【答案】(Ⅰ)見解析(Ⅱ)(﹣∞����,14).
【解析】
(Ⅰ)當n≥2時�����,由4Sn﹣4n+1=an2,類比可得4Sn﹣1﹣4(n﹣1)+1=an﹣12�,兩式相減,再化簡整理可得(an+an﹣1﹣2)(an﹣an﹣1﹣2)=0���,即an+an﹣1﹣2=0�,或an﹣an﹣1﹣2=0����,根據(jù)數(shù)列{an}是遞增數(shù)列可排除不符合題意的一項,即可證明結(jié)論����;
(Ⅱ)先根據(jù)第(Ⅰ)題的結(jié)果計算出數(shù)列{an}的通項公式,以及數(shù)列{bn}的通項公式��,然后運用裂項相消法計算出Tn的表達式��,將Tn的表達式代入不等式���,分離參變量可得λ
(2n+3)[3n+2(﹣1)n+1]��,構(gòu)造數(shù)列{cn}:令cn
(2n+3)[3n+2(﹣1)n+1]��,通過分別對數(shù)列{cn}的奇偶項的單調(diào)性進行分析可得數(shù)列{cn}的最小項的值���,即可得到實數(shù)λ的取值范圍.
(Ⅰ)證明:依題意����,當n≥2時�����,由4Sn﹣4n+1=an2����,可得
4Sn﹣1﹣4(n﹣1)+1=an﹣12,
兩式相減��,可得
4an﹣4=an2﹣an﹣12�,
化簡整理,得
(an+an﹣1﹣2)(an﹣an﹣1﹣2)=0��,
∴an+an﹣1﹣2=0���,或an﹣an﹣1﹣2=0�����,
∵數(shù)列{an}是遞增數(shù)列�����,
∴an≥an﹣1�,則an+an﹣1≥2an﹣1≥2a1=2×3=6��,
∴an+an﹣1﹣2=0不符合題意��,
∴an﹣an﹣1﹣2=0����,即an﹣an﹣1=2,
∴數(shù)列{an}是首項為3��,公差為2的等差數(shù)列.
(Ⅱ)由(Ⅰ)知���,an=3+2(n﹣1)=2n+1�,n∈N*�����,
則bn
(
),
故Tn=b1+b2+…+bn
(
)
(
)
()
(
)
(
)
���,
將Tn代入不等式��,可得λ
n
(﹣1)n+1��,
化簡整理��,得
λ(2n+3)[3n+2(﹣1)n+1]�����,
構(gòu)造數(shù)列{cn}:令cn(2n+3)[3n+2(﹣1)n+1]���,則
①當n為奇數(shù)時,n+2為奇數(shù)�,
cn(2n+3)[3n+2(﹣1)n+1] (2n+3)(3n+2),
cn+2
[2(n+2)+3][3(n+2)+2(﹣1)n+3] (2n+7)(3n+8)�����,
cn+2﹣cn(2n+7)(3n+8)
(2n+3)(3n+2)
�����,
∵n為奇數(shù),∴n2+2n﹣1
0�,
∴cn+2﹣cn0,即cn+2cn����,
∴數(shù)列{cn}的奇數(shù)項為單調(diào)遞增數(shù)列,即c1
c3c5…
②當n為偶數(shù)時���,n+2也為偶數(shù),
cn(2n+3)[3n+2(﹣1)n+1](2n+3)(3n﹣2)�,
cn+2[2(n+2)+3][3(n+2)+2(﹣1)n+3] (2n+7)(3n+4),
cn+2﹣cn(2n+7)(3n+4)(2n+3)(3n﹣2)
0����,
故數(shù)列{cn}的偶數(shù)項為單調(diào)遞增數(shù)列,即c2c4c6…
∵c1=25��,c2=14����,c3=33,c4
�����,
∴λ{cn}min=c2=14,
∴實數(shù)λ的取值范圍為(﹣∞�,14).
