The probability that the particle will be found in the region.

Question

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Answer 1

Question

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

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Answer 2

Question

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

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Answer 3

Question

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

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Answer 4

Question

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

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Answer 5

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

Answer 6

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

Answer 7

Chapter 34, Problem 49P

(a)

To determine

The probability that the particle will be found in the region.

Answer 8

(a)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.50 .

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given:

The one-dimensional box region is 0≤x≤L .

The particle is in the first excited state.

The given region is 0<x<L2 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L2 changes to 0 to π .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/22Lsin22πxLdx=∫0π2Lsin2θ(Ldθ2π)=1π∫0πsin2θdθ

Solving further as,

P=1π∫0π sin2θdθ=1π[θ2−sin2θ4]0π=1π[π2−0]=0.5

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.50 .

Answer 13

(b)

To determine

The probability that the particle will be found in the region.

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

Answer 14

(b)

To determine

The probability that the particle will be found in the region.

Answer 15

(b)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.402 .

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given:

The given region is 0<x<L3 .

Formula used:

The expression for probability for finding the particle in first excited state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to L3 changes to 0 to 2π3 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫0L/32Lsin22πxLdx=∫02π/32Lsin2θ(Ldθ2π)=1π∫02π/3sin2θdθ

Solving further as,

P=1π∫0 2π/3 sin2θdθ=1π[θ2−sin2θ4]02π/3=1π[π3−sin4π/34]=0.402

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.402 .

Answer 20

(c)

To determine

The probability that the particle will be found in the region.

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

Answer 21

(c)

To determine

The probability that the particle will be found in the region.

Answer 22

(c)

Expert Solution

Answer to Problem 49P

The probability that the particle will be found in the region is 0.750 .

Answer 23

(c)

Expert Solution

Answer 24

(c)

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given:

The given region is 0<x<3L4 .

Formula used:

The expression for probability for finding the particle in ground state is given by,

P=∫−∞∞2Lsin22πxLdx

From integral formula,

∫sin2dθ=θ2−sin2θ4+c

Calculation:

Let, 2πxL=θ .

By differentiating both sides,

2πdxL=dθdx=Ldθ2π

The limit is 0 to 3L4 changes to 0 to 3π2 .

The probability is calculated as,

P=∫−∞∞2L sin2 2πxLdx=∫03L/42Lsin22πxLdx=∫03π/22Lsin2θ(Ldθ2π)=1π∫03π/2sin2θdθ

Solving further as,

P=1π∫0 3π/2 sin2θdθ=1π[θ2−sin2θ4]03π/2=1π[3π4−0]=0.750

Conclusion:

Therefore, the probability that the particle will be found in the region is 0.750 .

Answer 27

Ch. 34 - Prob. 1P Ch. 34 - Prob. 2P Ch. 34 - Prob. 3P Ch. 34 - Prob. 4P Ch. 34 - Prob. 5P Ch. 34 - Prob. 6P Ch. 34 - Prob. 7P Ch. 34 - Prob. 8P Ch. 34 - Prob. 9P Ch. 34 - Prob. 10P

The probability that the particle will be found in the region.

Concept explainers

The probability that the particle will be found in the region.

Answer to Problem 49P

Explanation of Solution

The probability that the particle will be found in the region.

Answer to Problem 49P

Explanation of Solution

The probability that the particle will be found in the region.

Answer to Problem 49P

Explanation of Solution

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