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| == '''Problem''' == | | Let us start with the original box, with its walls at <math>x=0\!</math> and <math>x=a,\!</math> and with the particle in the ground state of this box. The energy and the wave function are |
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| An electron is moving freely inside a one-dimensional box with walls at x=0 and x=a. If the electron is initially in the ground state of the box and if we suddenly increase the size of the box or we can say that suppose the right hand side wall is moved instantaneosly from x=a to x=4, then calculate the probability of finding the electron in
| | <math>E_{0}=\frac{\pi ^{2}\hbar^{2}}{2ma^{2}}</math> |
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| (a) the ground state of the new box | | and |
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| | <math>\psi_0(x)=\sqrt{\frac{2}{a}}\sin\left (\frac{\pi x}{a}\right ),\, 0<x<a.</math> |
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| | '''(a)''' In the new box, with the right-hand wall now located at <math>x=4a,\!</math> the ground state energy and wave function of the electron are |
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| (b) the first excited state of the new box
| | <math>E'_{0}=\frac{\pi ^{2}\hbar^{2}}{32ma^2}</math> |
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| == '''Solution''' ==
| | <math>\psi'_{0}(x)= \frac{1}{\sqrt{2a}}\sin\left (\frac{\pi x}{4a}\right ),\,0<x<4a.</math> |
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| Let us statrt with the old box i.e. x=0 and x=a, suppose the particle is in the ground state of this box. So its energy and wavefunction are
| | The probability of finding the electron in <math>\psi_{0}(x)\!</math> is |
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| <math>E_{1}=-\frac{\pi ^{2}\hbar^{2}}{2ma^{2}}</math> ; <math>E_{1}=-\frac{\pi ^{2}\hbar^{2}}{2ma^{2}}</math> | | <math>P(E'_{0})=\left |\int_{0}^{a}\psi_{0}^{\ast}(x)\psi'_{0}(x)\,dx\right |^2=\frac{1}{a^{2}}\left |\int_{0}^{a}\sin\left (\frac{\pi x}{a}\right )\sin\left (\frac{\pi x}{4a}\right )\,dx\right |^2.</math> |
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| '''(a)''' Now in the new box i.e., x=a and x=4a, the ground state energy and wave function of the electron are<math>
| | Note that the upper limit of the integral is <math>a;\!</math> this is because <math>\psi_{0}(x)\!</math> is limited to the region between 0 and <math>a.\!</math> Using the identity, |
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| {E_{1}}'=-\frac{\pi ^{2}\hbar^{2}}{2m\left ( 4a \right )^{2}}= -\frac{\pi ^{2}\hbar^{2}}{32ma^{2}}</math> | | <math>\sin{a}\sin{b}=\tfrac{1}{2}[\cos(a+b)-\cos(a-b)],</math> |
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| <math>\psi _{1}\left ( x \right )= \frac{1}{\sqrt{2a}} sin\left ( \frac{\pi x}{4a} \right )</math> | | <math>P(E'_{0})=\frac{1}{4a^{2}}\left |\int_{0}^{a}\cos\left (\frac{5\pi x}{4a}\right )\,dx-\int_{0}^{a}\cos\left ( \frac{3\pi x}{4a}\right )\,dx\right |^2</math> |
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| The probability of finding the electron in <math>\psi _{1}\left ( x \right )</math> is
| | <math>=\frac{128}{225\pi ^{2}}=0.058=5.8%.</math> |
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| <math>P\left ( {E}'_{1} \right )=\left | \langle\psi _{1}|\phi _{1} \right \rangle^{2}= \left | \int_{0}^{a}\psi _{1}\ast \left ( x \right )\phi _{1}(x) \right |^{2}dx= \frac{1}{a^{2}}\left | \int_{0}^{a}sin\left ( \frac{\pi x}{4a}\right ) sin(\frac{\pi x}{a})\right |^{2}dx</math>
| | '''(b)''' The energy and wave function of the first excited state of the new box are |
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| the upper limit of the integral sign is 'a' because <math>\phi _{1}(x)</math> is limited to the region between 0 and a. Using the relation <math>sin\left ( a \right )sin(b)=\frac{1}{2}cos(a+b)-\frac{1}{2}cos(a-b)</math>, we get
| | <math>E'_{1}=\frac{\pi ^{2}\hbar^{2}}{8ma^2}</math> |
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| <math>P\left ( {E}'_{1} \right )=\frac{1}{a^{2}}\left | \frac{1}{2}\int_{0}^{a}cos\left ( \frac{5\pi x}{4a} \right )dx-\frac{1}{2}\int_{0}^{a}cos\left ( \frac{3\pi x}{4a} \right )dx \right |^{2}dx</math>
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| <math>=\frac{128}{\left ( 15 \right )^{2}\pi ^{2}}=0.058=5.8 percent</math> | | <math>\psi'_{1}(x)= \frac{1}{\sqrt{2a}}\sin\left (\frac{\pi x}{2a}\right ),\,0<x<4a.</math> |
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| '''(b)''' If the electron is in the first excited state of the new box, its energy and wavefunctions are
| | The probability of finding the particle in this state is |
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| <math>P\left ( {E}'_{2} \right )=\left | \langle\psi _{2}|\phi _{1} \right \rangle^{2}= \left | \int_{0}^{a}\psi _{2}\ast \left ( x \right )\phi _{1}(x) \right |^{2}dx= \frac{1}{a^{2}}\left | \int_{0}^{a}sin\left ( \frac{\pi x}{2a}\right ) sin(\frac{\pi x}{a})\right |^{2}dx</math> | | <math>P(E'_{2})=\left |\int_{0}^{a}\psi_{0}^{\ast}(x)\psi'_{1}(x)\,dx\right |^2=\frac{1}{a^2}\left |\int_{0}^{a}\sin\left ( \frac{\pi x}{a}\right )\sin(\frac{\pi x}{2a})\right |^{2}dx</math> |
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| <math>=\frac{16}{9\pi ^{2}}=0.18=18percent</math> | | <math>=\frac{16}{9\pi ^{2}}=0.18=18%.</math> |
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| Back to [[Summary of One-Dimensional Systems]] | | Back to [[One-Dimensional Bound States#Problems|One-Dimensional Bound States]] |
Latest revision as of 13:29, 18 January 2014
Let us start with the original box, with its walls at 
and 
and with the particle in the ground state of this box. The energy and the wave function are
and
(a) In the new box, with the right-hand wall now located at 
the ground state energy and wave function of the electron are
and
The probability of finding the electron in 
is
Note that the upper limit of the integral is 
this is because is limited to the region between 0 and 
Using the identity,
![{\displaystyle \sin {a}\sin {b}={\tfrac {1}{2}}[\cos(a+b)-\cos(a-b)],}](https://wikimedia.org/api/rest_v1/media/math/render/svg/c3ed5d3d5e4da035c0e16ba07cace3949048f596)
we get
(b) The energy and wave function of the first excited state of the new box are
and
The probability of finding the particle in this state is
Back to One-Dimensional Bound States