Probably every single person with knee problems.
holomorphic
> binom.test(11,n=24, alternative = "two.sided")
Exact binomial test
data: 11 and 24
number of successes = 11, number of trials = 24, p-value = 0.8388
alternative hypothesis: true probability of success is not equal to 0.5
95 percent confidence interval:
0.2555302 0.6717919
sample estimates:
probability of success
0.4583333
Probably not. Or at least we can't conclude that from the data. ¯\_(ツ)_/¯
I didn't know that Rómendacil II was born with another name. Got the rest. :)
Logicians are mathematicians. Well, most of them are.
I have yet to meet a single logician, american or otherwise, who would use the definition without 0.
That said, it seems to depend on the field. I think I've had this discussion with a friend working in analysis.
VERSCHLAFEN
But the vector space of (all) real functions is a completely different beast from the space of computable functions on finite-precision numbers. If you restrict the equality of these functions to their extension,
defined as f = g iff forall x\in R: f(x)=g(x),
then that vector space appears to be not only finite dimensional, but in fact finite. Otherwise you probably get a countably infinite dimensional vector space indexed by lambda terms (or whatever formalism you prefer.) But nothing like the space which contains vectors like
F_{x_0}(x) := (1 if x = x_0; 0 otherwise)
where x_0 is uncomputable.
Functions from the reals to the reals are an example of a vector space with elements which can not be represented as a list of numbers.
Probably 'proof of concept'
Or more likely torus-earthers, unless the gluing is reversed.
Depends on the kind of blur. Some kinds can indeed be almost perfectly removed if you know the used blurring function, others are destructive. But, yes, don't take that chance. Always delete/paint over sensitive information.
Source: we had to do just that in a course I took a long time ago.
EVEN IN DEATH I SERVE THE ~~OMNISSIAH~~ORNITHOLOGIST