10.正項數(shù)列{an}前n項和為Sn�����,且$a_n^2=4{S_n}-2{a_n}-1$(n∈N+)
(1)求數(shù)列{an}的通項公式���;
(2)若${b_n}=\frac{{4{{(-1)}^{n+1}}{a_{n+1}}}}{{({a_n}+1)({a_{n+1}}+1)}}$���,數(shù)列{bn}的前n項和為Tn�,證明:T2n-1>1>T2n(n∈N+).
分析 (1)在$a_n^2=4{S_n}-2{a_n}-1$中令n=1可知a1=1���;當n≥2時����,利用$a_n^2=4{S_n}-2{a_n}-1$與$a_{n-1}^2=4{S_{n-1}}-2{a_{n-1}}-1$作差�����,整理可知an-an-1=2�����,進而計算可得結論�;
(2)通過(1)裂項�,分奇數(shù)、偶數(shù)兩種情況討論即可.
解答 (1)解:依題意���,當n=1時��,a1=1��;
當n≥2時��,因為an>0���,$a_n^2=4{S_n}-2{a_n}-1$��,
所以$a_{n-1}^2=4{S_{n-1}}-2{a_{n-1}}-1$����,
兩式相減����,整理得:an-an-1=2,
所以數(shù)列{an}是以1為首項��、2為公差的等差數(shù)列�,
所以an=2n-1;
(2)證明:由(1)可知${b_n}=\frac{{4{{(-1)}^{n+1}}{a_{n+1}}}}{{({a_n}+1)({a_{n+1}}+1)}}=\frac{{{{(-1)}^{n+1}}(2n+1)}}{n(n+1)}={(-1)^{n+1}}(\frac{1}{n}+\frac{1}{n+1})$���,
所以${T_{2n-1}}=(1+\frac{1}{2})-(\frac{1}{2}+\frac{1}{3})+…+(\frac{1}{2n-1}+\frac{1}{2n})=1+\frac{1}{2n}>1$����,
${T_{2n}}=(1+\frac{1}{2})-(\frac{1}{2}+\frac{1}{3})+…-(\frac{1}{2n}+\frac{1}{2n+1})=1-\frac{1}{2n+1}<1$�,
所以T2n-1>1>T2n(n∈N+).
點評 本題考查數(shù)列的通項及前n項和,考查分類討論的思想,注意解題方法的積累��,屬于中檔題.
