working on chap 7 hw

This commit is contained in:
caes 2016-03-24 01:04:06 -04:00
parent 9cdb4a023a
commit 3991cf6fcf
10 changed files with 4839 additions and 4122 deletions

2
HW
View File

@ -6,5 +6,5 @@ Chap 5: 2, 6, 8, 12, in-class assignment
Chap 9: 7, 11, 12, 13, 14
Chap 7: 7, 8, one from last class, 11
Chap 7: 5, 7, 8, one from last class, 11
due friday 3-18, the class one is: show L̂𝓏 and p² commute

View File

@ -42,7 +42,7 @@ Rotational Invariance
= p̂𝓍[L̂𝓏,p̂𝓍] + [L̂𝓏,p̂𝓍]p̂𝓍
+ p̂𝓎[L̂𝓏,p̂𝓎] + [L̂𝓏,p̂𝓎]p̂𝓎
+ p̂𝓏[L̂𝓏,p̂𝓏] + [L̂𝓏,p̂𝓏]p̂𝓏 (f.n. 1)
+ p̂𝓏[L̂𝓏,p̂𝓏] + [L̂𝓏,p̂𝓏]p̂𝓏 note¹
= ιħp̂𝓍𝓎 + ιħp̂𝓎𝓍 - ιħp̂𝓎𝓍 - ιħp̂𝓍𝓎 = 0
@ -69,7 +69,7 @@ Rotational Invariance
(f.n. 1)
note¹
[L̂𝓏,p̂𝓍²] = [L̂𝓏,p̂𝓍𝓍]

View File

@ -1,7 +1,7 @@
Two dimensional harmonic oscillator
───────────────────────────────────
This is an oscillator with potential V(x,y) = μ/2 ω (x² + y²)
This is an oscillator with potential V(x,y) = μ/2 ω² (x² + y²)
The hamiltonian here leaves us with a 3-dimensional differential equation
@ -14,13 +14,14 @@ Two dimensional harmonic oscillator
Put together solutions of Ψ(x,y) and Ψ(z).
(pic) To find position space representation of Ψ(x,y), recall the Hermitian Polynomials solution
(pic) To find position space representation of Ψ(x,y), recall the Hermitian-- HARMONIC? DUBIOUS Polynomials solution
!!! STUDY THIS !!!
Developed the harmonic oscillator in polar coordinates
𝓍𝓎 = -ħ²\2μ ∇² + μ/2 ω² r²
𝓍𝓎 = -ħ²/2μ ∇² + μ/2 ω² r²
= -ħ²/2μ (∂²/∂r² + 1/r ∂/∂r + 1/r² ∂²/∂θ²) + μ/2 ω² r².
(pic) Can be solved using separation of variables.
@ -33,3 +34,9 @@ Two dimensional harmonic oscillator
Use L̂𝓏² Θ = -m²ħ² Θ ⇒ Θ(θ) = exp(±imθ)
(pic) further developed hamiltonian using this information
𝓍𝓎 = -ħ²/2μ (∂²/∂r² + 1/r ∂/∂r + 1/r² ∂²/∂θ²) + μ/2 ω² r².
= -ħ²/2μ (∂²/∂r² + 1/r ∂/∂r) + -ħ²/(2μr²) L̂𝓏²/ħ² + μ ω² r²/2
𝓏² ≐ ħ²∂²/∂θ²
𝓏 ≐ -ιħ∂/∂θ

View File

@ -0,0 +1,21 @@
This problem associated with chapter 7 was assigned during lecture.
Does L̂𝓏 commute with 𝐫̂²?
[L̂𝓏,𝐫̂²] = L̂𝓏 𝐫̂² - 𝐫̂² L̂𝓏.
𝓏 𝐫̂² - 𝐫̂² L̂𝓏.
Using the position representations, in spherical coordinates,
𝓏 ≐ -ιħ∂/∂θ and 𝐫̂² ≐ 𝐫²,
𝓏 𝐫̂² - 𝐫̂² L̂𝓏 = 𝐫² ιħ∂/∂θ - ιħ∂/∂θ 𝐫².
𝐫² has no θ dependence, so it can be separated from any quantity differentiated with respect to theta, I.E.,
∂/∂θ 𝐫² = 𝐫² ∂/∂θ.
𝐫² ιħ∂/∂θ - ιħ∂/∂θ 𝐫² = 𝐫² ιħ∂/∂θ - 𝐫² ιħ∂/∂θ = 0 = [L̂𝓏,𝐫̂²] = 0.
[L̂𝓏,𝐫̂²] = 0, so these quantities commute.

File diff suppressed because it is too large Load Diff

107
solutions/chap7/prob5 Normal file
View File

@ -0,0 +1,107 @@
There is an angular momentum system with the state function
❙Ψ❭ = 2͟ ❙1 1❭ + ι 3͟ ❙1 0❭ - 4͟ ❙1 -1❭
√29 √29 √29
In general the eigenvalue equation for the L̂𝓏 operator is
𝓏❙l m❭ = m ħ❙l m❭, where m ħ are the possible measurements.
The possible measurements of this system, then, are, for m = {-1, 0, 1}:
-ħ, 0, ħ.
The probability for is given by
│❬1 m❙Ψ❭│², with m = {-1, 0, 1}.
The eigenstates form an orthogonal set such that
❬l m❙l m❭ = δₗₗ′ δₘₘ′.
Then,
❬1 1❙Ψ❭ = ❬1 1❙⎛ 2͟ ❙1 1❭ + ι 3͟ ❙1 0❭ - 4͟ ❙1 -1❭ ⎞
⎝√29 √29 √29 ⎠
= ❬1 1❙ 2͟ ❙1 1❭ = 2͟ .
√29 √29
(𝐚)
│❬1 1❙Ψ❭│² = 4͟ = ⁴/₂₉.
29
Similarly,
│❬1 0❙Ψ❭│² = 9͟ = ⁹/₂₉ and
29
│❬1 -1❙Ψ❭│² = 1͟6͟ = ¹⁶/₂₉.
29
The eigenvalue equations for the L̂𝓏 operator are simplified because L̂𝓏 is diagonal in the z basis. The L̂𝓍 operator produces the same measurements, but the matrix representation of the L̂𝓍 operator must be applied. It is
𝓍
ħ͟ ⎛ 0 1 0 ⎞
√2 ⎜ 1 0 1 ⎟
⎝ 0 1 0 ⎠.
Applying the operator to the states in Ψ,
𝓍❙1 1❭ ≐
ħ͟ ⎛ 0 1 0 ⎞⎛1⎞ = ħ͟ ⎛0⎞ = ħ͟ ❙1 0❭.
√2 ⎜ 1 0 1 ⎟⎜0⎟ √2 ⎜1⎟ √2
⎝ 0 1 0 ⎠⎝0⎠ ⎝0⎠
𝓍❙1 0❭ ≐
ħ͟ ⎛ 0 1 0 ⎞⎛0⎞ = ħ͟ ⎛1⎞ = ħ͟ (❙1 1❭ + ❙1 -1❭), and
√2 ⎜ 1 0 1 ⎟⎜1⎟ √2 ⎜0⎟ √2
⎝ 0 1 0 ⎠⎝0⎠ ⎝1⎠
𝓍❙1 -1❭ ≐
ħ͟ ⎛ 0 1 0 ⎞⎛0⎞ = ħ͟ ⎛0⎞ = ħ͟ ❙1 0❭.
√2 ⎜ 1 0 1 ⎟⎜0⎟ √2 ⎜1⎟ √2
⎝ 0 1 0 ⎠⎝1⎠ ⎝0⎠
𝓍❙Ψ❭ = ⎛ 2͟ L̂𝓍❙1 1❭ + ι 3͟ L̂𝓍❙1 0❭ - 4͟ L̂𝓍❙1 -1❭ ⎞
⎝ √29 √29 √29 ⎠
2͟ L̂𝓍❙1 1❭ = 2͟ ħ❙1 0❭,
√29 √58
ι 3͟ L̂𝓍❙1 0❭ = ι 3͟ ħ (❙1 1❭ + ❙1 -1❭), and
√29 √58
4͟ L̂𝓍❙1 -1❭ = 4͟ ħ❙1 0❭.
√29 √58
Then,
𝓍❙Ψ❭ = ħ⎛ -2͟ ❙1 0❭ + ι 3͟ (❙1 1❭ + ❙1 -1❭)⎞
⎝ √58 √58 ⎠
Normalizing the function,
C⎛⎛-2͟ ⎞² + ⎛ι 3͟ ⎞² + ⎛ι 3͟ ⎞²⎞ = 1.
⎝⎝√58⎠ ⎝ √58⎠ ⎝ √58⎠ ⎠
STOPPED HERE
C = 58⎛⎛1͟⎞ - ⎛ι 3 ⎞⁻² + ⎛ι 3 ⎞⁻²⎞
⎝⎝4⎠ ⎝ ⎠ ⎝ ⎠ ⎠
So,
\|❬1 1❙L̂𝓍❙Ψ❭\|^2 =
𝓍❙Ψ❭ = ⎛ + ι 3͟ L̂𝓍❙1 0❭ - 4͟ L̂𝓍❙1 -1❭ ⎞
⎝ √29 √29 ⎠

3448
solutions/chap7/prob5.ps Normal file

File diff suppressed because it is too large Load Diff

View File

File diff suppressed because it is too large Load Diff