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im working on an RSA project in Java. I believe the only issue i have is that my private key (d) is returning 0. the code computing it:

privateKey = (one.mod(phi)).divide(publicKey); //phi is (p-1)*(q-1), publicKey = 65537

this returns 0, which doesnt really make sense because while 1/publicKey is small, but not that small that it cannot be represented by a BigInteger correct? or should i have used bigDecimal for this instead of bigInteger?

anyway here is the rest of my code, maybe my issue is elsewhere and someone can spot it:

package encryptionalgorithms;

import java.math.BigInteger;
import java.util.*;

/**
 *
 * @author YAZAN Sources:
 * http://introcs.cs.princeton.edu/java/78crypto/RSA.java.html
 * http://www.math.rutgers.edu/~greenfie/gs2004/euclid.html
 * http://www.youtube.com/watch?v=ejppVhOSUmA
 * http://stackoverflow.com/questions/5818842/problems-encrypting-a-string-using-rsa-algorithm-in-java
 */
public class EncryptionAlgorithms {

    private static BigInteger p, q, product, phi, publicKey, r, a, b, privateKey, encrypt, decrypt, message, userN, userE, userD;
    private static BigInteger one = new BigInteger("1");
    private static BigInteger badData = new BigInteger("-1");
    private static BigInteger zero = new BigInteger("0");

    public static void main(String[] args) {
        System.out.println(1%5);
        System.out.println(1%7);
        System.out.println(1%15);       


        PKE();
    }

    public static void PKE() { //Private Key Encryption
        Scanner input = new Scanner(System.in);
        Random rand1 = new Random(System.nanoTime());
        Random rand2 = new Random(System.nanoTime() * 16); //to create a second obscure random number

        p = BigInteger.probablePrime(1024, rand1);
        q = BigInteger.probablePrime(1024, rand2);

        product = p.multiply(q); // n = p * q
        phi = (p.subtract(one)).multiply(q.subtract(one)); // m = (p-1) * (q-1)


        publicKey = new BigInteger("65537"); //must be a prime. GCD(e,m)=1  //65537 = 2^16 + 1  // will have to make an algorith for this later
        privateKey = (one.mod(phi)).divide(publicKey); //weakest link <============

//        System.out.println("Public Keys:");
//        System.out.println("e = " + e + " and n = " + n);
//        System.out.println("Private Keys:");
//        System.out.println("d = " + d + " and n = " + n);

        System.out.println("p = " + p);
        System.out.println("q = " + q);
        System.out.println("product = " + product);
        System.out.println("phi = " + phi);
        System.out.println("public key = " + publicKey);
        System.out.println("private key = " + privateKey);
        System.out.println("");


        System.out.println("please enther the message to be encrypted");
        BigInteger mes = new BigInteger(input.next());
        BigInteger ans = encrypt(mes, product, publicKey);
        decrypt(ans, product, privateKey);
    }

    public static BigInteger encrypt(BigInteger num, BigInteger n, BigInteger e) {
        encrypt = num.modPow(e, n);
        System.out.println("encrypted: " + encrypt);
        return encrypt;
    }

    public static BigInteger decrypt(BigInteger enc, BigInteger n, BigInteger d) {
        decrypt = enc.modPow(d, n);
        System.out.println("decrypted: " + decrypt);
        return decrypt;
    }
}

EDIT:

my println's are showing:

1 1 1

p = 116836516005620566340054773857764031797944186559716240327950855431635039403009755486393306437986151660938961585855042767699921699290213154508261609587992784967007973771920952681452331230679204007231749877985338995375377055530874576754671566809579320008488587254143483816119529551389602238180023655212196118671

q = 118445841243660959783655439569263260088875780880318340730749393826729462878787052603343185844381113282914313404010265021460834832031349936675446265322019791433625601618768573332861024101362551263559309901437229668893444819854637447915924234885201092336165962514242782328851534270944932858310655258614396326481

product = 13838799426264186334752007568314388817999080436393046698822718780049594131958339754285122812528703328831770507600346387196178828551045467705258918741851385458709465331658531514221228970233180703647270287552837753141448222019771566054259160450349111420609315305712076175614925637533331760969764529465148575554436909984186174819968350087737759092473439388442979008215287412729873605743307221889589355321080925515130587917789192951804915620770181045927041436295136776421205411332865156021777271758200515616012524267222882737764344732490495401547779959227857738842827307140880624719496653055925158630393545977988735826751

phi = 13838799426264186334752007568314388817999080436393046698822718780049594131958339754285122812528703328831770507600346387196178828551045467705258918741851385458709465331658531514221228970233180703647270287552837753141448222019771566054259160450349111420609315305712076175614925637533331760969764529465148575554201627626936893293844639874310731800586619421002944427156587163471509103461510413799852863038713660571277312927923885162644159089448617954743333561385124200020571835942175630007463916426158760345221464487800314073495522857104983376877184157533077326498172757372494358574525589233590623533902867064162143381600

public key = 65537

private key = 0

share|improve this question
    
The smallest positive number that a BigInteger can hold is 1. If you're expecting between 0 and 1 then you'll want to use a BigDecimal. –  Shaded May 20 '13 at 15:09
    
i am just using a formula i found online. i thought that the private key is supposed to be an integer but i dont know how to manipulate it to be such –  yazan May 20 '13 at 15:10
    
Can you show what your System.out.printlns are showing, maybe just edit the question and put them as comments after each line? –  Shaded May 20 '13 at 15:11
    
added, the 1's are for the modulo's that i was doing in the begining. u can ignore them –  yazan May 20 '13 at 15:24

1 Answer 1

up vote 4 down vote accepted

You don't want to divide,

privateKey = (one.mod(phi)).divide(publicKey); //phi is (p-1)*(q-1), publicKey = 65537

you need the modular inverse, so use BigInteger.modInverse:

privateKey = publicKey.modInverse(phi);

to get a value such that

privateKey * publicKey ≡ 1 (mod phi)
share|improve this answer
    
but 1 % phi = 1, because 1 % x always = 1. so publicKey * privateKey will have to equal 1? –  yazan May 20 '13 at 15:20
    
it works :). but why does it work is what i do not understand though –  yazan May 20 '13 at 15:21
    
@yazan You don't need publicKey * privateKey = 1 [that's only possible if both are ±1], you need publicKey * privateKey = 1 + someFactor*phi. Then c^(publicKey * privateKey) = c^1 * (c^phi)^(someFactor), and c^phi is ≡ 1 (mod n) (unless one of p and q divides c, but in any case you have c^(publicKey * privateKey) ≡ c (mod n)). –  Daniel Fischer May 20 '13 at 15:22
    
ok. then maybe i misunderstand what the congruence sign means as opposed to the equal sign. could you explain please? –  yazan May 20 '13 at 15:25
    
@yazan a ≡ b (mod c) means that c divides the difference between a and b, i.e. there is a k such that (a - b) = k*c. –  Daniel Fischer May 20 '13 at 15:27

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