已知数列an 是各项为正数等比数列,且q≠1 试比较a1 a8与a4 a5的大小
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/18 03:40:06
a1^2+a2^2+a3^2+……an-1^2=(4(n-1/)^3-(n-1))/3a1^2+a2^2+a3^2+……an^2=(4n^3-n)/3两式相减可得an^2=(2n-1)^2所以an=2
结果是an=4(2n+1);首先由s1,s2,s3的关系可列出两个方程,关于a1,a2,a3.和已知的2a2=a1+a3联立,求出a1=4.接下来,利用根号sn是等差数列,推导出s(n)和a1的关系,
数列各项均为正,Sn>0.2√Sn是a(n+2)与an的等比中项,则(2√Sn)²=(an+2)an4Sn=an²+2ann=1时,4a1=4S1=a1²+2a1a1
①依题意,得(an+2)/2=根号下(2Sn),∴a1+2=2根号下(2S1)=2根号下(2a1),∴(a1-2)的平方=0,∴a1=2,由a2+2=2根号下(2S2)=2根号下[2(2+a2)],得
依题意,q>0a3a4=(a1·q的平方)(a2·q的平方)=a1a2·q的4次方于是,q的4次方=16,所以,q=2a1a2=a1的平方·q=2解得,a1=1所以,an=1·2的(n-1)次方=2的
(1)(an+2)/2=根号下2Sn所以8Sn=(an+2)^2n=1,S1=a1.8a1=(a1+2)^2,得a1=2n=2,8S2=(a2+2)^2,8(a1+a2)=(a2+2)^2,得a2=6
∵(an+1)²-an+1×an-2an²=0∴(an+1+an)(an+1-2an)=0∴an+1-2an=0,an+1+an=0(舍去)∴an+1=2an∴an是等比数列,设a
sn=an(an+1)/2s(n-1)=a(n-1)(a(n-1)+1)/2两式相减an=an(an+1)/2-a(n-1)(a(n-1)+1)/2an^2-an-a^2(n-1)-a(n-1)=0(
等比数列,则:a1a3=(a2)²,a3a5=(a4)²,则:a1a3+2a2a4+a3a5=(a2)²+2a2a4+(a4)²=(a2+a4)²=1
当n=1时,S1=a1=1/2(a1^2+a1),解得a1=1当n>1时,an=Sn-S(n-1)=1/2(an^2+an)-1/2[a(n-1)^2+a(n-1)],整理得[an+a(n-1)][a
由题意得1S3=a1+a2+a3=7……1;6a2=a1+1+a3+6……22式+1式得a2=2……3将3式代入12得q=2或1/2a1=4或1an=4*(1/2)^(n-1)或an=2^(n-1)2
f(a1)=lga1+lgq,f(a2)=lga1+2lgq,…,f(a的第2m+1项)=lga1+(2m+1)lgq,加起来合并得:(2m+1)lga1+m(2m+1)lgq=(2m+1)(lga1
∵{a[n]}是各项为正数的等比数列∴a[n+1]/a[n]=q∵两边取对数有:log(a[n+1]/a[n])=logq∴loga[n+1]-loga[n]=logq∵{a[n]}的公比q是常数∴l
(1)当n=1时,a1=s1=14a21+12a1−34,解出a1=3,又4Sn=an2+2an-3①当n≥2时4sn-1=an-12+2an-1-3②①-②4an=an2-an-12+2(an-an
a1+a2+...+an=(1/2)(an²+an)a1+a2+...+a(n-1)=(1/2)(a(n-1)²+a(n-1))两式相减得an=(1/2)(an²+an)
1.A(n+1)^2*An+A(n+1)*An^2+A(n+1)^2-An^2=0两边同除以A(n+1)²An²1/An+1/A(n+1)+1/An²-1/A(n+1)&
n>=2时,S[n]=1/4*(a[n]+1)^2;S[n-1]=1/4*(a[n-1]+1)^2两式相减得到a[n]=1/4*(a[n]^2+2a[n]-a[n-1]^2-2a[n-1])化简得到a
log2A(n+1)=log2An+1=log2[2An],则:A(n+1)=2An,则[A(n+1)]/[An]=2=常数,则数列{An}是以A1=1为首项、以q=2为公比的等比数列,得:An=2^
由题意知2an=Sn+1/2,an>0,当n=1时,2a1=a1+1/2,解得a1=1/2,当n≥2时,Sn=2an-1/2,S(n-1)=2a(n-1)-1/2,两式相减得an=Sn-S(n-1)=