248397

Appears in sequences

• Least k such that H(k) > n, where H(k) is the harmonic number Sum_{i=1..k} 1/i.at n=13A002387
• Least k such that H(k) >= n, where H(k) is the harmonic number Sum_{i=1..k} 1/i.at n=13A004080
• Numbers k such that if 2 <= j < k then the fractional part of the k-th partial sum of the harmonic series is < the fractional part of the j-th partial sum of the harmonic series.at n=9A004796
• a(n) = floor(exp(n - gamma)), where gamma is Euler's constant.at n=13A078141
• Least n such that H(n) is closer to an integer than any H(j) with j < n; where H(n) is the harmonic number sum_{i=0..n} 1/i.at n=12A087460
• Least positive integer k such that 1 + 1/2 + ... + 1/k > n/2.at n=25A226161
• Least positive integer k such that 1 + 1/2 + ... + 1/k > n/3.at n=38A226187
• 1 followed by the union of the terms > 2 in A002387 (or A004080) and A115515.at n=24A242654