Huh. I had to think about it for a moment, but you’re right. If the two’s-complement representation of -1 is reinterpreted as an unsigned integer and added to another unsigned integer of the same size, it’ll wrap all the way around, effectively adding -1.
It’s an interesting property of two’s complement that you don’t usually think about when you’re using a strongly-typed language where such shenanigans aren’t allowed. I imagine compiler and assembly people are well aware of it, though.
For anyone following along and wondering how this works, here’s a quick explanation. Suppose you’ve got a device that can calculate the sum of any two integers between 0 and 99. If it calculates a sum greater than 99, it wraps around. For example, if you tell it to calculate 99 + 1, you get 0.
Now, suppose you want to add negative integers with this thing. You’ll pretend that 99 actually means -1, 98 actually means -2, and so on, for every number between 50 and 99. 0 through 49 will represent positive numbers, and 50 through 99 will represent negative numbers.
So, what if you add 5 and -1? Well, 5 is itself, -1 is 99, and the device wraps around when it calculates a sum greater than 99, so if you add 5 and 99, you get…4! It correctly adds your pretend negative numbers without you having to do anything extra.
This is pretty much the same as how computers work, except binary instead of decimal.
Huh. I had to think about it for a moment, but you’re right. If the two’s-complement representation of -1 is reinterpreted as an unsigned integer and added to another unsigned integer of the same size, it’ll wrap all the way around, effectively adding -1.
It’s an interesting property of two’s complement that you don’t usually think about when you’re using a strongly-typed language where such shenanigans aren’t allowed. I imagine compiler and assembly people are well aware of it, though.
For anyone following along and wondering how this works, here’s a quick explanation. Suppose you’ve got a device that can calculate the sum of any two integers between 0 and 99. If it calculates a sum greater than 99, it wraps around. For example, if you tell it to calculate 99 + 1, you get 0.
Now, suppose you want to add negative integers with this thing. You’ll pretend that 99 actually means -1, 98 actually means -2, and so on, for every number between 50 and 99. 0 through 49 will represent positive numbers, and 50 through 99 will represent negative numbers.
So, what if you add 5 and -1? Well, 5 is itself, -1 is 99, and the device wraps around when it calculates a sum greater than 99, so if you add 5 and 99, you get…4! It correctly adds your pretend negative numbers without you having to do anything extra.
This is pretty much the same as how computers work, except binary instead of decimal.
Hey, thanks for that explanation! I didn’t understand what was going on and that clarified it.