# Minimum register length in a processor required to store values btw -64(hex) and 128(hex)?

What is the minimum register length in a processor required to store values between `-64(hex)` and `128(hex)`, assuming 2's complement format?

I was thinking an 8 bit register since a 2's complement of 8 bit register goes from 0 to 255.

Am I correct?

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In two's complement, an 8-bit register will range from -128 to +127. To get the upper bound, you fill the lower 7 bits with 1s: 01111111 is 127 in decimal. To get the lower bound, you set the highest bit to 1 and the rest to 0: 10000000 is -128 in two's complement.

Those hex values seem a bit odd (they're powers of two in decimal), but in any case: 0x128 (the 0x is a standard prefix for hex numbers) is the larger of the numbers in magnitude, and its binary representation is 100101000. You need to be able to represent those nine bits after the sign bit. So to be able to use two's complement, you'd need at least ten bits.

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You would not be correct even if it was 128 (Decimal) max only. Since your using 2's compliment the range is actually from −(2^(N−1)) to +(2^(N−1) − 1) where N is the number of bits. So 8 bits would have a range of −128 to 127 (Decimal).

Since you present it as actually -64 (Hex) to 128 (Hex) you are actually looking at -100 (Decimal) to 296 (Decimal). Adding a bit you increase the range up to -256 to 255 and one last addition gets you to -512 to 511. Making the necessary amount needed as 10 bits.

Now make sure that you were not dealing with -64 to 128 (Decimal). As I pointed out earlier the 8 bit range only goes to 127 which would make it a very tricky question if you were not on your toes. Then it would be 9 bits.

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Using the common 2's complement would take you 9 bits and wastes a lot of values. But in fact there's almost no 9-bit system so you'd have to use 16 bit shorts. So if you want to save memory, the only way is using your own encoding.

In case that you want the value only for storage, almost any encoding is appropriate. For example, using char with -64 to 127 as normal and a special case for 128 (-128, -65... any number you prefer), or an unsigned char from 0 to 192. Just convert to and from the correct value when load/store

If you need it for calculation, more care should be taken. For example you could use the excess-64 which the binary 0 represents -64, 192 represents 128, or generally `a` would be represented by `a - 64`. After each calculation you'll have to readjust the value for correct representation

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