terrestrial triangle

简明释义

地面三角形

英英释义

例句

1.Understanding the terrestrial triangle is crucial for students studying cartography.

理解地面三角形对学习制图的学生至关重要。

2.The concept of a terrestrial triangle is essential in surveying land for construction projects.

在进行建筑项目的土地测量时，地面三角形的概念是必不可少的。

3.The terrestrial triangle method is often applied in navigation to improve route planning.

地面三角形方法通常应用于导航，以改善路线规划。

4.In geography, a terrestrial triangle can help define regions for ecological studies.

在地理学中，地面三角形可以帮助定义生态研究的区域。

5.When mapping out the area, we used a terrestrial triangle to ensure accuracy.

在绘制该区域时，我们使用了地面三角形以确保准确性。

作文

In the study of geography and cartography, the term terrestrial triangle refers to a specific triangular area on the Earth's surface that is defined by three points. These points can be any significant locations, such as mountain peaks, landmarks, or cities. The concept of the terrestrial triangle is crucial for various applications, including navigation, land surveying, and even in the development of geographic information systems (GIS). Understanding how to accurately define and utilize a terrestrial triangle can greatly enhance our ability to interpret spatial data and make informed decisions based on geographical information.The formation of a terrestrial triangle often begins with the selection of three distinct points. For example, imagine you are tasked with creating a map of a national park. You might choose the highest peak, a central lake, and a notable visitor center as your three points. By connecting these points, you create a terrestrial triangle that represents a specific area of interest within the park. This triangle can then be used to analyze various geographical features, such as elevation changes, vegetation types, or wildlife habitats within that region.One of the primary advantages of using a terrestrial triangle is its simplicity. Triangles are one of the most basic shapes in geometry, making them easy to work with in mathematical calculations. For instance, once you have established your terrestrial triangle, you can easily calculate its area, perimeter, and even the angles between its sides. These calculations can provide valuable insights into the geography of the area being studied.Moreover, the terrestrial triangle serves as a foundational element in more complex geographical analyses. In surveying, for instance, surveyors often use triangulation methods, which rely on the principles of the terrestrial triangle, to determine the location of points on the Earth's surface. By measuring the distances and angles between known points, they can accurately plot new locations, which is essential for construction, land development, and urban planning.Another application of the terrestrial triangle is in the field of navigation. Pilots and sailors often use triangulation techniques to pinpoint their location relative to landmarks or navigational aids. By establishing a terrestrial triangle with three known positions, they can calculate their exact position on a map, ensuring safe and efficient travel.In addition to practical applications, the concept of the terrestrial triangle also has theoretical implications. It encourages us to think critically about the relationships between different geographical features. For example, how do the locations of mountains, rivers, and cities interact within the confines of a terrestrial triangle? What patterns emerge when we analyze multiple triangles across a larger region? These questions can lead to a deeper understanding of the complexities of our environment.In conclusion, the terrestrial triangle is more than just a geometric shape; it is a fundamental concept that underpins many aspects of geography and cartography. From navigation to land surveying, the applications of the terrestrial triangle are vast and varied. By mastering this concept, we can enhance our ability to analyze and interpret the world around us, leading to more informed decisions and a greater appreciation for the intricate relationships that exist within our environment.

在地理和制图研究中，术语terrestrial triangle（地面三角形）指的是地球表面上由三个点定义的特定三角区域。这些点可以是任何重要位置，例如山峰、地标或城市。terrestrial triangle的概念对于导航、土地测量甚至地理信息系统（GIS）的发展等各种应用至关重要。准确地定义和利用terrestrial triangle的能力可以大大增强我们解读空间数据和基于地理信息做出明智决策的能力。terrestrial triangle的形成通常始于选择三个不同的点。例如，想象一下你被指派创建一个国家公园的地图。你可能会选择最高峰、中央湖泊和一个显著的游客中心作为你的三个点。通过连接这些点，你创建了一个代表公园内特定兴趣区域的terrestrial triangle。然后，可以使用这个三角形来分析该区域内的各种地理特征，例如海拔变化、植被类型或野生动物栖息地。使用terrestrial triangle的主要优点之一是其简单性。三角形是几何学中最基本的形状之一，使其在数学计算中易于处理。例如，一旦建立了terrestrial triangle，就可以轻松计算其面积、周长，甚至是其边之间的角度。这些计算可以提供有关所研究区域地理的宝贵见解。此外，terrestrial triangle作为更复杂地理分析的基础元素。在测量中，测量员经常使用依赖于terrestrial triangle原理的三角测量方法来确定地球表面点的位置。通过测量已知点之间的距离和角度，他们可以准确绘制新的位置，这对于建筑、土地开发和城市规划至关重要。terrestrial triangle的另一个应用是在导航领域。飞行员和水手经常使用三角测量技术来确定自己相对于地标或导航设备的位置。通过建立一个包含三个已知位置的terrestrial triangle，他们可以计算出自己在地图上的确切位置，从而确保安全高效的旅行。除了实际应用外，terrestrial triangle的概念也具有理论意义。它鼓励我们批判性地思考不同地理特征之间的关系。例如，山脉、河流和城市在terrestrial triangle的范围内如何互动？当我们分析一个较大区域内的多个三角形时，会出现什么模式？这些问题可以引导我们更深入地理解我们环境的复杂性。总之，terrestrial triangle不仅仅是一个几何形状；它是支撑地理和制图许多方面的基本概念。从导航到土地测量，terrestrial triangle的应用广泛而多样。通过掌握这一概念，我们可以增强分析和解读周围世界的能力，从而做出更明智的决策，并更加欣赏我们环境中存在的复杂关系。