已知数列的前n项和为Sn满足Sn=2an 1,且a1=1,则通项公式an
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n=1时,S1=a1=2a1-1,a1=1n≥2时,an=Sn-S(n-1)=(2an-1)-(2a(n-1)-1)an=2a(n-1),故an=2^(n-1).
可以用an与Sn之间的关系求当n》2时an=Sn-S(n-1)=2an-2a(n-1)即an=2a(n-1)即数列{an}是等比数列当n=1时a1=S1=2a1-1a1=1an=2的n-1次方
由lg(Sn+1)=n可得:Sn=10^n-1.n=1时,a1=S1=9,n≥2时,an=Sn-S(n-1)=10^n-1-(10^(n-1)-1)=9×10^(n-1)所以an=9×10^(n-1)
(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
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
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)an+2Sn·S(n-1)=0(n≥2),又an=Sn-S(n-1)所以Sn-S(n-1)+2Sn·S(n-1)=0(n≥2)两边同时除以Sn·S(n-1),得1/S(n-1)-1/sn+2=0
(1)∵数列a[n]的前n项和为S[n],且满足a[n]+2S[n]S[n-1]=0,n≥2∴S[n]-S[n-1]+2S[n]S[n-1]=0两边除以S[n]S[n-1],得:1/S[n-1]-1/
由题得:Sn=1-nan于是有:S(n-1)=1-(n-1)a(n-1)两式相减得:an=(n-1)a(n-1)-nan移项后有:(n+1)an=(n-1)a(n-1)于是:an=[(n-1)/(n+
(1)∵Sn-Sn-1=2SnSn-1∴1Sn−1−1Sn=2即1Sn−1Sn−1=−2(常数)∴{1Sn}为等差数列  
由Sn=n-Sa知,an=Sn-Sn-1=1(>=2).a1=1-Sa
(Ⅰ)证明:由a1+s1=2a1=2得a1=1;由an+Sn=2n得an+1+Sn+1=2(n+1)两式相减得2an+1-an=2,即2an+1-4=an-2,即an+1-2=12(an-2)是首项为
log2(an+1)=n+12^(n+1)=an+1an=2^(n+1)-1
应该是a1=0.5吧.(1)先把a1转化,Sn-(Sn-1)+2Sn*Sn-1=0,(Sn-1)-Sn=2Sn*Sn-1因为Sn不为0,所以两边同除Sn*Sn-1可得1/Sn-1/(Sn-1)=2很明
因为Sn+Sn-1=3an所以Sn-1+Sn-1+an=3an2Sn-1=2anSn-1=an因为Sn=an+1所以Sn-Sn-1=an+1-anan=an+1-an2an=an+1an+1/an=2
解题思路:方法:数列通项的求法:已知sn,求an。求和:错位相减法。解题过程:
an+Sn=2n令n=1a1+S1=2=>a1=1又a(n-1)+S(n-1)=2(n-1)与上式作差an-a(n-1)+an=22an-a(n-1)=2an-2=(1/2)[a(n-1)-2]得证a
由Sn=13(an−1)可知Sn−1=13(an−1−1),两式相减可得,an=13(an−an−1),即anan−1=−12,(n≥2)故数列数列{an}为等比数列.公比q=−12. 又a
(1)当n=1时,T1=2S1-1因为T1=S1=a1,所以a1=2a1-1,求得a1=1(2)当n≥2时,Sn=Tn-Tn-1=2Sn-n2-[2Sn-1-(n-1)2]=2Sn-2Sn-1-2n+
你的写法绝对有问题...害我走了很多弯路,以下[]表示下标b[n]-b[n-1]=(n+1)S[n]/n-nS[n-1]/(n-1)=(通分)=((n²-1)S[n]-n²S[n-