Given an array of **infinite** length having all elements as 0.↵
2 numbers N,K. In the next N lines , 3 integers are given : l, r, and x↵
you have to add x to all the elements in the range l to r (inclusive)↵
↵
Your task is to find a subsequence that satisfies all the given conditions :↵
↵
- Subsequence size should be maximum↵
↵
- Lexicographically minimum↵
↵
- it must form an arithmetic progression i.e [z, z + k, z + 2k, z + 3k,..., z + (l — 1)k]↵
here z is an arbitrary number and k is given in the input (see line 2) and l is the length of the subsequence.↵
↵
↵
META DATA : ↵
1 <= x <= 1e9;↵
1 <= l <= r <= 1e9;↵
1 <= N <= 2e5;↵
↵
**note that N is not the length of the array**↵
↵
Any kind of help will be highly appreciated, thanks
2 numbers N,K. In the next N lines , 3 integers are given : l, r, and x↵
you have to add x to all the elements in the range l to r (inclusive)↵
↵
Your task is to find a subsequence that satisfies all the given conditions :↵
↵
- Subsequence size should be maximum↵
↵
- Lexicographically minimum↵
↵
- it must form an arithmetic progression i.e [z, z + k, z + 2k, z + 3k,..., z + (l — 1)k]↵
here z is an arbitrary number and k is given in the input (see line 2) and l is the length of the subsequence.↵
↵
↵
META DATA : ↵
1 <= x <= 1e9;↵
1 <= l <= r <= 1e9;↵
1 <= N <= 2e5;↵
↵
**note that N is not the length of the array**↵
↵
Any kind of help will be highly appreciated, thanks