isoclinic
简明释义
英[ˌaɪsəˈklɪnɪk]美[ˌaɪsəˈklɪnɪk]
等倾的
英英释义
Relating to or denoting lines on a diagram that connect points at which the angle of inclination is the same. | 与图示上连接倾斜角度相同的点的线有关或表示。 |
单词用法
同义词
| 等角的 | The isoclinic lines on the map represent areas of equal dip. | 地图上的等倾线表示倾角相等的区域。 | |
| 各向同性的 | In geology, isogonal and isoclinic concepts are often used to analyze rock formations. | 在地质学中,等角和等倾的概念常用于分析岩石构造。 |
反义词
| 非等倾角的 | The non-isoclinic structure of the material affects its mechanical properties. | 材料的非等倾角结构影响其机械性能。 | |
| 异倾角的 | In an aniso-clinic crystal, the angles between the axes are not equal. | 在异倾角晶体中,轴之间的角度不相等。 |
例句
1.This paper introduce a new type of high precision measurement system based on plane isoclinic interference theory (PUT).
介绍了一种新型的基于平面等倾干涉原理的高精度平面度测量系统。
2.This paper introduce a new type of high precision measurement system based on plane isoclinic interference theory (PUT).
介绍了一种新型的基于平面等倾干涉原理的高精度平面度测量系统。
3.In physics, isoclinic refers to surfaces where the angle of inclination is constant.
在物理学中,isoclinic指的是倾斜角度恒定的表面。
4.In geology, the term isoclinic refers to lines on a map that connect points of equal dip angle.
在地质学中,术语isoclinic指的是地图上连接相同倾角点的线。
5.Understanding isoclinic zones can help geologists predict earthquake patterns.
理解isoclinic区可以帮助地质学家预测地震模式。
6.The isoclinic curves on the graph represent regions of uniform magnetic field strength.
图表上的isoclinic曲线表示均匀磁场强度的区域。
7.The isoclinic lines on the geological survey indicate areas with similar rock formations.
地质调查中的isoclinic线表示具有相似岩层的区域。
作文
In the study of physics and engineering, understanding various concepts is crucial for grasping more complex theories. One such term that often comes up in discussions of mechanics and structural analysis is isoclinic. The word isoclinic refers to lines or surfaces that have the same inclination or angle with respect to a reference plane. This concept is particularly important in fields such as geology, where it can describe the orientation of stress in rocks, or in materials science, where it helps in analyzing the behavior of materials under load. To better understand isoclinic lines, let’s consider their application in geotechnical engineering. Engineers often need to assess the stability of slopes and the forces acting on them. By mapping isoclinic lines, they can visualize how different sections of a slope respond to gravitational forces. Each isoclinic line indicates a zone of equal stress, which allows engineers to identify potential failure areas in a slope. This is vital for ensuring the safety and integrity of structures built on or near these slopes.Moreover, isoclinic surfaces are also used in the analysis of beam bending. When a beam is subjected to loads, it experiences different angles of deflection along its length. By plotting isoclinic lines on a diagram of the beam, engineers can predict how the beam will deform under various loading conditions. This predictive capability is essential for designing beams that can withstand specific loads without failing.In addition to engineering applications, the concept of isoclinic is also significant in meteorology. Meteorologists use isoclinic lines to represent areas of equal atmospheric pressure on weather maps. These lines help in forecasting weather patterns, as they indicate where high and low-pressure systems are located. Understanding how isoclinic lines interact with other meteorological factors can greatly enhance the accuracy of weather predictions.Furthermore, the importance of isoclinic lines extends into the realm of mathematics, particularly in vector calculus. In this context, isoclinic surfaces can be analyzed to study gradients and directional derivatives. By understanding the properties of isoclinic surfaces, mathematicians can solve complex problems related to multivariable functions, which has implications in physics and engineering as well.In conclusion, the term isoclinic encompasses a variety of applications across different fields, from engineering and geology to meteorology and mathematics. Its ability to represent zones of equal inclination or stress provides valuable insights that help professionals make informed decisions in their respective domains. Mastering the concept of isoclinic lines and surfaces not only enhances our understanding of physical phenomena but also equips us with the tools needed to tackle real-world challenges effectively. As we delve deeper into the complexities of these fields, the significance of isoclinic becomes increasingly apparent, reminding us of the interconnectedness of knowledge across disciplines.
在物理学和工程学的研究中,理解各种概念对于掌握更复杂的理论至关重要。一个经常出现在力学和结构分析讨论中的术语是等倾角。等倾角这个词指的是与参考平面具有相同倾斜角度的线或表面。这个概念在地质学等领域特别重要,它可以描述岩石中的应力方向,或者在材料科学中,帮助分析材料在负载下的行为。为了更好地理解等倾角线,让我们考虑它们在岩土工程中的应用。工程师常常需要评估坡面的稳定性以及作用于坡面上的力。通过绘制等倾角线,他们可以可视化坡面不同部分对重力的响应。每条等倾角线表示一个等应力区,这使工程师能够识别坡面上潜在的失效区域。这对于确保在这些坡面上或附近建造的结构的安全性和完整性至关重要。此外,等倾角表面也用于梁弯曲的分析。当梁受到负载时,它在其长度上经历不同的挠度角。通过在梁的图示上绘制等倾角线,工程师可以预测梁在各种加载条件下的变形。这种预测能力对于设计能够承受特定负载而不失败的梁至关重要。除了工程应用外,等倾角的概念在气象学中也非常重要。气象学家使用等倾角线来表示天气图上等大气压力的区域。这些线有助于预测天气模式,因为它们指示高压和低压系统的位置。理解等倾角线与其他气象因素之间的相互作用可以大大提高天气预测的准确性。此外,等倾角线的重要性延伸到数学领域,尤其是向量微积分。在这个背景下,可以分析等倾角表面,以研究梯度和方向导数。通过理解等倾角表面的性质,数学家可以解决与多变量函数相关的复杂问题,这在物理和工程中都有影响。总之,等倾角这个术语涵盖了不同领域的多种应用,从工程、地质学到气象学和数学。它代表等倾斜或应力区的能力提供了宝贵的见解,帮助专业人士在各自的领域做出明智的决策。掌握等倾角线和表面的概念不仅增强了我们对物理现象的理解,也为我们提供了解决现实世界挑战所需的工具。当我们深入探讨这些领域的复杂性时,等倾角的重要性变得愈发明显,提醒我们跨学科知识的相互联系。
