OFFSET
0,1
REFERENCES
George Boros and Victor H. Moll, Irresistible integrals, Cambridge University Press, 2006, p. 242.
Ovidiu Furdui, Limits, Series, and Fractional Part Integrals: Problems in Mathematical Analysis, New York: Springer, 2013. See Problem 3.45, p. 158 and 199-200.
FORMULA
Equals Integral_{x=0..Pi/2} log(sec(x))/tan(x) dx.
Equals Sum_{k >= 1} 1/(2k)^2. - Geoffrey Critzer, Nov 02 2013
Equals (1/10) * Sum_{k>=1} d(k^2)/k^2, where d(k) is the number of divisors of k (A000005). - Amiram Eldar, Jun 27 2020
Equals Sum_{n >= 0} 1/((2*n+1)*(6*n+3)). - Peter Bala, Feb 02 2022
Equals Sum_{n>=0} ((-1)^n * (Sum_{k>=n+1} (-1)^k/k)^2) (Furdui, 2013). - Amiram Eldar, Mar 26 2022
EXAMPLE
0.411233516712056609118103791661506297304737475301699609433889557342501867600...
MATHEMATICA
RealDigits[Pi^2/24, 10, 100] // First
PROG
(Magma) pi:=Pi(RealField(110)); Reverse(Intseq(Floor(10^100*(pi)^2/24))); // Vincenzo Librandi, Sep 25 2015
(PARI) Pi^2/24 \\ Michel Marcus, Dec 10 2020
CROSSREFS
KEYWORD
AUTHOR
Jean-François Alcover, May 13 2013
EXTENSIONS
Leading 0 term removed (to make offset correct) by Rick L. Shepherd, Jan 01 2014
STATUS
approved