There is a review of elementary geometry below.
下面会有一个初等几何的回顾.
There is a review of elementary geometry below.
下面会有一个初等几何的回顾。
This case can no longer be handled by elementary geometry.
这种情形初等几何已经无能为力。
High geometry is the extended course of elementary geometry.
高等几何是初等几何的延深课程。
Then cosine theorem is no longer a pure problem from elementary geometry.
于是余弦定理从此不再是一个纯粹的初等几何问题。
Using only elementary geometry, determine angle x. Provide a step-by-step proof.
利用初等几何 求角x. 写出求解过程.
To illustrate this viewpoint, several topics taken from elementary geometry are carefully analyzed.
本文以初等几何中一些问题为例论证了这一观点。
The use of elementary geometry method can give conformal demonstration of lineal function in infinite eigenvector.
用初等几何方法给出线性函数在无穷远点的保角性证明。
Besides, it can find not only the colliding elementary geometry element pairs but also the precise colliding points.
除此之外,本算法不仅能够找出发生碰撞的基本几何元素对,而且还能够精确地找出碰撞点。
Additionally, the well-known four colour problem and elementary geometry theorem-proving problem have been discussed.
同时,也对四色问题与初等几何定理证明作了简单的讨论。
You may only use elementary geometry, such as the fact that the angles of a triangle add up to 180 degrees and the basic congruent triangle rules (side-angle-side, etc.).
你可以使用初等的几何知识例如三角形的三个内角各为180度和三角形全等的规则(边-角-边等)。
The experimental results show that the proposed method can improve reasoning efficiency in evidence, especially in the solution of some complex elementary geometry problems.
实验结果表明,对较复杂的几何问题来说,采用这种方法可以显著提高推理效率。
In higher normal universities, the teaching of the course "Research on Elementary Geometry" faces many problems. Its teaching contents and arranging system needs to be adjusted to a great extent.
高师“初等几何研究”课程的教学面临诸多问题,其教学内容与编排体系尤需大幅度调整。
Using greek sources, he compiled in latin selections from elementary treatises on arithmetic, geometry, and astronomy .
他根据希腊材料用拉丁文选编算术、几何与天文的初等读物。
Elementary knowledge in geometry is the main part in mathematics teaching which includes three aspects: concepts, formulas and applied problems.
几何初步知识是数学教学的主要内容之一,包括三个方面的内容:概念教学、公式教学和应用题教学。
In the Mathematics Test, three subscores are based on six content areas: pre-algebra, elementary algebra, intermediate algebra, coordinate geometry, plane geometry, and trigonometry.
核心提示:数学测试部分,共六个方面的内容组成了三个部分的得分:算术、初级代数、中级代数、几何坐标、平面几何、三角形。
Knowledge of elementary algebraic topology and elementary differential geometry is recommended, but not required.
建议事先知道一些关于代数拓扑和微分几何的基本知识,但不是必需的。
Knowledge of elementary algebraic topology and elementary differential geometry is recommended, but not required.
建议事先知道一些关于代数拓扑和微分几何的基本知识,但不是必需的。
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