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相关概念视频

Oscillations In An LC Circuit01:30

Oscillations In An LC Circuit

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An idealized LC circuit of zero resistance can oscillate without any source of emf by shifting the energy stored in the circuit between the electric and magnetic fields. In such an LC circuit, if the capacitor contains a charge q before the switch is closed, then all the energy of the circuit is initially stored in the electric field of the capacitor. This energy is given by
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Forced Oscillations01:06

Forced Oscillations

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When an oscillator is forced with a periodic driving force, the motion may seem chaotic. The motions of such oscillators are known as transients. After the transients die out, the oscillator reaches a steady state, where the motion is periodic, and the displacement is determined.
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Damped Oscillations01:07

Damped Oscillations

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In the real world, oscillations seldom follow true simple harmonic motion. A system that continues its motion indefinitely without losing its amplitude is termed undamped. However, friction of some sort usually dampens the motion, so it fades away or needs more force to continue. For example, a guitar string stops oscillating a few seconds after being plucked. Similarly, one must continually push a swing to keep a child swinging on a playground.
Although friction and other non-conservative...
5.8K
Oscillations about an Equilibrium Position01:04

Oscillations about an Equilibrium Position

5.4K
Stability is an important concept in oscillation. If an equilibrium point is stable, a slight disturbance of an object that is initially at the stable equilibrium point will cause the object to oscillate around that point. For an unstable equilibrium point, if the object is disturbed slightly, it will not return to the equilibrium point. There are three conditions for equilibrium points—stable, unstable, and half-stable. A half-stable equilibrium point is also unstable, but is named so...
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¹H NMR: Interpreting Distorted and Overlapping Signals01:02

¹H NMR: Interpreting Distorted and Overlapping Signals

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Spin systems where the difference in chemical shifts of the coupled nuclei is greater than ten times J are called first-order spin systems. These nuclei are weakly coupled, and their chemical shifts and coupling constant can generally be estimated from the well-separated signals in the spectrum.
As Δν decreases and the signals move closer, the doublets appear increasingly distorted. The intensities of the inner lines increase at the cost of those of the outer lines as the signals are...
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Time and frequency -Domain Interpretation of Phase-lead Control01:24

Time and frequency -Domain Interpretation of Phase-lead Control

103
Phase-lead controllers are commonly used in various control systems to enhance response speed and stability. Adjusting the brightness on a television screen offers a practical example of phase-lead control. When contrast is enhanced, a phase-lead controller is employed. Mathematically, phase-lead control is identified when the first parameter is smaller than the second.
The design of phase-lead control involves the strategic placement of poles and zeros to balance steady-state error and system...
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相关实验视频

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Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators
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Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators

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在合振荡器系统中的相位滑动.

Pragjyotish Bhuyan Gogoi1, Suresh Kumarasamy2, Awadhesh Prasad1

  • 1Department of Physics and Astrophysics, University of Delhi, Delhi 110007, India.

Physical review. E
|August 16, 2023
PubMed
概括

合振荡器系统中的相位滑动是通过分析相位速度的静止点来解释的. 这项研究提供了定量描述,揭示了网络中的单个相位滑动通常不会同时发生.

科学领域:

  • 非线性动力学是一种非线性动力学.
  • 复杂的系统复杂的系统.
  • 网络科学 网络科学

背景情况:

  • 相位滑动是合振荡器系统中的关键事件,标志着过渡到相位同步.
  • 以前的分析通常依赖于识别结残留物或"幽灵"以进行相位滑动的表征.

研究的目的:

  • 为了提供一个更精确的,定量描述相位滑动力学在合振荡器系统.
  • 调查相位移和相位棒的潜在机制.

主要方法:

  • 详细检查相振荡器组中的动态.
  • 分析相位速度及其静止点.
  • 对各种表现相同步的系统的研究,包括具有和没有结幽灵,相似性依赖合和合混乱振荡器的系统.

主要成果:

  • 相位移和相位棒发生在相位速度的静止点上.
  • 在合相振荡器网络中,单个相位滑动通常不会同时发生.
  • 在各种系统中证明了相同步,包括那些缺乏传统的结幽灵系统.

结论:

  • 该研究提供了对合振荡器相位滑动现象的精细,定量理解.
  • 确定了相位速度的静止点,作为相位滑动事件的关键.

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  • 将分析扩展到各种振荡器网络配置,突出了同步的复杂性.