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Chapter 6: Q10CQ (page 226)

Question: An electron bound in an atom can be modeled as residing in a finite well. Despite the walls. When many regularly spaced atoms are relatively close together as they are in a solid-all electrons occupy alltheatoms. Make a sketch of a plausible multi-atom potential energy and electron wave function.

Short Answer

Expert verified

Answer:

Finite well, multiple finite and Multi-atom system is described as follows.

Step by step solution

01

concept:

A finite potential well (also known as a finite square well) is a concept from quantum mechanics. It is an extension of an infinite potential well in which the particle is confined to a "box", but one that has "walls" of finite potential

02

Step 2: Determine Finite well:

The wave exists as a traveling incident and reflected wave inside a finite well.

03

Determine multiple finite:

A particle can tunnel through a potential barrier between two or more finite when they are near to one another.

04

Determine the Multi-atom system:

In a multi-atom system, the potential energy function in the radial direction would be a superposition of the coulomb potential from each other.

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Most popular questions from this chapter

As we learned in example 4.2, in a Gaussian function of the form $ψ (x) α e^{- (x^{2} / 2 ε^{2})}$ is the standard deviation or uncertainty in position.The probability density for gaussian wave function would be proportional to $ψ (x)$ squared: $e^{- (x^{2} / 2 ε^{2})}$ . Comparing with the timedependentGaussian probability of equation (6-35), we see that the uncertainty in position of the time-evolving Gaussian wave function of a free particle is given by

. $Δ x = ε \sqrt{1 + \frac{h^{2} t^{2}}{4 m^{2} ε^{4}}}$ That is, it starts atand increases with time. Suppose the wave function of an electron is initially determined to be a Gaussian ofuncertainty. How long will it take for the uncertainty in the electron's position to reach $5 m$ , the length of a typical automobile?

Your friend has just finished classical physics and can’t wait to know what lies ahead. Keeping extraneous ideas and postulates to a minimum, Explain the process of Quantum-mechanical tunneling.

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Make the crude approximation that this is a rectangular barrier of widthm and approximate height of $4 X 10^{8} j / kg$ . Your mass is 65 kg, and you launch your-self from Earth at an impressive 4 m/s. What is the probability that you can jump to Jupiter?

As we learn in physical optics, thin-film interference can cause some wavelengths of light to be strongly reflected while others not reflected at all. Neglecting absorption all light has to go one way or the other, so wavelengths not reflected are strongly transmitted. (a) For a film, of thickness t surrounded by air, what wavelengths λ (while they are within the film) will be strongly transmitted? (b) What wavelengths (while they are “over” the barrier) of matter waves satisfies condition (6-14)? (c) Comment on the relationship between (a) and (b).

For a general wave pulse neither E nor p (i.eneither $ω$ nor k)areweIldefined. But they have approximate values $E_{0} and p_{0}$ . Although it comprisemany plane waves, the general pulse has an overall phase velocity corresponding to these values.

$v_{p h a s e} = \frac{ω_{0}}{k_{0}} = \frac{E_{0} / h}{p_{0} / h} = \frac{E_{0}}{p_{0}}$

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Note that the phase velocity is greatest for particles whose speed is least.

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