angle of inclination

简明释义

俯角

英英释义

例句

1.The architect calculated the angle of inclination 倾斜角 for the roof to ensure proper drainage.

建筑师计算了屋顶的angle of inclination 倾斜角以确保排水良好。

2.When designing the staircase, the builder had to consider the angle of inclination 倾斜角 for comfort and accessibility.

在设计楼梯时，建造者必须考虑angle of inclination 倾斜角以确保舒适性和可达性。

3.The angle of inclination 倾斜角 of the ramp must be less than 30 degrees for safety reasons.

出于安全原因，坡道的angle of inclination 倾斜角必须小于30度。

4.In physics class, we learned that the angle of inclination 倾斜角 affects the trajectory of a projectile.

在物理课上，我们了解到angle of inclination 倾斜角影响抛射物的轨迹。

5.The angle of inclination 倾斜角 of the Earth affects the seasons and climate.

地球的angle of inclination 倾斜角影响季节和气候。

作文

The concept of the angle of inclination is fundamental in various fields, including physics, engineering, and even art. It refers to the angle formed between a reference plane and a line or surface that is inclined to it. Understanding this concept can help us analyze and solve problems related to slopes, trajectories, and structures. In this essay, I will explore the significance of the angle of inclination in different contexts, illustrating its importance through practical examples.In physics, the angle of inclination plays a crucial role in mechanics, especially when studying the motion of objects on inclined planes. For instance, when a block slides down an inclined surface, the angle of inclination determines the gravitational force component acting along the slope. A steeper incline results in a larger component of gravitational force, leading to increased acceleration. This principle is not only applicable in theoretical scenarios but also in real-world applications such as roller coasters, where engineers must calculate the optimal angle of inclination to ensure safety and excitement for riders.Furthermore, in civil engineering, the angle of inclination is critical when designing roads and ramps. A road with an appropriate angle of inclination ensures that vehicles can ascend or descend safely without losing traction. If the incline is too steep, vehicles may struggle to climb, while a gentle slope might not provide enough momentum for certain types of vehicles. Thus, understanding the angle of inclination helps engineers create designs that are both functional and safe.In addition to its applications in science and engineering, the angle of inclination can also be observed in art, particularly in the composition of paintings and sculptures. Artists often manipulate the angle of inclination of elements within their work to create depth and perspective. For example, a painter might tilt a horizon line at a specific angle of inclination to suggest distance and three-dimensionality. This technique draws the viewer's eye and adds dynamism to the artwork, showcasing how mathematical concepts can enhance creative expression.Moreover, the angle of inclination is significant in astronomy. The tilt of the Earth's axis, known as the axial tilt, affects the seasons and climate patterns. The Earth's angle of inclination relative to its orbital plane determines the intensity and duration of sunlight received in different regions. This phenomenon explains why summer occurs in the Northern Hemisphere when the North Pole is tilted toward the sun, while the Southern Hemisphere experiences winter. Understanding this angle of inclination is essential for climatologists and environmental scientists studying global warming and climate change.In conclusion, the angle of inclination is a versatile concept that transcends disciplines. Its implications in physics, engineering, art, and astronomy highlight its significance in both practical and theoretical realms. By grasping the nuances of the angle of inclination, we can better understand the world around us and apply this knowledge to solve complex problems. Whether we are designing safe structures, creating captivating art, or studying celestial movements, the angle of inclination remains a vital aspect of our understanding of the universe.

‘倾斜角’的概念在物理学、工程学甚至艺术等多个领域中都至关重要。它指的是参考平面与一个倾斜的线或表面之间形成的角度。理解这一概念可以帮助我们分析和解决与坡度、轨迹和结构相关的问题。在这篇文章中，我将探讨‘倾斜角’在不同背景下的重要性，通过实际例子阐明其重要性。在物理学中，‘倾斜角’在力学中发挥着关键作用，特别是在研究物体在倾斜平面上的运动时。例如，当一个块体沿着倾斜表面滑下时，‘倾斜角’决定了沿坡道作用的重力分量。更陡的倾斜会导致更大的重力分量，从而加速下滑。这一原理不仅适用于理论场景，还适用于现实应用，例如过山车，工程师必须计算最佳的‘倾斜角’以确保乘客的安全和刺激感。此外，在土木工程中，‘倾斜角’在设计道路和坡道时至关重要。适当的‘倾斜角’确保车辆能够安全上下坡道，而不会失去牵引力。如果坡度过陡，车辆可能难以攀爬，而缓和的坡度可能不足以为某些类型的车辆提供足够的动力。因此，理解‘倾斜角’可以帮助工程师创造既实用又安全的设计。除了在科学和工程中的应用外，‘倾斜角’还可以在艺术中观察到，特别是在绘画和雕塑的构图中。艺术家常常操纵作品中元素的‘倾斜角’来创造深度和透视。例如，画家可能会以特定的‘倾斜角’倾斜地平线，以暗示距离和三维感。这种技巧吸引观众的目光，并为艺术作品增添活力，展示了数学概念如何增强创造性表达。此外，‘倾斜角’在天文学中也很重要。地球的轴倾角，即轴的倾斜程度，影响季节和气候模式。地球相对于其轨道平面的‘倾斜角’决定了不同地区接收到的阳光强度和持续时间。这一现象解释了为什么当北极朝向太阳倾斜时，北半球经历夏季，而南半球则经历冬季。理解这一‘倾斜角’对研究全球变暖和气候变化的气候学家和环境科学家至关重要。总之，‘倾斜角’是一个跨越多个学科的多功能概念。它在物理学、工程学、艺术和天文学中的影响突显了它在实践和理论领域的重要性。通过掌握‘倾斜角’的细微差别，我们可以更好地理解周围的世界，并将这些知识应用于解决复杂问题。无论是在设计安全结构、创作引人入胜的艺术作品，还是研究天体运动，‘倾斜角’始终是我们理解宇宙的重要方面。