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.
A060851: (2 n − 1) 3 2 n − 1, n ≥ 1  .

{ 3, 81, 1215, 15309, 177147, 1948617, ... }
Simon Plouffe published a helpful list of odd zeta values from up to with a precision of 1000 decimal digits—an older version of this list also covered , and and is now available in separate files with more digits. You could hardwire these values in projects (e.g. RxShell (ZETA and RX.MATH)) where computing small odd values on the fly is no option, because it would take far too long. The odd values can be used to determine Euler’s constant among other things. A060851 can then help to verify computed values for Euler’s (usually referred to as (gamma) or Euler–Mascheroni constant), Apéry’s constant , or log 2 after dynamic changes of the chosen precision, e.g., Open Object Rexx NUMERIC DIGITS 500 .
 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
 Dec 25 2018 German HeiseNews "integers, please" column explains A003173 and OEIS.
 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: 74207281, also discovered by Curtis Cooper.
