# Performing the math behind public key cryptography

I was pretty fascinated by this simple example of the idea behind public key cryptography, and sat down to write my own `Client <- Server -> Client` example using Java. Just a simple back and forth that encodes messages using the resulting secret.

The problem I initially encountered was a technical one. In the demonstration, the author determines the result of the equation:

`3 ^ (24 * 54) mod 17`

With a value:

`= 1`

But my question is, how would one approach the calculation of such a large number in Java?

Or is the example provided simply that: an example, and not the actual method of calculation?

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Modular exponentiation by repeated squaring. If nobody elaborated until I return from dinner, I will. –  Daniel Fischer Oct 29 '12 at 17:09
Wikipedia link: en.wikipedia.org/wiki/Modular_exponentiation –  assylias Oct 29 '12 at 17:16

There must be a good mathematical reason for it (Daniel Fischer seems to have one). In any case, you can use a BigInteger:

``````public static void main(String[] args) {
BigInteger bi = new BigInteger("3")
.modPow(new BigInteger(String.valueOf(24 * 54)), new BigInteger("17"));
System.out.println(bi);
}
``````

which outputs 1.

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Interesting! I also found the `valueOf()` static method - it seems to be slightly easier to use: `BigInteger.valueOf(3).modPow(BigInteger.valueOf(24 * 54), BigInteger.valueOf(17))` –  Craig Otis Oct 29 '12 at 17:15
Emphasis on `slightly` easier. Heavy objects are heavy. :( –  Craig Otis Oct 29 '12 at 17:16
For the life of me I still don't know why there isn't a BigInteger constructor capable of taking a numeric literal. –  Wug Oct 29 '12 at 18:37
@Wug Yes - I wonder every time I need to use that class too ;-) –  assylias Oct 29 '12 at 18:38
@Wug I believe it's intentionally missing to facilitate internal caching/reuse. –  Craig Otis Nov 9 '12 at 21:41

You need to use BigInteger class to deal with such big numbers. It provides arithmetic operations on big integers.

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