# Counting the occurrence of each number in prime factors of an integer

I want to count the number of each prime factor of an integer. For an example 18=2^1*3^2. I want to get all exponent part of each prime number. For number 18, it is 1+2=3.
Below is the program which generates all the prime factors of an integer.

``````    Scanner sc = new Scanner(System.in);
int n = sc.nextInt();
for (int i = 2; i <= n / i; i++) {
while (n % i == 0) {
System.out.print(i + ", ");
n /= i;
}
}
if (n > 1)
System.out.print(n + ", ");
``````

For input 18, this program prints 2, 3, 3, . As for completing my requirement, to count the occurrence of each prime factor, i can first add them all to a list, then a `for` loop from starting to ending of the list can count the occurrence of each number. But this idea doesn't seem good to me. Unnecessary i am adding one `for` loop, for all prime factors, which just tells me that this prime factor comes n times in the list.
Any better approach to get the number of individual number of prime factors of an integer.

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Just count how many times your inner loop is executed. –  n.m. Apr 12 '12 at 15:59
`i * i <= n` is slightly faster than `i <= n / i` –  Peter Lawrey Apr 12 '12 at 16:07
@n.m. Nope. I don't want to count the total number of factors. I want to count that `for all prime factors of an integer, how many times every prime factor is occurring` . For example integer 18 can be written as 2^1*3^2. I want to count all the occurance of all factors. As in the prime factor of integer 18, 2 comes 1 time and 3 comes 2 times. So my final ans is `2, 3`. What you are saying will print the number of prime factors, which is 3 in this example. –  Ravi Joshi Apr 12 '12 at 16:08
@Ravi: the two conditions are equivalent (`i*i<=n` if and only if `i<=n/i`), provided nothing overflows. What Peter is saying is that the compiler+JIT isn't smart enough to figure that out and do the faster calculation regardless of which you write. –  Steve Jessop Apr 12 '12 at 17:09

yy, just as @attila and @robert said:

``````import java.util.Scanner;
import java.util.TreeMap;

public class Test{
public static void main( String args[] ){
Scanner sc = new Scanner(System.in);
int n = sc.nextInt();
TreeMap<Integer, Integer> factors = new TreeMap<Integer, Integer>();

for (int i = 2; i <= n / i; i++) {
int count = 0;

while (n % i == 0) {
System.out.print(i + ", ");
n /= i;
count ++;
}
if( count > 0 )
factors.put( i, count );
}
if (n > 1){
System.out.print(n + ", ");
factors.put( n, 1 );
}
System.out.println();

System.out.println( "-------------" );
for( Integer factor : factors.keySet() ){
System.out.println( factor + "^" + factors.get( factor ) );
}
}
}
``````

i'm using a treemap because it keeps the factors in their natural order, which is neat :) you could also use a hashmap which should be a bit faster. but the implementation of the prime decomposition should be so slow that i don't think it matters much :)

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I apologize for not asking the question correctly. Let say i have an integer 18. `18=2^1*3^2` i want the exponent number for each prime factor. here exponent factors are 1 and 2. –  Ravi Joshi Apr 12 '12 at 16:18
updated my answer accordingly ... –  kritzikratzi Apr 12 '12 at 16:50
Thank you so much. Works fine. Initially i was thinking to make use of any `java collection` but i thought that mathematically if there exists any other solution, then i should implement that. Because at the end i just want `prime_num_1^any_integer*prime_num_2^any_integer*prime_num_3^any_integer.....` –  Ravi Joshi Apr 12 '12 at 17:01
you don't need no treemap here. First, since you test `i`s in increasing order, you can only get factors in increasing order. Second, if all you do is print, why not print them out each inside the inner loop, under `if (count > 0) ...` (and one more possible printout in the end, if `n>1`)? The only need for TreeMap is if you'd want to return it. –  Will Ness Apr 13 '12 at 11:28
"The only need for TreeMap is if you'd want to return it." yes, that's exactly why i put it there :) –  kritzikratzi Apr 13 '12 at 17:44
Every time you are executing `n/=i;`, you are encountering a factor. So by incrementing a counter (Starting from 0) at that point, you get the total number of factors at the end of the factorization process.
Nope. I don't want to count the total number of factors. I want to count that `for all prime factors of an integer, how many times every prime factor is occurring` . For example integer 18 can be written as 2^1*3^2. I want to count all the occurance of all factors. As in the prime factor of integer 18, 2 comes 1 time and 3 comes 2 times. So my final ans is `2, 3`. What you are saying will print the number of prime factors, which is 3 in this example. –  Ravi Joshi Apr 12 '12 at 16:04
@DavidConrad `18=2^1*3^2` i want the exponent number for each prime factor. here exponent factors are 1 and 2. –  Ravi Joshi Apr 12 '12 at 16:16