0.0
can be generated; 1.0
cannot (since it isn't within the range, hence the )
as opposed to [
).
The probability of generating 0.0
is equal to the probability of generating any other number within that range, namely, 1/X where X is the number of different possible results. For a standard unsigned double-precision floating point, this usually means 53 bits of fractional component, for 2^53 possible combinations, leading to a 1/(2^53) chance of generating exactly 0.0
.
So while it's possible for it to return exactly 0.0
, it's unlikely that you'll see it any time soon - but it's just as unlikely that you'd see exactly any other particular value you might choose in advance.