graduated parallels

简明释义

分度纬度线

英英释义

例句

1.In geography class, we learned how graduated parallels can indicate temperature variations in different regions.

在地理课上，我们学习了如何通过等距平行线指示不同地区的温度变化。

2.The artist used graduated parallels in her painting to create depth and perspective.

这位艺术家在她的画作中使用了等距平行线来创造深度和透视效果。

3.The map features graduated parallels, which help in understanding the elevation changes across the terrain.

这张地图具有等距平行线，有助于理解地形的高程变化。

4.For navigation, sailors often rely on charts that include graduated parallels for accurate positioning.

对于导航，水手们通常依赖包含等距平行线的图表来进行精确定位。

5.The engineering blueprint displayed graduated parallels to represent the slope of the roof accurately.

工程蓝图展示了等距平行线，以准确表示屋顶的坡度。

作文

The concept of graduated parallels is often used in various fields, including geography and mathematics. In geography, it refers to the lines of latitude that are drawn on maps to represent the Earth’s surface. These lines are not just arbitrary; they serve a significant purpose in helping us understand the geographical layout of our planet. The term graduated parallels specifically highlights how these lines are measured and spaced at regular intervals, thus creating a systematic approach to mapping the Earth.When we look at a globe or a map, we can see how the graduated parallels divide the world into different regions. Each line represents a degree of latitude, starting from the equator at 0 degrees and moving towards the poles at 90 degrees north and south. This systematic division allows for easier navigation and understanding of climate zones, ecosystems, and even cultural regions across the globe. For instance, knowing that a location is situated at 30 degrees north latitude can help us infer its climate characteristics, as this coordinate generally corresponds to certain weather patterns.In mathematics, the idea of graduated parallels can be applied in the context of graphing functions. When plotting a graph, one often uses a coordinate system where the axes are divided into graduated intervals. This allows for precise measurements and clear representations of relationships between variables. For example, when graphing a linear equation, the graduated parallels on the y-axis and x-axis help in identifying points of intersection and the slope of the line. This mathematical representation is crucial in fields such as physics, engineering, and economics, where understanding relationships between different quantities is essential.Furthermore, the significance of graduated parallels extends beyond just geography and mathematics. In art and design, the concept can be seen in the use of grids and frameworks that help artists create proportionate and balanced compositions. By using graduated lines, artists can maintain perspective and depth in their work, ensuring that each element aligns harmoniously with others.In conclusion, the term graduated parallels encompasses a broad range of applications across various disciplines. Whether in geography, mathematics, or the arts, understanding the importance of these graduated lines helps us navigate our world more effectively. They provide a structured way of interpreting data, whether it’s the layout of continents or the relationship between numbers. As we continue to explore and learn about our environment, the concept of graduated parallels will remain a fundamental tool in our quest for knowledge and understanding. Ultimately, embracing this concept allows us to appreciate the interconnectedness of different fields and enhances our ability to analyze and interpret the complexities of the world around us.

“graduated parallels”这一概念在地理和数学等多个领域中被广泛使用。在地理学中，它指的是绘制在地图上的纬线，用以表示地球表面。这些线并非随意而画；它们在帮助我们理解地球的地理布局方面具有重要意义。“graduated parallels”这个术语特别强调这些线是如何按规则间隔测量和排列，从而形成一种系统化的地图绘制方法。当我们查看地球仪或地图时，可以看到“graduated parallels”如何将世界划分为不同的区域。每条线代表一个纬度，起始于赤道的0度，向北和南极延伸至90度。这种系统化的划分使得导航和理解气候带、生态系统甚至文化区域变得更加容易。例如，知道某个地点位于北纬30度可以帮助我们推断其气候特征，因为这一坐标通常对应于某些天气模式。在数学中，“graduated parallels”的思想可以应用于函数图形的绘制。当绘制图形时，人们通常使用一个坐标系，其中轴线被划分为逐渐增加的间隔。这允许进行精确的测量和清晰的变量关系表示。例如，在绘制线性方程时，y轴和x轴上的“graduated parallels”有助于识别交点和线的斜率。这种数学表示在物理学、工程学和经济学等领域至关重要，因为理解不同数量之间的关系是必不可少的。此外，“graduated parallels”的重要性不仅限于地理和数学。在艺术和设计中，这一概念可以在使用网格和框架中看到，帮助艺术家创作出比例协调、平衡的作品。通过使用逐渐增加的线条，艺术家可以在作品中保持透视和深度，确保每个元素与其他元素和谐对齐。总之，“graduated parallels”这一术语涵盖了多个学科中的广泛应用。无论是在地理、数学还是艺术中，理解这些逐渐增加的线条的重要性都能帮助我们更有效地导航我们的世界。它们提供了一种结构化的数据解释方式，无论是大陆的布局还是数字之间的关系。随着我们继续探索和学习我们的环境，“graduated parallels”的概念将始终是我们获取知识和理解的基本工具。最终，接受这一概念使我们能够欣赏不同领域之间的相互联系，并增强我们分析和解释周围复杂世界的能力。