so, firstly let get rid of repetition in our array, for example: we won't count array [1, 2, 2, 4] cause 2 appears twice.

let's solve this problem. we can see that every new element will be at least 2 times greater than the previous. so, if $$$n < 10^5$$$, we will place not more than $$$log (n) + 1= 17$$$ elements. let's solve this using dynamic programming: $$$dp_{i, j} = $$$ number of arrays consists of $$$i$$$ elements and last element is $$$j$$$. $$$dp_{i, j}$$$ we update from $$$dp_{i-1, k}$$$ for all $$$k$$$ which are divisors of $$$n$$$ except $$$k = n$$$. so, as $$$i$$$ as small enough (17), it will work very fast.

how this help solve the original problem?

Fact 1: let $$$k = 5$$$ and we have array $$$a=[1, 2, 4]$$$, and we want to count only good arrays where distinct elements are the same like in $$$a$$$. these arrays are $$$[1, 1, 1, 2, 4]$$$, $$$[1, 1, 2, 2, 4]$$$, $$$a[1, 1, 2, 4, 4]$$$, and so on... what we can see? this is a well-known distribution problem. so, the number of the good arrays we can use in the original problem is the number of ways to distribute $$$k - size(a)$$$ elements between $$$size(a)$$$ 'containers'. this is $$$C_{k-1, size(a)-1}$$$.

Fact 2: we can also see that in order to count the number of good arrays produced from the array $$$a$$$ in 'fact 1', the elements in the array $$$a$$$ don't matter to us. we need only $$$size(a)$$$. so, let see at all ours $$$dp_{i, j}$$$ — this number is equal to a number of arrays that can be used as $$$a$$$ in 'fact 1'. so, as elements in $$$a$$$ don't matter, let take the answer for an abstract array with length $$$i$$$ = $$$C_{k-1, i-1}$$$ and multiply this number with the number of arrays that can be length $$$i$$$ = $$$dp_{i, j}$$$ (note that we iterate also through all possible $$$j$$$-s).

the overall answer is the sum of all products computed in 'fact 2'