Find i’th index character in a binary string obtained after n iterations | Set 2

Given a decimal number m, convert it into a binary string and apply n iterations, in each iteration 0 becomes “01” and 1 becomes “10”. Find ith(based indexing) index character in the string after nth iteration.
Examples: 
 

Input: m = 5 i = 5 n = 3
Output: 1
Explanation
In the first case m = 5, i = 5, n = 3. 
Initially, the string is  101  ( binary equivalent of 5 )
After 1st iteration -   100110
After 2nd iteration - 100101101001
After 3rd iteration -   100101100110100110010110 
The character at index 5 is 1, so 1 is the answer

Input: m = 11 i = 6 n = 4
Output: 1

A naive approach to this problem has been discussed in the previous post. 
Efficient algorithm: The first step will be to find which block the i-th character will be after N iterations are performed. In the n’th iteration distance between any two consecutive characters initially will always be equal to 2^n. For a general number m, the number of blocks will be ceil(log m). If M was 3, the string gets divided into 3 blocks. Find the block number in which kth character will lie by k / (2^n), where n is the number of iterations. Consider m=5, then the binary representation is 101. Then the distance between any 2 consecutive marked characters in any i’th iteration will be as follows
0th iteration: 101, distance = 0 
1st iteration: 10 01 1 0, distance = 2 
2nd iteration: 1001 0110 1001, distance = 4 
3rd iteration: 10010110 01101001 10010110, distance = 8 
In the example k = 5 and n = 3, so Block_number, when k is 5, will be 0, as 5 / (2^3) = 0
Initially, block numbers will be 
 

Original String :    1   0    1
Block_number    :    0   1    2

There is no need to generate the entire string, only computing in the block in which the i-th character is present will give the answer. Let this character be root root = s[Block_number], where s is the binary representation of “m”. Now in the final string, find the distance of the kth character from the block number, call this distance as remaining. So remaining = k % (2^n) will be the index of i-th character in the block. If remaining is 0, the root will be the answer. Now, in order to check whether the root is the actual answer use a boolean variable flip which whether we need to flip our answer or not. Following the below algorithm will give the character at the i-th index. 
 

bool flip = true;
while(remaining > 1){
   if( remaining is odd ) 
        flip = !flip    
   remaining = remaining/2;
}

Below is the implementation of the above approach: 
 

1

Time Complexity: O(log Z), where Z is the distance between initially consecutive bits after N iterations
Auxiliary Space: O(1) 

Approach 2: Bitset Approach

1

Time Complexity:  O(1),  since the number of iterations and the size of the bitset (32 in this case) are constant.
Auxiliary Space:  O(1),  since the bitset size is constant and does not depend on the input values.