Dynamic Programming == - Given a flight itinerary consisting of starting city, destination city, and ticket price (2D list) - find the optimal price flight path to get from start to destination. (A variation of Dynamic Programming Shortest Path) - Given some coin denominations and a target value `M`, return the coins combination with the minimum number of coins. - Time complexity: `O(MN)`, where N is the number of distinct type of coins. - Space complexity: `O(M)`. - Given a set of numbers in an array which represent a number of consecutive days of Airbnb reservation requested, as a host, pick the sequence which maximizes the number of days of occupancy, at the same time, leaving at least a 1-day gap in-between bookings for cleaning. - The problem reduces to finding the maximum sum of non-consecutive array elements. - E.g. ~~~ // [5, 1, 1, 5] => 10 The above array would represent an example booking period as follows - // Dec 1 - 5 // Dec 5 - 6 // Dec 6 - 7 // Dec 7 - 12 The answer would be to pick Dec 1-5 (5 days) and then pick Dec 7-12 for a total of 10 days of occupancy, at the same time, leaving at least 1-day gap for cleaning between reservations. Similarly, // [3, 6, 4] => 7 // [4, 10, 3, 1, 5] => 15 ~~~ - Given a list of denominations (e.g., `[1, 2, 5]` means you have coins worth $1, $2, and $5) and a target number `k`, find all possible combinations, if any, of coins in the given denominations that add up to `k`. You can use coins of the same denomination more than once.