Examples of physical pendulum in the following topics:
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The Physical Pendulum
- The period of a physical pendulum depends upon its moment of inertia about its pivot point and the distance from its center of mass.
- In case we know the moment of inertia of the rigid body, we can evaluate the above expression of the period for the physical pendulum.
- As with a simple pendulum, a physical pendulum can be used to measure g.
- A brief introduction to pendulums (both ideal and physical) for calculus-based physics students from the standpoint of simple harmonic motion.
- This is another example of a physical pendulum.
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The Simple Pendulum
- Example:Measuring Acceleration due to Gravity: The Period of a Pendulum.What is the acceleration due to gravity in a region where a simple pendulum having a length 75.000 cm has a period of 1.7357 sStrategy: We are asked to find g given the period T and the length L of a pendulum.
- For the simple pendulum:
- or the period of a simple pendulum.
- Even simple pendulum clocks can be finely adjusted and accurate.
- A brief introduction to pendulums (both ideal and physical) for calculus-based physics students from the standpoint of simple harmonic motion.
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Energy Transformations
- For example, imagine a pendulum in a vacuum.
- However, when the pendulum is at its lowest point, all of its energy exists in the form of kinetic energy.
- This animation shows the velocity and acceleration vectors for a pendulum.
- One may note that at the maximum height of the pendulum's mass, the velocity is zero.
- This corresponds to zero kinetic energy and thus all of the energy of the pendulum is in the form of potential energy.
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Back EMF, Eddy Currents, and Magnetic Damping
- Consider the apparatus shown in , which swings a pendulum bob between the poles of a strong magnet.
- A common physics demonstration device for exploring eddy currents and magnetic damping.
- (a) The motion of a metal pendulum bob swinging between the poles of a magnet is quickly damped by the action of eddy currents.
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Introduction to Simple Harmonic Motion
- My favorite is Feynman's Lectures on Physics).
- Lots of physics is linear.
- For instance, the motion of a plane pendulum of length $\ell$ (Figure 1.1) is governed by
- So for small displacements, the equation for the pendulum is:
- Thus the equation of motion for the pendulum is linear in $\theta$ when $\theta$ is small.
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Time
- Time is the fundamental physical quantity of duration and is measured by the SI Unit known as the second.
- Time is one of the seven fundamental physical quantities in the International System (SI) of Units.
- For example, the movement of the sun across the sky, the phases of the moon, the swing of a pendulum, and the beat of a heart have all been used as a standard for time keeping.
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Projecting Vectors Onto Other Vectors
- We did this, in effect, when we computed the tangential force of gravity on a simple pendulum.
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Energy in a Simple Harmonic Oscillator
- For example, for a simple pendulum we replace the velocity with v=Lω, the spring constant with k=mg/L, and the displacement term with x=Lθ.
- A similar calculation for the simple pendulum produces a similar result, namely:
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Other Forms of Energy
- Elastic Energy: This is potential mechanical energy that is stored in the configuration of a material or physical system as work is performed to distort its volume or shape.
- An example of something that utilizes mechanical energy is a pendulum.
- A brief overview of energy, kinetic energy, gravitational potential energy, and the work-energy theorem for algebra-based physics students.
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Simple Harmonic Motion
- In addition, other phenomena can be approximated by simple harmonic motion, such as the motion of a simple pendulum, or molecular vibration.
- Each of these constants carries a physical meaning of the motion: A is the amplitude (maximum displacement from the equilibrium position), ω = 2πf is the angular frequency, and φ is the phase.
- A brief introduction to simple harmonic motion for calculus-based physics students.