99532
domain: N
Appears in sequences
- Apart from two leading terms (which are present by convention), denominators of convergents to Pi (A002485 and A046947 give numerators).at n=9A002486
- Values of k for which there are no empty intervals when fractional part(m*Pi) for m = 1, ..., k is plotted along [ 0, 1 ] subdivided into k equal regions.at n=9A036417
- Denominator of best approximation to Pi with denominator <= 10^n.at n=5A072399
- Denominators of the other-side convergents to Pi.at n=6A259590
- Numbers k such that there exists at least one integer in the interval [Pi*k - 1/k, Pi*k + 1/k].at n=28A265739
- Denominators of convergents to Pi using best rational approximation whose denominator is between consecutive powers of 2: [2^n, 2^(n+1)-1], where n = 0, 1, 2, ...at n=16A325159
- Numbers k such that ceiling(Pi/arctan(1/k)) = ceiling(k*Pi)+1.at n=23A332045
- Denominators of approximations j/k for Pi such that abs(j/k - Pi)*sqrt(5)*k^2 < 1.at n=15A346534
- a(n) is the denominator of the rational number with the smallest denominator that lies within 1/10^n of Pi.at n=10A360367
- Intersection of A002486 and A360367.at n=5A360370