angle of inclination

简明释义

倾角

英英释义

例句

1.The angle of inclination 倾斜角 of the satellite's orbit affects its coverage area on Earth.

卫星轨道的angle of inclination 倾斜角影响其在地球上的覆盖区域。

2.To analyze the slope stability, we need to determine the angle of inclination 倾斜角 of the hillside.

为了分析坡度稳定性，我们需要确定山坡的angle of inclination 倾斜角。

3.The architect specified a angle of inclination 倾斜角 of 30 degrees for the staircase design.

建筑师为楼梯设计指定了30度的angle of inclination 倾斜角。

4.During the physics experiment, we measured the angle of inclination 倾斜角 of the inclined plane.

在物理实验中，我们测量了斜面的angle of inclination 倾斜角。

5.The engineer calculated the angle of inclination 倾斜角 for the roof to ensure proper drainage.

工程师计算了屋顶的angle of inclination 倾斜角以确保适当的排水。

作文

The concept of the angle of inclination is fundamental in various fields, especially in physics and engineering. It refers to the angle formed between a reference plane and an object, which can significantly affect how forces act upon it. For instance, when analyzing the stability of a structure, understanding the angle of inclination is crucial. A building that is designed with a certain angle of inclination may have different stress points compared to one with a steeper or shallower angle. Engineers must carefully calculate this angle to ensure safety and durability.In the realm of astronomy, the angle of inclination plays a vital role in the orbits of celestial bodies. The orbits of planets, moons, and asteroids are not always perfectly circular; they often tilt at specific angles relative to a reference plane, such as the plane of the solar system. This angle of inclination affects the way these bodies interact with each other gravitationally and can lead to fascinating phenomena, such as eclipses and planetary alignments.Moreover, the angle of inclination is also significant in sports. For example, in skiing, the slope of a hill is described by its angle of inclination. Skiers must understand this angle to navigate safely and effectively down the slope. A steep angle of inclination can pose challenges for even the most experienced skiers, while a gentle slope offers a different set of dynamics.In mathematics, the angle of inclination can be used to describe lines on a graph. It indicates the steepness of a line and can help in determining the rate of change between two variables. For example, in linear equations, the slope is often represented as the angle of inclination, which can reveal important information about the relationship between the variables involved.Understanding the angle of inclination enhances our comprehension of various natural and human-made systems. It allows scientists, engineers, and mathematicians to predict behaviors, design better structures, and solve complex problems. In education, teaching students about the angle of inclination can spark interest in STEM (science, technology, engineering, and mathematics) fields, encouraging them to explore how these principles apply to real-world situations.In conclusion, the angle of inclination is a versatile concept that transcends disciplines. Whether we are discussing the stability of a building, the orbits of planets, the dynamics of sports, or mathematical graphs, this angle serves as a critical parameter that influences outcomes. By grasping the significance of the angle of inclination, we can better appreciate the interconnectedness of various fields and the importance of precise measurements in our understanding of the world around us.

“倾斜角”这一概念在各个领域中都至关重要，尤其是在物理学和工程学中。它指的是参考平面与物体之间形成的角度，这会显著影响作用于物体的力。例如，在分析结构的稳定性时，理解“倾斜角”是至关重要的。设计时具有特定“倾斜角”的建筑，其应力点可能与具有更陡或更平缓角度的建筑不同。工程师必须仔细计算这个角度，以确保安全性和耐久性。在天文学领域，“倾斜角”在天体的轨道中也发挥着重要作用。行星、卫星和小行星的轨道并不总是完美的圆形；它们通常相对于参考平面（例如太阳系平面）倾斜一定的角度。这个“倾斜角”影响这些天体之间的引力互动，并可能导致有趣的现象，如日食和行星排列。此外，“倾斜角”在体育运动中也很重要。例如，在滑雪中，山坡的陡峭程度被称为“倾斜角”。滑雪者必须理解这个角度，以安全有效地滑下坡道。陡峭的“倾斜角”可能对经验丰富的滑雪者构成挑战，而平缓的坡道则提供了不同的动态。在数学中，“倾斜角”可以用来描述图表上的直线。它表示直线的陡峭程度，可以帮助确定两个变量之间的变化率。例如，在线性方程中，斜率通常表示为“倾斜角”，这可以揭示变量之间关系的重要信息。理解“倾斜角”增强了我们对各种自然和人造系统的理解。它使科学家、工程师和数学家能够预测行为、设计更好的结构和解决复杂问题。在教育中，教导学生关于“倾斜角”的知识可以激发他们对STEM（科学、技术、工程和数学）领域的兴趣，鼓励他们探索这些原理如何应用于现实世界的情况。总之，“倾斜角”是一个跨学科的多功能概念。无论我们是在讨论建筑的稳定性、行星的轨道、运动的动态，还是数学图形，这个角度都是影响结果的关键参数。通过掌握“倾斜角”的重要性，我们可以更好地欣赏各个领域的相互联系以及精确测量在我们理解周围世界中的重要性。