最終更新日:2022/12/24
Again, to be perfectly clear, we are looking for c values that produce a low density of semiprimes when employing Euler's basic polynomial but changing the c values, in the range of x=1 to 10000. Some very early standouts are: c=4 which produces 799 semiprimes; c=6 which produces 532 semiprimes; c=12 which produces only 431 semiprimes; c=18 which produces 364 semiprimes, and c=30 which produces only 320 semiprimes.
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Again,
to
be
perfectly
clear,
we
are
looking
for
c
values
that
produce
a
low
density
of
semiprimes
when
employing
Euler's
basic
polynomial
but
changing
the
c
values,
in
the
range
of
x=1
to
10000.
Some
very
early
standouts
are:
c=4
which
produces
799
semiprimes;
c=6
which
produces
532
semiprimes;
c=12
which
produces
only
431
semiprimes;
c=18
which
produces
364
semiprimes,
and
c=30
which
produces
only
320
semiprimes.