已知数列{an}的前n项和Sn满足Sn=2an-n(其中n∈N*).(1)求证:数列{an+1}是等比数列,并求数列{an}的
已知数列{an}的前n项和Sn满足Sn=2an-n(其中n∈N*).(1)求证:数列{an+1}是等比数列,并求数列{an}的通项公式;(2)若bn=log2(an+1)2n,且Tn=b1+b2+b3+…+bn,求Tn.
已知数列{an}的前n项和为Sn,且Sn=2an-n(n∈N*)1.求证数列{an+1}是等比...
(an+1)\/(a<n+1>+1)=(2a<n-1>+2)\/(2an+2)=(a<n-1>+1)\/(an+1)所以数列{an+1}是等比数列 设Bn=b1+b2+b3+...+bn=log2(a1+1)+log2(a2+1)+log2(a3+1)+...+log2(an+1)=log2[(a1+1)(a2+1)(a3+1)...(an+1)]这里不知道数列的公比,无法求具体的值 设{an...
...且Sn=2an-n(n∈N*)①证明:数列{an+1}是等比数列,并求
可知,{an+1}是等比数列 取n=1,可知,S1=a1=2a1-1,知a1=1,即an+1=2*2^(n-1)=2^n,可知an=2^n-1 (2)由(1)知,a[n+1]-an=2^n,而 an+1=2^n,即有an+1=a[n+1]-an 故bn=(a[n+1]-an)\/(an×a[n-1])=1\/an - 1\/a[n+1]所以{bn}的前n项和,b1+b2...
...且Sn=2an-n(n∈N*)①证明:数列{an+1}是等比数列,并求数列{an}的通...
所以a_n+1是等比数列公比为2 令n=1得a_1=2a_1-1 a_1=1 (2)a_n+1=(a_1+1)2^(n-1)=2^n ,a_n=2^n-1 b_n=(2^n)\/(2^n-1)*(2^(n+1)-1)=1\/2^n-1\/2^(n+1)=1\/2^(n+1)数列{bn}的前n项和T_n=[1\/4-1\/2^(n+2)]\/[1-1\/2]=1\/2(1-1\/2^n)...
已知数列{an}的前n项和为Sn,且满足Sn+n=2an(n∈N*).(1)证明:数列{an+...
解答:(1)证明:当n=1时,2a1=a1+1,∴a1=1.∵2an=Sn+n,n∈N*,∴2an-1=Sn-1+n-1,n≥2,两式相减得an=2an-1+1,n≥2,即an+1=2(an-1+1),n≥2,∴数列{an+1}为以2为首项,2为公比的等比数列,∴an+1=2n,∴an=2n-1,n∈N*;(2)解:bn=(2n+1)...
已知数列{an}的前n项和为Sn,且满足Sn=2an-n,(n∈N*)(Ⅰ)求a1,a2,a3的...
1+1)所以{an+1}是以2为首项,以2为公比的等比数列∴an=2n-1解:(III)∵bn=(2n+1)an+2n+1∴bn=(2n+1)2n∴Tn=3?2+5?22+…+(2n+1)?2n2Tn=3?22+5?23+…(2n-1)?2n+(2n+1)?2n+1两式相减可得,-Tn=3?2+2(22+23+…+2n)-(2n+1)?2n+1=6+2×4(1...
已知数列{an}的前n项和为Sn,若Sn=2an+n. (1)求证:数列{an-1}为等比...
所以S(n-1)=2a(n-1)+n-1 an=Sn-S(n-1)=2an+n-(2a(n-1)+n-1)=2an-2a(n-1)+1 由上式得:an=2an-2a(n-1)+1,即an=2a(n-1)-1;两边同时减1,则an-1=2a(n-1)-2 于是an-1=2(a(n-1)-1),an-1\/(a(n-1)-1)=2 所以,数列{an-1}为...
已知数列{an}的前n项和Sn,满足:a1=1,Sn-2Sn-1=1,n∈N*,且n≥2.(1...
1=1Sn+1?2Sn=1两式相减得an+1-2an=0,又当n=2时,a2=2,所以an+1an=2(n∈N*),所以{an}是以1为首项,2为公比的等比数列.(2)由(1)得an=2n?1,∴cn=n×(12)n?1,∴Tn=1×(12)0+2×(12)1+3×(12)2+…+(n?1)×(12)n?2+n×(12)n?1∴12Tn=1×(1...
已知数列{an}的前n项和为Sn,且满足Sn=2an-n(n∈N*)(1)求数列{an}的通...
(1)∵Sn=2an-n,∴a1=1,∵Sn=2an-n,Sn-1=2an-1-(n-1),n≥2,n∈N+,两式相减,得an=2an-1+1,∴an+1=2(an-1+1),n≥2,n∈N+,∵a1+1=2,∴{an+1}是首项为2,公比为2的等比数列,∴an+1=2n,∴an=2n-1.(2)∵bn=(2n+1)an+2n+1,∴bn=(2...
已知数列{an}前n项和为Sn,且Sn=2an-n, (1)求证,数列{an+1}为等比数列...
⑴Sn=3\/2an-1,∴S(n-1)=3\/2A(n-1)-1,两式相减整理得:An\/A(n-1)=3,{an}是等比数列,公比为3,首项由Sn=3\/2an-1得,另n=1,S1=a1得:A1=2,∴An=2*3^(n-1)⑵B(n+1)-Bn=2*3^(n-1)∶Bn=(Bn-B(n-1))+(B(n-1)-B(n-2))+.+(B2-B1)+B1,这是迭代法...
已知数列{an}的前n项和为Sn,且Sn=2an+n-4 (1)求证:数列{an-1}为等比...
a1=3 Sn=2an+n-4 S(n-1)=2a(n-1)+n-1-4 相减 an=2an-2a(n-1)+1 (an-1)\/[a(n-1)-1]=2 所以数列{an-1}是以2为公比的等比数列 an=2^n+1 cn=anlog2(an-1)cn=n*2^n+n Tn=(n-1)*2^(n+1)+(n^2+n+4)\/2 ...
