goniometric

简明释义

英[ˌɡoʊniəˈmɛtrɪk]美[ˌɡoʊniəˈmɛtrɪk]

adj. 测角计的；测角的

英英释义

单词用法

同义词

反义词

例句

1.Based on these techniques, the counter-jamming performance of typical goniometric systems is described. Finally, the improvements are suggested.

在此基础上，阐明了几种典型测角体制的抗干扰性能，提出了改进意见。

2.Based on these techniques, the counter-jamming performance of typical goniometric systems is described. Finally, the improvements are suggested.

在此基础上，阐明了几种典型测角体制的抗干扰性能，提出了改进意见。

3.The researcher used a goniometric device to measure the angles of joint movement during the study.

研究人员使用了一个测角的设备来测量研究中关节运动的角度。

4.In physical therapy, goniometric assessments help track a patient's range of motion over time.

在物理治疗中，测角的评估有助于跟踪患者的活动范围随时间的变化。

5.The goniometric analysis revealed significant improvements in flexibility after the training program.

这项测角的分析显示，在训练计划后灵活性有显著改善。

6.Using a goniometric tool, the coach was able to provide precise feedback on athletes' techniques.

教练使用测角的工具，能够为运动员的技术提供精确的反馈。

7.The goniometric measurements were essential for designing custom orthopedic devices.

这些测角的测量对于设计定制的矫形装置至关重要。

作文

In the field of mathematics and engineering, the term goniometric refers to the measurement of angles and the relationships between them. The study of angles is crucial in various applications, from architecture to astronomy. Understanding goniometric principles allows professionals to create accurate designs and models that reflect real-world scenarios. For instance, in architecture, the angles of a structure must be calculated precisely to ensure stability and aesthetic appeal. This is where goniometric functions come into play, as they help architects determine the optimal angles for beams, roofs, and other components of a building. Moreover, goniometric measurements are vital in navigation and surveying. Surveyors use these principles to measure land accurately, ensuring that property boundaries are defined correctly. They rely on tools like theodolites, which can measure angles in both horizontal and vertical planes. By applying goniometric methods, surveyors can create detailed maps and plans that guide construction and land development. In addition to practical applications, goniometric concepts also have theoretical implications. In trigonometry, the study of goniometric functions such as sine, cosine, and tangent is essential for solving problems involving right triangles. These functions relate the angles of a triangle to the lengths of its sides, enabling mathematicians to derive various properties and theorems. For example, the Pythagorean theorem, which is foundational in geometry, relies on these goniometric relationships to establish connections between the sides of a right triangle. Furthermore, the importance of goniometric functions extends to physics, particularly in the analysis of wave phenomena. Waves can be described using goniometric functions, which help in understanding their behavior, frequency, and amplitude. In fields like acoustics and optics, these functions provide insights into how sound and light propagate through different mediums. By employing goniometric principles, scientists can develop technologies such as sonar and lasers, which have transformed communication and exploration. In conclusion, the term goniometric encompasses a wide range of applications and implications across various disciplines. From architecture and surveying to mathematics and physics, the measurement and analysis of angles play a critical role in our understanding of the world. As we continue to explore and innovate, the significance of goniometric principles will undoubtedly remain at the forefront of scientific and engineering advancements. Embracing the complexities of goniometric functions not only enhances our technical capabilities but also enriches our appreciation of the intricate relationships that govern the universe around us.

在数学和工程领域，术语goniometric指的是角度的测量及其之间的关系。角度的研究在各个应用中至关重要，从建筑到天文学。理解goniometric原理使专业人士能够创建准确的设计和模型，以反映现实世界的场景。例如，在建筑中，结构的角度必须精确计算，以确保稳定性和美观。这就是goniometric函数发挥作用的地方，因为它们帮助建筑师确定梁、屋顶和建筑其他组件的最佳角度。 此外，goniometric测量在导航和测量中至关重要。测量师利用这些原理来准确测量土地，确保财产边界被正确定义。他们依赖于经纬仪等工具，可以测量水平和垂直平面中的角度。通过应用goniometric方法，测量师可以创建详细的地图和计划，指导建筑和土地开发。 除了实际应用，goniometric概念还有理论意义。在三角学中，goniometric函数（如正弦、余弦和正切）的研究对于解决涉及直角三角形的问题至关重要。这些函数将三角形的角度与其边的长度联系起来，使数学家能够推导出各种性质和定理。例如，毕达哥拉斯定理，几何学的基础，依赖于这些goniometric关系来建立直角三角形边之间的联系。 此外，goniometric函数的重要性扩展到物理学，特别是在波动现象的分析中。波可以使用goniometric函数来描述，这有助于理解它们的行为、频率和振幅。在声学和光学等领域，这些函数提供了关于声音和光如何通过不同介质传播的见解。通过采用goniometric原理，科学家可以开发出声纳和激光等技术，这些技术改变了通信和探索。 总之，术语goniometric涵盖了各个学科中广泛的应用和含义。从建筑和测量到数学和物理，角度的测量和分析在我们理解世界中发挥着关键作用。随着我们继续探索和创新，goniometric原理的重要性无疑将继续处于科学和工程进步的前沿。拥抱goniometric函数的复杂性不仅增强了我们的技术能力，也丰富了我们对支配周围宇宙的复杂关系的欣赏。