non-linear motion

简明释义

非线性运动

英英释义

例句

1.The path of a thrown baseball is an example of non-linear motion 非线性运动 due to the effects of gravity and air resistance.

被投掷的棒球的轨迹是一个例子，展示了由于重力和空气阻力的影响而产生的非线性运动。

2.In physics, non-linear motion 非线性运动 often involves complex equations that describe the motion of particles in a fluid.

在物理学中，非线性运动通常涉及描述流体中粒子运动的复杂方程。

3.The trajectory of a roller coaster can be modeled as non-linear motion 非线性运动 because of its steep drops and sharp turns.

过山车的轨迹可以建模为非线性运动，因为它有陡峭的下降和急转弯。

4.A car taking a sharp turn exhibits non-linear motion 非线性运动 as it changes direction rapidly.

一辆汽车在急转弯时表现出非线性运动，因为它迅速改变方向。

5.In robotics, understanding non-linear motion 非线性运动 is crucial for programming the movement of robotic arms.

在机器人技术中，理解非线性运动对编程机器臂的运动至关重要。

作文

Non-linear motion is a fascinating concept in physics that describes the movement of objects in a way that does not follow a straight line or predictable path. Unlike linear motion, where an object moves in a straight line at a constant speed, 非线性运动 involves changes in direction, speed, and acceleration that can be quite complex. This type of motion can be observed in various real-world scenarios, from the trajectory of a thrown ball to the orbits of planets around the sun.To better understand 非线性运动, let’s consider the example of a roller coaster. As the coaster climbs up a hill, it slows down due to gravity. Once it reaches the peak, it rapidly descends, gaining speed as it goes down. The path taken by the coaster is not a straight line; instead, it twists and turns, creating a non-linear motion. The forces acting on the coaster—gravity, friction, and centripetal force—contribute to this complex movement.Another example of 非线性运动 can be found in the motion of planets in our solar system. While the planets generally follow elliptical orbits around the sun, their paths are influenced by the gravitational pull of other celestial bodies. This results in a non-linear trajectory that can change over time, especially when considering the interactions between multiple planets. The study of such motions is crucial in astrophysics, as it helps scientists predict the positions of planets and other celestial objects.In engineering, understanding 非线性运动 is essential for designing vehicles, aircraft, and even spacecraft. Engineers must account for various forces and factors that affect motion, such as air resistance and thrust. For instance, when designing a car, engineers need to consider how the vehicle will handle during sharp turns, sudden stops, or acceleration. These situations often involve non-linear motion, and failing to account for them can lead to safety issues.Furthermore, 非线性运动 plays a significant role in sports. Athletes often rely on their understanding of motion to enhance their performance. For example, a basketball player must understand the arc of a shot, which is a non-linear trajectory. By mastering the principles of 非线性运动, athletes can improve their skills and increase their chances of success in their respective sports.In summary, 非线性运动 is a vital concept that extends beyond the realm of physics into everyday life. Whether we are observing the graceful arcs of athletes or the intricate paths of celestial bodies, non-linear motion is all around us. Understanding this phenomenon not only enriches our knowledge of the physical world but also enhances our ability to innovate and excel in various fields. As we continue to explore the complexities of motion, we gain valuable insights that can lead to advancements in technology, safety, and performance. Therefore, studying 非线性运动 is not just an academic pursuit; it is a pathway to a deeper appreciation of the dynamic universe we inhabit.

非线性运动是物理学中一个引人入胜的概念，描述了物体以不遵循直线或可预测路径的方式移动的情况。与线性运动不同，线性运动是指物体以恒定速度沿直线移动，非线性运动则涉及方向、速度和加速度的变化，这些变化可能相当复杂。这种类型的运动可以在各种现实场景中观察到，从投掷球的轨迹到行星围绕太阳的轨道。为了更好地理解非线性运动，让我们考虑过山车的例子。当过山车爬上山丘时，由于重力，它会减速。一旦到达峰顶，它会迅速下降，速度随之增加。过山车所走的路径不是直线，而是扭曲和转弯，形成了非线性运动。作用于过山车的力量——重力、摩擦力和向心力——共同导致了这种复杂的运动。另一个非线性运动的例子可以在我们太阳系内的行星运动中找到。虽然行星通常沿着椭圆轨道围绕太阳运行，但它们的路径受到其他天体引力的影响。这导致了非线性轨迹，随着时间的推移可能会发生变化，特别是在考虑多个行星之间的相互作用时。这种运动的研究对于天体物理学至关重要，因为它帮助科学家预测行星和其他天体的位置。在工程领域，理解非线性运动对于设计车辆、飞机甚至航天器至关重要。工程师必须考虑影响运动的各种力量和因素，例如空气阻力和推力。例如，在设计汽车时，工程师需要考虑车辆在急转弯、突然停车或加速时的表现。这些情况通常涉及非线性运动，如果不加以考虑，可能会导致安全问题。此外，非线性运动在体育运动中也发挥着重要作用。运动员通常依赖对运动的理解来提升自己的表现。例如，篮球运动员必须理解投篮的弧度，这是一种非线性轨迹。通过掌握非线性运动的原理，运动员可以提高技能，增加在各自运动中的成功机会。总之，非线性运动是一个超越物理学领域的重要概念，延伸到日常生活中。无论我们是在观察运动员优雅的弧线，还是在观察天体的复杂路径，非线性运动无处不在。理解这一现象不仅丰富了我们对物理世界的知识，还增强了我们在各个领域创新和卓越的能力。随着我们继续探索运动的复杂性，我们获得了宝贵的见解，这可以导致技术、安全和性能的进步。因此，研究非线性运动不仅仅是学术追求；它是通往更深刻欣赏我们所居住的动态宇宙的一条途径。