Java Notes

Example - Factorial

Factorial n (usually written n!) is the product of all integers up to and including n (1 * 2 * 3 * ... * n). This problem is often (inappropriately) used as a programming example, especially to show how to write recursive functions.

Recursive solution is a bad example

Writing a recursive factorial function is a mistake because Recursion is a great tool, but using it where it's not appropriate doesn't set a great example.

Range and precision problems

Even the iterative solution has problems because the large numbers that factorial generates cannot be represented in the limited range of integers, or limited precision of floating-point numbers. Programs using these primitive types are very dangerous because they will produce garbage results without comment.

Solution with java.math.BigInteger

The proper solution is to use java.Math.BigInteger. Here is a program with int and BigInteger solutions.
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// numbers/Factorial.java - Computes factorial
// Fred Swartz - 2003-11-02
import java.math.BigInteger;
public class Factorial {
    public static void main(String[] args) {
        
        //-- BigInteger solution.
        BigInteger n = BigInteger.ONE;
        for (int i=1; i<=20; i++) {
            n = n.multiply(BigInteger.valueOf(i));
            System.out.println(i + "! = " + n);
        }
        
        //-- int solution (BAD IDEA BECAUSE ONLY WORKS TO 12).
        int fact = 1;
        for (int i=1; i<=20; i++) {
            fact = fact * i;
            System.out.println(i + "! = " + fact);
        }
    }
}

Sample output

An int produces pure garbage after 12, and long only makes it to 20. The shame of integer arithmetic is that it doesn't stop when the values are bad -- it just produces garbage by throwing away bits in the result that don't fit in an int (32 bits) or long (64-bits). BigInteger values are limited only by the amount of memory.      
BigInteger outputint output
1! = 1
2! = 2
3! = 6
4! = 24
5! = 120
6! = 720
7! = 5040
8! = 40320
9! = 362880
10! = 3628800
11! = 39916800
12! = 479001600
13! = 6227020800
14! = 87178291200
15! = 1307674368000
16! = 20922789888000
17! = 355687428096000
18! = 6402373705728000
19! = 121645100408832000
20! = 2432902008176640000
1! = 1
2! = 2
3! = 6
4! = 24
5! = 120
6! = 720
7! = 5040
8! = 40320
9! = 362880
10! = 3628800
11! = 39916800
12! = 479001600
13! = 1932053504 BAD
14! = 1278945280 BAD
15! = 2004310016 BAD
16! = 2004189184 BAD
17! = -288522240 BAD
18! = -898433024 BAD
19! = 109641728 BAD
20! = -2102132736 BAD