题目内容
5.数列{an}满足a1=1,a2=1,an+2=(1+sin2$\frac{nπ}{2}$)an+2cos2$\frac{nπ}{2}$,则该数列的前20项和为1123.分析 分别取n为奇数和偶数可得奇数项是以a1=1,公比为2的等比数列,偶数项是以a2=1为首项,公差为2的等差数列.然后利用等差数列与等比数列前n项和求得答案.
解答 解:当n为奇数时,an+2=(1+sin2$\frac{nπ}{2}$)an+2cos2$\frac{nπ}{2}$=2an,
故奇数项是以a1=1,公比为2的等比数列;
当n为偶数时,an+2=(1+sin2$\frac{nπ}{2}$)an+2cos2$\frac{nπ}{2}$=an+2,
故偶数项是以a2=1为首项,公差为2的等差数列.
∴数列的前20项中奇数项和为${S}_{奇}=\frac{1-{2}^{10}}{1-2}={2}^{10}-1$=1023,
数列的前20项中偶数项和为${S}_{偶}=10×1+\frac{10×9}{2}×2=100$.
∴S20=1023+100=1123.
故答案为:1123.
点评 本题考查数列递推式,考查了等差关系与等比关系的确定,训练了等差数列与等比数列前n项和的求法,是中档题.
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