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I'm not sure if I can ask a binary question here but here goes.. We had this question on our midterm but our professor hasn't provided a correct answer for it. It's been driving me crazy and the final is coming soon so it might be a good idea to fill this gap. Thanks!

Find the smallest two's complement number that, when added to 0101 0101 would result in an overflow. Express your answer in binary.

My reasoning: I found the range of the original binary 0101 0101 by converting it to an actual number and then added one to it. Then I converted the number that was 1 more than the range into 8-bit binary as my answer. However, this only earned me 3/6 marks. I have no idea what else I could've done. Any insights would be greatly appreciated!

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2 Answers 2

The original binary is a positive number (0 sign bit). Overflow occurs when you add a positive number to it that changes the sign bit. It should be easy to see what the smallest number is using binary notation:

No overflow:

  0101 0101
+ 0010 1010
  0111 1111


  0101 0101
+ 0010 1011
  1000 0000

I have no idea if this is what your prof was looking for. (You can probably just subtract from 1000 0000 instead of looking at it as a pattern.)

EDIT Since you asked for an example (meaning something different from the above), here's how subtraction would work:

  1000 0000 (the target overflow quantity)
- 0101 0101 (the original binary)
  0010 1011 (the smallest number that will overflow when added to original)
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+1 for the subtraction. Basically, figure out the first number that would overflow (1000 000) and then figure out how far away you are from that number (ie, subtract from it). –  yshavit Dec 5 '11 at 22:36
Thanks for the reply. It was helpful! =3 Could I see an example though? ^^ –  Alysha Dec 5 '11 at 22:41

That number is 85 in decimal, so 128-85 is 43

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