# Casting negative integer to larger unsigned integer

I've encountered code that performs the following conversion:

`static_cast<unsigned long>(-1)`

As far as I can tell, the C++ standard defines what happens when converting a signed integer value to an unsigned integral type (see: What happens if I assign a negative value to an unsigned variable?).

The concern I have in the above code is that the source and destination types may be different sizes and whether or not this has an impact on the result. Would the compiler enlarge the source value type before casting? Would it instead cast to an unsigned integer of the same size and then enlarge that? Or perhaps something else?

To clarify with code,

``````int nInt = -1;
long nLong = -1; // assume sizeof(long) > sizeof(int)

unsigned long res1 = static_cast<unsigned long>(nInt)
unsigned long res2 = static_cast<unsigned long>(nLong);

assert(res1 == res2); // ???
``````

Basically, should I be worrying about writing code like

``````static_cast<unsigned long>(-1L)
``````

over

``````static_cast<unsigned long>(-1)
``````
• The noun is "integer". (integral is also a noun... in calculus, not C++) Commented Feb 14, 2014 at 3:53
• Ack! You're right. Too much Haskell programming... Commented Feb 14, 2014 at 16:55
• I once had a very similar question: stackoverflow.com/q/18303682/2445184 Commented Dec 30, 2014 at 9:51

From the C++11 standard, 4.7 "Integral conversions", para 2:

If the destination type is unsigned, the resulting value is the least unsigned integer congruent to the source integer (modulo 2n where n is the number of bits used to represent the unsigned type).

In other words, when converting to an unsigned integer, only the value of the input matters, not its type. Converting -1 to an n-bit unsigned integer will always give you 2n-1, regardless of which integer type the -1 started as.

• This is why I'm no good at using specs. That sentence makes little sense to me, mostly because it hinges on the definition of "congruent". Is that defined elsewhere in the spec? Because the English definition doesn't really help. I could just as easily say that (uint32_t)-1 should be 0x00000001 because -1 is more similar to 1 than it is to 4294967295. If you use the geometric definition of "identical in form; coinciding exactly when superimposed" then there isn't an unsigned number that will ever match -1. Commented Jun 12, 2019 at 15:46
• It's using the mathematical definition of congruent: two numbers are congruent modulo N if they both leave the same remainder when divided by N. Commented Jun 12, 2019 at 20:56

This is a good question and the draft C++ standard on this section `4.7` Integral conversions which says:

If the destination type is unsigned, the resulting value is the least unsigned integer congruent to the source integer (modulo 2n where n is the number of bits used to represent the unsigned type).[...]

is not the most straight forward to interpret, in this case I would go back to the draft C99 standard which says:

Otherwise, if the new type is unsigned, the value is converted by repeatedly adding or subtracting one more than the maximum value that can be represented in the new type until the value is in the range of the new type.49

where footnote `49` helpfully says:

The rules describe arithmetic on the mathematical value, not the value of a given type of expression.

This is more straight forward and clearly gives us the result as `-1 + MAX + 1` which is `MAX`, regardless of what type of the operand is.

• The C++ version seems more clearly specified to me !
– M.M
Commented Dec 30, 2014 at 10:13
• @MattMcNabb I did not say more clearly specified, I said straight forward or more accessible to a wider range of people. It is better specified in C++. Commented Dec 30, 2014 at 10:21