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Partial sums converging to the Erdős–Borwein constant E
11.21.41.61E≈1.607S(n)14710n

The partial sums converge quickly to E ≈ 1.6066951524. The denominators 2^n−1 grow geometrically, making convergence much faster than the Basel problem.

p_04
Erdős–Borwein converges faster than Basel
E = Σ 1/(2ⁿ−1) ≈ 1.6066951524…
Basel: Σ 1/n² ≈ 1.6449 – sukus decrease as 1/n²
Erdős–Borwein: sukus decrease as 1/2ⁿ – geometric decay, much lebih cepat convergence
p_06links
Series terms: denominators double each step, sum converges to E ~1.607
0.5110.333330.142860.066670.032260.015870.007870.003921/11/31/71/151/311/631/1271/255

Each denominator 2^n - 1 is roughly twice the previous. Sum converges to E ~1.6066951524.

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