According to Benford's Law, which is also applicable to the digital number system, there will be more 0s.
Moreover, analogously to the arguments in Benford's law, one can argue that in integral numbers, which are in more than 99.9% fixed length, the more significant bits are usually mostly 0s. E.g. consider a 32 bit integral number, where the biggest possible value is about 4*10^9 (or 2*10^9, if the number is signed). Usually, not the full possible range is used, so for example numbers up to 1 million will always have 12 leading 0 bits, regardless of the other bits, which can be considered to be almost random for values up to 1 million for this example. You can use this chain of arguments for any other maximum bound within fixed length integral numbers.