cycloidal
简明释义
adj. 摆线的;圆形的
英英释义
Relating to or resembling a cycloid, which is the curve traced by a point on the circumference of a circle as it rolls along a straight line. | 与圆周运动相关或相似的,指的是一个点在圆的周长上滚动时沿直线所描绘的曲线。 |
单词用法
摆线齿轮 |
同义词
反义词
| 线性的 | 线性运动是由一条直线路径描述的。 | ||
| 非周期性的 | Non-cycloidal gears are often used in applications requiring constant velocity. | 非周期性齿轮通常用于需要恒定速度的应用中。 |
例句
1.Electric pumps are mainly cycloidal reducer, transmission parts, piston pump major components, etc.
电动加油泵主要有摆线针轮减速机、传动件、活塞泵等主要部件组成。
2.Internal gear pump has two kinds of tooth profile namely: involute profile and cycloidal tooth profile.
内啮合齿轮泵有两种齿形即:渐开线齿形和摆线齿形。
3.Gives the force analysis theory of mechanism W of cycloidal gear suitable for engineering practice and series complete formula.
本文提出了一种适用于工程实际的摆线针轮行星传动的输出机构受力分析理论,并给出一套完整公式。
4.Acceptable metal shaving contact rollers of cycloidal gears and involute gears in shape grinding have been manufactured with this method.
用该法已加工出了满足生产要求的摆线齿轮、硬齿面渐开线齿轮成形磨削砂轮金属修整滚轮。
5.Firstly, the performance of several kinds of gears that is commonly used in present is analyzed. the sliding coefficients of the involute gear and the cycloidal gear are compared.
论文首先对目前常用的几种齿轮性能进行了分析,比较了渐开线与摆线齿轮的滑动系数,渐开线与圆弧齿轮的弯曲应力和接触应力。
6.Based on the equation of action line for cycloidal pump, a geometrical mathematical model is built to solve instantaneous flow, displacement, average flow and the pulsation of the pump.
根据摆线泵的啮合线方程,建立了用几何法求解摆线泵的瞬时流量、排量、流量脉动率的数学模型。
7.With the purpose to reduce the high contact stress of the meshing pair of needle roller, a group of optimized cycloidal parameters are obtained through the comparative calculations w...
针对摆线针轮啮合副接触应力较大,作者通过几种方案对比计算,提出了一组较好的摆线参数。
8.Engineers studied the cycloidal 圆周运动的 motion of gears to improve machinery efficiency.
工程师研究了齿轮的cycloidal 圆周运动的运动,以提高机械效率。
9.The cycloidal 圆周运动的 pendulum is a fascinating topic in physics due to its unique properties.
由于其独特的性质,cycloidal 圆周运动的摆是物理学中的一个迷人话题。
10.In mathematics, the cycloidal 圆周运动的 path is often used to illustrate complex curves.
在数学中,cycloidal 圆周运动的路径常用于说明复杂曲线。
11.The design of the roller coaster features cycloidal 圆周运动的 elements to enhance the thrill of the ride.
过山车的设计包含了cycloidal 圆周运动的元素,以增强乘坐的刺激感。
12.The motion of the toy car can be described as cycloidal 圆周运动的 when it rolls down the ramp.
当玩具车沿着斜坡滚下时,它的运动可以被描述为cycloidal 圆周运动的。
作文
The concept of motion has always fascinated scientists and mathematicians throughout history. One particular type of motion that captures the imagination is the cycloidal (抛物线的) motion, which is characterized by its unique path traced out by a point on the circumference of a rolling circle. This motion can be observed in various natural phenomena and mechanical systems, making it an essential topic of study in physics and engineering.To understand cycloidal (抛物线的) motion, we can start by considering a simple example: a wheel rolling along a flat surface. As the wheel rolls, a point on its edge traces a specific curve known as a cycloid. This curve is defined mathematically, but its physical implications are far-reaching. The cycloidal (抛物线的) path demonstrates how objects in motion can exhibit periodic behavior, which is a key principle in both classical mechanics and modern physics.One of the most intriguing aspects of cycloidal (抛物线的) motion is its connection to the principles of calculus. The study of the cycloid led to significant advancements in mathematics, particularly in the fields of differential equations and integral calculus. For instance, the famous mathematician Galileo Galilei conducted experiments with the cycloidal path, leading to his discovery that objects in free fall follow a cycloidal (抛物线的) trajectory. This revelation not only advanced our understanding of gravity but also laid the groundwork for future studies in kinematics.In engineering, the cycloidal (抛物线的) motion is applied in various mechanisms, such as gears and cam systems. Cycloidal drives, for example, utilize the cycloidal (抛物线的) motion to convert rotary motion into linear motion efficiently. This technology is particularly useful in robotics and automation, where precise movement and control are paramount. The efficiency of cycloidal (抛物线的) drives makes them ideal for applications requiring high torque and low backlash.Moreover, the cycloidal (抛物线的) motion can be observed in nature, particularly in the movement of pendulums and the orbits of celestial bodies. The motion of a pendulum, for instance, can be approximated by a cycloidal (抛物线的) path when considering small angles. This connection between mathematics and the natural world highlights the importance of understanding cycloidal (抛物线的) motion in both theoretical and practical contexts.In conclusion, the study of cycloidal (抛物线的) motion provides valuable insights into the principles of motion, mathematics, and engineering. From its mathematical origins to its applications in modern technology, the cycloidal (抛物线的) path serves as a reminder of the interconnectedness of various fields of study. As we continue to explore the complexities of motion and its implications, the cycloidal (抛物线的) motion will undoubtedly remain a significant area of research and innovation.
运动的概念一直以来都吸引着科学家和数学家们的关注。特别是一种运动类型,即cycloidal(抛物线的)运动,以其独特的路径而引人入胜,这条路径是由一个滚动圆周上的点所描绘的。这种运动可以在各种自然现象和机械系统中观察到,使其成为物理学和工程学研究的重要主题。要理解cycloidal(抛物线的)运动,我们可以从一个简单的例子开始:一个轮子在平面上滚动。当轮子滚动时,边缘上的一个点描绘出一种特定的曲线,称为摆线。这条曲线在数学上有明确的定义,但其物理意义却远不止于此。cycloidal(抛物线的)路径展示了运动中的物体如何表现出周期性行为,这是经典力学和现代物理学中的关键原则。cycloidal(抛物线的)运动的一个最引人入胜的方面是它与微积分原理的联系。对摆线的研究推动了数学的重大进展,尤其是在微分方程和积分微积分领域。例如,著名数学家伽利略进行了关于摆线路径的实验,发现自由落体的物体遵循cycloidal(抛物线的)轨迹。这一发现不仅加深了我们对重力的理解,也为未来的运动学研究奠定了基础。在工程学中,cycloidal(抛物线的)运动被应用于各种机制,如齿轮和凸轮系统。例如,摆线驱动利用cycloidal(抛物线的)运动有效地将旋转运动转换为线性运动。这项技术在机器人和自动化领域尤为重要,因为精确的运动和控制至关重要。cycloidal(抛物线的)驱动的高效性使其非常适合需要高扭矩和低回程的应用。此外,cycloidal(抛物线的)运动在自然界中也可以观察到,特别是在摆和天体的轨道运动中。例如,考虑小角度时,摆的运动可以近似为cycloidal(抛物线的)路径。这种数学与自然界之间的联系突显了理解cycloidal(抛物线的)运动在理论和实践背景下的重要性。总之,研究cycloidal(抛物线的)运动为我们提供了对运动、数学和工程原理的宝贵见解。从其数学起源到现代技术中的应用,cycloidal(抛物线的)路径提醒我们不同研究领域之间的相互联系。随着我们继续探索运动的复杂性及其影响,cycloidal(抛物线的)运动无疑将继续成为研究和创新的重要领域。
