Count ways to reach the Nth stair using multiple 1 or 2 steps and a single step 3

Given an integer N number of stairs, the task is count the number ways to reach the N^th stair by taking 1 or 2 step any number of times but taking a step of 3 exactly once.
Examples: 
 

Input: N = 4 
Output: 2 
Explanation: 
Since a step of 3 has to be taken compulsorily and only once. So, there are only two possible ways: (1, 3) or (3, 1)
Input: N = 5 
Output: 5 
Explanation: 
There are five possible ways to reach 5th stair: (2, 3), (3, 2), (1, 1, 3), (1, 3, 1), (3, 1, 1) 
 

Approach: This problem can be solved using the concept of Permutations & Combinations. There is a constraint according to which 3 steps at a time have to be taken exactly once. The idea is to count the number of positions that are possible for 3 steps to be taken.
Now, the next task is to find the number of possible two-steps in the movement to N^th stair, which is (N – 3) / 2. In this way, all the possible ways will be covered if the count of two-step is incremented once at a time and for each step, all the possible combinations are calculated.
After Generalising the steps the possible combinations for each possible sequence will be 
 

Ways = (Length of sequence)! * (Count of 2-step)! 
       ------------------------------------------
                  (Count of 1-step)! 

Algorithm: 
 

• Initialize the length of the sequence to (N – 2).
• Initialize the count of 1-steps to (N – 3).
• Initialize the count of 2-steps to 0
• Initialize the possible count of 2-steps to (N-3)/2.
• Run a loop until the possible count of 2-steps is equal to the actual count of 2-steps. 
  • Find the possible number of ways with the help of the current length of the sequence, count of 1-steps, count of 2-steps and by above-given formulae.
  • Reduce the length of the sequence by 1.
  • Increase the count of 2-steps by 1

Below is the implementation of the above approach.
 

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Performance Analysis: 
 

• Time Complexity: As in the above approach, there is one loop to check the possible permutations for each sequence which can go up till (N-3) which takes O(N) time and to find the possible combinations it will take O(N), Hence the Time Complexity will be O(N²).
• Space Complexity: As in the above approach, there is no extra space used, Hence the space complexity will be O(1).

Note: The time complexity can be improved up to O(N) by precomputing the factorials for every number till N.