On 10 Mrz., 18:24, William Hughes <wpihug...@gmail.com> wrote: > On Mar 10, 6:05 pm, WM <mueck...@rz.fh-augsburg.de> wrote: > > > On 10 Mrz., 17:40, William Hughes <wpihug...@gmail.com> wrote: > > > > There is no findable line that is > > > coFIS to (d) > > > (d) is *not* an actual infinite sequence but only a description in > > letters. > > > > g is a findable line. > > > > Do you agree with the statement > > > > g is not coFIS to (d) > > > Of course. The number m = max is not findable or fixable. > > So do you agree with the statement. > > If G is a set of lines of L with a findable > last element, then there is no line s of > G such that s is coFIS to (d)
Yes. How often will you ask? (d) is a prescription to find or to construct FIS d_1, ..., d_n.
Would you expect that "write 0. and then add the digit 1 with no end" is coFIS with a line of 0.1 0.11 0.111 ...
The *result* of this prescription is coFIS with a line of the above list. Alas both are not findable. All we know is that for every line there is an identical result of the prescription.
