# Bitwise operations to add two numbers?

So if I have a number1 and another number2 .. both integers, is my approach corrected in adding two numbers using bitwise operations ? Can this go wrong for any test case ?

``````public int add(int number1, int number2)
{
int carry = (number1&number2)<<1;
int sum = number1^number2^carry;
return sum;
}
``````
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If you plug in a few non-trivial numbers, you're realize that it's wrong. Adders need to be chained one after the other. (hint: you need a loop) –  Mysticial Sep 4 '12 at 4:49
can you give an example of these 2 numbers ? –  Phoenix Sep 4 '12 at 4:51
`3 + 1` as given in the answer so far. Anything with chained carries will also be wrong, `63 + 1`, `127 + 1`, etc... –  Mysticial Sep 4 '12 at 4:54
write a unit test and see your self. –  Jayan Sep 4 '12 at 4:56

Yes. This approach does not work for additions that involve multiple carries. The simplest such case is `3 + 1`; your function gives `0` as a result.

There is no simple general-case solution to solve this -- any solution must take into mind the width of an integer. See Wikipedia's article on gate-level implementations of addition for some approaches.

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Here is how an circuit designer would add two numbers. To translate, the two symbols on top with the double curved left edges are XOR (^), the two in the middle with the flat left edges are AND (&), and the last one with the single curved left edge is OR (|).

Now, here's how you could translate that to code, one bit at a time, using a mask.

``````public int add(final int A, final int B) {
int sum = 0;
int carry = 0;

for (int i = 1; i <= Integer.SIZE; i++) { //JVM uses 32-bit int
int a = A & mask; //bit selection
int b = B & mask;

//sum uses |= to preserve the history,
//but carry does not need to, so it uses =
sum |= a ^ b ^ carry; //essentially, is the sum of bits odd?
carry = ((a & b) | ((a ^ b) & carry)) << 1; //are exactly two of them 1?

mask <<= 1; //move on to the next bit
}
return sum;
}
``````
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not working. I checked it for 3 and 9 and got 12. Also, it doesn't work for negative + positive. –  cookya Jan 11 '13 at 12:20
Works for both positive and negative values, tested for more than 500 values –  SVashisth Sep 7 '14 at 18:31