Physics extended problems (resonance framework)
Problem 4 – Resonant oscillator energy#
A resonant oscillator has energy
$$ E = \frac{1}{2} D_6 τ_r^2 + X. $$
- If $$τ_r$$ increases by 15%, how does the first term change?
- What is the qualitative effect on total energy?
Problem 5 – Triadic field strength#
A field strength is modeled as
$$ F = \frac{T_f + D_3}{\sqrt{ΛΘ + τ_r}}. $$
- If $$τ_r$$ increases, how does the denominator change?
- What is the qualitative effect on $$F$$?
Problem 6 – Resonant thermal radiation#
A simplified radiation model is
$$ R = X e^{-D_9 / τ_r}. $$
- If $$τ_r$$ increases, does radiation increase or decrease?
- Why?
Problem 7 – Momentum drift#
Momentum drift is modeled as
$$ p = D_6 τ_r - ΛΘ. $$
- If $$τ_r$$ increases, how does $$p$$ change?
- If $$ΛΘ$$ increases, what happens?
Problem 8 – Triadic wave packet spreading#
A wave packet spreads according to
$$ σ(t) = \sqrt{σ_0^2 + \frac{T_f^2 t^2}{D_9 + τ_r}}. $$
- If $$τ_r$$ increases, how does the spreading rate change?
- If $$T_f$$ increases, what is the effect?