设数列〔an〕满足a1=1,a2=5/3(3分之5),an+2=5/3an+1-2/3an,(n属于N※). 求数列{nan}的前n项和Sn
展开全部
解:
a(n+2)=(5/3)a(n+1)-(2/3)an
a(n+2)-a(n+1)=(2/3)a(n+1)-(2/3)an=(2/3)[a(n+1)-an]
[a(n+2)-a(n+1)]/[a(n+1)-an]=2/3,为定值。
a2-a1=5/3 -1=2/3
数列{a(n+1)-an}是以2/3为首项,2/3为公比的等比数列。
a(n+1)-an=(2/3)×(2/3)^(n-1)=(2/3)ⁿ
an-a(n-1)=(2/3)^(n-1)
a(n-1)-a(n-2)=(2/3)^(n-2)
…………
a2-a1=2/3
累加
an -a1=2/3 +(2/3)²+...+(2/3)^(n-1)
an=a1+2/3 +(2/3)²+...+(2/3)^(n-1)
=1+2/3 +(2/3)²+...+(2/3)^(n-1)
=1×[1-(2/3)ⁿ]/(1-2/3)
=3 -3×(2/3)ⁿ
数列{an}的通项公式为an=3-3×(2/3)ⁿ
nan=n×[3-3×(2/3)ⁿ]=3n -3×[n×(2/3)ⁿ]
Sn=a1+2a2+3a3+...+nan
=3(1+2+...+n) -3×[1×(2/3)+2×(2/3)²+3×(2/3)³+...+n×(2/3)ⁿ]
令Cn=1×(2/3)+2×(2/3)²+3×(2/3)³+...+n×(2/3)ⁿ
则(2/3)Cn=1×(2/3)²+2×(2/3)³+...+(n-1)×(2/3)ⁿ+n×(2/3)^(n+1)
Cn-(2/3)Cn=(1/3)Cn
=(2/3)+(2/3)²+...+(2/3)ⁿ -n×(2/3)^(n+1)
=(2/3)[1-(2/3)ⁿ]/(1-2/3) -n×(2/3)^(n+1)
=2 -(n+2)×(2/3)^(n+1)
Cn=6-(2n+4)×(2/3)ⁿ
Sn=3(1+2+...+n)-3Cn
=3n(n+1)/2 -18 -(n+2)×2^(n+1) /3^(n-1)
a(n+2)=(5/3)a(n+1)-(2/3)an
a(n+2)-a(n+1)=(2/3)a(n+1)-(2/3)an=(2/3)[a(n+1)-an]
[a(n+2)-a(n+1)]/[a(n+1)-an]=2/3,为定值。
a2-a1=5/3 -1=2/3
数列{a(n+1)-an}是以2/3为首项,2/3为公比的等比数列。
a(n+1)-an=(2/3)×(2/3)^(n-1)=(2/3)ⁿ
an-a(n-1)=(2/3)^(n-1)
a(n-1)-a(n-2)=(2/3)^(n-2)
…………
a2-a1=2/3
累加
an -a1=2/3 +(2/3)²+...+(2/3)^(n-1)
an=a1+2/3 +(2/3)²+...+(2/3)^(n-1)
=1+2/3 +(2/3)²+...+(2/3)^(n-1)
=1×[1-(2/3)ⁿ]/(1-2/3)
=3 -3×(2/3)ⁿ
数列{an}的通项公式为an=3-3×(2/3)ⁿ
nan=n×[3-3×(2/3)ⁿ]=3n -3×[n×(2/3)ⁿ]
Sn=a1+2a2+3a3+...+nan
=3(1+2+...+n) -3×[1×(2/3)+2×(2/3)²+3×(2/3)³+...+n×(2/3)ⁿ]
令Cn=1×(2/3)+2×(2/3)²+3×(2/3)³+...+n×(2/3)ⁿ
则(2/3)Cn=1×(2/3)²+2×(2/3)³+...+(n-1)×(2/3)ⁿ+n×(2/3)^(n+1)
Cn-(2/3)Cn=(1/3)Cn
=(2/3)+(2/3)²+...+(2/3)ⁿ -n×(2/3)^(n+1)
=(2/3)[1-(2/3)ⁿ]/(1-2/3) -n×(2/3)^(n+1)
=2 -(n+2)×(2/3)^(n+1)
Cn=6-(2n+4)×(2/3)ⁿ
Sn=3(1+2+...+n)-3Cn
=3n(n+1)/2 -18 -(n+2)×2^(n+1) /3^(n-1)
本回答由网友推荐
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
展开全部
设bn=an+1-an
bn+1=2/3bn
bn=(2/3)^n=an+1-an
...................
bn+1=2/3bn
bn=(2/3)^n=an+1-an
...................
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
展开全部
3a(n+2)=5a(n+1)-2an3a(n+2)-3a(n+1)=2a(n+1)-2an[a(n+2)-a(n+1)]/[a(n+1)-an]=2/3a(n+1)-an=(a2-a1)(2/3)^(n-1)=(2/3)^na2-a1=2/3a3-a2=(2/3)^2a4-a3=(2/3)^3……a(n-1)-a(n-2)=(2/3)^(n-2)an-a(n-1)=(2/3)^(n-1)将上列式子相加得an-a1=2/3+(2/3)^2+(2/3)^3+……(2/3)^(n-1)=(2/3)[1-(2/3)^(n-1)]/(1-2/3)an=3-2(2/3)^(n-1)nan=3n-2n(2/3)^(n-1)Sn=3(1+2+3+……+n)-2[1+2*(2/3)+3*(2/3)^2+……+(n-1)(2/3)^(n-2)+n(2/3)^(n-1)]=3n(n+1)/2-2[1+2*(2/3)+3*(2/3)^2+……+(n-1)(2/3)^(n-2)+n(2/3)^(n-1)](2/3)Sn=n(n+1)-2[(2/3)+2*(2/3)^2+……+(n-2)(2/3)^(n-2)+(n-1)(2/3)^(n-1)+n(2/3)^n]Sn-(2/3)Sn=Sn/3=n(n+1)/2-2[1-n(2/3)^n+(2/3)+(2/3)^2+……+(2/3)^(n-2)+(2/3)^(n-1)]=n(n+1)/2-2[1-n(2/3)^n+(2/3)(1-(2/3)^(n-1))/(1-2/3)]=n(n+1)/2-2[1-n(2/3)^n+2-(2/3)^n]=n(n+1)/2+2(n+1)(2/3)^n-6Sn=3n(n+1)/2+6(n+1)(2/3)^n-18
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
更多回答(2)
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
