题目内容
19.在数列{an}及{bn}中,an+1=an+bn+$\sqrt{a_n^2+b_n^2}$,bn+1=an+bn-$\sqrt{a_n^2+b_n^2}$,a1=1,b1=1.设${c_n}={2^n}({\frac{1}{a_n}+\frac{1}{b_n}})$,则数列{cn}的前n项和为2n+2-4.分析 由an+1=an+bn+$\sqrt{a_n^2+b_n^2}$,bn+1=an+bn-$\sqrt{a_n^2+b_n^2}$,a1=1,b1=1.可得an+1+bn+1=2(an+bn),a1+b1=2.an+1bn+1=$({a}_{n}+{b}_{n})^{2}$-$({a}_{n}^{2}+{b}_{n}^{2})$=2anbn,即anbn=2n-1.分别利用等比数列的通项公式即可得出.
解答 解:∵an+1=an+bn+$\sqrt{a_n^2+b_n^2}$,bn+1=an+bn-$\sqrt{a_n^2+b_n^2}$,a1=1,b1=1.
∴an+1+bn+1=2(an+bn),a1+b1=2.
∴an+bn=2n.
另一方面:an+1bn+1=$({a}_{n}+{b}_{n})^{2}$-$({a}_{n}^{2}+{b}_{n}^{2})$=2anbn,
∴anbn=2n-1.
∴${c_n}={2^n}({\frac{1}{a_n}+\frac{1}{b_n}})$=${2}^{n}•\frac{{a}_{n}+{b}_{n}}{{a}_{n}{b}_{n}}$=2n•$\frac{{2}^{n}}{{2}^{n-1}}$=2n+1,
则数列{cn}的前n项和=$\frac{4({2}^{n}-1)}{2-1}$=2n+2-4.
故答案为:2n+2-4.
点评 本题考查了数列递推关系、等比数列的通项公式与求和公式,考查了推理能力与计算能力,属于中档题.
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