a1=1,2an+1=(1+1/n)^2*an 证明{an/n^2}为等比数列 求{an}通项公式 令bn=(an+1),求数列{bn}的前n项和Sn
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![a1=1,2an+1=(1+1/n)^2*an 证明{an/n^2}为等比数列 求{an}通项公式 令bn=(an+1),求数列{bn}的前n项和Sn](/uploads/image/z/729979-43-9.jpg?t=a1%3D1%2C2an%2B1%3D%281%2B1%2Fn%29%5E2%2Aan+%E8%AF%81%E6%98%8E%7Ban%2Fn%5E2%7D%E4%B8%BA%E7%AD%89%E6%AF%94%E6%95%B0%E5%88%97+%E6%B1%82%7Ban%7D%E9%80%9A%E9%A1%B9%E5%85%AC%E5%BC%8F+%E4%BB%A4bn%3D%EF%BC%88an%2B1%EF%BC%89%2C%E6%B1%82%E6%95%B0%E5%88%97%7Bbn%7D%E7%9A%84%E5%89%8Dn%E9%A1%B9%E5%92%8CSn)
a1=1,2an+1=(1+1/n)^2*an 证明{an/n^2}为等比数列 求{an}通项公式 令bn=(an+1),求数列{bn}的前n项和Sn
a1=1,2an+1=(1+1/n)^2*an 证明{an/n^2}为等比数列 求{an}通项公式 令bn=(an+1),求数列{bn}的前n项和Sn
a1=1,2an+1=(1+1/n)^2*an 证明{an/n^2}为等比数列 求{an}通项公式 令bn=(an+1),求数列{bn}的前n项和Sn
2a(n+1)=(1+1/n)^2a(n)
2^(n+1)a(n+1)=(n+1)^2[2^na(n)]/n^2
2^(n+1)a(n+1)/(n+1)^2=2^na(n)/n^2=...=2a(1)/1=2
a(n)=n^2/2^(n-1)
b(n)=a(n+1)=(n+1)^2/2^n=n(n+1)/2^n + (n+1)/2^n=c(n)+d(n)
c(n)=n(n+1)/2^n,d(n)=(n+1)/2^n
D(n)=d(1)+d(2)+...+d(n)=2/2 + 3/2^2 + 4/2^3 + ...+ (n-1+1)/2^(n-1) + (n+1)/2^n
2D(n)=2 + 3/2 + 4/2^2 +...+ (n-1+1)/2^(n-2) + (n+1)/2^(n-1)
D(n)=2D(n)-D(n)=2+1/2+1/2^2+...+1/2^(n-1) - (n+1)/2^n
=1-(n+1)/2^n + 2[1-1/2^n]
=3-(n+3)/2^n
C(n)=c(1)+c(2)+...+c(n)=1*2/2 + 2*3/2^2 + 3*4/2^3 + ...+(n-1)n/2^(n-1) + n(n+1)/2^n
2C(n)=1*2 + 2*3/2 + 3*4/2^2 + ...+ (n-1)n/2^(n-2) + n(n+1)/2^(n-1)
C(n)=2C(n)-C(n)=1*2 + 2(3-1)/2 + 3(4-2)/2^2 + ...+ n(n+1-n+1)/2^(n-1) - n(n+1)/2^n
=2+ 2[(1+1)/2 + (2+1)/2^2 + ...+ (n-1+1)/2^(n-1)] - n(n+1)/2^n
=2+2[D(n)-(n+1)/2^n] - n(n+1)/2^n
S(n)=C(n)+D(n)=2+2[D(n)-(n+1)/2^n] - n(n+1)/2^n + D(n)
=2-n(n+1)/2^n - 2(n+1)/2^n + 3D(n)
=2-n(n+1)/2^n -2(n+1)/2^n + 3[3-(n+3)/2^n]
=11-(n^2+6n+11)/2^n
2a(n+1)=(1+1/n)^2*an
2a(n+1)=[(n+1)/n]^2*an
2a(n+1)/(n+1)^2=an/n^2
[a(n+1)/(n+1)^2]/(an/n^2)=1/2
所以{an/n^2}是以1/2为公比的等比数列
an/n^2=(a1/1^2)*q^(n-1)
an/n^2=(1/2)^(n-1)
an=n^2*(1/2)^(n-1)