???[?]??an?1an22n?1?12n?122n?1?2n?2n?2n?1?132?232?2311??n?1n???(?)(n?2)n?1n?1nn?1n22?2?2?122?2222n?1nn?1n(2) 当n为偶数时,
11?n111311131???...??(1??2?...?n)??2?3?3?n?3 a1a2an222221?122当n为奇数时,?an?12n[2?(?1)n]?0,?an?1?0,?0,又n?1为偶数 3an?1?由(1)知,
1111111??...????...???3 a1a2ana1a2anan?1(3)证明:?f(n?1)?f(n)?f2(n)?0?f(n?1)?f(n),?f(n?1)?f(n)?f(n?1)?????f(1)?2?0 又
11111111?2????? ?
f(n?1)f(n)?f(n)f(n)[f(n)?1]f(n)f(n)?1f(n)?1f(n)f(n?1)n1111111?[?]?[?]?????[?]f(1)f(2)f(2)f(3)f(n)f(n?1)k?1f(k)?11111????.f(1)f(n?1)f(1)2?x?0 ?例45 设不等式组?y?0所表示的平面区域为Dn,记Dn内的格点(格点即横坐标和纵坐标均为整数的
?y点)的个数为f(n)(nN*). ??nx?3n?∈?? (1)求f(1)、f(2)的值及f(n)的表达式;
n
(2)设bn=2f(n),Sn为{bn}的前n项和,求Sn;
(3)记Tn?f(n)f(n?1),若对于一切正整数n,总有Tn≤m成立,求实数m的取值范围.
2nn
解:(1)f(1)=3, f(2)=6当x=1时,y=2n,可取格点2n个;当x=2时,y=n,可取格点n个 ∴f(n)=3n (2)由题意知:bn=3n·2
2
3
Sn=3·21+6·22+9·23+?+3(n-1)·2n-1+3n·2n
n
n+1
∴2Sn=3·2+6·2+?+3(n-1)·2+3n·2
1
2
3
n
n+1
2?2n?1?3n2n?1 =3(2n+1-2)-3nn+1 ∴-Sn=3·2+3·2+3·2+?3·2-3n·2 =3(2+2+?+2)-3n·2=3·
1?22
n
n+1
∴-Sn=(3-3n)2n+1-6 Sn=6+(3n-3)2n+1
(3)Tn?f(n)f(n?1)3n(3n?3)?
2n2n(3n?3)(3n?6)n?1Tn?1n?22???3n(3n?3)Tn2n2nn?2?1 当n?1时, 2nn?2当n?2时,?12nn?2当n?3时,?12n ∴T1
(Ⅱ)证明:|xn?1-xn|≤()证明(1)由x1?1265n?1。
112513 及xn+1?得x2??x4?,x4?21?xn3821由x2?x4?x6猜想:数列?x2n?是递减数列 下面用数学归纳法证明: (1)当n=1时,已证命题成立 (2)假设当n=k时命题成立,即x2k?x2k?2 易知x2k?0,那么x2k?2?x2k?4?x2k?3?x2k?111??
1?x2k?11?x2k?3(1?x2k?1)(1?x2k?3)=
x2k?x2k?2?0 即x2(k?1)?x2(k?1)?2
(1?x2k)(1?x2k?1)(1?x2k?2)(1?x2k?3)也就是说,当n=k+1时命题也成立,结合(1)和(2)知,命题成立