The average values of 〈 x 2 〉 , 〈 y 2 〉 and 〈 z 2 〉 for Ψ 111 of a 3-D particle-in-a-box are to be stated. Concept introduction: The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics . It is generally expressed as follows. H ⌢ Ψ = E Ψ Where, • H ⌢ is the Hamiltonian operator. • Ψ is the wavefunction. • E is the energy. The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

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Answer 1

Question

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

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Students have asked these similar questions

For a particle in a box of length L and in the state with n = 3, at what positions is the probability density a maximum? At what positions is the probability density zero?

Consider a particle of mass m confined to a one-dimensional box of length L and in a state with normalized wavefunction ψn. (a) Without evaluating any integrals, explain why ⟨x⟩ = L/2. (b) Without evaluating any integrals, explain why ⟨px⟩ = 0. (c) Derive an expression for ⟨x2⟩ (the necessary integrals will be found in the Resource section). (d) For a particle in a box the energy is given by En = n2h2/8mL2 and, because the potential energy is zero, all of this energy is kinetic. Use this observation and, without evaluating any integrals, explain why <p2x> = n2h2/4L2.

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Answer 2

Question

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

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Answer 3

Question

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

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Answer 4

Question

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

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Answer 5

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Answer 6

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Answer 7

Chapter 10, Problem 10.83E

Interpretation Introduction

Interpretation:

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are to be stated.

Concept introduction:

The Schrödinger equation is used to find the allowed energy levels for electronic transitions in the quantum mechanics. It is generally expressed as follows.

H⌢Ψ=EΨ

Where,

• H⌢is the Hamiltonian operator.

• Ψis the wavefunction.

• Eis the energy.

The energy obtained after applying the operator on wavefunction is known as the eigen value for the wavefunction.

Answer 8

Expert Solution & Answer

Answer to Problem 10.83E

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

For particle in 3-D box, Ψ111 wavefunction is written as follows.

Ψ111=8abcsinπxasinπybsinπzc

The average value of 〈x2〉 is expressed as follows.

〈x2〉=∭Ψ111 x2 Ψ111*

Substitute the value in the above function as follows.

〈x2〉=∭Ψ111 x2 Ψ111*=∭8abcsinπxasinπybsinπzc(x2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0ax2sin2πxadx ∫0bsin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0ax2sin2πxadx =[x36−(ax24π−a28π2)sin(2πxa)−a2x4π2cos(2πxa)]0a=a36−a34π2=a3(4π2−6)24π2

∫0bsin2πyady =[y2−b4πsin(2πyb)]0b=b2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈x2〉 as follows.

〈x2〉= 8abc(a3(4π2−6)24π2)b2c2=a2(4π2−6)12π2

Similarly, the average value of 〈y2〉 is expressed as follows.

〈y2〉=∭Ψ111 y2 Ψ111*

Substitute the value in the above function as follows.

〈y2〉=∭Ψ111 y2 Ψ111*=∭8abcsinπxasinπybsinπzc(y2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0by2sin2πybdy ∫0csin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0by2sin2πybdy =[y36−(by24π−b28π2)sin(2πyb)−b2y4π2cos(2πyb)]0b=b36−b34π2=b3(4π2−6)24π2

∫0csin2πzadz =[z2−c4πsin(2πzc)]0c=c2

Substitute these solved integrals in expression for 〈y2〉 as follows.

〈y2〉= 8abca2(b3(4π2−6)24π2)c2=b2(4π2−6)12π2

Similarly, the average value of 〈z2〉 is expressed as follows.

〈z2〉=∭Ψ111 z2 Ψ111*

Substitute the value in the above function as follows.

〈z2〉=∭Ψ111 z2 Ψ111*=∭8abcsinπxasinπybsinπzc(z2)8abcsinπxasinπybsinπzcdx dy dz=8abc∫0asin2πxadx ∫0bsin2πybdy ∫0cz2sin2πzcdz

The above equation can be simplified in three parts as follows.

∫0asin2πxadx =[x4−a4πsin(2πxa)]0a=a2

∫0bsin2πybdy =[y2−b4πsin(2πyb)]0b=b2

∫0cz2sin2πzcdz =[z36−(cz24π−c28π2)sin(2πzc)−c2z4π2cos(2πzc)]0c=c36−c34π2=c3(4π2−6)24π2

Substitute these solved integrals in expression for 〈z2〉 as follows.

〈z2〉= 8abca2b2(c3(4π2−6)24π2)=c2(4π2−6)12π2

Answer 12

Conclusion

The average values of 〈x2〉, 〈y2〉 and 〈z2〉 for Ψ111 of a 3-D particle-in-a-box are a2(4π2−6)12π2, b2(4π2−6)12π2 and c2(4π2−6)12π2 respectively.

Answer 13

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Concept explainers

Answer to Problem 10.83E

Explanation of Solution

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