HCF of three numbers

Zero Point Energy of Particle in 3D SHO Calculator

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✖Angular Frequency of Oscillator is the angular displacement of any element of the wave per unit of time or the rate of change of the phase of the waveform.ⓘ Angular Frequency of Oscillator [ω]

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✖Zero Point Energy of 3D SHO is the lowest possible energy possessed by the particle.ⓘ Zero Point Energy of Particle in 3D SHO [Z.P.E]

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Zero Point Energy of Particle in 3D SHO Solution

STEP 0: Pre-Calculation Summary

Formula Used

Zero Point Energy of 3D SHO = 1.5*[h-]*Angular Frequency of Oscillator
Z.P.E = 1.5*[h-]*ω
This formula uses 1 Constants, 2 Variables

Constants Used

[h-] - Reduced Planck constant Value Taken As 1.054571817E-34

Variables Used

Zero Point Energy of 3D SHO - (Measured in Joule) - Zero Point Energy of 3D SHO is the lowest possible energy possessed by the particle.
Angular Frequency of Oscillator - (Measured in Radian per Second) - Angular Frequency of Oscillator is the angular displacement of any element of the wave per unit of time or the rate of change of the phase of the waveform.

STEP 1: Convert Input(s) to Base Unit

Angular Frequency of Oscillator: 1.666 Radian per Second --> 1.666 Radian per Second No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

Z.P.E = 1.5*[h-]*ω --> 1.5*[h-]*1.666

Evaluating ... ...

Z.P.E = 2.63537492854764E-34

STEP 3: Convert Result to Output's Unit

2.63537492854764E-34 Joule --> No Conversion Required

FINAL ANSWER

2.63537492854764E-34 ≈ 2.6E-34 Joule <-- Zero Point Energy of 3D SHO

(Calculation completed in 00.006 seconds)

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< Simple Harmonic Oscillator Calculators

Energy Eigen Values for 1D SHO

LaTeX Go Energy Eigen Values of 1D SHO = (Energy Levels of 1D Oscillator+0.5)*([h-])*(Angular Frequency of Oscillator)

Restoring Force of Diatomic Vibrating Molecule

LaTeX Go Restoring Force of Vibrating Diatomic Molecule = -(Force Constant of Vibrating Molecule*Displacement of Vibrating Atoms)

Potential Energy of Vibrating Atom

LaTeX Go Potential Energy of Vibrating Atom = 0.5*(Force Constant of Vibrating Molecule*(Displacement of Vibrating Atoms)^2)

Zero Point Energy of Particle in 1D SHO

LaTeX Go Zero Point Energy of 1D SHO = 0.5*[h-]*Angular Frequency of Oscillator

Zero Point Energy of Particle in 3D SHO Formula

LaTeX Go

Zero Point Energy of 3D SHO = 1.5*[h-]*Angular Frequency of Oscillator
Z.P.E = 1.5*[h-]*ω

What is a harmonic oscillator ?

In classical mechanics, a harmonic oscillator is a system that, when displaced from its equilibrium position, experiences a restoring force F proportional to the displacement x.

If F is the only force acting on the system, the system is called a simple harmonic oscillator, and it undergoes simple harmonic motion: sinusoidal oscillations about the equilibrium point, with a constant amplitude and a constant frequency (which does not depend on the amplitude).

How to Calculate Zero Point Energy of Particle in 3D SHO?

Zero Point Energy of Particle in 3D SHO calculator uses Zero Point Energy of 3D SHO = 1.5*[h-]*Angular Frequency of Oscillator to calculate the Zero Point Energy of 3D SHO, The Zero Point Energy of Particle in 3D SHO formula is defined as the lowest possible energy that a quantum mechanical system may have. Zero Point Energy of 3D SHO is denoted by Z.P.E symbol.

How to calculate Zero Point Energy of Particle in 3D SHO using this online calculator? To use this online calculator for Zero Point Energy of Particle in 3D SHO, enter Angular Frequency of Oscillator (ω) and hit the calculate button. Here is how the Zero Point Energy of Particle in 3D SHO calculation can be explained with given input values -> 2.6E-34 = 1.5*[h-]*1.666.

FAQ

What is Zero Point Energy of Particle in 3D SHO?

The Zero Point Energy of Particle in 3D SHO formula is defined as the lowest possible energy that a quantum mechanical system may have and is represented as Z.P.E = 1.5*[h-]*ω or Zero Point Energy of 3D SHO = 1.5*[h-]*Angular Frequency of Oscillator. Angular Frequency of Oscillator is the angular displacement of any element of the wave per unit of time or the rate of change of the phase of the waveform.

How to calculate Zero Point Energy of Particle in 3D SHO?

The Zero Point Energy of Particle in 3D SHO formula is defined as the lowest possible energy that a quantum mechanical system may have is calculated using Zero Point Energy of 3D SHO = 1.5*[h-]*Angular Frequency of Oscillator. To calculate Zero Point Energy of Particle in 3D SHO, you need Angular Frequency of Oscillator (ω). With our tool, you need to enter the respective value for Angular Frequency of Oscillator and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

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