3591: Good Sequences
Description
Squirrel Liss is interested in sequences. She also has preferences of integers. She thinks n integers a1,a2,...,an are good.
Now she is interested in good sequences. A sequence x1,x2,...,xk is called good if it satisfies the following three conditions:
- The sequence is strictly increasing, i.e. xi<xi+1 for each i (1≤i≤k-1).
- No two adjacent elements are coprime, i.e. gcd(xi,xi+1)>1 for each i (1≤i≤k-1) (where gcd(p,q) denotes the greatest common divisor of the integers p and q).
- All elements of the sequence are good integers.
Find the length of the longest good sequence.
The input consists of two lines. The first line contains a single integer n (1≤n≤105) − the number of good integers. The second line contains a single-space separated list of good integers a1,a2,...,an in strictly increasing order (1≤ai≤105;ai<ai+1).
Print a single integer − the length of the longest good sequence.
5
2 3 4 6 9
4
9
1 2 3 5 6 7 8 9 10
4
In the first example, the following sequences are examples of good sequences: [2; 4; 6; 9], [2; 4; 6], [3; 9], [6]. The length of the longest good sequence is 4.