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i have written a program to find out the number of digit in a given number in java. Is it a good way to do it and what is the time complexity of the program:

import java.util.*;

public class Inst {
     /**
     * @param args
     */
    public static void main(String[] args) {

            Scanner sc = new Scanner(System.in);
             double a = sc.nextDouble();
            for(int n=0;n<200000;n++)
            {
             double b=Math.pow(10, n);

             double d=a/b; 
            if(d>=0 & d<=9)
            {
                System.out.println("The number has "+(n+1)+" DIGITS");
                break;
            }
            }

    }

}
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4  
No this doesnt seem like a good way to do this to me, there is a lot of unnecessary operations. the scanner gives you a string, just check whether or not its an actual number and then count the number of char's –  Neil Locketz Feb 26 '13 at 1:57

4 Answers 4

How about this?

double input = Input;
int length = (input + "").length();
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ya thanks but i want to make a program that can be implemented in any language. –  Shoummo Rauth Feb 26 '13 at 2:04
import java.util.*;

public class JavaLength {
  public static void main(String[] args){ 
   Scanner sc = new Scanner(System.in);
   Double d = sc.nextDouble();
   String dString = d.toString();
   System.out.println(d);
   if(dString.contains(".")){
      System.out.println("Total Characters: " + (dString.length() -1 ));
   }else{
      System.out.println("Total Characters: " + (dString.length()));
   } /*-1 for the '.' in between, if it exists!*/
}
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FWIW, the most efficient way to test the number of (decimal) digits needed to represent an integer will be a tree of if / else tests. The complexity will be O(1), but the code will be UGLY (but portable); e.g.

int num = ...

if (num >= 0)
    if (num < 1000000)
        if (num < 10000)
            if (num < 100)
                if (num < 10)
                    return 1
                else
                    return 2
            else 
                ...
        else
            ...
    else 
        ...
else 
    ...
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That's like claiming FFT is O(1), as any real input sequence is finite. In reality that solution is O(log n). I'm not sure though if it's ugly or not. –  Aki Suihkonen Feb 26 '13 at 7:06
    
It is O(log N) where N is the largest possible value of the type of num. For any primitive type, N will be a constant. But the approach wouldn't work for types where N isn't a constant ... because that would imply a test tree whose size is not constant. –  Stephen C Feb 27 '13 at 6:11
    
... Therefore, it is justifiable in substituting for N and calling this O(1). (And it makes sense ... because time taken does NOT vary as O(log N) if N is the value of num!) By constrast, the time taken to do an FFT depends on the size of the input array, and that is a runtime parameter. –  Stephen C Feb 27 '13 at 6:16

Using pow / log is not generally a good solution, as there may be a number close to a power of ten that rounds to the next integer. In double precision one should be able to precisely store all 15 digit numbers for which log10 should be absolutely < 15. In reality log10(10^15 - 100) still rounds to 15.

One will be stuck with the same algorithms, that are internally used in decimal to string conversions:

trial division:

while (i > 0) { i=i/10;  count++; }

trial multiplication:

j=10; while (i >= j) { j*=10; count++; }

trial division from msb to lsb converting to string;

j=10000000; while (i>0) { 
                 while (i>=j) { digit++;i-=j;}; 
                 j/=10; *str++=digit+'0'; digit=0:
            }

Binary to bcd conversion using double dabble algorithm where each digit is represented by reduced set of hexadecimal digits (omitting a-f).

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