Iterative Power (Binary Exponentiation)

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Sun Feb 06 2022 05:47:23 GMT+0000 (Coordinated Universal Time)

Saved by @Uttam #java #mathematics #lecture #gfg #geeksforgeeks #efficientmethod #naivemethod #iterativepower #binaryexponentiation 

// Efficient Method : Time Complexity : θ(logn), Auxiliary Space: θ(1)

import java.io.*;
import java.util.*;

public class Main {
	
	static int power(int x, int n)
	{
	    int res = 1;
    
        while(n>0)
        {
          if(n%2 != 0) 
          {
            res = res * x;
            x = x*x;
            n = n/2;
          }
          else 
          {
            x = x*x;
            n = n/2;
          }
        }

		return res; 
	}

	public static void main (String[] args) {
		
		int x = 3, n = 4;

		System.out.println(power(x, n));

	}
}
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3^10 = 3^8 * 3^2 3^19 = 3^16 * 3^2 * 3^1 10 : 1010 (3^8 * 3^4 * 3^2 * 3^1) 1.) Every numbers can be written as sum of powers of 2 (set bits in binary representation) 2.) We can traverse through all bits of a number (From LSB to MSB in O(logN) time. while (n is greater than 0) { if(n%2 != 0) // Bit is 1 else // Bit is 0 n = n/2; } --------------------------------------------- x=4, n =5 Initially : res = 1 1st Iteration : res = 4 x = 16 n = 2 2nd Iteration : res = 4 x = 16 * 16 = 256 n = 1 3rd Iteration : res = 4 * 256 = 1024 x = 256 * 256 = 65,536 n = 0 --------------------------------------------- 5 : 1001 (4^8 * 4^4 * 4^2 * 4^1) res = 4^4 * 4^1