4

Is there a more efficient way of performing the following calculation? It works fine, but something tells me that x &= (1 << 8) - 1 ^ 1 << 3 can be written to avoid some calculations and increase speed.

def unset_mask(width, index):
    return (1 << width) - 1 ^ 1 << index

x = 0b11111111
x &= unset_mask(8, 3)
assert x == 0b11110111

3 Answers 3

3

Actually, you don't need to state the width. Bigints behave the right way when you do this:

>>> bin(255 & ~(1 << 3))
'0b11110111'
>>> bin(65535 & ~(1 << 3))
'0b1111111111110111'
>>> bin(75557863725914323419135 & ~(1 << 3))
'0b1111111111111111111111111111111111111111111111111111111111111111111111110111'

It's because negative numbers have an "infinite" string of ones preceding them. So when you complement a positive number (which starts with an "infinte" string of zeros), you get a negative number (-(x + 1) to be exact). Just don't trust the bin representation of negative numbers; it doesn't reflect the actual bits in memory.

So you would rewrite unset_mask like so:

def unset_mask(index):
    return ~(1 << index)

x = 0b11111111
x &= unset_mask(3)
print x == 0b11110111  # prints True
1
  • Thank you very much! That was a very thorough answer and explanation. Jul 11, 2012 at 13:02
1

You can use this to clear a bit in x:

x &= ~(1 << index)
1

This will unset the bit:

x ^= 1 << 3 & x

In a function:

def unset_bit(x, n):
    return 1 << n & x ^ x
1
  • I cannot get it shorter than this. Jul 11, 2012 at 7:43

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.