设等差数列前n项和为sn,公比是正数的等比数列
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S4=a1+a2+a3+a4=a2/q+a2+a2*q+a2*q^2S4/a2=1/q+1+q+q^2=7.5
2S(n+2)=Sn+S(n+1)2[Sn+a(n+1)+a(n+2)]=Sn+Sn+a(n+1)2Sn+2a(n+1)+2a(n+2)=2Sn+a(n+1)2a(n+1)+2a(n+2)=a(n+1
设等比数列{an}的公比为q,前n项和为Sn,且Sn+1,Sn,Sn+2成等差数列,则2Sn=Sn+1+Sn+2.若q=1,则Sn=na1,式子显然不成立.若q≠1,则有2a1(1−qn)1−q=a1
(1)∵{An}为等比数列,则有An+1=An·q,又∵Sn+1,Sn,Sn+2成等差数列,∴Sn+1+Sn+2=2Sn∴Sn+An+Sn+An+An·q=2Sn∴可得2+q=0所以q=-2(2)这里
若q=1,则S(n+1)=n+1,Sn=n,S(n+2)=n+2,此时S(n+1),Sn,S(n+2)不成等差数列所以q≠1,则Sn=a1*(1-q^n)/(1-q)a1*[1-q^(n+1)]/(1
a(n)=aq^(n-1),n=1,2,...若q=1.则s(n)=na,n=1,2,...s(n+1)+s(n+2)-2s(n)=(n+1)a+(n+2)a-2na=3a不等于0,矛盾.因此,q不为
因为Sn+1,Sn,Sn+2成等差数列S(n+1)+S(n+2)=2*S(n)(q^(n+1)-1)*a1/(q-1)+(q^(n+2)-1)*a1/(q-1)=2*(q^(n)-1)*a1/(q-1
s4/a4=[a1(1-q^4)/(1-q)]/a1q^3=[(1-q^4)/(1-q)]/q^3=[(1-q)(1+q)(1+q^2)]/(1-q)]/q^3=(1+q)(1+q^2)/q^3=(1
(1)数列{an}是公比不为1的等比数列且a5,a3,a4成等差数列,则2a3=a4+a5,即q^2+q-2=0,解得q=1(舍)或q=-2(2)S(k+2)+S(k+1)=[a1(1-q^(k+2)
a3=1+2db3=3q²所以1+2d+3q²=17T3=b1+b2+b3=3+3q+3q²S3=a1+(a1+d)+(a1+2d)=3+3d所以3+3q+3q²
(1)S5=5a1+10d=5+10d=45,d=4,a3=1+2d=9.T3=b1+b2+b3=1+q+q^2=9-q,则q=-4或q=2.因为q>0,所以q=2.{an}的通项公式为:an=1+4
依据题意,有2*3a2=a1+3+a3+4=7+a1+a3=7+a1+a2+a3-a2=7+7-a2=14-a2.2*3a2=14-a26a2=14-a27a2=14.a2=2.s3=a1+a2+a3
(1)若q=1,则S3=3a,S9=9a,S6=6a;不成等差数列故q≠1,此时由S3,S9S6成等差数列得2S9=S3+S6,2*a1(1-q^9)/(1-q)=a1(1-q)^3/(1-q)+a1
q=1,讨论一下就可以了,首先你写等比求和公式的时候,需要讨论的是q是否为1,假设q=1,你会发现这个结果是可以的,再讨论q不等于1,因为sn-s(n-1)=a1*q^n,对吧?因为sn为等差,那么a
数列{an}为等比数列,首项a1≠0.公比q=1时,Sn=nSn+1=n+1Sn+2=n+22Sn=2nSn+1+Sn+2=2n+32Sn≠Sn+1+Sn+2,不满足题意,因此公比q≠1Sn+1、Sn
An=A(n-1)+dBn=B(n-1)*qq=1时容易求q不等于1时Sn=A1*B1+A2*B2+...+A(n-1)*B(n-1)+An*Bnq*Sn=A1*B1*q+A2*B2*q+...+A(
S3=a1(1-q³)/(1-q),S9=a1(1-q^9)/(1-q),S6=a1(1-q^6)/(1-q),2S9=S3+S6,2a1(1-q^9)/(1-q)=a1(1-q³
由A4=B2得:1+3d=B1q由S6=2T2-1得:6+15d=2B1(1+q)-1由limTn=8得:B1/(1-q)=8解出d,B1,q即可
1.A1q^3+A1q^6=2A1q^9.解之得q^3=12.当q=1时A2=A1A5=A1A8=A1所以A2+A5=2A8所以a2,a8,a5成等差数列
设首项为a1,则s1=a1,s2=a1+a1qs3=a1+a1q+a1q2由于{Sn}是等差数列,故2(a1+a1q)=a1+a1+a1q+a1q2q2-q=0解得q=1.故答案为:1.