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I see an LCG implementation in Java under Random class as shown below:

 * This is a linear congruential pseudorandom number generator, as
 * defined by D. H. Lehmer and described by Donald E. Knuth in
 * <i>The Art of Computer Programming,</i> Volume 3:
 * <i>Seminumerical Algorithms</i>, section 3.2.1.
 * @param  bits random bits
 * @return the next pseudorandom value from this random number
 *         generator's sequence
 * @since  1.1

protected int next(int bits) {
    long oldseed, nextseed;
    AtomicLong seed = this.seed;
    do {
        oldseed = seed.get();
        nextseed = (oldseed * multiplier + addend) & mask;
    } while (!seed.compareAndSet(oldseed, nextseed));
    return (int)(nextseed >>> (48 - bits));

But below link tells that LCG should be of the form, x2=(ax1+b)modM

But above code does not look in similar form. Instead it uses & in place of modulo operation as per below line

nextseed = (oldseed * multiplier + addend) & mask;

Can somebody help me understand this approach of using & instead of modulo operation?

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Bitwise-ANDing with a mask which is of the form 2^n - 1 is the same as computing the number modulo 2^n: Any 1's higher up in the number are multiples of 2^n and so can be safely discarded. Note, however, that some multiplier/addend combinations work very poorly if you make the modulus a power of two (rather than a power of two minus one). That code is fine, but make sure it's appropriate for your constants.

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This can be used if mask + 1 is a power of 2.

For instance, if you want to do modulo 4, you can write x & 3 instead of x % 4 to obtain the same result.

Note however that this requires that x be a positive number.

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