11 KiB
Calculating R_opt_power and R_opt_phase
Overview
This worked example demonstrates the complete calculation procedure for the two critical resistance values in spark modeling: R_opt_power (maximum power transfer) and R_opt_phase (minimum impedance phase angle). We show multiple scenarios with different frequencies and capacitances to build intuition.
Fundamental Formulas
R_opt_power (Maximum Power Transfer):
R_opt_power = 1 / [ω(C_mut + C_sh)]
R_opt_phase (Minimum Phase Angle):
R_opt_phase = 1 / [ω√(C_mut(C_mut + C_sh))]
Angular frequency:
ω = 2πf [rad/s]
Scenario 1: Medium Coil at 200 kHz
Given Parameters
- Operating frequency: f = 200 kHz
- Mutual capacitance: C_mut = 8 pF = 8×10⁻¹² F
- Shunt capacitance: C_sh = 6 pF = 6×10⁻¹² F
- Spark length: 2 feet (where C_sh ≈ 2 pF/ft × 2 = 4 pF, but using measured value)
Step 1: Calculate Angular Frequency
ω = 2π × f
= 2π × 200,000 Hz
= 2 × 3.14159 × 200,000
= 1.257 × 10⁶ rad/s
Validation: Units are rad/s, positive value as expected.
Step 2: Calculate Total Capacitance
C_total = C_mut + C_sh
= 8 pF + 6 pF
= 14 pF
= 14 × 10⁻¹² F
Physical check: Total capacitance is reasonable for a 2-foot spark with medium topload.
Step 3: Calculate R_opt_power
R_opt_power = 1 / (ω × C_total)
= 1 / (1.257×10⁶ rad/s × 14×10⁻¹² F)
= 1 / (1.760×10⁻⁵)
= 56,818 Ω
≈ 56.8 kΩ
Dimensional analysis:
[R] = 1 / ([rad/s] × [F])
= 1 / ([1/s] × [C/V])
= [V·s/C]
= [Ω] ✓
Step 4: Calculate Product for R_opt_phase
C_mut × (C_mut + C_sh) = 8×10⁻¹² × 14×10⁻¹²
= 112 × 10⁻²⁴
= 1.12 × 10⁻²² F²
√(C_mut × (C_mut + C_sh)) = √(1.12 × 10⁻²²)
= 1.058 × 10⁻¹¹ F
= 10.58 pF
Step 5: Calculate R_opt_phase
R_opt_phase = 1 / (ω × √(C_mut(C_mut + C_sh)))
= 1 / (1.257×10⁶ × 1.058×10⁻¹¹)
= 1 / (1.330×10⁻⁵)
= 75,188 Ω
≈ 75.2 kΩ
Step 6: Compare the Two Resistances
Ratio = R_opt_power / R_opt_phase
= 56.8 kΩ / 75.2 kΩ
= 0.755
= 75.5%
Difference = R_opt_phase - R_opt_power
= 75.2 - 56.8
= 18.4 kΩ
Key insight: R_opt_power is always less than R_opt_phase. For this geometry, it's about 75% of R_opt_phase.
Step 7: Calculate Phase Angles
Capacitance ratio:
r = C_mut / C_sh
= 8 / 6
= 1.333
Minimum achievable phase angle:
φ_Z,min = -atan(2√[r(1 + r)])
= -atan(2√[1.333 × 2.333])
= -atan(2√3.111)
= -atan(2 × 1.764)
= -atan(3.528)
= -74.2°
Phase angle at R_opt_power:
Calculate admittance components:
G = 1/R = 1/56800 = 1.761 × 10⁻⁵ S = 17.61 μS
B₁ = ωC_mut = 1.257×10⁶ × 8×10⁻¹² = 1.006 × 10⁻⁵ S = 10.06 μS
B₂ = ωC_sh = 1.257×10⁶ × 6×10⁻¹² = 7.542 × 10⁻⁶ S = 7.54 μS
Real part of admittance:
Re{Y} = G×B₂² / [G² + (B₁+B₂)²]
= 17.61 × (7.54)² / [17.61² + (17.60)²]
= 17.61 × 56.85 / [310.1 + 309.8]
= 1001.2 / 619.9
= 1.615 μS
Imaginary part of admittance:
Im{Y} = B₂[G² + B₁(B₁+B₂)] / [G² + (B₁+B₂)²]
= 7.54[310.1 + 10.06×17.60] / 619.9
= 7.54[310.1 + 177.1] / 619.9
= 7.54 × 487.2 / 619.9
= 5.929 μS
Phase angle:
φ_Y = atan(Im{Y}/Re{Y})
= atan(5.929/1.615)
= atan(3.671)
= 74.7°
φ_Z = -φ_Y = -74.7°
Observation: At R_opt_power, phase is -74.7° (slightly more capacitive than the minimum of -74.2°). The difference is small because we're close to the optimal point.
Scenario 2: Large Coil at 150 kHz
Given Parameters
- Operating frequency: f = 150 kHz
- Mutual capacitance: C_mut = 12 pF (larger topload)
- Shunt capacitance: C_sh = 10 pF (5 feet spark)
Step 1: Angular Frequency
ω = 2π × 150,000 = 942,478 rad/s ≈ 9.425 × 10⁵ rad/s
Step 2: Total Capacitance
C_total = 12 + 10 = 22 pF = 22 × 10⁻¹² F
Step 3: R_opt_power
R_opt_power = 1 / (9.425×10⁵ × 22×10⁻¹²)
= 1 / (2.074×10⁻⁵)
= 48,220 Ω
≈ 48.2 kΩ
Step 4: R_opt_phase
C_mut × C_total = 12×10⁻¹² × 22×10⁻¹² = 264×10⁻²⁴ F²
√(C_mut × C_total) = 1.625 × 10⁻¹¹ F
R_opt_phase = 1 / (9.425×10⁵ × 1.625×10⁻¹¹)
= 1 / (1.532×10⁻⁵)
= 65,274 Ω
≈ 65.3 kΩ
Step 5: Comparison
Ratio = 48.2 / 65.3 = 0.738 = 73.8%
Observation: Lower frequency gives lower resistance values. Ratio is similar to Scenario 1.
Scenario 3: Small Coil at 300 kHz
Given Parameters
- Operating frequency: f = 300 kHz
- Mutual capacitance: C_mut = 6 pF (smaller topload)
- Shunt capacitance: C_sh = 4 pF (2 feet spark)
Step 1: Angular Frequency
ω = 2π × 300,000 = 1.885 × 10⁶ rad/s
Step 2: Total Capacitance
C_total = 6 + 4 = 10 pF = 10 × 10⁻¹² F
Step 3: R_opt_power
R_opt_power = 1 / (1.885×10⁶ × 10×10⁻¹²)
= 1 / (1.885×10⁻⁵)
= 53,050 Ω
≈ 53.1 kΩ
Step 4: R_opt_phase
C_mut × C_total = 6×10⁻¹² × 10×10⁻¹² = 60×10⁻²⁴ F²
√(C_mut × C_total) = 7.746 × 10⁻¹² F
R_opt_phase = 1 / (1.885×10⁶ × 7.746×10⁻¹²)
= 1 / (1.460×10⁻⁵)
= 68,493 Ω
≈ 68.5 kΩ
Step 5: Comparison
Ratio = 53.1 / 68.5 = 0.775 = 77.5%
Observation: Higher frequency, but smaller capacitances gives R values similar to Scenario 1. The ratio is slightly higher due to lower capacitance ratio.
Scenario 4: Effect of Varying C_sh (Spark Length)
Fixed parameters: f = 200 kHz, C_mut = 8 pF Variable: C_sh (representing different spark lengths)
Short Spark: L = 1 ft → C_sh ≈ 2 pF
ω = 1.257 × 10⁶ rad/s
C_total = 8 + 2 = 10 pF
R_opt_power = 1/(1.257×10⁶ × 10×10⁻¹²) = 79.6 kΩ
√(8 × 10) = √80 = 8.944 pF
R_opt_phase = 1/(1.257×10⁶ × 8.944×10⁻¹²) = 89.0 kΩ
Ratio = 79.6/89.0 = 0.894 = 89.4%
Medium Spark: L = 3 ft → C_sh ≈ 6 pF
(Already calculated in Scenario 1)
R_opt_power = 56.8 kΩ
R_opt_phase = 75.2 kΩ
Ratio = 75.5%
Long Spark: L = 6 ft → C_sh ≈ 12 pF
C_total = 8 + 12 = 20 pF
R_opt_power = 1/(1.257×10⁶ × 20×10⁻¹²) = 39.8 kΩ
√(8 × 20) = √160 = 12.65 pF
R_opt_phase = 1/(1.257×10⁶ × 12.65×10⁻¹²) = 62.9 kΩ
Ratio = 39.8/62.9 = 0.633 = 63.3%
Summary Table: Effect of Spark Length
| Length | C_sh | C_total | R_opt_power | R_opt_phase | Ratio |
|---|---|---|---|---|---|
| 1 ft | 2 pF | 10 pF | 79.6 kΩ | 89.0 kΩ | 89.4% |
| 3 ft | 6 pF | 14 pF | 56.8 kΩ | 75.2 kΩ | 75.5% |
| 6 ft | 12 pF | 20 pF | 39.8 kΩ | 62.9 kΩ | 63.3% |
Key insight: As spark grows longer:
- Both R values decrease (higher capacitance)
- The ratio R_opt_power/R_opt_phase also decreases
- Longer sparks have larger separation between the two optimal points
Frequency Dependence Study
Fixed parameters: C_mut = 8 pF, C_sh = 6 pF Variable: Frequency from 100 kHz to 400 kHz
f = 100 kHz
ω = 6.283 × 10⁵ rad/s
R_opt_power = 1/(6.283×10⁵ × 14×10⁻¹²) = 113.6 kΩ
R_opt_phase = 1/(6.283×10⁵ × 10.58×10⁻¹²) = 150.4 kΩ
f = 200 kHz
(Scenario 1 result)
R_opt_power = 56.8 kΩ
R_opt_phase = 75.2 kΩ
f = 400 kHz
ω = 2.513 × 10⁶ rad/s
R_opt_power = 1/(2.513×10⁶ × 14×10⁻¹²) = 28.4 kΩ
R_opt_phase = 1/(2.513×10⁶ × 10.58×10⁻¹²) = 37.6 kΩ
Frequency Scaling Table
| Frequency | ω (Mrad/s) | R_opt_power | R_opt_phase |
|---|---|---|---|
| 100 kHz | 0.628 | 113.6 kΩ | 150.4 kΩ |
| 200 kHz | 1.257 | 56.8 kΩ | 75.2 kΩ |
| 400 kHz | 2.513 | 28.4 kΩ | 37.6 kΩ |
Scaling law: R_opt ∝ 1/f Doubling frequency halves resistance (inverse relationship).
Final Results Summary
Scenario Comparison
| Scenario | f (kHz) | C_mut | C_sh | C_total | R_opt_power | R_opt_phase | Ratio |
|---|---|---|---|---|---|---|---|
| 1 (Medium, 200 kHz) | 200 | 8 pF | 6 pF | 14 pF | 56.8 kΩ | 75.2 kΩ | 75.5% |
| 2 (Large, 150 kHz) | 150 | 12 pF | 10 pF | 22 pF | 48.2 kΩ | 65.3 kΩ | 73.8% |
| 3 (Small, 300 kHz) | 300 | 6 pF | 4 pF | 10 pF | 53.1 kΩ | 68.5 kΩ | 77.5% |
Physical Bounds Check
All scenarios fall within expected ranges:
- R_opt_power: 28-114 kΩ (reasonable for 100-400 kHz, 1-6 ft sparks)
- R_opt_phase: 38-150 kΩ (always higher than R_opt_power)
- Both values are well above R_min ≈ 1-10 kΩ (plasma lower limit)
- Both values are well below R_max ≈ 1-100 MΩ (plasma upper limit)
Key Insights
Power vs Phase Optimization
R_opt_power maximizes power transfer:
- This is what the "hungry streamer" seeks
- Plasma adjusts conductivity to approach this value
- Results in phase angles of -55° to -75° (typical)
R_opt_phase minimizes phase angle:
- Represents "most resistive-looking" impedance
- NOT necessarily maximum power transfer
- The -45° target is often unachievable (topological constraint)
Relationship Between the Two
Mathematical relationship:
R_opt_power = 1/(ω·C_total)
R_opt_phase = 1/(ω·√(C_mut·C_total))
Ratio = R_opt_power/R_opt_phase = √(C_mut/C_total) = √(C_mut/(C_mut+C_sh))
For typical r = C_mut/C_sh ratios:
- r = 0.5: Ratio = 0.816 (82%)
- r = 1.0: Ratio = 0.707 (71%)
- r = 2.0: Ratio = 0.577 (58%)
As capacitance ratio increases, the two optimal points diverge more.
Common Mistakes to Avoid
- Forgetting the square root in R_opt_phase calculation
- Using C_mut instead of C_total in R_opt_power formula
- Mixing units (pF vs F, kHz vs Hz)
- Calculating ω = 2f instead of ω = 2πf
- Assuming -45° is always achievable (topological constraint!)
- Using wrong capacitance in product: C_mut × (C_mut + C_sh), NOT C_mut × C_sh
Validation Checks
Always verify:
- R_opt_power < R_opt_phase (mathematical certainty)
- Ratio typically 0.5-0.9 (depends on capacitance ratio)
- Values in physically reasonable range (5-500 kΩ for typical coils)
- Dimensional analysis: units are Ohms
- Scaling: R ∝ 1/f and R ∝ 1/C_total
See Also
-
Related Lessons:
- Module 2, Lesson 1: Two Critical Resistances (theory)
- Module 2, Lesson 2: Hungry Streamer (self-optimization physics)
- Module 1, Lesson 5: Phase Constraint (topological limitations)
-
Related Exercises:
- Exercise opt-ex-01: Practice calculations with different parameters
- Exercise fund-ex-05: Phase angle calculations
-
Related Worked Examples:
- thevenin-extraction.md: Using R_opt in Thévenin analysis
- distributed-model-complete.md: R_opt for distributed segments