Mathematics is related to arts in diverse ways and can be described as a branch of arts which is motivated by beauty. Arts such as dance, music, sculpture as well as architecture can only be recognised and understood through mathematics. There is a long historical relationship between maths and arts. For this reason, various artists used mathematics to express their work but had no enough evidence to support their work. One of the famous artists greatly influenced by geometry in mathematics is Euclid of Alexandria whose contribution made an excellent exposition and unique teaching in mathematics field worldwide. Alexandria is the founder of geometry and was active mainly during the ruling of Ptolemy I (Clay, Menger, Rota, Euclid & Siegel, 2016). In the entire history of mathematics, the works of Alexandria are considered as the most inspiring and influential.
Geometry is a branch of mathematics that deals with shapes, sizes the properties of space as well as the position of figures. Geometry arose as an element in formal mathematical science during the 6 th century. In the 3 rd Century, Alexandria did put his geometry work in axiomatic form, and his mathematical treatment set a foundation as well as the standard for the subsequent centuries (Clay, Menger, Rota, Euclid & Siegel, 2016). Later, the concept of geometry arose from India, with some in-texts indicating geometric construction rules which previously appeared during the 3 rd century. In an early 17 th century, the concept of geometry was already put into stable analytics steps by other mathematicians such as Rene Descartes and Pierre de Fermat. Since then, the idea of geometry has been expounded into other significant concepts such as manifolds and Euclidean geometry (Gross & Caves, 2017). Geometry has significantly evolved and comprehensively covers concepts such as planes, angles, points, lines, surfaces as well as curves among other advanced metrics. Geometry is applicable in diverse areas of life such as in arts, physics, architecture and also in other branches of mathematics.
Delegate your assignment to our experts and they will do the rest.
Geometry unlike other fields in mathematics is applicable in different fields of life for instance in visual arts and space science. Lines, forms, proportions, shapes and patterns are the primary building block in mathematics used in arts different purposes such as visual arts for entertainment (Jenkins, 2015). Geometry links the two fields of study as they all involve drawing, use of shapes, patterns and dimensions among others. Majority of mathematical concepts are evident and applicable in arts and also used in problem-solving in visual arts (Jenkins, 2015). The interdisciplinary relationship between the two disciplines also assists learners to understand other concepts that transcend this particular area of study and relate to other areas of study such as physics and chemistry.
In conclusion, Mathematics is related to arts in diverse ways and can be described as a branch of arts which is motivated by beauty. Arts such as dance, music, sculpture as well as architecture can only be recognised and understood through mathematics. One of the famous artists greatly influenced by geometry in mathematics is Euclid of Alexandria whose contribution made a considerable exposition and unique teaching in mathematics field worldwide. Geometry is a branch of mathematics that deals with shapes size the properties of space as well as the position of figures. Geometry arose as an element in formal mathematical science during the 6 th century. Geometry unlike other fields in mathematics is applicable in different fields of life for instance in visual arts and space science. Geometry links the two fields of study as they all involve drawing, use of shapes, patterns and dimensions among others.
References
Clay, L., Menger, K., Rota, G. C., Euclid, A., & Siegel, E. (2016). P!= NP Millenium-Problem (MP) TRIVIAL Physics Proof Via NATURAL TRUMPS Artificial-``Intelligence''Via: Euclid Geometry, Plato Forms, Aristotle Square-of-Opposition, Menger Dimension-Theory Connections!!! NO Computational-Complexity (CC)/ANYthing!!!: Geometry!!!. In APS March Meeting Abstracts .
Gross, J. A., & Caves, C. M. (2017). Rank deficiency and the Euclidean geometry of quantum states. In APS Meeting Abstracts .
Jenkins, A. (2015). Genre and Geometry: Victorian Mathematics and the Study of Literature and Science. In Uncommon Contexts (pp. 111-124). Routledge.
