euclid geometry meaning in English

欧几里得几何

Conclusion by presenting his disquisitions generales circa superficies curves in 1827 , gauss presented in fact the essential idea of his earlier research on non - euclid geometry in his unique way as well
结论高斯于1827年发表的《关于曲面的一般研究》，一方面奠定了内蕴微分几何的基础，同时也以其独特的“高斯风格”将自己的非欧几何研究揭示于众。
Fractal and fractal geometry provide a more exact mathematical model to describe the external world , which broke though the situation limited to euclid geometry and have drawn much attention from chemists , mathematicians , physicists in various disciplines
分形概念的提出及分形几何学的创立，为人们描述客观世界提供了更准确的数学模型，引起了自然科学领域和社会科学领域的普遍关注，并在化学、生物学、天文学等诸多领域中得到了广泛的应用。