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I need to determine if a signed 32 bit number is a power of two. So far I know the first thing to do is check if its negative since negative numbers cannot be powers of 2. Then I need to see if the next numbers are valid etc... SO I was able to write it like this:

// Return 1 if x is a power of 2, and return 0 otherwise.
int func(int x)
{
     return ((x != 0) && ((x & (~x + 1)) == x));
}

But for my assignment I can only use 20 of these operators:

! ~ & ^ | + << >>

and NO equality statements or loops or casting or language constructs.

So I am trying to convert the equality parts and I know that !(a^b) is the same as a == b but I cant seem to figure it out completely. Any ideas on how to covert that to the allowed operators?

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6  
It's going to be interesting to see if someone can find a way to answer this without just giving you the answer. –  Tim Post Sep 9 '11 at 13:42
2  
A very useful trick to use in this situation is !!x. This normalises the number, so 0 becomes 0 and not-0 becomes 1. It's even efficient (compilers optimise for it). –  David Given Sep 9 '11 at 13:43
1  
I always have trouble with the !!x so if x = 2 and then !x = 1 and then !!x = 0. if x = 0, !x = 0 and !!x = 1? –  jameson Sep 9 '11 at 13:46
6  
Can I open a new stackexchange site proposal for "Incompetent CS instructor X's do-everything-with-!~&^|+<<>> problems"? It's getting to the point where we have enough for a whole site... –  R.. Sep 9 '11 at 13:50
1  
I think these problems would be good if the instructor also understood C, but the way he/she has stated them, they're not solvable in C and the desired "solutions" are full of undefined behavior (which could be fixed just by switching to unsigned arithmetic). I also think it's unfortunate that one student in the class found/knew Stack Overflow and told the whole class to come here to get their homework done for them... –  R.. Sep 9 '11 at 13:54
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4 Answers

Tim's comment ashamed me. Let me try to help you to find the answer by yourself.

What does it mean that x is power of 2 in terms of bit manipulation? It means that there is only one bit set to 1. How can we do such a trick, that will turn that bit to 0 and some other possibly to 1? So that & will give 0? In single expression? If you find out - you win.

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Try these ideas:

  • ~!!x+1 gives a mask: 0 if x==0 and -1 if x!=0.
  • (x&(~x+1))^x gives 0 if x has at most 1 bit set and nonzero otherwise, except when ~x is INT_MIN, in which case the result is undefined... You could perhaps split it into multiple parts with bitshifts to avoid this but then I think you'll exceed the operation limit.
  • You also want to check the sign bit, since negative values are not powers of two...

BTW, it sounds like your instructor is unaware that signed overflow is UB in C. He should be writing these problems for unsigned integers. Even if you want to treat the value semantically as if it were signed, you need unsigned arithmetic to do meaningful bitwise operations like this.

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How do you like them apples instructor? It always pains me that teachers are usually people with no industry experience. Their only experience is playing about. –  Matt Joiner Sep 9 '11 at 13:51
3  
I really don't get it. As someone who's been in academia (admittedly math rather than CS), I always expect rigor and attention to precise definitions in academic work. Yet again and again we see CS homework where the instructor obviously does not care about the precise definitions and specification of the language(s) they're working with... –  R.. Sep 9 '11 at 13:58
    
The question implies that 1 << 31 should be false as its a negative number and not a power of 2. –  Peter Lawrey Sep 9 '11 at 17:04
    
@Peter, no for a signed 32 bit number 1 << 31 is undefined behavior. –  Jens Gustedt Sep 9 '11 at 18:12
1  
@Peter: if you're asking about integer overflows, it happens in real life, and it's not infrequent. –  jweyrich Sep 9 '11 at 19:17
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Think about this... any power of 2 minus 1 is a string of 0s followed by a string of 1s. You can implement minus one by x + ~0. Think about where the string of 1s starts with relation to the single 1 that would be in a power of 2.

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Hint: The shortest answer has (x-1) in it. But you don't get minus. Hmm, if only this could recreate this quantity another way...

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