题目内容
16.若数列{an},{bn},{cn}满足cn=$\left\{\begin{array}{l}{{a}_{n},n是奇数}\\{{b}_{n},n是偶数}\end{array}$,则称数列{cn}是数列{an}和{bn}的调和数列.已知数列{an}的通项为an=2n+n,数列{bn}满足$\left\{\begin{array}{l}{a_n}={b_n},n=1\\{a_{n-1}}+{a_n}=-{b_n},n≥2\end{array}$,若数列{an}和{bn}的调和数列{cn}的前n项和为Tn,则T8+T9=-199.分析 先求出bn=$\left\{\begin{array}{l}{3,n=1}\\{-3•{2}^{n-1}-2n+1,n≥2}\end{array}\right.$,再求出cn=$\left\{\begin{array}{l}{{2}^{n}+n,n是奇数}\\{-3•{2}^{n-1}-2n+1,n是偶数}\end{array}\right.$,由此能求出T8+T9的值.
解答 解:∵cn=$\left\{\begin{array}{l}{{a}_{n},n是奇数}\\{{b}_{n},n是偶数}\end{array}$,且an=2n+n,数列{bn}满足$\left\{\begin{array}{l}{a_n}={b_n},n=1\\{a_{n-1}}+{a_n}=-{b_n},n≥2\end{array}$,
∴bn=$\left\{\begin{array}{l}{3,n=1}\\{-3•{2}^{n-1}-2n+1,n≥2}\end{array}\right.$,
∴cn=$\left\{\begin{array}{l}{{2}^{n}+n,n是奇数}\\{-3•{2}^{n-1}-2n+1,n是偶数}\end{array}\right.$,
当n是偶数时,Tn=(2+1)+(23+3)+(25+5)+…+[2n-1+(n-1)]-(3•2+3)-(3•23+7)-…-[3•2n-1+(2n-1)]
=$\frac{2}{3}$(2n-1)+$\frac{{n}^{2}}{4}$-[${2}^{n+1}-2+\frac{n(n+1)}{2}$]
=-$\frac{1}{3}•{2}^{n+2}-\frac{{n}^{2}+2n}{4}+\frac{4}{3}$,
∴T8=-$\frac{1}{3}×{2}^{10}-\frac{{8}^{2}+2×8}{4}+\frac{4}{3}$=-360,
T9=T8+a9=-360+29+9=161,
∴T8+T9=-360+161=-199.
故答案为:-199.
点评 本题考查数列的前8项和与前9项和的和的求法,是中档题,解题时要认真审题,注意项数为奇数和项数为偶数的不同情况的分类讨论和数列性质的合理运用.
| A. | $(0,\sqrt{3})$ | B. | $(-\sqrt{3},0)$ | C. | $(-\sqrt{3},\sqrt{3}]$ | D. | $(-\sqrt{3},\sqrt{3})$ |
| A. | 16π | B. | $2\sqrt{3}$ | C. | π | D. | 32π |
| A. | $\frac{4}{3}π$ | B. | 4π | C. | 8π | D. | 16π |
| A. | 锐角三角形 | B. | 等腰三角形 | ||
| C. | 直角三角形 | D. | 等腰或直角三角形 |
| A. | 充分不必要条件 | B. | 必要不充分条件 | ||
| C. | 充要条件 | D. | 既不充分也不必要条件 |