**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 `NOT`

s 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)
```