Best Time to Buy and Sell Stock

Given an array prices[] of length N, representing the prices of the stocks on different days, the task is to find the maximum profit possible by buying and selling the stocks on different days when at most one transaction is allowed.

Note: Stock must be bought before being sold.

Examples:

Input: prices[] = {7, 1, 5, 3, 6, 4}
Output: 5
Explanation:
The lowest price of the stock is on the 2^nd day, i.e. price = 1. Starting from the 2nd day, the highest price of the stock is witnessed on the 5^th day, i.e. price = 6. 
Therefore, maximum possible profit = 6 – 1 = 5. 

Input: prices[] = {7, 6, 4, 3, 1} 
Output: 0
Explanation: Since the array is in decreasing order, no possible way exists to solve the problem.

Best Time to Buy and Sell Stock using Greedy Approach:

In order to maximize the profit, we have to minimize the cost price and maximize the selling price. So at every step, we will keep track of the minimum buy price of stock encountered so far. If the current price of stock is lower than the previous buy price, then we will update the buy price, else if the current price of stock is greater than the previous buy price then we can sell at this price to get some profit. After iterating over the entire array, return the maximum profit.

Follow the steps below to implement the above idea:

• Declare a buy variable to store the min stock price encountered so far and max_profit to store the maximum profit.
• Initialize the buy variable to the first element of the prices array.
• Iterate over the prices array and check if the current price is less than buy price or not.
  • If the current price is smaller than buy price, then buy on this ith day.
  • If the current price is greater than buy price, then make profit from it and maximize the max_profit.
• Finally, return the max_profit.

Below is the implementation of the above approach:

5

Time Complexity: O(N). Where N is the size of prices array. 
Auxiliary Space: O(1)

Best Time to Buy and Sell Stock using Recursion and Memoization:

We can define a recursive function maxProfit(idx, canSell) which will return us the maximum profit if the user can buy or sell starting from idx.

• If idx == N, then return 0 as we have reached the end of the array
• If canSell == false, then we can only buy at this index. So, we can explore both the choices and return the maximum:
  • buy at the current price, so the profit will be: -prices[idx] + maxProfit(idx+1, true)
  • move forward without buying, so the profit will be: maxProfit(idx+1, false)
• If canSell == true, then we can only sell at this index. So, we can explore both the choices and return the maximum:
  • sell at the current price, so the profit will be: prices[idx]
  • move forward without selling, so the profit will be: maxProfit(idx+1, true)

Below is the implementation of the approach:

5

Time Complexity: O(N), where N is the size of input array prices[]
Auxiliary Space: O(N)

Best Time to Buy and Sell Stock using Dynamic Programming:

We can optimize the recursive approach by storing the states in a 2D dp array of size NX2. Here, dp[idx][0] will store the answer of maxProfit(idx, false) and dp[idx][1] will store the answer of maxProfit(idx, true).

Below is the implementation of the approach:

5

Time complexity: O(N), where N is the length of the given array. 
Auxiliary Space: O(N)