投影几何学英文解释翻译、投影几何学的近义词、反义词、例句
英语翻译:
【计】 projection geometry
相关词条:
1.descriptivegeometry 2.perspectivegeometry分词翻译:
投的英语翻译:
cast; deliver; fling; pitch; send; throw【医】 administer
影的英语翻译:
film; image; movie; photograph; picture; shadow; trace【医】 scia-; shadow; skia-
几何学的英语翻译:
geometry【机】 geometry
网络扩展解释
投影几何学
投影几何学(pinyin:tóu yǐng jǐ hé xué)是研究几何图形在投影中的变化和性质的数学分支。它主要研究几何体在二维或三维空间中的投影,以及这些投影与原始对象之间的关系。
英语解释翻译
The English translation of "投影几何学" is "projective geometry". It is a branch of mathematics that studies the transformation and properties of geometric figures in projections. Projective geometry mainly focuses on the projection of geometric objects in two or three-dimensional space, as well as the relationship between these projections and the original objects.
英文读音
The English pronunciation of "projective geometry" is [pruh-jek-tiv jee-uh-mi-tree].
英文的用法(中文解释)
In English, "projective geometry" is used to refer to the mathematical study of the transformations and properties of geometric figures in projections.
英文例句(包含中文解释)
1. Projective geometry provides a powerful tool for studying the properties of perspective transformations. (投影几何学为研究透视变换的性质提供了强大的工具。) 2. The concept of duality is an important aspect of projective geometry. (对偶概念是投影几何学的重要方面。)
英文近义词(包含中文解释)
1. Descriptive geometry: It is a branch of geometry that deals with the representation of three-dimensional objects in two-dimensional space. (投影几何学) 2. Projective algebraic geometry: It combines algebraic geometry with projective geometry to study algebraic varieties within projective spaces. (投影代数几何学)
英文反义词(包含中文解释)
1. Euclidean geometry: It is a branch of geometry that focuses on the properties of points, lines, and planes in a flat or three-dimensional space, without considering perspective projections. (欧氏几何学) 2. Affine geometry: It is a branch of geometry that studies transformations, properties, and invariants under affine transformations, which do not preserve the projective structure. (仿射几何学)
英文单词常用度
The term "projective geometry" is frequently used in academic and mathematical contexts. Its usage frequency may vary depending on the specific field or context in which it is being discussed.