A383361 a(n) is the i-th smallest divisor d_i of A383360(n) for which i*d_i = A383360(n).

1, 2, 5, 5, 7, 9, 7, 6, 8, 11, 13, 8, 11, 8, 17, 13, 19, 17, 23, 19, 12, 29, 23, 31, 37, 16, 29, 41, 31, 43, 47, 16, 37, 53, 20, 41, 43, 35, 59, 61, 47, 25, 67, 21, 53, 71, 73, 28, 59, 79, 20, 61, 49, 83, 89, 67, 27, 55, 28, 71, 97, 73, 101, 103, 79, 107, 65, 109

Offset

1,2

Links

Felix Huber, Table of n, a(n) for n = 1..10000

Formula

a(n) = A383360(n)/A383362(n).

a(n) = A027750(A383360(n),A383362(n)).

Example

a(8) = 6 because 6 is the 5th smallest divisor of A383360(8) = 30 = 5*6.

Maple

with(NumberTheory):
A383360:=proc(n)
    option remember;
    local k, i, L;
    if n=1 then
        1
    else
        for k from procname(n-1)+1 do
            L:=Divisors(k);
            for i to tau(k) do
                if L[i]*i=k then
                    return k
                fi
            od
        od
    fi;
end proc;
A383361:=proc(n)
    local i, M;
    M:=Divisors(A383360(n));
    for i do
        if A383360(n)/i=M[i] then
            return M[i]
        fi
    od;
end proc;
seq(A383361(n), n=1..68);

Crossrefs

Cf. A383360, A383362.

Sequence in context: A263317 A256300 A342852 * A023850 A175649 A240497

Adjacent sequences: A383358 A383359 A383360 * A383362 A383363 A383364

Keyword

nonn,easy

Author

Felix Huber, May 03 2025

Status

approved