数列{an}的前几项和为Sn,且满足a1=1 2,an=-2
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1、Sn=(a1+an)n/2所以nan/Sn=2an/(a1+an)=2[a1+(n-1)d]/[2a1+(n-1)d]上下除以(n-1)=2[a1/(n-1)+d]/[2a1/(n-1)+d]n-
n=1时,S1=a1=2a1-1,a1=1n≥2时,an=Sn-S(n-1)=(2an-1)-(2a(n-1)-1)an=2a(n-1),故an=2^(n-1).
当n=1时,b1=5+a1;当n≥2时,bn=5^n-(-1)^n×3(a1+1)×4^﹙n-2﹚(a1>-1).①当n为偶数时,5^n-3(a1+1)×4^(n-2)<5^n+1+3(a1+1)×4
∵Sn-Sn-1=-anSn-Sn-1=-an/2∴d=1/Sn-1/Sn-1=(Sn-Sn-1)/SnSn-1=21/S1=1/a1=2∴{1/Sn}为首项=2,公差=2的等差数列
3乘2的n次方减3.3*2^n-3再问:怎么求、再答:先代入1,因为s1=a1,s1=2a1-3,求出a1等于3,再写一个式子,Sn-1=2a(n-1)-3(n-1),用第一个式子减这个式子,得到Sn
证:(1)根号Sn+1=(a1+1)*2^(n-1)=4*2^(n-1)=2^(n+1)Sn+1=2^(2n+2)=4^(n+1).1Sn=4^n.21式-2式Sn+1-Sn=4^(n+1)-4^na
(1)当n=1时,a1=S1=13(a1−1),得a1=−12;当n=2时,S2=a1+a2=13(a2−1),得a2=14,同理可得a3=−18.(2)当n≥2时,an=Sn−Sn−1=13(an−
a1=1s1=1s(n+1)=sn+a(n+1)=sn+an+6,a(n+1)=an+6是个等差数列an=1+6*(n-1)=6n-5
设数列{an}的前n项和为Sn,Sn=a1(3n−1)2(对于所有n≥1),则a4=S4-S3=a1(81−1)2−a1(27−1)2=27a1,且a4=54,则a1=2故答案为2
因为Sn+Sn-1=3an所以Sn-1+Sn-1+an=3an2Sn-1=2anSn-1=an因为Sn=an+1所以Sn-Sn-1=an+1-anan=an+1-an2an=an+1an+1/an=2
因为an,Sn,an^2成等差数列所以2Sn=an^2+an2an=2Sn-2S(n-1)=an^2+an-a(n-1)^2-a(n-1)得:(an-a(n-1))(an+a(n-1))-(an+a(
∵数列{an}的前n项和为Sn,Sn=1-23an,∴a1=s1=1-23a1,解得 a1=35.且n≥2时,an=Sn-Sn-1=(1-23an)-(1-23an-1)=23an-1-23
证明:由已知得:Sn+1=2^nSn=2^n-1an/a(n-1)=[sn-s(n-1]/[s(n-1)-S(n-2)]=[2^n-1-2^(n-1)+1]/[2^(n-1)-1-2^(n-2)+1]
解题思路:方法:数列通项的求法:已知sn,求an。求和:错位相减法。解题过程:
an+Sn=2n令n=1a1+S1=2=>a1=1又a(n-1)+S(n-1)=2(n-1)与上式作差an-a(n-1)+an=22an-a(n-1)=2an-2=(1/2)[a(n-1)-2]得证a
a(n+1)=2S(n)=S(n+1)-S(n),S(n+1)=3S(n),{S(n)}是首项为S(1)=a(1)=1,公比为3的等比数列.S(n)=3^(n-1),n=1,2,...a(n+1)=2
当n≥2时,可以化为Sn-S(n-1)=-2Sn×S(n-1),两边同除以Sn×S(n-1),得1/Sn-1/S(n-1)=2所以{1/Sn}是以2为首项,2为公差的等差数列即1/Sn=2nSn=1/
嗯,我赞同各位大哥的方法,下面是我个人的思路,不知对不对,希望大家能够多多指教,sn=n^2-4n+1Sn-1=(n-1)^2-4(n-1)+1两式相减为an=n^2-(n-1)^2-4化简为an=2
解题思路:考查数列的通项,考查等差数列的证明,考查数列的求和,考查存在性问题的探究,考查分离参数法的运用解题过程:
Sn-S(n-1)=2An-2A(n-1)=An所以An=2A(n-1)An/2A(n-1)=2即An为等比为2的等比数列令n=1,S1=3+2A1=A1A1=-3所以An=-3*[2^(n-1)]