The value of 〈 x 〉 and 〈 x 2 〉 .

Question

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Answer 1

Question

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

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Answer 2

Question

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

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Answer 3

Question

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

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Answer 4

Question

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

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Answer 5

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Answer 6

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Answer 7

Chapter 34, Problem 53P

To determine

The value of 〈x〉 and 〈x2〉 .

Answer 8

Expert Solution & Answer

Answer to Problem 53P

The value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given:

The one-dimensional box region is −L2≤x≤L2 .

The one-dimensional box length is L .

Centre at origin.

The particle mass is m

The wave function for n=1, 3, 5,... is ψ(x)=2LcosnπxL .

The wave function for n=2, 4, 6,... is ψ(x)=2LsinnπxL .

State is ground (n=1) .

Formula used:

The expression for 〈x〉 is given by,

〈x〉=∫−∞∞xψ2(x)dx

The expression for 〈x2〉 is given by,

〈x2〉=∫−∞∞x2ψ2(x)dx

The integral formula,

∫θ2sin2θdθ=θ36−(θ24−18)sin2θ−θcos2θ4+c

Calculation:

The 〈x〉 is calculated as,

〈x〉=∫−∞∞xψ2(x)dx=∫−L/2L/2x( 2 L cos πx L )2dx

The function x( 2 L cos πxL)2 is odd function.

Solving further as,

〈x〉=∫ −L/2 L/2 x( 2 L cos πx L )2dx=0

The 〈x2〉 is calculated as,

〈x2〉=∫−∞∞x2ψ2(x)dx=∫−L/2L/2x2( 2 L cos πx L )2dx

The function x2( 2 L cos πxL)2 is even function.

Solving further as,

〈x2〉=∫ −L/2 L/2 x 2( 2 L cos πx L )2dx=2∫0L/2x2( 2 L cos πx L )2dx

Let, πxL=θ .So,

πdxL=dθ

Solving further as,

〈x2〉=2∫0 L/2 x 2( 2 L cos πx L )2dx=2∫0π/2 ( Lθ π )2( 2 L cosθ)2(Ldθπ)=4L2π3∫0π/2θ2cos2θdθ=4L2π3[∫0π/2θ2dθ−∫0π/2θ2sin2θdθ]

Solving further as,

〈x2〉=4L2π3[∫0 π/2 θ 2dθ−∫0π/2θ2 sin2θdθ]=4L2π3[{ θ 3 3}0π/2−{ θ 3 6−( θ 2 4 − 1 8 )sin2θ− θcos2θ4}0π/2]=4L2π3[{π324}−{π348−0−−π8}]=L2[112−12π2]

Conclusion:

Therefore, the value of 〈x〉 is 0 and value of 〈x2〉 is L2[112−12π2] .

Answer 12

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 value of 〈 x 〉 and 〈 x 2 〉 .

The value of 〈x〉 and 〈x2〉 .

Answer to Problem 53P

Explanation of Solution

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Chapter 34 Solutions