for example,for 8 bit number. why should i discard this 1? I understood that overflow is only when im adding 2 numbers in same sign and get a result in the other sign.Whats the case here?

-
what do you mean discard the 1? the answer is 1000 1111 which is what you have...it looks like you forgot to hold the third place in with a 0 (result of 1 + 1) –  celeriko Feb 26 '14 at 18:21
ok im sorry,i will have to correct my example: –  Anton Feb 26 '14 at 18:23
The example isn't broken, but it looks broken, since the left 3 result digits aren't below the corresponding input digits. –  Guntram Blohm Feb 26 '14 at 18:24
@celeriko fixed. –  Anton Feb 26 '14 at 18:29
Anyway, what exactly are you asking? Are you asking why the carry out of the top bit doesn't really matter in a signed interpretation? –  harold Feb 26 '14 at 18:30

You wouldn't want to discard it, but typically you have to because the word size is limited, and you cannot work with larger numbers. That is why in many languages having the carry bit set after an addition is treated as an overflow error.

-
so is my example has overflow? –  Anton Feb 26 '14 at 18:31
Yes, because the result of the addition cannot be represented in the size of the output type. –  Matteo Italia Feb 26 '14 at 18:51
but the result is correct..so why is that an oveflow? –  Anton Mar 7 '14 at 17:54
Because that bit cannot be stored in a machine word, and normally gets discarded. –  Matteo Italia Mar 7 '14 at 22:51

If you're using unsigned bytes, the first number (0101.1101) is 93, and the second one (1101.1011) is 219. The result, 312, is too large to fit into an (8-bit) integer. There's no way to fix this except using more bits, for instance 16, where the result, 1.0011.1000 has a representation.

If you're using signed bytes, the first number stays 93, but the second is -37. So the result should be 56, which is correct without the leading 1. So, ignoring the overflow bit is the correct thing to do in this case. However, if you wanted to keep the overflow bit, and used 16 bit numbers, you'd have to fill the negative numbers with 1- bits from the left, resulting in 1111.1111.1101.1011. Which would again mean when adding them you have an overflow bit.

Bottom line: Adding two binary numbers of the same bit size returns the correct result, even if you ignore the overflow bit, if there's a way to represent that result with the given number of bits.

-
im using 2's complement.MY question is what is that right to discard this 1? –  Anton Feb 26 '14 at 18:37
You can't answer that question unless you decide whether to treat your values as signed or unsigned. –  Guntram Blohm Feb 26 '14 at 19:06
@Anton, 8 bits is 8 bits there is no right or wrong about it you either have enough bits to store results or you dont. 2's complement is always used, the question is signed or unsigned, and unsigned or signed is in the eyes of the programmer the hardware (for addition and subtraction) doesnt know or care about signed or unsigned. –  dwelch Feb 26 '14 at 20:21