作业帮数列 谢已知数列 {an} 满足a1=1,当n为奇数,an+1=(1/2)*an+n;当n为偶数,an+1=an-2n,
来源:学生作业帮 编辑:作业帮 分类:数学作业 时间:2024/07/09 05:54:55
数列 谢
已知数列 {an} 满足a1=1,当n为奇数,an+1=(1/2)*an+n;当n为偶数,an+1=an-2n,1)设bn=a2n-2(n∈N*),求证:{bn}是等比数列,并求bn
已知数列 {an} 满足a1=1,当n为奇数,an+1=(1/2)*an+n;当n为偶数,an+1=an-2n,1)设bn=a2n-2(n∈N*),求证:{bn}是等比数列,并求bn
∵bn=a(2n)-2∴b(n+1)=a(2n+2)-2
∴b(n+1)/bn=[a(2n+2)-2]/[a(2n)-2]
=[(1/2)a(2n+1)+2n-1]/[a(2n)-2]
={(1/2)[a(2n)-4n]+2n-1}/[a(2n)-2]
=[(1/2)a(2n)-1]/[a(2n)-2]
=(1/2)[a(2n)-2]/[a(2n)-2]
=1/2
∵1/2是与n无关常数
∴{bn}是等比数列,q=1/2
b1=3/2,bn=3*(1/2)^n
∴b(n+1)/bn=[a(2n+2)-2]/[a(2n)-2]
=[(1/2)a(2n+1)+2n-1]/[a(2n)-2]
={(1/2)[a(2n)-4n]+2n-1}/[a(2n)-2]
=[(1/2)a(2n)-1]/[a(2n)-2]
=(1/2)[a(2n)-2]/[a(2n)-2]
=1/2
∵1/2是与n无关常数
∴{bn}是等比数列,q=1/2
b1=3/2,bn=3*(1/2)^n
已知数列{an}满足a1=1,an+1={1/2an+n,n为奇数,an-2n,n为偶数}
已知数列满足:A1=1.AN+1=1/2AN+N,N奇数,AN-2N.N偶数
已知数列{an}满足a1=1,an+1={2an n为奇数,an+2,n为偶数},且a1+a3+a5+.+a2k--=3
已知数列an满足a1=1,an+1={2n ,n为奇数 an+2 ,n为偶数 ,且a1+a3+a5+……+a2k-
已知数列{an}中,当n为奇数时,an=5n+1,当n为偶数时,an=2
已知数列{an}满足a1=1,an+1=1/2an+n,(n为奇数时),an+1=an-2n,(n为偶数时),且bna2
已知数列{an}满足a1=1,an+1=[1/2an+n.n为奇数.an-2n,n为偶数]且bn=a2n-2,n∈N+
已知数列满足:a1=1,a(n+1)=an+1,n为奇数;2an,n为偶数,设bn=a2n-1,
已知数列{an}满足:a1=1,an+1=1/2an+n,n 为奇数,an-2n,n 为偶数.设bn=a2n+1+4n-
已知数列{An}满足A1=1,An+1={1/2An+n-1,n为奇数,An-2n,n为偶数},记Bn=A2nn∈N*
已知数列{an}满足a1=1,an+1={1/2an+n,n为奇数,an-2n,n为偶数} 记bn=a2n Tn=a1+
已知数列{an}满足a1=1,an+1=2an/(an+2)(n∈N+),则数列{an}的通项公式为