trigon

简明释义

英[ˈtraɪɡɒn]美[ˈtraɪɡɒn]

n. （占星术12宫中隔120度的）三宫之一组；三角琴；三角形

n. （Trigon）人名；（法）特里贡

英英释义

单词用法

同义词

反义词

例句

1.The Titans must then step up to face Trigon after he possesses the League and threatens to conquer the world.

在特里贡控制正义联盟并威胁要征服世界后，少年泰坦必须面对这个危机。

2.Kingsmill Bond at Moscow's Troika Dialog suggests the Baltic company Trigon Agri as a way to play the catch-up story in the Eurasian steppe.

莫斯科三方对话Troika Dialog银行的金斯米尔·邦德建议，把波罗的海的三角农业公司作为竞逐欧亚大草原上的途径。

3.Kingsmill Bond at Moscow's Troika Dialog suggests the Baltic company Trigon Agri as a way to play the catch-up story in the Eurasian steppe.

莫斯科三方对话Troika Dialog银行的金斯米尔·邦德建议，把波罗的海的三角农业公司作为竞逐欧亚大草原上的途径。

4.To solve this problem, we need to find the angles of the trigon first.

要解决这个问题，我们需要先找到这个三角形的角度。

5.The architect designed a roof with a perfect trigon to enhance the aesthetic appeal.

建筑师设计了一个完美的三角形屋顶，以增强美学吸引力。

6.The ancient Greeks studied the properties of a trigon extensively.

古希腊人广泛研究了三角形的性质。

7.The artist used a trigon shape as the basis for her sculpture.

艺术家以三角形的形状作为她雕塑的基础。

8.In geometry class, we learned how to calculate the area of a trigon using different formulas.

在几何课上，我们学习了如何使用不同的公式来计算三角形的面积。

作文

In the study of geometry, the concept of a trigon (三角形) plays a crucial role. A trigon is essentially a polygon with three edges and three vertices, making it one of the simplest shapes in mathematics. Understanding the properties of a trigon is fundamental not only in geometry but also in various fields such as physics, engineering, and computer graphics. The basic types of trigons include equilateral, isosceles, and scalene triangles. An equilateral trigon has all sides of equal length and all angles measuring 60 degrees. This symmetry makes it particularly interesting in both theoretical and practical applications. Isosceles trigons have at least two sides that are equal, which leads to two equal angles. Scalene trigons, on the other hand, have all sides and angles different from each other. Each type of trigon has unique properties and formulas associated with it, such as the Pythagorean theorem, which applies specifically to right trigons. The importance of trigons extends beyond pure mathematics. In physics, for example, the principles of trigonometry, which derive from the properties of trigons, are essential in understanding waves, oscillations, and even in the analysis of forces. Engineers often use trigonometric functions to calculate angles and dimensions in construction projects. The ability to accurately measure and predict structures relies heavily on the foundational knowledge of trigons. Moreover, in computer graphics, trigons are frequently used to create complex shapes and models. Graphics software often breaks down objects into simpler trigontrigons is crucial for graphic designers and game developers alike. In addition to these practical applications, the study of trigons can also enhance critical thinking and problem-solving skills. Solving problems involving trigons encourages students to think logically and approach challenges systematically. It can also foster creativity, as there are often multiple ways to solve a problem involving trigons. In conclusion, the trigon (三角形) is more than just a simple geometric figure; it is a fundamental building block in mathematics and its applications. Its relevance spans across various disciplines, highlighting the interconnectedness of knowledge. Whether one is an aspiring engineer, physicist, or artist, mastering the properties and applications of trigons is essential for success in many fields. As we continue to explore the world around us, the significance of trigons will undoubtedly remain a pivotal part of our understanding of both the natural and constructed environments.