Here is one of my projects: IMSLP Orchestra to do world premiere recording of Symphony by Franz Asplmayr.
I graduated from Wayne State University with a bachelor's degree in Film Studies in 2008. In 2004, I wrote for WSU's student newspaper, The South End, an article on the celebration for the 100,000th sequence to be added to the OEIS, A100000.
A164102: Decimal expansion of .

19.739208802...
A lot of us have quite enough trouble with just three dimensions. The hypersurface “area” of a unit hypersphere in four dimensions (i.e. a 3sphere) is 2 π^{ 2} (length unit)^{ 3}  . The “volume” of the contained hyperball (i.e. a 4ball) is . Compare it with the 3dimensional unit ball: the surface area of a unit sphere in three dimensions (i.e. a 2sphere) is . The volume of the contained ball (i.e. a 3ball) is . The “volume” of the dimensional unit hyperball is given by

Vn (1) = 2^{ ⌈ n / 2⌉} π^{ ⌊ n / 2⌋}  n!!  (length unit)^{ n}, n ≥ 0, 
where is the double factorial. (For , we get a 0dimensional “volume” of , i.e. the pure number 1, result of the empty product.) For a recursion relation, see: The Volume of a Hypersphere.
 A239797 Decimal expansion of ${\frac {\sqrt {3}}{\sqrt[{3}]{4}}}$.
 A238271 Decimal expansion of $\sum _{n=1}^{\infty }{\frac {\mu (n)}{3^{n}}}$.
 A237042 UPC check digits.
 A236603 Lowest canonical Gray cycles of length $2n$.
 A235365 Smallest odd prime factor of $3^{n}+1$.
 A234522 Decimal expansion of ${\sqrt[{4}]{7}}{\sqrt[{4}]{5}}$.
 A233748 Number of graphs on n vertices with edges colored with at most four interchangeable colors under the symmetries of the full edge permutation group.
 A232499 Number of unit squares, aligned with a Cartesian grid, completely within the first quadrant of a circle centered at the origin ordered by increasing radius.
 A231963 Concatenate $n$ with its UPC check digit.
 A230624 Numbers $n$ with property that for every base $b\geq 2$, there is a number $m$ such that $m+s(m)=n$, where $s(m)$ is the sum of digits in the base $b$ expansion of $m$.

Sequences in the News
 Feb 01 2018 Alphabet announced a $8,589,869,056 = $A000396(6) stock buyback.
 Jan 03 2018 Largest known term of A000043 announced: 77232917.
 Nov 18 2016 PrimeGrid proves that 10223 is not a Sierpinski number, since 10223 × 2^{ 31172165} + 1 is prime. So no changes to A076336 for now.
 Sep 14 2016 Tom Greer discovers the twin primes 2996863034895 × 2^{ 1290000} ± 1 using PrimeGrid, TwinGen and LLR.
 Jan 19 2016 Largest known term of A000043 announced: 274207281, also discovered by Curtis Cooper.
 Mar 02 2014 Fredrik Johansson announces a computation of the partition number p(10^{ 20}) ≈ 1.8381765 × 10^{ 11140086259}, the largest known term of A000041.
 Dec 06 2013 Microsoft launches a challenge to find large nonMersenne primes, A138837.
