等差数列an的前n项和为sn且s3=6 a1=4 向量m=(a5,3.)
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当n=1时,2S1=a1+1/a1,得a1=1当n=2时,2S2=2(1+a2)=a2+1/a2,得a2=√2-1当n=3时,2S3=2(√2+a3)=a3+1/a3,得a3=√3-√2猜想an=√n
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-
答案为ASn=((a1+an)/2)*nan=a1+(n-1)d根据上式得出:Sn=(2a1+(n-1)d)*n/2=a1*n+n方*d/2-n*d/2limSn/n方=lim(2a1*n+n方*d-
前16项和最大.因为等差数列前n项和是关于n的二次函数,设为f(n).已知f(13)=f(19),所以对称轴n=(13+19)/2=16
Sn+1/(2n+1)-Sn/(2n-1)=1Sn/(2n-1)=S1+n-1→Sn=(S1+n-1)(2n-1)→Sn=n(2n-1)an=4n-31/√an=2/2√(4n-3)>2/(√4n-3
设:等差数列{an}的公差为d,通项为an=a1+(n-1)d,则:sn=a1+a2+...+an=na1+n(n-1)d/2lim(n->∞)(n*an)/Sn=lim(n->∞)[n*(a1+(n
设第一项为:a1,公差为:d1、S15>0可得到a1>-7d2、a8+a9
an+2Sn*Sn-1=0其中an=Sn-Sn-1代入上式:Sn-Sn-1+2Sn*Sn-1=0a1=1/2,故Sn和Sn-1≠0,上式两边同除以Sn*Sn-1得:1/Sn-1-1/Sn+2=0即:1
∵等差数列{an}前m项和为Sm,若Sm:Sn=m^2:n^2∴m(a1+am)/n(a1+an)=m^2/n^2∴m[2a1+(n-1)d]=n[a1+(m-1)d]∴2(m-n)a1=(m-n)d
由Sn=Sn-1/2Sn-1+1,两边同时取倒数可得1/Sn=(2Sn-1+1)/Sn-11/Sn=2+1/Sn-1即1/Sn-1/Sn-1=2故{1/Sn}是首项为1/2,公差为2的等差数列1/Sn
(1)Sn+n=2anSn=2an-nS(n-1)=2a(n-1)-(n-1)an=Sn-S(n-1)=[2an-n]-{2a(n-1)-(n-1)}=2an-2a(n-1)-1an=2a(n-1)-
因为a1=S1=(a1+12)2,所以 a1=1.设公差为d,则有a1+a2=2+d=S2=(2+d2)2.解得d=2或d=-2(舍).所以an=2n-1,Sn=n2.所以 bn=
由等差数列的性质Sn=na1+n(n-1)d/2=dn2/2+(a1-d/2)n=An2+Bn即A=d/2B=a1-d/2同样地Tn=nb1+n(n-1)p/2=pn2/2+(b1-p/2)n=Cn2
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)=
Tn=b1*b2*b3*……*bn=b1*(b1*q)*(b1*q^2)*……*[b1*q^(n-1)]=(b1)^n*q^[1+2+……+(n-1)]=(b1)^n*q^[n(n-1)/2]={b1
1.s2/s1=c+1s2=c+1a2=cs3/s2=(2+c)/2s3=(2+c)(c+1)/2a3=c(c+1)/22a2=a1+a32c=1+c(c+1)/2c^2-3c+2=0c=1或22.c
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(
S5=5a3所以a3=-1S10-S5=a6+...+a10=a1+...+a5+5乘以5dd=1所以a1=负3an=n-4Sn=0.5n^2-3.5nSn/n=0.5n-3.5Tn=n(n-13)/
先求an,求得an=n-4,在求sn,求得sn=n*-7n/2,再求得sn/n为n-7/2,易知{sn/n}为等差数列,故Tn为n*-13n/4(*为2)