已知an是各项均为正数的等差数列,设sn=a1 a2 ... an,Tn=
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正数项等比数列an/an-1=q,q>0根号an/根号an-1=根号q,所以{根号an}仍是等比数列.
是原数列是a1a1qa1q^2a1q^3a1q^4.根号an根号a1(根号a1)*(根号q)(根号a1)*q(根号a1)*(根号q)*q.任意相邻两项比值为是根号q因为原来q是等比数列公比,根号q不会
是{an}是各项均为正数的等比数列q大于0{根号an}是以根号a1为首项根号q为公比的等比数列
.{An}为正数等比数列.那么等比数列的通项公式是:An=A1×q^(n-1)将两边同时开方等式仍然相等.An^1/2=(A1^1/2)×[q^(n-1)]^1/2即
在等比数列中有a5a6=a4a7=a3a8=a2a9=a1a10所以有log3a1+log3a2+...+log3a10=log3(a5a6*a4a7*a3a8*a2a9*a1a10)=5log3a5
由题意可得,这4项即a1,a1q,a1q2,a1q3,若删去第一项,则a1q,a1q2,a1q3 成等差数列,2a1q2=a1q+a1q3,故q=1(舍去),或q=0(舍去).若删去第二项,
(1)根据题意,设公差为d则a3=a1+2d=2d+1a9=a1+8d=8d+1有(2d+1)^2=8d+1d=1故通项:an=n(2)根据题意,设公比为q则b2=qb3=q^2有q-0.5q^2=0
由题意知对任意n有2S[n]=a[n]^2+a[n]同样有:2S[n-1]=a[n-1]^1+a[n-1]两式相减,得左边=2S[n]-2S[n-1]=2a[n]即2a[n]=a[n]^2+a[n]-
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
1)由题意得,a1=1,当n>1时,sn=an^2/2+an/2sn-1=a(n-1)^2/2+a(n-1)/2,∴sn-sn-1=an^2/2-a(n-1)^2/2+an/2-a(n-1)/2即(a
(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
2sn=(an)^2+an,2(sn+1)=(an+1)^2+(an+1)作差((sn+1)-(sn)=an+1)则((an+1)-an-1)((an+1)+an)=0因为数列{an}的各项都是正数所
∵(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
(Ⅰ)∵an+12-an+1an-2an2=0,∴(an+1+an)(an+1-2an)=0,∵数列{an}的各项均为正数,∴an+1+an>0,∴an+1-2an=0,即an+1=2an,所以数列{
(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)
由等比数列的性质知,a1a2a3,a4a5a6,a7a8a9成等比数列,所以a4a5a6=52.故答案为52
1+b2+b3=log1/2(a1a2a3)=6,所以a1a2a3=(1/2)^6又an是等比数列,所以a1a3=(a2)²故(a2)³=(1/2)^6得a2=(1/2)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)=