数列综合考向1等差数列与等比数列的综合应用1.已知{an}为等差数列且公差d≠0,其首项a1=20,且a3,a7,a9成等比数列,Sn为{an}的前n项和,n∈N*,则S10的值为()A.-110B.-90C.90D.110【解析】由a3,a7,a9成等比数列,则a3a9=(a7)2,即(a1+2d)(a1+8d)=(a1+6d)2,化简可得2a1d+20d2=0,由a1=20,d≠0,解得d=-2
则S10=10a1+×(-2)=110
【答案】D2.设数列{an}是以3为首项,1为公差的等差数列,{bn}是以1为首项,2为公比的等比数列,则ba1+ba2+ba3+ba4=()A.15B.60C.63D.72【解析】数列{an}是以3为首项,1为公差的等差数列,则an=3+(n-1)×1=n+2,{bn}是以1为首项,2为公比的等比数列,则bn=2n-1,则ba1+ba2+ba3+ba4=b3+b4+b5+b6=22+23+24+25=60
【答案】B3.已知{an}是等差数列,其前n项和为Sn,{bn}是等比数列(bn>0),且a1=b1=2,a3+b3=16,S4+b3=34
(1)求数列{an}与{bn}的通项公式;(2)记Tn为数列{anbn}的前n项和,求Tn
【解】(1)设数列{an}的公差为d,数列{bn}的公比为q,由已知q>0, a1=b1=2,a3+b3=16,S4+b3=34
∴⇒∴an=a1+(n-1)d=2+3(n-1)=3n-1,bn=b1qn-1=2n
(2)Tn=2×2+5×22+…+(3n-1)×2n,2Tn=2×22+5×23+…+(3n-1)×2n+1,两式相减得-Tn=4+3×22+…+3×2n-(3n-1)×2n+1=4+-(3n-1)×2n+1=-8-(3n-4)2n+1
∴Tn=(3n-4)2n+1+8
等差数列、等比数列综合
