Created by: roberto.c.alfredo on Jul 6, 2025, 1:54 AM
1. Setting the Stage
It all began in 1905 when Albert Einstein asked whether light could exert a push (the ārecoilā of a photon cannon) and what that implied for conservation of energy and momentum. The radical answer was: mass is stored energy. Hereās why.
2. Historical Clues and Key Experiments
- Fusion in the Sun: the āmissingā mass in the reaction converts into the energy that lights our star.
- Marie Curieās radioactivity: nuclei āloseā mass by emitting particles and photons.
- Atomic bomb (Trinity, 1945): \(\sim0.7 g\) of mass converted into \(5\times10^{13}\,\text{J}\) of energy.
š¼ Musical fact: Ā Metastasis by Iannis Xenakis (1954) applies mathematical formulas and architectural structures to musicāan artāscience fusion.
3. Special Relativity in Three Ideas
- Relativity principle: the laws of physics are the same in all inertial frames.
- Speed limit \(c\): no signal travels faster than light in a vacuum.
- Spacetime invariant: Ā Ā $$ Ā s^2 = c^2t^2 - x^2 - y^2 - z^2. Ā $$
These pillars lead to new expressions for momentum and energy.
Want to dive deeper into this fundamental invariant? See The spacetime invariant: from Minkowski to šøĀ² = šĀ²šĀ² + šĀ²šā“.
4. Quick Quantitative Derivation
4.1 Relativistic Momentum
$$ \mathbf{p} = \gamma\,m\,\mathbf{v}, \quad \text{where} \quad \gamma = \frac{1}{\sqrt{1 - v^2/c^2}}. $$
4.2 Total Energy
$$ E^2 = p^2c^2 + m^2c^4. $$
4.3 Rest Energy
If \(v = 0\) ā \(p = 0\), then Ā $$ E_0 = mc^2. $$ Ā VoilĆ ! The rest energy is bottled up in mass.
You can expand \(\gamma\) in a Taylor series for \(v \ll c\) and recover the classical kinetic energy term \(E_{\text{kin}} = \tfrac12 mv^2\).
5. Cosmic and Everyday Consequences
| Phenomenon | āLostā Mass ā Energy |
|---|---|
| Fusion in the Sun | Powers the starās luminosity āļø |
| Nuclear fission | Reactors and medical applications |
| Positron Emission Tomography (PET) | \(e^+e^-\) annihilate ā two 511 keV photons |
| Cosmic rays | Partial mass conversion in ultra-energetic particles |
š Car fact: Ā The first Saab 92 (1949) used lightweight aerospace alloys. Ā Less mass = less fuel = less energy consumed.
6. What If There Were More Dimensions?
In a \(d>3\) spatial dimensionality, the form of the invariant changes, but as long as thereās a speed limit \(c\) and a similar quadratic invariant, an \(mc^2\)ālike term appears. The constants shift, but rest energy still emerges from spacetime symmetry.
To understand why three dimensions are critical, see Why the universe works with three spatial dimensions.
7. Quick FAQs
Does ārelativistic massā exist? Ā Today we speak of rest mass \(m\) and energy \(E\); ārelativistic massā \(\gamma m\) is just another way to write \(E/c^2\).
Why \(c^2\) and not another constant? Ā \(c\) comes from the spacetime metric; squaring it ensures dimensional consistency.
Can I convert all the mass of my car into energy? Ā In principle yes. In practice youād need 100% efficient matterāantimatter annihilation. Your old Saab would unleash as much energy as thousands of nuclear bombsā¦ better not try. š
8. Conclusion
\(E = mc^2\) isnāt just a sloganāitās the manifestation of a deep symmetry between space and time. Ā Each kilogram hides \(9\times10^{16}\,\text{J}\). Understanding it takes us from the heart of stars to medical imaging, and opens the door to modern physics.