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I'm trying to understand the code from an answer I received yesterday:

2nd: How to make a bitwise NOR gate
1st: How to do a bitwise NOR Gate in Python (editing python maths to work for me)

a=0b01100001
b=0b01100010

bin((a ^ 0b11111111) & (b ^ 0b11111111))

I now understand EVERYTHING except:

the & between the two values

and the ^ 11111111 ( I know that 0b is base 2)

Can someone please explain these?

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marked as duplicate by Karoly Horvath, Mike W, CSᵠ, iCodez, fedorqui Oct 7 '13 at 12:59

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

2  
Please include a link to the previous question, so everyone else doesn't have to go looking for it. –  John Zwinck Oct 6 '13 at 13:30
    
Better yet - include the code in this question. –  Mike W Oct 6 '13 at 13:32
6  
It's already explained stackoverflow.com/questions/19197495/… –  stark Oct 6 '13 at 13:33
    
docs.python.org/2/reference/… –  Haidro Oct 6 '13 at 13:34
    
Instead of posting a new question every time, please add a comment to explain what is unclear so I can improve my answer. Now, we have 3 questions for the same thing, it's a mess. –  Maxime Oct 6 '13 at 14:18
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1 Answer

How NOR works?

The expression x NOR y can be broken using AND, OR, and NOT:

x NOR y == NOT(x OR y) == NOT(x) AND NOT(y)

So, for your given values:

a=0b01100001
b=0b01100010

a NOR b would be NOT(a) AND NOT(b). Now think how would you do a NOT(a)? You just need to flip the bits. What is the way to flip the bits? An XOR(^). How?

0 ^ 1 == 1
1 ^ 1 == 0

So, taking the XOR of any bit with 1 will flip that bit. i.e. NOT(somebit) == a XOR somebit. So, in your case, just take an XOR of each bits in a and b with 1 will get you the NOT:

   01100001
^  11111111
------------
   10011110

That is, we do an XOR with 11111111. Note the number of 1's is same as the number of bits in a.

Putting it together:

NOT(a) = a ^ 0b11111111
NOT(b) = b ^ 0b11111111

Now, that we got the NOTs of a and b, let's do an AND. So, what's the way to do an AND? Just do a bitwise &.

That's pretty simple:

NOT(a) AND NOT(b) == (a ^ 0b11111111) & (b ^ 0b11111111)
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