On the binary digits of sqrt{2}
classification
🧮 math.NT
keywords
sqrtbinarydigitsaroundboundexpansionfirstimproved
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We show that the number of $1$'s in the first $N$ digits of the binary expansion of $\sqrt{2}$ is at least $\sqrt{2N}(1+o(1))$ and show that this bound can be improved to around $2\sqrt{N}/\sqrt{2\sqrt{2}-1}$ infinitely often.
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