设数列{an}满足:若n=2k-1,(k∈N*)an=n;若n=2k,(k∈N*),an=ak 后面是2的n次
设数列{An}满足:若N=2k-1,(k∈n),An=n:若n=2k,(k∈n),An=Ak.求:a2+a4+a6+a8
已知数列{an}满足ak+a(n-k)=2,(k,n-k∈N*),则数列{an}的前n项和Sn=
已知数列{an}满足:an=log(n+1)(n+2),n∈N+,我们把使a1•a2•a3•…•ak为整数的数k(k∈N
已知数列{an}(n∈N*)满足:an=logn+1(n+2)(n∈N*),定义使a1·a2·a3·……ak为整数的数k
已知数列{an}(n∈N*)满足:an=logn+1(n+2)(n∈N*),定义使a1·a2·a3·……ak为整数的数k
已知数列{an}的前n项和Sn=n^2-9n,第k项满足5<ak<8,则k等于
已知数列an满足an=log(n+1)(n+2),n∈ N:,我们把使a1·a2·…·ak为整数的数k叫做数列的理想数,
数列{an}共有k项,其前n项和Sn=2n^2+n(n∈[1,k],n为正整数)
已知数列an满足an=log(n+1)(n+2),n∈ N:,我们把使a1·a2·…·ak为整数的数k叫希望数,则区间【
已知数列an满足an=log(n+1)(n+2),n∈ N:,我们把使a1·a2·…·ak为整数的数k叫理想数;
设fk(n)为关于n的k(k∈N)次多项式.数列{an}的首项a1=1,前n项和为Sn.对于任意的正整数n,an+Sn=
已知数列{an}的前n项和Sn=n^2-9n,则其通项an=多少;若它的第k项满足5<ak<8,则k=多少