课时提升练(三十)数列的综合应用一、选择题1.已知等比数列{an}中,各项都是正数,且a1,a3,2a2成等差数列,则的值为()A.1+B.1-C.3+2D.3-2【解析】设{an}的公比为q, a1,a3,2a2成等差数列.∴a3=a1+2a2,∴a1q2=a1+2a1q,∴q2-2q-1=0,∴q=1±, 各项均为正数,∴q>0,∴q=1+,∴=q2=3+2.【答案】C2.已知各项不为0的等差数列{an},满足2a3-a+2a11=0,数列{bn}是等比数列,且b7=a7,则b6b8=()A.2B.4C.8D.16【解析】 数列{an}是等差数列,∴a3+a11=2a7,由2a3-a+2a11=0得4a7-a=0,又an≠0,∴a7=4,∴b6b8=b=42=16.【答案】D3.已知正项等差数列{an}满足:an+1+an-1=a(n≥2),等比数列{bn}满足:bn+1bn-1=2bn(n≥2),则log2(a2+b2)=()A.-1或2B.0或2C.2D.1【解析】由题意知,an+1+an-1=2an=a.∴an=2(n≥2),又 bn+1bn-1=b=2bn(n≥2),∴bn=2(n≥2),∴log2(a2+b2)=log24=2.【答案】C4.已知数列{an}满足:a1=m(m为正整数),an+1=若a6=1,则m所有可能的取值为()A.{4,5}B.{4,32}C.{4,5,32}D.{5,32}【解析】注意递推的条件是an为偶数或奇数,而不是n为偶数或奇数,故由a6=1往前递推可得a1=4或5或32.【答案】C5.已知函数f(x)=若数列{an}满足an=f(n)(n∈N*),且{an}是递增数列,则实数a的取值范围是()A.B.C.(2,3)D.(1,3)【解析】数列{an}满足an=f(n)(n∈N*),则函数f(n)为增函数.所以解得2<a<3.【答案】C6.植树节某班20名同学在一段直线公路一侧植树,每人植一棵,相邻两棵树相距10米,1开始时需将树苗集中放置在某一树坑旁边,现将树坑从1到20依次编号,为使各位同学从各自树坑前来领取树苗所走的路程总和最小,树苗可以放置的两个最佳坑位的编号为()A.①和⑳B.⑨和○C.⑨和⑪D.○和⑪【解析】设树苗放在第i个树坑旁边(如图所示)则各个树坑到第i个树坑距离的和是S=10(i-1)+10(i-2)+…+10(i-i)+10[(i+1)-i]+…+10(20-i)=10=10(i2-21i+210).∴当i=10或11时,S有最小值.【答案】D二、填空题7.(2014·安徽高考)数列{an}是等差数列,若a1+1,a3+3,a5+5构成公比为q的等比数列,则q=________.【解析】设等差数列的公差为d,则a3=a1+2d,a5=a1+4d,∴(a1+2d+3)2=(a1+1)(a1+4d+5),解得d=-1,∴q===1.【答案】18.(2014·福建高考改编)在等比数列{an}中,a2=3,a5=81.设bn=log3an.则数列{bn}的前n项和Sn=________.【解析】设{an}的公比为q,依题意得解得因此,an=3n-1.因为bn=log3an=n-1,所以数列{bn}的前n项和Sn==.【答案】9.已知数列{an}满足3an+1+an=4(n∈N*)且a1=9,其前n项和为Sn,则满足不等式|Sn-n-6|<的最小正整数n是________.【解析】由3an+1+an=4得,an+1-1=-(an-1)(运用构造数列法),∴{an-1}是以a1-1=8为首项,-为公比的等比数列,∴an-1=8·n-1,∴an=8×n-1+1.∴Sn=8+n=8×+n=6-n×6+n,∴|Sn-n-6|=|n×6|=n×6<,即3n>750.将n=5,6,7分别代入验证符合题意的最小正整数n=7.【答案】7三、解答题10.(2014·湖南高考)已知数列{an}满足a1=1,|an+1-an|=pn,n∈N*.(1)若{an}是递增数列,且a1,2a2,3a3成等差数列,求p的值;(2)若p=,且{a2n-1}是递增数列,{a2n}是递减数列,求数列{an}的通项公式.2【解】(1)因为{an}是递增数列,所以an+1-an=|an+1-an|=pn.而a1=1,因此a2=p+1,a3=p2+p+1.又a1,2a2,3a3成等差数列,所以4a2=a1+3a3,因而3p2-p=0,解得p=,p=0.当p=0时,an+1=an,这与{an}是递增数列矛盾.故p=.(2)由于{a2n-1}是递增数列,因而a2n+1-a2n-1>0,于是(a2n+1-a2n)+(a2n-a2n-1)>0.①但<,所以|a2n+1-a2n|<|a2n-a2n-1|.②由①②知,a2n-a2n-1>0,因此a2n-a2n-1=2n-1=.③因为{a2n}是递减数列,同理可得a2n+1-a2n<0,故a2n+1-a2n=-2n=.④由③④即知,an+1-an=.于是an=a1+(a2-a1)+(a3-a2)+…+(an-an-1)=1+-+…+=1+·=+·.故数列{an}的通项公式为an=+·.11.已知二次函数f(x)=ax2+bx的图像过...
