HL Deep Dives — Rigid Bodies & Relativity
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HL Deep Dives — Rigid Bodies & Relativity

Chapter 2 · Special relativity

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Two postulates
(1) Laws of physics are the same in every inertial frame. (2) The speed of light c is the same for every observer.
Lorentz factor
γ=11v2/c2\gamma = \frac{1}{\sqrt{1 - v^2/c^2}}
γ1\gamma \ge 1; γ\gamma \to \infty as vcv \to c.
Time dilation
Δt=γΔt0\Delta t = \gamma\,\Delta t_0
Moving clocks tick slow; Δt0\Delta t_0 = proper time (measured at rest in the events' frame).
Length contraction
L=L0/γL = L_0/\gamma
Moving objects are shorter along the direction of motion; L0L_0 = proper length (rest frame).
Relativistic energy
E=γmc2,E0=mc2E = \gamma m c^2,\quad E_0 = mc^2
Rest energy + kinetic; Ek=(γ1)mc2E_k=(\gamma-1)mc^2.
Velocity addition (HL)
u=u+v1+uv/c2u = \dfrac{u'+v}{1 + u'v/c^2}
Collinear motion. Reduces to Galilean u+vu' + v when u,vcu', v \ll c. With u=cu' = c gives u=cu = c — postulate 2 baked in.
Relativistic Doppler (HL)
ff=1β1+β\dfrac{f'}{f} = \sqrt{\dfrac{1-\beta}{1+\beta}}
Receding source (β=v/c\beta = v/c); approaching uses the reciprocal under the root. Reduces to Δλ/λv/c\Delta\lambda/\lambda \approx v/c when β1\beta \ll 1. Use when redshift comes from vv comparable to cc.
Proper vs observed
Δt0\Delta t_0 measured where the two events occur at the same place; L0L_0 measured in the frame where the object is at rest. Other observers see longer times and shorter lengths.
Key SI units (HL)
γ\gamma: dimensionless; c3.0×108c \approx 3.0\times10^8 m s⁻¹; energies often quoted in MeV.
Common traps
Forgetting that γ1\gamma\to 1 at everyday speeds; confusing proper vs observed time/length; using Newtonian KE = ½mv² when v is comparable to c.