Interval
- Given a list of schedules, provide a list of times that are available for a meeting.
[ [[4,5], [6,10], [12,14]], [[4,5], [5,9], [13,16]], [[11,14]] ] Example Output: [[0,4], [11,12], [16,23]] - You have a number of meetings (with their start and end times). You need to schedule them using the minimum number of rooms. Return the list of meetings in every room.
- Interval ranges:
- Given 2 interval ranges, create a function to tell me if these ranges intersect. Both start and end are inclusive:
[start, end]- E.g.
[1, 4]and[5, 6]=>false - E.g.
[1, 4]and[3, 6]=>true
- E.g.
- Given 2 interval ranges that intersect, now create a function to merge the 2 ranges into a single continuous range.
- E.g.
[1, 4]and[3, 6]=>[1, 6]
- E.g.
- Now create a function that takes a group of unsorted, unorganized intervals, merge any intervals that intersect and sort them. The result should be a group of sorted, non-intersecting intervals.
- Now create a function to merge a new interval into a group of sorted, non-intersecting intervals. After the merge, all intervals should remain non-intersecting.
- Given 2 interval ranges, create a function to tell me if these ranges intersect. Both start and end are inclusive:
- Given a list of meeting times, check if any of them overlap. The follow-up question is to return the minimum number of rooms required to accommodate all the meetings.
- If you have a list of intervals, how would you merge them?
- E.g.
[1, 3], [8, 11], [2, 6]=>[1, 6], [8-11]
- E.g.