Moment magnitude scale: Difference between revisions

The moment magnitude scale (abbreviated as MMS; denoted as M_W) is used by seismologists to measure the size of earthquakes in terms of the energy released.^[1] The magnitude is based on the seismic moment of the earthquake, which is equal to the rigidity of the Earth multiplied by the average amount of slip on the fault and the size of the area that slipped.^[2] The scale was developed in the 1970s to succeed the 1930s-era Richter magnitude scale (M_L). Even though the formulæ are different, the new scale retains the familiar continuum of magnitude values defined by the older one. The MMS is now the scale used to estimate magnitudes for all modern large earthquakes by the United States Geological Survey.^[3]

Definition

The symbol for the moment magnitude scale is ${\displaystyle M_{\mathrm {w} }}$, with the subscript ${\displaystyle \mathrm {w} }$ meaning mechanical work accomplished. The moment magnitude ${\displaystyle M_{\mathrm {w} }}$ is a dimensionless number defined by

${\displaystyle M_{\mathrm {w} }=\textstyle {\frac {2}{3}}\log _{10}M_{0}-10.7,}$

where ${\displaystyle M_{0}}$ is the magnitude of the seismic moment in dyne centimeters (10⁻⁷ N·m).^[1] The constant values in the equation are chosen to achieve consistency with the magnitude values produced by earlier scales, most importantly the Local Moment (or "Richter") scale.

As with the Richter scale, an increase of one step on this logarithmic scale corresponds to a 10^1.5 ≈ 32 times increase in the amount of energy released, and an increase of two steps corresponds to a 10³ = 1000 times increase in energy.

Comparative energy released by two earthquakes

A closely related formula, obtained by solving the previous equation for ${\displaystyle M_{0}}$, allows one to assess the proportional difference ${\displaystyle f_{\Delta E}}$ in energy release between earthquakes of two different moment magnitudes, say ${\displaystyle m_{1}}$ and ${\displaystyle m_{2}}$:^{[citation needed]}

${\displaystyle f_{\Delta E}={\frac {10^{({\frac {3}{2}}(m_{1}+10.7))}}{10^{({\frac {3}{2}}(m_{2}+10.7))}}}=10^{{\frac {3}{2}}(m_{1}-m_{2})}.}$

Converting magnitude to energy

Reversing the definition produces the following simple relation between magnitude and energy (as measured in joules):^{[citation needed]}

${\displaystyle \log _{10}E=9+M_{\mathrm {w} }\times 1.5}$

Thus, a magnitude 4 earthquake dissipates 10⁹⁺⁶ joules, or one peta-joule.

Radiated seismic energy

Potential energy is stored in the crust in the form of built-up stress. During an earthquake, this stored energy is transformed and results in

• cracks and deformation in rocks
• heat,
• radiated seismic energy ${\displaystyle E_{s}}$.

The seismic moment ${\displaystyle M_{0}}$ is a measure of the total amount of energy that is transformed during an earthquake. Only a small fraction of the seismic moment ${\displaystyle M_{0}}$ is converted into radiated seismic energy ${\displaystyle E_{\mathrm {s} }}$, which is what seismographs register. Using the estimate

${\displaystyle E_{\mathrm {s} }=M_{0}\cdot 10^{-4.8}=M_{0}\cdot 1.6\times 10^{-5},}$

Choy and Boatwright defined in 1995 the energy magnitude ^[4]

${\displaystyle M_{\mathrm {e} }=\textstyle {\frac {2}{3}}\log _{10}E_{\mathrm {s} }-2.9.}$

Nuclear explosions

The energy released by nuclear weapons is traditionally expressed in terms of the energy stored in a kiloton or megaton of the conventional explosive trinitrotoluene (TNT).

A rule of thumb equivalence from seismology used in the study of nuclear proliferation asserts that a one kiloton nuclear explosion creates a seismic signal with a magnitude of approximately 4.0.^[5] This in turn leads to the equation ^[6]

${\displaystyle M_{n}=\textstyle {\frac {2}{3}}\displaystyle \log _{10}{\frac {m_{\mathrm {TNT} }}{\mbox{Mt}}}+6,}$

where ${\displaystyle m_{\mathrm {TNT} }}$ is the mass of the explosive TNT that is quoted for comparison (relative to megatons Mt).

Such comparison figures are not very meaningful. As with earthquakes, during an underground explosion of a nuclear weapon, only a small fraction of the total amount of energy transformed ends up being radiated as seismic waves. Therefore, a seismic efficiency has to be chosen for a bomb that is quoted as a comparison. Using the conventional specific energy of TNT (4.184 MJ/kg), the above formula implies the assumption that about 0.5% of the bomb's energy is converted into radiated seismic energy ${\displaystyle E_{s}}$.^[7] For real underground nuclear tests, the actual seismic efficiency achieved varies significantly and depends on the site and design parameters of the test.

Comparison with Richter scale

Main article: Richter magnitude scale

In 1935, Charles Richter and Beno Gutenberg developed the local magnitude (${\displaystyle M_{\mathrm {L} }}$) scale (popularly known as the Richter scale) with the goal of quantifying medium-sized earthquakes (between magnitude 3.0 and 7.0) in Southern California. This scale was based on the ground motion measured by a particular type of seismometer at a distance of 100 kilometres (62 mi) from the earthquake's epicenter.^[3]. Because of this, there is an upper limit on the highest measurable magnitude, and all large earthquakes will tend to have a local magnitude of around 7. The magnitude becomes unreliable for measurements taken at a distance of more than about 600 kilometres (370 mi) from the epicenter.

The moment magnitude (${\displaystyle M_{\mathrm {w} }}$) scale was introduced in 1979 by Caltech seismologists Thomas C. Hanks and Hiroo Kanamori to address these shortcomings while maintaining consistency. Thus, for medium-sized earthquakes, the moment magnitude values should be similar to Richter values. That is, a magnitude 5.0 earthquake will be about a 5.0 on both scales. This scale was based on the physical properties of the earthquake, specifically the seismic moment (${\displaystyle M_{0}}$). Unlike other scales, the moment magnitude scale does not saturate at the upper end; there is no upper limit to the possible measurable magnitudes. However, this has the side-effect that the scales diverge for smaller earthquakes.^[1]

Moment magnitude is now the most common measure for medium to large earthquake magnitudes,^[8] but breaks down for smaller quakes. For example, the United States Geological Survey does not use this scale for earthquakes with a magnitude of less than 3.5, which is the great majority of quakes. For these smaller quakes, other magnitude scales are used. All magnitudes are calibrated to the ${\displaystyle M_{\mathrm {L} }}$ scale of Richter and Gutenberg.

Magnitude scales differ from earthquake intensity, which is the perceptible moving, shaking, and local damages experienced during a quake. The shaking intensity at a given spot depends on many factors, such as soil types, soil sublayers, depth, type of displacement, and range from the epicenter (not counting the complications of building engineering and architectural factors). Rather, they are used to estimate only the total energy released by the quake.

The following table compares magnitudes towards the upper end of the Richter Scale for major Californian earthquakes.^[1] class="wikitable "

See also

• Earthquake engineering
• Geophysics
• List of earthquakes
• Other seismic scales
• Surface wave magnitude

Notes

1. Hanks, Thomas C.; Kanamori, Hiroo (05/1979). "Moment magnitude scale" (PDF). Journal of Geophysical Research. 84 (B5): 2348–2350. doi:10.1029/JB084iB05p02348. {{cite journal}}: Check date values in: |date= (help)
2. "Glossary of Terms on Earthquake Maps". USGS. Retrieved 2009-03-21.
3. USGS Earthquake Magnitude Policy
4. Choy, George L.; Boatwright, John L. (1995), "Global patterns of radiated seismic energy and apparent stress", Journal of Geophysical Research, 100 (B9): 18205–18228
5. "Nuclear Testing and Nonproliferation", "Chapter 5: Assessing Monitoring Requirements"
6. "What is Richter Magnitude?"
7. Q: How much energy is released in an earthquake?
8. Boyle, Alan (May 12, 2008). "Quakes by the numbers". MSNBC. Retrieved 2008-05-12. That original scale has been tweaked through the decades, and nowadays calling it the "Richter scale" is an anachronism. The most common measure is known simply as the moment magnitude scale.

References

• Choy GL, Boatwright JL (1995). "Global patterns of radiated seismic energy and apparent stress". Journal of Geophysical Research. 100 (B9): 18205–28. doi:10.1029/95JB01969.
• Utsu,T., 2002. "Relationships between magnitude scales, in: Lee, W.H.K, Kanamori, H., Jennings, P.C., and Kisslinger, C., editors, International Handbook of Earthquake and Engineering Seismology: Academic Press, a division of Elsevier, two volumes, International Geophysics, vol. 81-A, pages 733-746". {{cite journal}}: Cite journal requires |journal= (help)

External links

• USGS: Measuring earthquakes