Sn=2^n-1 2^(n-1)

分析：由于对于数列的n值有不同范围取值,对应不同的求和公式,可知数列为分段数列,需要对不同范围的n值进行讨论,方可求得数列的通项公式；当n=1时,a1=S1=3+1=4;当2≤n≤5时,an=Sn-S

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

用错位相减法a1=1*2^0a2=2*2^1a3=3*2^2.an=n*2^(n-1)Sn=1*2^0+2*2^1+3*2^2+.+n*2^(n-1)2Sn=1*2^1+2*2^2+3*2^3+.+(

∵Sn-S(n-1)=√Sn-√S(n-1)∴Sn≥0(n≥2)又S1=a1=1∴Sn≥0(n≥1)又Sn-S(n-1)=[√Sn＋√S(n-1)]*[√Sn-√S(n-1)]=√Sn-√S(n-1)

因为但看1+2+3...+n这个数列,通项公式为n(n+1)/2=n^/2+n/2所以1=1/2(1^+1)1+2=1/2(2^+2)1+2+3=1/2(3^+3)以此类推,提出共因数1/2,合并括号

由题得：an=1/2(1/n-1/(n+1);所以：a1=1/2(1-1/2);a2=1/2(1/2-1/3);a3=1/2(1/3-1/4);.an=1/2(1/n-1/(n+1);sn=a1+a2

我来试试吧.Sn+1=1*(n+1)+2*(n)+3*(n-1)+……+(n+1)*1=1*n+1+2*(n-1)+2+3*(n-2)+3+……+n*1+n=1*n+2*(n-1)+3*(n-2)+…

an=（2^n-1)n=2^n*n-n,令Tn=2^1*1+2^*2+…2^n*n,①则2Tn=2^2*1+2^3*2+…+2^n*(n-1)+2^(n+1)*n②②-①得Tn=-(2^1+2^2+…

∵a(n+1)=（n+2)Sn/n且a(n+1)=S(n+1)-Sn∴S(n+1)-Sn=(n+2)*Sn/n∴S(n+1)=[(n+2)/n+1]Sn=(2n+2)/n*Sn∴S(n+1)/(n+1

an=(2n+1)*3^na1=3*3^1a2=5*3^2a3=7*3^3.an=(2n+1)*3^nSn=3*3^1+5*3^2+7*3^3+.(2n+1)*3^n3Sn=3*3^2+5*3^3+7

Sn=(3n+1)/2-(n/2)an当n=1时,a1=4/3=1+1/3=1+1/[1*(1+2)]当n=2时,a2=13/12=1+1/[2*(1+2+3)当n=3时,a3=31/30=1+1/[

一,n为奇数,Sn=nC(n,n)+(1+n-1)C(n,1)+(2+n-2)C(n,2)+…+nC(n,n-1/2)=n[C(n,0)+C(n,1)+…+C(n,n-1/2)=n*2de(n-1)次

(1).Sn=1＋2×3＋3×7……n(2^n-1),求Sn.Sn=1×(2^1-1)+2×(2^2-1)+3×(2^3-1)+……+n(2^n-1)=(1×2^1+2×2^2+3×2^3+……+n×

等于呀,你把后面的算式一道前面来n(n+2)(n+4)+1/6)(n-1)n(n+2)(n+4)=n(n+2)(n+4)[1+1/6(n-1)]=1/6n(n+2)(n+4)(n+5)

 再问： 再问：那个划横线的答案是不是错了再答：我觉得是

an=4n^2/(4n^2-1)=1+1/（4n^2-1)=1+1/(1/(2n-1)-1/(2n+1))∴Sn=a1+a2+……an=n+(1-1/(2n+1))

Sn=2+5n+8n^2+…+(3n-1)n^n-1nSn=2n+5n^2+…+(3n-4)n^(n-1)+(3n-1)n^nSn-nSn=2+3n+3n^2+…+3n^(n-1)-(3n-1)n^n

(1)An=3(1+2^n)(2)由题知,Sn=2An+3n-12=6(2^n-1)+3nBn=(An-3)/(Sn-3n)(A(n+1)-6)=(3*2^n)/(6(2^n-1))(3(2^(n+1

裂项相消：Cn=[(n+2)/n－(n+2)/(n+1)]2^n=2/(n2^n)－1/((n+1)2^n)=1/(n2^(n-1)－1/((n+1)2^n),因此Sn＝1－1/(2*2)+1/(2*

因为n,an,Sn成等差数列所以2an=Sn+n又因为an=Sn-Sn-1所以Sn+n=2Sn-1+2n左右两边同时加2Sn+n+2=2Sn-1+2n+2右边再变化Sn+n+2=2Sn-1+2n+2-