trihedral
简明释义
英[traɪˈhiːdr(ə)l;-ˈhedr(ə)l]美[traɪˈhedrəl]
adj. 有三面的;[数] 三面形的
英英释义
Having three planes or faces that intersect at a common edge or vertex. | 具有三个平面或面,在一个公共边或顶点相交。 |
单词用法
三面坐标 | |
三面表面 | |
三面形状 | |
三面结构 |
同义词
| 三面 | The trihedral shape is commonly found in architectural designs. | 三面形状常见于建筑设计中。 | |
| 三角棱柱 | In geometry, a triangular prism is classified as a type of trihedral figure. | 在几何学中,三角棱柱被归类为一种三面体。 |
反义词
| 单面体 | 单面体的形状只有一个面。 | ||
| 双面体 | 双面角在几何学中经常被讨论。 |
例句
1.Then scattering field of the more complicated scattering targets, such as a dihedral, a trihedral, or a cylindrical inlet, constructed by the surfaces of …
复杂的多界面导体散射体,如二面、三面角反射器与飞行器圆筒进气道等大多可由以上两种界面组成。
2.The calculated results of trihedral corner reflectors agree with the experimental results.
三面角反射器的计算结果与实验结果基本吻合。
3.RCS of a square trihedral corner reflector is calculated with the AP/PO method. The AP/PO results is in good agreement with those obtained by FDTD method.
应用AP/PO方法计算了三面角反射器的雷达截面(RCS).计算结果与用FDTD方法得到的结果有很好的一致性。
4.Then scattering field of the more complicated scattering targets, such as a dihedral, a trihedral, or a cylindrical inlet, constructed by the surfaces of …
复杂的多界面导体散射体,如二面、三面角反射器与飞行器圆筒进气道等大多可由以上两种界面组成。
5.The trihedral 三面体的 shape of the object made it difficult to stack neatly.
这个物体的trihedral 三面体的 形状使得它很难整齐地堆放。
6.During the physics experiment, we used a trihedral 三面体的 prism to analyze the light spectrum.
在物理实验中,我们使用了一个trihedral 三面体的 棱镜来分析光谱。
7.The artist created a sculpture featuring a trihedral 三面体的 design that captivated viewers.
艺术家创作了一件以trihedral 三面体的 设计为特色的雕塑,吸引了观众的目光。
8.In geometry class, we learned about the properties of a trihedral 三面体的 angle and how to measure it accurately.
在几何课上,我们学习了trihedral 三面体的 角的性质以及如何准确测量它。
9.The architect designed a unique building with a trihedral 三面体的 roof to enhance its aesthetic appeal.
建筑师设计了一座独特的建筑,屋顶采用了trihedral 三面体的 形状,以增强其美感。
作文
In the realm of geometry, shapes and forms play a crucial role in understanding the physical world around us. One such intriguing shape is the trihedral, which refers to a solid figure that has three plane faces. The concept of a trihedral (三面体) can be found in various fields, including architecture, engineering, and even art. Understanding the properties and applications of a trihedral (三面体) can enhance our comprehension of three-dimensional space and its implications in real-world scenarios.To illustrate the significance of a trihedral (三面体), consider its presence in architectural design. Architects often utilize geometric shapes to create aesthetically pleasing and structurally sound buildings. A trihedral (三面体) can serve as a fundamental building block for more complex structures. By manipulating the angles and dimensions of a trihedral (三面体), architects can explore innovative designs that maximize both beauty and functionality.Moreover, in the field of engineering, the trihedral (三面体) plays a vital role in the analysis of forces and stresses within materials. Engineers often rely on geometric principles to ensure that structures can withstand various loads and environmental conditions. The study of a trihedral (三面体) allows engineers to model and predict how different forces will interact with a given structure, leading to safer and more efficient designs.In addition to its practical applications, the trihedral (三面体) also offers a fascinating exploration of mathematical concepts. For students learning geometry, understanding the characteristics of a trihedral (三面体) can deepen their grasp of spatial reasoning and visualization skills. By constructing models of trihedral (三面体) shapes, students can engage in hands-on learning that reinforces theoretical knowledge.Artistic endeavors also benefit from the incorporation of geometric shapes like the trihedral (三面体). Artists often experiment with different forms to create visually striking pieces. The interplay of light and shadow on the surfaces of a trihedral (三面体) can evoke emotions and provoke thought, making it a powerful element in contemporary art. By integrating a trihedral (三面体) into their work, artists can challenge viewers to consider the relationship between geometry and creativity.In conclusion, the trihedral (三面体) is more than just a geometric term; it is a versatile shape that finds relevance across various disciplines. Whether in architecture, engineering, education, or art, the trihedral (三面体) serves as a reminder of the interconnectedness of mathematics and the physical world. As we continue to explore and understand these shapes, we unlock new possibilities for innovation and creativity. Embracing the concept of a trihedral (三面体) can inspire future generations to appreciate the beauty and utility of geometry in our everyday lives.
