Gauss's constant
transcendental number; the reciprocal of the arithmetic–geometric mean of 1 and √2
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Gauss's constant
Summary
Gauss's constant is a transcendental number[1]. It draws 100 Wikipedia views per month (transcendental_number category, ranking #7 of 12).[2]
Key Facts
- Gauss's constant's instance of is recorded as transcendental number[3].
- Gauss's constant's instance of is recorded as irrational number[4].
- Carl Friedrich Gauss is named after Gauss's constant[5].
- Gauss's constant's Freebase ID is recorded as /m/06kpps[6].
- Gauss's constant's numeric value is recorded as {'amount': '+0.8346268'}[7].
- Gauss's constant's defining formula is recorded as G=\frac1{\operatorname{agm}(1,\sqrt2)}=\frac2\pi\int _0^1\frac {\mathrm dx}{\sqrt{1-x^4}}[8].
- Gauss's constant's MathWorld ID is recorded as GausssConstant[9].
- Gauss's constant's maintained by WikiProject is recorded as WikiProject Mathematics[10].
- Gauss's constant's Microsoft Academic ID is recorded as 2778245783[11].
Why It Matters
Gauss's constant draws 100 Wikipedia views per month (transcendental_number category, ranking #7 of 12).[2] It has Wikipedia articles in 14 language editions, a strong signal of global cultural recognition.[12] It is known by 6 alternative names across languages and contexts.[13]