
若存在m∈N*,当n>m且an为奇数时,an恒为常数P,则P的值为________.在线课程1或9
分析:若存在m∈N*,当n>m且an为奇数时,an恒为常数P,则 an =P,an+1=5an+27,an+2=
=
=p,再由数列{an}的各项均为正整数,求出参数的值.解答:若存在m∈N*,当n>m且an为奇数时,an恒为常数P,则 an =P,an+1=5an+27,an+2=
=
=
=p,∴p(2k-5)=27,∵数列{an}的各项均为正整数,
故当k=3时,p=9,当k=5 时,p=1,
故答案为 1或9.
点评:本题考查数列的递推公式的性质和应用,解题的关键是得出an =P,an+1=5an+27,an+2=
=
=p,从而利用数列{an}的各项均为正整数,求出参数的值.