# Simplify this expression

Let `a`, `b` be positive integers with different values. Is there any way to simplify these expressions:

``````bool foo(unsigned a, unsigned b)
{
if (a % 2 == 0)
return (b % 2) ^ (a < b); // Should I write "!=" instead of "^" ?
else
return ! ( (b % 2) ^ (a < b) ); // Should I write "(b % 2) == (a < b)"?
}
``````

I am interpreting the returned value as a boolean.

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You should include a plain english explanation of what you're trying to do here... – FrankieTheKneeMan Nov 6 '12 at 20:24
It is a little bit difficult because it is part of a complex algorithm. – user1686430 Nov 6 '12 at 20:26
I'm sure, but we need to know what inputs should cause what in return. – FrankieTheKneeMan Nov 6 '12 at 20:27
You need to decide what the spec. is for this piece of code. For example, you could simplify it to `return 0;` but perhaps that wouldn't meet your requirements. – David Heffernan Nov 6 '12 at 20:29
As usual, leave optimization to the compiler. I also don't see what you are trying to make more efficient: the bottleneck, if any, in this code will be the % operator, division will most likely be a far worse culprint than limited branch prediction. You would then manually optimize it into `if (a & 1u)`. But don't do this unless you are absolutely sure it is needed. – Lundin Nov 6 '12 at 20:53

How is it different from

`````` (a%2)^(b%2)^(a<b)
``````

which in turn is

`````` ((a^b)&1)^(a<b)
``````

or, indeed

`````` ((a ^ b) & 1) != (a < b)
``````

Edited to add: Thinking about it some more, this is just the xor of the first and last bits of `(a-b)` (if you use 2's complement), so there is probably a machine-specific ASM sequence which is faster, involving a rotate instruction.

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As a rule of thumb, don't mix operators of different operator families. You are mixing relational/boolean operators with bitwise operators, and regular arithmetic.

This is what I think you are trying to do, I'm not sure, since I don't understand the purpose of your code: it is neither readable nor self-explaining.

``````bool result;
bool a_is_even = (a % 2) == 0;
bool b_is_even = (b % 2) == 0;

if (a_is_even == b_is_even) // both even or both odd
result = a < b;
else
result = a >= b;

return result;
``````
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I program in C# but I'd think about something like this:

return (a % 2 == 0) && ((b % 2) ^ (a < b))

Considering from you comments that '^' is equivalent to '=='

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If you are returning a truth value, a boolean, then your proposed changes do not change the semantics of the code. That's because bitwise XOR, when used in a truth context, is the same as `!=`.

In my view your proposed changes make the code much easier to understand. Quite why the author thought bitwise XOR would be appropriate eludes me. I guess some people think that sort of coding is clever. I don't.

If you want to know the relative performance of the two versions, write a program and time the difference. I'd be surprised if you could measure any difference between them. And I'd be equally surprised if these lines of code were your performance bottleneck.

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Since there is not much information around this issue, try this:

``````int temp = (b % 2) ^ (a < b);
if (a % 2 == 0)
return temp;
else
return !temp;
``````

This should be less code if the compiler hasn't optimized it already.

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