working on chap 7 hw #1

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8
HW
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@ -8,3 +8,11 @@ Chap 9: 7, 11, 12, 13, 14
Chap 7: 5, 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 due friday 3-18, the class one is: show L̂𝓏 and p² commute
Chap 7: 10, 13, 18, 23, 30 due april 1
Exam 2: harmonic oscillator 1d, harmonic oscillator 3d, square well, angular momentum

22
concepts Normal file
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the meaning of an operator - how it relates to an action that is a measurement and also an action on the state
the meaning of an eigenstate and an eigenvalue for an operator
the concept of a complete set of orthogonal operators that commute
- this says something about having common states
superposition states
unitary operators:
❙Ψ❭ = ∑ ❙n❭❬n❙Ψ❭ = ∑Cₙ❙n❭
❬n❙Ψ❭ = ∫ dx ❬n❙x❭❬x❙Ψ❭
= ∫ dx n†(x) Ψ(x)
time evolution
schrodinger equation - specific cases: infinite or finite well, harmonic oscillator, hydrogen atom
angular momentum operators

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Problems with known polarization
(pic) Uniformly polarized sphere
Gauss' Law in Dielectric
ε₀∇⋅𝐄 = ρ = ρfree + ρbound
= ρfree - ∇⋅𝐏
ε₀∇⋅𝐄 + ∇⋅𝐏 = ρfree
∇⋅(ε₀𝐄 + 𝐏) = ρfree/ε₀
𝐃 ≡ ε₀𝐄 + 𝐏
Bar Electret
- Analogous to Magnetic bar
Two limits and an intermediate case.
∇×𝐃 = ∇×(ε₀𝐄 + 𝐏) = ∇×𝐏
𝐄 for bar electret, properties:
(𝐄₂ - 𝐄₁)⋅𝐧̂₁→₂ = σ/ε₀ with σ = σᵦ + σfree
Curl eq shows 𝐄"₂ - 𝐄"₁ = 0 (tangential components).
(𝐃₂ - 𝐃₁)⋅𝐧̂₁→₂ = σfree
(𝐃"₂ - 𝐃"₁) = 𝐏"₂ - 𝐏"₁
𝐏 = ε₀χₑ𝐄
• χₑ is the susceptibility of a linear dielectric material.
𝐃 = ε₀𝐄 + 𝐏 = ε₀𝐄 + ε₀χₑ𝐄 = ε₀(1+χₑ) 𝐄
• ε₀(1+χₑ) ≡ permittivity
• 1+χₑ = dielectric constant
Metal Sphere
(pic) What is V(0)?
(pic) ε becomes relevant in electric field
𝐄 = ⎧ 𝐃/ε = Q𝐫̂/(4πεr²), R<r<b
𝐃/ε = Q𝐫̂/(4πε₀r²), b<r
R b ∞
V(∞) - V(0) = -∫ 𝐄⋅d𝐥 - ∫ 𝐄⋅d𝐥 - ∫ 𝐄⋅d𝐥
0 R b
= 0 - ...

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Bound states of a central potential
━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━━
For any central potential V(r) = V(│r│) the eigenfunctions of H can be separated as
❬r❙E,l,mₗ❭ = Rₑ﹐ₗ(r) Yₗ﹐ₘ(θ,ϕ)
The radial S.E. is
⎡−͟ħ͟² ⎛ ∂͟²͟ + 2͟∂͟ ⎞ + l͟(l͟+͟1͟)ħ͟² + V(│r│) ⎤ Rₑ﹐ₗ(r) = E Rₑ﹐ₗ(r)
⎣2m ⎝ ∂r² r∂r ⎠ 2 m r² ⎦
Rₑ﹐ₗ(r) = U͟ₑ͟﹐͟ₗ͟(r)
r
(pic) ...
(pic) Developed radial schrodinger equation using U(r) replacement
- Developed normalization condition
If V(r) is not more singular at the origin than 1/r^2 then the SE has power series solutions.
Thus for small r we take U(r) → rˢ
(pic) substitute U(r) = rˢ into S.E.
-ħ²/2m [(s(s-1) + l(l+1)] + V r² = E r²
For r → 0
r² → 0
V(r) r² → 0
⇒ s(s-1) + l(l+1) = 0
⇒ s = l+1 or s = -l
If s = -l, the normalization conditions
∞ │∞
∫ r⁻²ˡ dr = 1/(2l-1) 1/(r²ˡ⁻¹) │ → diverges
0 │0
Uₑ﹐ₗ(r) → (r→0) → rˡ⁺¹
Rₑ﹐ₗ(r) → (r→0) → rˡ
The Hydrogen Atom
━━━━━━━━━━━━━━━━━
V(r) = -e²/r
For a hydrogenic ion with nuclear charge Z
V(r) = -Ze²/r
Eigenfunctions:
Ψₑ﹐ₗ﹐ₘ(r,θ,φ) = Rₑ﹐ₗ(r) Yₗ﹐ₘ(θ,φ) = Uₑ﹐ₗ/r Yₗ﹐ₘ(θ,φ)

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@ -47,6 +47,61 @@ The eigenvalue equations for the L̂𝓏 operator are simplified because L̂𝓏
√2 ⎜ 1 0 1 ⎟ √2 ⎜ 1 0 1 ⎟
⎝ 0 1 0 ⎠. ⎝ 0 1 0 ⎠.
The general eigenvalue equation is
𝓍❙λ,mₗ❭ = λ❙λ,mₗ❭, where the eigenvalues λ are the possible measured values of L̂𝓍. The eigenvalues can be obtained from the secular equation
det│L̂𝓍 - λ𝕀│ = 0
ħ͟ ⎛ 0 1 0 ⎞ - ⎛ λ 0 0 ⎞ = ⎛ -λ ħ/√2 0 ⎞
√2 ⎜ 1 0 1 ⎟ ⎜ 0 λ 0 ⎟ ⎜ ħ/√2 -λ ħ/√2 ⎟
⎝ 0 1 0 ⎠ ⎝ 0 0 λ ⎠ ⎝ 0 ħ/√2 -λ ⎠.
│⎛ -λ ħ/√2 0 ⎞│ = (-λ(λ² - ħ²/2) + (ħ²/2) λ) = -λ³ + ħ²λ.
│⎜ ħ/√2 -λ ħ/√2 ⎟│
│⎝ 0 ħ/√2 -λ ⎠│
λ(-λ² + ħ²) = -λ(λ² - ħ²)) = 0.
One eigenvalue is immediately obvious: λ = 0. The other two are given by
λ² = ħ², so the eigenvalues are
λ = 0,±ħ.
These are exactly the expected measured values for a spin component.
The eigenvalue equations are
𝓍❙1 1❭𝓍 = ħ❙1 1❭𝓍 ,
𝓍❙1 0❭𝓍 = 0❙1 1❭𝓍 , and
𝓍❙1 -1❭𝓍 = -ħ❙1 -1❭𝓍 .
Matrix analysis can be used to find the eigenvectors for these eigenstates. The first one is
ħ͟ ⎛ 0 1 0 ⎞ ⎛ a ⎞ = ħ ⎛ a ⎞, which gives the system
√2 ⎜ 1 0 1 ⎟ ⎜ b ⎟ ⎜ b ⎟
⎝ 0 1 0 ⎠ ⎝ c ⎠ ⎝ c ⎠
⎧ b = √2 a
⎨ (a + c) = √2 b
⎩ b = √2 c
Applying the operator to the states in Ψ, Applying the operator to the states in Ψ,
𝓍❙1 1❭ ≐ 𝓍❙1 1❭ ≐
@ -79,7 +134,7 @@ Applying the operator to the states in Ψ,
Then, Then,
𝓍❙Ψ❭ = ħ⎛ -2͟ ❙1 0❭ + ι 3͟ (❙1 1❭ + ❙1 -1❭)⎞ 𝓍❙Ψ❭ = ħ ⎛ -2͟ ❙1 0❭ + ι 3͟ (❙1 1❭ + ❙1 -1❭)⎞
⎝ √58 √58 ⎠ ⎝ √58 √58 ⎠
Normalizing the function, Normalizing the function,
@ -87,14 +142,20 @@ Normalizing the function,
C⎛⎛-2͟ ⎞² + ⎛ι 3͟ ⎞² + ⎛ι 3͟ ⎞²⎞ = 1. C⎛⎛-2͟ ⎞² + ⎛ι 3͟ ⎞² + ⎛ι 3͟ ⎞²⎞ = 1.
⎝⎝√58⎠ ⎝ √58⎠ ⎝ √58⎠ ⎠ ⎝⎝√58⎠ ⎝ √58⎠ ⎝ √58⎠ ⎠
C⎛4 - 9 - 9⎞ = 58 = C(14).
⎝ ⎠
STOPPED HERE C = 58/14 = 29/7.
C = 58⎛⎛1͟⎞ - ⎛ι 3 ⎞⁻² + ⎛ι 3 ⎞⁻²⎞ The probability of measuring one of the possible angular momenta will be given by
⎝⎝4⎠ ⎝ ⎠ ⎝ ⎠ ⎠
So,
\|❬1 1❙L̂𝓍❙Ψ❭\|^2 = │❬l m❙L̂𝓍❙Ψ❭│².
❬1 1❙L̂𝓍❙Ψ❭ = ❬1 1❙2͟9͟⎛ -2͟ ❙1 0❭ + ι 3͟ (❙1 1❭ + ❙1 -1❭)⎞
7 ⎝ √58 √58 ⎠
= 2͟9͟ ι͟3͟ ❬1 1❙1 1❭ = ι 8͟7͟
7 √58 7√58

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@ -6,35 +6,130 @@
⎩ z = r cosθ ⎩ z = r cosθ
Some differential forms may come in handy.
∂/∂θ:
⎧ ∂x = r cosϕ cosθ ∂θ
⎨ ∂y = r sinϕ cosθ ∂θ
⎩ ∂z = - r sinθ ∂θ
∂/∂ϕ:
⎧ ∂x = - r sinθ sinϕ ∂ϕ
⎨ ∂y = r sinθ cosϕ ∂ϕ
⎩ ∂z = 0 ∂ϕ
7.47 is the set of algebraic conditions expressed by the vector definition 𝐋 = 𝐫 × 𝐩. 7.47 is the set of algebraic conditions expressed by the vector definition 𝐋 = 𝐫 × 𝐩.
⎧ L̂𝓍 = yp𝓏 - zp𝓎 = -ιħ (y ∂͟_ - z ∂͟_ ) ⎧ L̂𝓍 = yp𝓏 - zp𝓎 = -ιħ (y ∂͟_ - z ∂͟_ )
⎪ ∂y ∂y ⎪ ∂z ∂y
⎨ L̂𝓎 = zp𝓍 - xp𝓏 = -ιħ (z ∂͟_ - x ∂͟_ ) ⎨ L̂𝓎 = zp𝓍 - xp𝓏 = -ιħ (z ∂͟_ - x ∂͟_ )
⎪ ∂y ∂y ⎪ ∂x ∂z
⎪ L̂𝓏 = xp𝓎 - yp𝓍 = -ιħ (x ∂͟_ - y ∂͟_ ) ⎪ L̂𝓏 = xp𝓎 - yp𝓍 = -ιħ (x ∂͟_ - y ∂͟_ )
⎩ ∂y ∂y ⎩ ∂y ∂x
Substituing 7.35 into 7.47, Substituting 7.35 into 7.47,
⎧ L̂𝓍 = -ιħ (r sinθ sinϕ ∂͟_ - r cosθ ∂͟_ ) ⎧ L̂𝓍 = -ιħ (r sinθ sinϕ ∂͟_ - r cosθ ∂͟_ )
⎪ ∂y ∂y ⎪ ∂z ∂y
⎨ L̂𝓎 = -ιħ (r cosθ ∂͟_ - r sinθ cosϕ ∂͟_ ) ⎨ L̂𝓎 = -ιħ (r cosθ ∂͟_ - r sinθ cosϕ ∂͟_ )
⎪ ∂y ∂y ⎪ ∂x ∂z
⎪ L̂𝓏 = -ιħ (r sinθ cosϕ ∂͟_ - r sinθ sinϕ ∂͟_ ) ⎪ L̂𝓏 = -ιħ (r sinθ cosϕ ∂͟_ - r sinθ sinϕ ∂͟_ )
⎩ ∂y ∂y ⎩ ∂y ∂x
⎧ L̂𝓍 = -ιħ (r sinθ sinϕ ∂͟_ - r cosθ ∂͟_ )
⎪ ∂y ∂y Geometry is shown on the attached notes page.
For L̂𝓍:
∂͟z͟ = -r sinθ
∂θ
∂͟y͟ = r sinθ cosϕ
∂ϕ
𝓍 = -ιħ ( r sinθ sinϕ ∂͟θ͟ ∂͟_ - r cosθ ∂͟ϕ͟ ∂͟_ )
∂θ ∂z ∂ϕ ∂y
𝓍 = ιħ ( -r sinθ sinϕ ∂͟θ͟ ∂͟_ + r cosθ ∂͟ϕ͟ ∂͟_ )
∂z ∂θ ∂y ∂ϕ
𝓍 = ιħ ( ͟r͟ s͟i͟n͟θ͟ sinϕ ∂͟_ + c͟o͟s͟θ͟ ∂͟_ )
-r sinθ ∂θ sinθ cosϕ ∂ϕ
𝓍 = ιħ ( sinϕ ∂͟_ + c͟o͟t͟θ͟ ∂͟_ )
∂θ cosϕ ∂ϕ
For L̂𝓎:
∂x = r cosϕ cosθ ∂θ
∂z = 0 ∂ϕ
𝓎 = -ιħ (r cosθ ∂͟_ - r sinθ cosϕ ∂͟_ )
∂x ∂z
𝓎 = ιħ (-r cosθ ∂͟θ͟ ∂͟_ + r sinθ cosϕ ∂͟ϕ͟ ∂͟_ )
∂θ ∂x ∂ϕ ∂z
𝓎 = ιħ (-r cosθ ∂͟θ͟ ∂͟_ + r sinθ cosϕ ∂͟ϕ͟ ∂͟_ )
∂x ∂θ ∂z ∂ϕ
𝓎 = ιħ (- _͟1͟ cosθ ∂͟_ + r sinθ cosϕ 0 ∂͟_ )
cosϕ cosθ ∂θ ∂ϕ
𝓎 = ιħ (- _͟1͟ ∂͟_ )
cosϕ ∂θ
𝓎 = -ιħ _͟1͟ ∂͟_
cosϕ ∂θ
For L̂𝓏:
∂x = -r sinθ sinϕ ∂ϕ
∂y = r sinθ cosϕ ∂ϕ
𝓏 = -ιħ (r sinθ cosϕ ∂͟͟ϕ͟ ∂͟_ - r sinθ sinϕ ∂͟͟ϕ͟ ∂͟_ )
∂ϕ ∂y ∂ϕ ∂x
𝓏 = -ιħ (r͟ s͟i͟n͟θ͟ c͟o͟s͟ϕ͟ ∂͟_ + r͟ s͟i͟n͟θ͟ s͟i͟n͟ϕ͟ ∂͟_ )
r sinθ cosϕ ∂ϕ r sinθ sinϕ ∂ϕ
𝓏 = -ιħ ∂͟_ ( 1 + 1 )
∂ϕ
𝓏 = -2ιħ ∂͟_
∂ϕ
So, according to my calculus, the final solutions should be the set
⎧ L̂𝓍 = ιħ ( sinϕ ∂͟_ + c͟o͟t͟θ͟ ∂͟_ )
⎪ ∂θ cosϕ ∂ϕ
⎨ L̂𝓎 = ιħ (r cosθ ∂͟_ + r sinθ cosϕ ∂͟_ ) ⎨ L̂𝓎 = -ιħ _͟1͟ ∂͟_
⎪ ∂y ∂y cosϕ ∂θ
⎪ L̂𝓏 = -ιħ (r sinθ cosϕ ∂͟_ - r sinθ sinϕ ∂͟_ ) ⎪ L̂𝓏 = -2ιħ ∂͟_
⎩ ∂y ∂y ⎩ ∂ϕ
The spherical representation, i.e. ending place, is the set
⎧ L̂𝓍 = ιħ (sinϕ ∂͟_ + cosϕ cotθ ∂͟_ )
⎪ ∂θ ∂ϕ
⎨ L̂𝓎 = ιħ (-cosϕ ∂͟_ + sinϕ cotθ ∂͟_ )
⎪ ∂θ ∂ϕ
⎪ L̂𝓏 = -ιħ ∂͟_
⎩ ∂ϕ
My set DOES NOT match this. I must be going about this the wrong way. I have to give it more thought. Perhaps a purely geometric approach will improve my answers: I'll try that over the weekend.