Color N boxes using M colors such that K boxes have different color from the box on its left

Given N number of boxes arranged in a row and M number of colors. The task is to find the number of ways to paint those N boxes using M colors such that there are exactly K boxes with a color different from the color of the box on its left. Print this answer modulo 998244353.
Examples: 
 

Input: N = 3, M = 3, K = 0 
Output: 3 
Since the value of K is zero, no box can have a different color from color of the box on its left. Thus, all boxes should be painted with same color and since there are 3 types of colors, so there are total 3 ways. 
Input: N = 3, M = 2, K = 1 
Output: 4 
Let’s number the colors as 1 and 2. Four possible sequences of painting 3 boxes with 1 box having different color from color of box on its left are (1 2 2), (1 1 2), (2 1 1) (2 2 1) 
 

Prerequisites : Dynamic Programming
 

Approach: This problem can be solved using dynamic programming where dp[i][j] will denote the number of ways to paint i boxes using M colors such that there are exactly j boxes with a color different from the color of the box on its left. For every current box except 1^st, either we can paint the same color as painted on its left box and solve for dp[i – 1][j] or we can paint it with remaining M – 1 color and solve for dp[i – 1][j – 1] recursively.

Steps to follow to according to above approach:

• If idx is greater than N, then check if diff is equal to K.
  • *If diff is equal to K, then return 1.
             *Else, return 0.
• If the result for the current value of idx and diff is not equal to -1 then return the precomputed result dp[idx].
• Otherwise, recursively call solve() function with idx+1, diff, N, M, and K and store the result in the variable ans.
• recursively call solve() function with idx+1, diff+1, N, M, and K, and multiply the result with (M-1).
• add the value obtained in step 5 to the result obtained in step 4, and take its modulo with MOD.
• store the result obtained in step 6 in the dp array for the current value of idx and diff, and return the same value.

Below is the code to implement the above approach: 
 

3

Time Complexity: O(M*M)
Auxiliary Space: O(M*M)

Efficient approach : Using DP Tabulation method ( Iterative approach )

The approach to solve this problem is same but DP tabulation(bottom-up) method is better then Dp + memoization(top-down) because memoization method needs extra stack space of recursion calls.

Steps to solve this problem :

• Create a DP to store the solution of the subproblems .
• Initialize the DP with base cases by initializing the first row of DP.
• Now Iterate over subproblems to get the value of current problem form previous computation of subproblems stored in DP.
• Return the final solution stored in dp[1][K].

Implementation :

Output: 

3

Time Complexity:  O(N * N)
Auxiliary Space:  O(N)