# Binary subtraction in Java

I'm trying to make a binary calculator that subtracts two binary numbers (only with base 2) without parsing it.

Can anyone help me with the situation that I have zero in the upper number and one in the lower number, I can't seem to write the code for it.

``````for (int i = ss.length()-1; i > -1; i--)
{
if(s.charAt(i)=='0' && ss.charAt(i)=='0') sb.append("0");
else if (s.charAt(i)=='1' && ss.charAt(i)=='0') sb.append("1");
else if (s.charAt(i)=='1' && ss.charAt(i)=='1') sb.append("0");
else
{
sb.append("1");
doit(s,i+1,sb);
}
}

for (int i = s.length() - ss.length(); i >-1; i--)
{
sb.append(s.charAt(i));
}

ArrayList<Character> res = new ArrayList<>();
for (int i =  sb.length()-1; i > -1; i--)
{
}
System.out.println(res);
}
public static void doit(StringBuilder s, int i, StringBuilder sb)
{
for (int j = i; j > -1; j--)
{
if(s.charAt(j)=='0')
{
s.setCharAt(j, '1');
}
else
{
s.setCharAt(j, '0');
break;
}
}
}
``````
-
Can you show some of your code that you tried? And what do you mean by : - `binary numbers (only with base 2)`? Binary numbers are base 2 only right? Why explicit mentioning? –  Rohit Jain Nov 14 '12 at 18:32
What have you tried? –  Adam Arold Nov 14 '12 at 18:34
Can you define `without parsing`? I can't tell you to subtract two numbers, but not give you permission to read them. –  jlordo Nov 14 '12 at 18:44
I guess "without parsing" means, 'in character representation of "0" and "1".' Anyway, there's an ambiguity in the assignment: which binary system. A common one is 2's Complement ( simple.wikipedia.org/wiki/Negative_binary_numbers ), which gives you the rules, such as 00000 - 1 = 11111 (or 111111, or 11111 + integer overflow :)) . Just implement them. –  full.stack.ex Nov 14 '12 at 18:47

You can do it strictly bitwise, right to left, like at least some chips do. The tricky knowledge is a five-column table: (a,b, carry bit from prior position) -> (result, new carry bit). You don't actually borrow from the higher-level positions; you carry the underverflow into those instead. See table 2.4 here:

Define two methods: (a,b, carry bit from prior position) -> result and (a,b, carry bit from prior position) -> new carry bit, and apply them right to left.

Alternative: invert your second argument according to the rules here: http://simple.wikipedia.org/wiki/Negative_binary_numbers .

Then add #1 to the inverted #2 :).

PS. Who said it's a bad assignment :)?

-

Binary rules of subtraction.

``````1 - 1 = 0
0 - 0 = 0
1 - 0 = 1
0 - 1 = 1 (needs a carry bit from a higher bit position.
You might have to check several higher bits before you
find the carry bit.  -1 otherwise.)
``````
-
I add'd code, can any tell me why this doesnt work? –  Daerik Fisher Nov 14 '12 at 19:38
Hard to find out: too convoluted, too procedural. Would require debugging/nitpicking. I'd better redo it using a more structured approach. See my answer. You do it right going right to left. At each step, use two simple methods that map (a, b, carry) to a-b and new carry, respectively. The methods are easy to write: for each of 8 combinations of (a, b, carry) return the output bit. And your code will magically get clear and, chances are, will work right away. Or you'll be able to debug it easily. Try it! –  full.stack.ex Nov 14 '12 at 19:51