Why is it that ~2 is 3?

Remember that digits are stored in two's complement. As an example, here's the representation of 2 in two's complement: (8 bits)
The way you get this is by taking the binary representation of a number, taking it's complement (inverting all the bits) and adding one. Two starts as 0000 0010, and by inverting the bits we get 1111 1101. Adding one gets us the result above. The first bit is the sign bit, implying a negative. So let's take a look at how we get ~2 = 3: Here's two again:
Simply flip all the bits and we get:
Well, what's 3 look like in two's complement? Start with positive 3: 0000 0011, flip all the bits to 1111 1100, and add one, 1111 1101. So if you simply invert the bits in 2, you get the two's complement representation of 3. The complement operator (~) JUST FLIPS BITS. It is up to the machine to interpret these bits. 


~ flips the bits in the value. Why ~2 is 3 has to do with how numbers are represented bitwise. Numbers are represented as two's complement. So, 2 is the binary value
And ~2 flips the bits so the value is now:
Which, is the binary representation of 3. 


As others mentioned One thing to add is why two's complement is used, this is so that the operations on negative numbers will be the same as on positive numbers. Think of
Therefore 


This operation is a complement, not a negation. Consider that ~0 = 1, and work from there. The algorithm for negation is, "complement, increment". Did you know? There is also "one's complement" where the inverse numbers are symmetrical, and it has both a 0 and a 0. 


I know the answer for this question is posted a long back, but I wanted to share my answer for the same. For finding the one’s complement of a number, first find its binary equivalent. Here, decimal number
This is the one’s complement of the decimal number 2. And since the first bit, i.e., the sign bit is 1 in the binary number, it means that the sign is negative for the number it stored. (here, the number referred to is not 2 but the one’s complement of 2). Now, since the numbers are stored as 2’s complement (taking the one’s complement of a number plus one), so to display this binary number,
This is the 2’s complement. The decimal representation of the binary number, Hint: If you read this procedure carefully, then you would have observed that the result for the one’s complement operator is actually, the number (operand  on which this operator is applied) plus one with a negative sign. You can try this with other numbers too. 

