题目内容
已知数列{an}满足[2+(-1)n+1]an+[2+(-1)n]an+1=1+(-1)n•3n,n∈N*,a1=2.
(Ⅰ)求a2,a3的值;
(Ⅱ)设bn=a2n+1-a2n-1,n∈N*,证明:{bn}是等差数列;
(Ⅲ)设cn=an+
n2,求数列{cn}的前n项和Sn.
(Ⅰ)求a2,a3的值;
(Ⅱ)设bn=a2n+1-a2n-1,n∈N*,证明:{bn}是等差数列;
(Ⅲ)设cn=an+
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(Ⅰ)因为数列{an}满足[2+(-1)n+1]an+[2+(-1)n]an+1=1+(-1)n•3n,(*),且a1=2,
所以将n=1代入(*)式,得3a1+a2=-2,故a2=-8
将n=2代入(*)式,得a2+3a3=7,故a3=5
(Ⅱ)证明:在(*)式中,用2n代换n,得[2+(-1)2n+1]a2n+[2+(-1)2n]a2n+1=1+(-1)2n•6n,
即a2n+3a2n+1=1+6n ①,
再在(*)式中,用2n-1代换n,得[2+(-1)2n]a2n-1+[2+(-1)2n-1]a2n=1+(-1)2n-1•(6n-3),
即3a2n-1+a2n=4-6n②,
①-②,得3(a2n+1-a2n-1)=12n-3,即bn=4n-1
∴bn+1-bn=4,
∴{bn}是等差数列;
(Ⅲ)因为a1=2,由(Ⅱ)知,a2k-1=a1+(a3-a1)+…+(a2k-1-a2k-3)=(k-1)(2k-1)+2 ③,
将③代入②,得3(k-1)(2k-1)+6+a2k=4-6k,即a2k=-6k2+3k-5
所以c2k-1=a2k-1+
(2k-1)2=-4k2-5k+
,c2k=a2k+
(2k)2=-4k2+3k-5,
则c2k-1+c2k=-2k-
,
所以S2k=(c1+c2)+(c3+c4)+…+(c2k-1+c2k)=-k2-
k
所以S2k-1=S2k-c2k=(-k2-
k)-(-4k2+3k-5)=3k2-
+5
故Sn=
.
所以将n=1代入(*)式,得3a1+a2=-2,故a2=-8
将n=2代入(*)式,得a2+3a3=7,故a3=5
(Ⅱ)证明:在(*)式中,用2n代换n,得[2+(-1)2n+1]a2n+[2+(-1)2n]a2n+1=1+(-1)2n•6n,
即a2n+3a2n+1=1+6n ①,
再在(*)式中,用2n-1代换n,得[2+(-1)2n]a2n-1+[2+(-1)2n-1]a2n=1+(-1)2n-1•(6n-3),
即3a2n-1+a2n=4-6n②,
①-②,得3(a2n+1-a2n-1)=12n-3,即bn=4n-1
∴bn+1-bn=4,
∴{bn}是等差数列;
(Ⅲ)因为a1=2,由(Ⅱ)知,a2k-1=a1+(a3-a1)+…+(a2k-1-a2k-3)=(k-1)(2k-1)+2 ③,
将③代入②,得3(k-1)(2k-1)+6+a2k=4-6k,即a2k=-6k2+3k-5
所以c2k-1=a2k-1+
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| 7 |
| 2 |
| 1 |
| 2 |
则c2k-1+c2k=-2k-
| 3 |
| 2 |
所以S2k=(c1+c2)+(c3+c4)+…+(c2k-1+c2k)=-k2-
| 5 |
| 2 |
所以S2k-1=S2k-c2k=(-k2-
| 5 |
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| 11k |
| 2 |
故Sn=
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