设数列为等差数列=2000,试求S20
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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,
a(n)=a+(n-1)d,a=a(1)0.b(n)=bq^(n-1)=[a(n)]^2>=0.b=b(1)0,q>1.b=b(1)=[a(1)]^2=a^2,b(n)=a^2q^(n-1).b(2)
设数列{bn}的前n项和为Sn,且Sn=1-bn/2;数列{an}为等差数列,且a6=17,a8=23,1,求bn的通项公式2,若cn=anbn(n=1,2,3,...),Tn为数列cn的前n项和,求
1=2-2b1,b1=2/3.bn-b(n-1)=-2(sn-s(n-1))=-2bn,bn/b(n-1)=1/3.bn=2/3•(1/3)^(n-1).a1=2,d=3.an=3n-1.
1=2-2*b13b1=2b1=2/3bn-bn-1=(2-2sn)-(2-2sn-1)=-2(sn-sn-1)=-2bn3bn=bn-1bn=1/3*bn-1{bn}是等比数列{bn}={2/3*(
Sn=a^n-1①Sn-1=a^(n-1)-1②①-②得:an=a^n-a^(n-1)(n>=2)an=a^(n-1)(a-1)a(n-1)=a^(n-2)(a-1)所以an-a(n-1)=(a-1)
1.s20=(a1+a20)*20/2=(a8+a13)*10=100002.sn=1-2/3an,sn+1=1-2/3an+1两式相减an+1=-2/3an+1+2/3anan+1=2/5an所以是
a1+a2+a3+…+an=na1+[n(n-1)d]/2,则bn=a1+(d/2)(n-1),从而b(n+1)-bn=[a1+(d/2)n]-[a1+(d/2)(n-1)]=d/2=常数,则数列{b
∵bn=2-2Sn,∴b[n-1]=2-S[n-1]则bn-b[n-1]=-2(Sn-S[n-1])=-2bn∴3bn=b[n-1]即bn/b[n-1]=1/3,b1=2-2b1,得b1=2/3{bn
我手写的你第二题MS没完?!
an=a1+(n-1)mbn=b1+(n-1)p则liman/bn=m/p=31im(b1+b2+...+bn)/n*a3n=lim(nb1+n(n-1)p/2)/n*(a1+(3n-1)m)=p/6
Sn=a1n+n(n-1)d/2S4=4a1+6d=-62S6=6a1+15d=-75a1=-20,d=3an=a1+(n-1)d=3n-23当n<8时,an<0当n≥8时,an>0|a1|+|a2|
设该等差数列是首项为a1,公差为dS3=3a1+3(3-1)*d/2=3a1+3dS2=2a1+2(2-1)*d/2=2a1+dS4=4a1+4(4-1)*d/2=4a1+6d又:S3²=9
由{an}是公差不为0的等差数列且|a11|=|a51|,可知a11=-a51,即a1+10d=-(a1+50d),可得a1=-30d;a20=22,即a1+19d=22,即-30d+19d=22,所
/>n≥2时,an=Sn/n+2(n-1)Sn=nan-2n(n-1)S(n-1)=(n-1)an-2(n-1)(n-2)Sn-S(n-1)=an=nan-2n(n-1)-(n-1)an+2(n-1)
a[n]等差数列所以:S[5]=5*a[3]=30,a[3]=6a[6]-a[3]=3d,2-6=3d,d=-4/3a[4]=6-4/3=14/3a[5]=6-2*4/3=10/3所以S[8]=4*(
(1)设数列{an}的公差为d,数列{bn}的公比为q,由题意得d+q=12d+q2=2,解得d=1q=0(舍) 或d=−1q=2,则an=1-n,bn=2n-1.(2)由(1)知,cn=a
T1=a1=1-a12a1=1a1=1/2a1a2...an=Tn=1-an(1)a1a2...a(n-1)=Tn-1=1-a(n-1)(2)(1)/(2)an=(1-an)/[1-a(n-1)]整理
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=====啊,等等再问:?怎么了?你会不?再答:马上再问:大哥~麻烦快点吧~急死我了~~~~~~~~~~~再答:①充分性,即:由“{bn}为等比数列”推出“{an}为等差数列”设bn公比为q,∵b1>