已知数列的前n项和sn=n² 1
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(Ⅰ)由Sn+1=2Sn+n+5(n∈N*)得 Sn=2Sn-1+(n-1)+5(n∈N*,n≥2)两式相减得 an+1=2an+1,∴an+1+1=2(an+1)即 &
第一题,n=10时,Sn=-(a1+a2+a3+……)+2(a1+a2+……+a9)=-(9+10-n)n/2+90=(n^2-19n)/2+90.第二题实在是看不清楚你是怎么样写的题目第三题:1
(I)由已知Sn+1=2Sn+n+5(n∈N*),可得n≥2,Sn=2Sn-1+n+4两式相减得Sn+1-Sn=2(Sn-Sn-1)+1即an+1=2an+1从而an+1+1=2(an+1)当n=1时
sn=3*3^1+5*3^2+.+(2n+1)*3^n①3sn=3*3^2+5*3^3+.+(2n-1)*3^n+(2n+1)*3^(n+1)②①-②-2Sn=Sn-3Sn=-2n*3^(n+1),因
n=1,S1=a1=(a1-1)/3,a1=-1/2;n=2,S2=a1+a2=(a2-1)/3,a2=+1/4;an=Sn-Sn-1=(an-1)/3-(an-1-1)/3=an/3-an-1/32
(1)∵Sn+1=2Sn+3n+1,∴当n≥2时,Sn=2Sn-1+3(n-1)+1,两式相减得an+1=2an+3,从而bn+1=an+1+3=2(an+3)=2bn(n≥2),∵S2=2S1+3+
(1)当n≥2时,an=Sn-Sn-1=n(2n-1)-(n-1)(2n-3)=4n-3,当n=1时,a1=S1=1,适合.∴an=4n-3,∵an-an-1=4(n≥2),∴an为等差数列.(2)由
an=sn-Sn-1(1)Sn=3n^2-nSn-1=3(n-1)^2-(n-1)Sn-Sn-1=3(2n-1)-1=6n-4
1.n=1时,a1=S1=1²+1=2n≥2时,Sn=n²+nS(n-1)=(n-1)²+(n-1)an=Sn-S(n-1)=n²+n-(n-1)²-
an=Sn-Sn-1=1/3n(n+1)(n+2)-1/3n(n+1)(n-1)=n(n+1)所以1/an=1/n(n+1)=1/n-1/n+1数列(1/an)的前n项和=1-1/2+1/2-1/3+
Sn=(n^2+n)/21/Sn=1/((n2+n)/2)=2/(n^2+n)Tn=1+2/6+2/12+2/30+.+2/n*(n+1)=1+(2/2-2/3)+(2/3+2/4)+.+(2/n-2
(1)令n=1a1=S1=32-1+1=32Sn=32n-n²+1Sn-1=32(n-1)-(n-1)²+1an=Sn-Sn-1=32n-n²+1-32(n-1)+(n-
为了避免混淆,我把下角标放在内.首先从数列本身的基本意义出发a=S-S其次,从已知a=S(n+2)/n出发a=S*(n+1)/(n-1)因此S-S=S*(n+1)/(n-1)移项整理S=S
由1/S1+1/S2+1/S3+.+1/Sn=n/(n+1),知,当n=1时,s1=2,当n≥2时1/S1+1/S2+1/S3+.+1/Sn-1=(n-1)/n,两式相减得,1/sn=1/[n(n+1
Sn=2a+3a^2+4a^3+...(n+1)a^naSn=2a^2+3a^3+.+na^n+(n+1)a^(n+1)(1-a)Sn=2a+a^2+a^3+...a^n-(n+1)a^(n+1)(1
【方法1:强行展开a(n)表达式】1+2+……+n=n(n+1)/21^2+2^2+……+n^2=n(n+1)(2n+1)/61^3+2^3+……+n^3=n^2(n+1)^2/41^4+2^4+……
(I)当n=1时,a1=S1=4,当n≥2时,an=Sn-Sn-1=n2+2n+1-[(n-1)2+2(n-1)+1]=2n+1,又a1=4不适合上式,∴an=4,
n=n(n+1)=n^2+nSn=b1+b2+...+bn=(1^2+1)+(2^2+2)+...+(n^2+n)=(1^2+2^2+...+n^2)+(1+2+...+n)=n(n+1)(2n+1)
f(n)=[1/2(n+1)n]/[(n+32)(n+2)(n+1)1/2]=n/(n+32)(n+2)=n/(n^2+34n+64),f(n)×(n/n)=1/[n+(64/n)+34]且n为正整数
S[n]=n-5a[n]-85其中:为了表示清楚,[n]表示下标,S[n-1]=n-1-5a[n-1]-85两式相减:a[n]=1+5(a[n-1]-a[n])a[n]-1=5(a[n-1]-1)-5