已知各项均为正数的数列an满足a1=1,an 1²-an²=2
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∵等比数列{an}的各项均为不等于1的正数,数列{bn}满足bn=lnan,b3=18,b6=12,∴a3=a1q2=eb3=e18,a6=a1q5=eb6=e12,∴a6a3=q3=e12e18=e
(1)∵2Sn=an2+n-4(n∈N*).∴2Sn+1=an+12+n+1-4.两式相减得2Sn+1-2Sn=an+12+n+1-4-(an2+n-4),即2an+1=an+12-an2+1,则an
4Sn=(an+1)^24Sn-1=(an-1+1)^2n-1为下标则4an=4Sn-4Sn-1=(an+1)^2-(an-1+1)^2化简得(an-1)^2=(an-1+1)^2则an-1=正负(a
因为2Sn=an^2+n-4,所以2S(n-1)=a(n-1)²+n-1-4.两式相减2an=an^2-a(n-1)²+1,a(n-1)²=an^2-2an+1=(an-
an+Sn=4a(n-1)+S(n-1)=4相减:an/a(n-1)=1/2等比数列n=1时a1+a1=4a1=2an=2^(2-n)bn=1/n²数学归纳法n=2时T2=5/4
n=1时,2S1=2a1=a1²+a1a1²-a1=0a1(a1-1)=0a1=0(各项均为正数,舍去)或a1=1n≥2时,2Sn=an²+an2Sn-1=a(n-1)&
∵(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
1.n=1时,2a1=2S1=a1²+1-4a1²-2a1-3=0(a1+1)(a1-3)=0a1=-1(数列各项均为正,舍去)或a1=3n≥2时,2an=2Sn-2S(n-1)=
由a1=S1=1/6(a1+1)(a1+2),解得a1=1或a1=2,由假设a1=S1>1,因此a1=2,又由a(n+1)=S(n+1)-Sn=1/6(a(n+1)+1)(a(n+1)+2)-1/6(
n=1时,2a1=2S1=a1^2+1-4a1^2-2a1-3=0(a1+1)(a1-3)=0a1=-1(数列各项均为正,舍去)或a1=3n≥2时,2an=2Sn-2S(n-1)=an^2+n-4-a
4a(1)=[a(1)+1]^2a(1)=14a(n+1)=[a(n+1)+1]^2-[a(n)+1]^2[a(n)+1]^2=[a(n+1)-1]^2若a(n+1)>1a(n+1)=a(n)+2a(
可用递推法:2Sn=An+An*An递推2Sn-1=An-1+An-1*An-1两市相减,得:An+An-1=An*An-An-1*An-1因为An为正数,所以An-An-1=1之后求An,然后用求和
6Sn=an^2+3an+26S(n-1)=a(n-1)^2+3a(n-1)+26Sn-6S(n-1)=6an=an^2+3an+2-a(n-1)^2-3a(n-1)-26an=an^2+3an-a(
1)6Sn=An^2+3An+2因为S1=A1所以6A1=A1^2+3A1+2A1^2-3A1+2=0(A1-1)(A1-2)=0因为A1=S1>1所以A1=2因为An=Sn-S(n-1)注S(n-1
6Sn=An^2+3An+26S(n-1)=[A(n-1)]^2+3A(n-1)+26Sn-6S(n-1)=6An=An^2+3An+2-{[A(n-1)]^2+3A(n-1)+2}An-A(n-1)
6Sn=An^2+3An+26S(n-1)=[A(n-1)]^2+3A(n-1)+26Sn-6S(n-1)=6An=An^2+3An+2-{[A(n-1)]^2+3A(n-1)+2}An-A(n-1)
让n=1,得出a1=1,然后6sn=an^2+3*an+2,1-6Sn-1=An-1^2+3*An-1+2,21式子-2式子:6(Sn-Sn-1)=An^2-An-1^2+3*An-3*An-1化简得
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)&
4a(1)=[a(1)+1]^2a(1)=14a(n+1)=[a(n+1)+1]^2-[a(n)+1]^2[a(n)+1]^2=[a(n+1)-1]^2若a(n+1)>1a(n+1)=a(n)+2a(
a(3)=a(1+2)=1/[1+a(1)]=a(1),1=a(1)+[a(1)]^2,0=[a(1)]^2+a(1)-1,Delta=1+4=5.a(1)=[-1+5^(1/2)]/2,或a(1)=