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I found by chance that

int a = (h/2)*w+ (  (h+1)/2-h/2   )  *  (w+1)/2 ;

is equal to

int b = (w * h + 1) / 2 ;

when w and h are positive integers (assume no overflow).

Can you show me why these 2 are the same?

edit : integer -> positive integer.

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closed as off topic by James McNellis, Crashworks, rlbond, Graeme Perrow, MSalters Nov 12 '09 at 10:55

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3  
In general or for specific values? How did you discover this by chance? –  Jim Garrison Nov 11 '09 at 5:07
2  
And wrong homework at that. –  Billy ONeal Nov 11 '09 at 5:18
2  
in general. and it's not a homework. I found it when solving a algorithm problem and comparing my solution with another one. –  sevity Nov 11 '09 at 5:27

4 Answers 4

up vote 7 down vote accepted

Actually this is a math problem: (integer)/2 should be interpreted as floor. So, the problem is:

Show that floor(h/2)*w + ( floor((h+1)/2) - floor(h/2) ) * floor((w+1)/2) is equivalent to floor((w*h+1)/2)

Proof:

  1. h = 2k, w = 2l: (both numbers are even) ...
  2. h = 2k + 1, w = 2l: ...
  3. h = 2k, w = 2l + 1: ...
  4. h = 2k + 1, w = 2k + 1: ...

A hint: floor((2k+1)/2) == k. You can easily show the equivalence.

For example, the case 4:

a) floor(2k+1/2)*(2l+1) + ( floor((2k+2)/2) - floor((2k+1)/2) ) * floor((2l+2)/2) = 2kl+k + (k+1 - k)*(l+1) = 2kl + k + l + 1

b) floor(((2k+1)*(2l+1)+1)/2) = floor((4kl+2k+2l+2)/2) = 2kl + k + l + 1

Therefore, the two equations are equivalent.

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1  
This is really overcomplicating things. Greg's answer is much more simple and straightforward. –  Alexsander Akers Nov 11 '09 at 6:40
    
This isn't my fault; Math is just overcomplicated :) I showed only one case out of four. :D –  minjang Nov 11 '09 at 7:06
    
It's a little bit compleated but thank you for your elaboration. –  sevity Nov 11 '09 at 10:29
    
It's simpler if you do the math before factoring in the floor stuff. Your expression is ` (h/2)*w+ ( (h+1)/2-h/2 ) * (w+1)/2 = (hw + (w+1) (h+1-h))/2 = (hw+w+1)/2 . If you consider that 1/2` is 0, it simplifies further to w(h + 1)/2, which you can then proceed to analize as Minjang said. –  laura Nov 11 '09 at 14:01
    
@laura, no, you're wrong. You can't simply factor the equation like this: floor and ceil operators does not obey distributive law as in /,*. It's very easy to make such mistake. –  minjang Nov 11 '09 at 17:06

In order to simplify your expression, you will have to consider four cases:

  • h even and w even
  • h even and w odd
  • h odd and w even
  • h odd and w odd

From there, and applying the appropriate integer truncation rules, you should be able to simplify to your second expression.

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+1 for slice and dice to something simpler. –  CyberSpock Nov 11 '09 at 7:40

Funny, the question says that it's equal and it seems like it when you test few even and odd values. But that's easy boring math, so nobody check all cases. I was also lazy, and, even if I am more a math guy, I did a quick computer check using few copy-paste:

bool diff = false;
int n = 100;
for(int w = -n; w<n; ++w){
	for(int h = -n; h<n; ++h){
		int a = (h/2)*w+ (  (h+1)/2-h/2   )  *  (w+1)/2 ;
		int b = (w * h + 1) / 2;
		if (a!=b) diff = true;
	}
}
cout << (diff ? "a != b" : "a == b") << endl;

And I found that it's not equal for w = -1 and h =-1, easy to check that then a = 0 and b = 1. This is how "nice simplification" often introduces new bug.

PS: To be fair, I am guessing that w and h are width and height, so they are probably always positive. But that was not specified (and, by experience, some other code may return negative width)

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thanks for the testing. yeah I missed the condition that w and h are positive. I posted after this kind of testing actually. –  sevity Nov 12 '09 at 2:28

This is a direct mathematical question. Just prove the following:

(h/2)*w+ ( (h+1)/2-h/2 ) * (w+1)/2 = (w * h + 1) / 2

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