The Richter magnitude scale, or more correctly local magnitude ML scale, assigns a single number to quantify the amount of seismic energy released by an earthquake. It is a base-10 logarithmic scale obtained by calculating the logarithm of the combined horizontal amplitude of the largest displacement from zero on a Wood–Anderson torsion seismometer output. So, for example, an earthquake that measures 5.0 on the Richter scale has a shaking amplitude 10 times larger than one that measures 4.0. The effective limit of measurement for local magnitude is about .
The energy release of an earthquake, which equates to its destructive power, scales with the 3⁄2 power of the shaking amplitude. Thus, a difference in magnitude of 1.0 is equivalent to a factor of 31.6 () in the energy released; a difference of magnitude of 2.0 is equivalent to a factor of 1000 ( ) in the energy released. 
Developed in 1935 by Charles Richter in partnership with Beno Gutenberg, both of the California Institute of Technology, the scale was firstly intended to be used only in a particular study area in California, and on seismograms recorded on a particular instrument, the Wood-Anderson torsion seismometer. (Many scientists and historians feel it should be known as the Richter–Gutenberg scale.) Richter originally reported values to the nearest quarter of a unit, but decimal numbers were used later. His motivation for creating the local magnitude scale was to separate the vastly larger number of smaller earthquakes from the few larger earthquakes observed in California at the time.
His inspiration was the apparent magnitude scale used in astronomy to describe the brightness of stars and other celestial objects. Richter arbitrarily chose a magnitude 0 event to be an earthquake that would show a maximum combined horizontal displacement of one micrometre on a seismograph recorded using a Wood-Anderson torsion seismometer 100 kilometres (62 mi) from the earthquake epicenter. This choice was intended to prevent negative magnitudes from being assigned. However, the Richter scale has no upper or lower limit, and sensitive modern seismographs now routinely record quakes with negative magnitudes.
Because of the limitations of the Wood-Anderson torsion seismometer used to develop the scale, the original ML cannot be calculated for events larger than about 6.8. Investigators have proposed extensions to the local magnitude scale, the most popular being the surface wave magnitude mS and the body wave magnitude mb. These traditional magnitude scales have largely been superseded by the implementation of methods for estimating the seismic moment and its associated moment magnitude scale.
The Richter magnitude of an earthquake is determined from the logarithm of the amplitude of waves recorded by seismographs (adjustments are included to compensate for the variation in the distance between the various seismographs and the epicenter of the earthquake). Because of the logarithmic basis of the scale, each whole number increase in magnitude represents a tenfold increase in measured amplitude; in terms of energy, each whole number increase corresponds to an increase of about 31.6 times the amount of energy released.
Events with magnitudes of about 4.6 or greater are strong enough to be recorded by any of the seismographs in the world, given that the seismograph's sensors are not located in an earthquake's shadow.
The following describes the typical effects of earthquakes of various magnitudes near the epicenter. This table should be taken with extreme caution, since intensity and thus ground effects depend not only on the magnitude, but also on the distance to the epicenter, the depth of the earthquake's focus beneath the epicenter, and geological conditions (certain terrains can amplify seismic signals).
|Richter Magnitudes||Description||Earthquake Effects||Frequency of Occurrence|
|Less than 2.0||Micro||Microearthquakes, not felt.||About 8,000 per day|
|2.0-2.9||Minor||Generally not felt, but recorded.||About 1,000 per day|
|3.0-3.9||Minor||Often felt, but rarely causes damage.||49,000 per year (est.)|
|4.0-4.9||Light||Noticeable shaking of indoor items, rattling noises. Significant damage unlikely.||6,200 per year (est.)|
|5.0-5.9||Moderate||Can cause major damage to poorly constructed buildings over small regions. At most slight damage to well-designed buildings.||800 per year|
|6.0-6.9||Strong||Can be destructive in areas up to about 160 kilometres (100 mi) across in populated areas.||120 per year|
|7.0-7.9||Major||Can cause serious damage over larger areas.||18 per year|
|8.0-8.9||Great||Can cause serious damage in areas several hundred miles across.||1 per year|
|9.0-9.9||Great||Devastating in areas several thousand miles across.||1 per 20 years|
|10.0+||Epic||Never recorded; see below for equivalent seismic energy yield.||Extremely rare (Unknown)|
(Based on U.S. Geological Survey documents.)
The following table lists the approximate energy equivalents in terms of TNT explosive force - though note that the energy here is that of the underground energy release (ie a small atomic bomb blast will not simply cause light shaking of indoor items) rather than the overground energy release; the majority of energy transmission of an earthquake is not transmitted to and through the surface, but is instead dissipated into the crust and other subsurface structures.
|Approximate TNT for|
Seismic Energy Yield
|0.0||1 kg (2.2 lb)||4.2 MJ|
|0.5||5.6 kg (12.4 lb)||23.5 MJ||Large hand grenade|
|1.0||32 kg (70 lb)||134.4 MJ||Construction site blast|
|1.5||178 kg (392 lb)||747.6 MJ||WWII conventional bombs|
|2.0||1 metric ton||4.2 GJ||Late WWII conventional bombs|
|2.5||5.6 metric tons||23.5 GJ||WWII blockbuster bomb|
|3.0||32 metric tons||134.4 GJ||Massive Ordnance Air Blast bomb|
|3.5||178 metric tons||747.6 GJ||Chernobyl nuclear disaster, 1986|
|4.0||1 kiloton||4.2 TJ||Small atomic bomb|
|4.5||5.6 kilotons||23.5 TJ|
|5.0||32 kilotons||134.4 TJ||Nagasaki atomic bomb (actual seismic yield was negligible since it detonated in the atmosphere. The Hiroshima atomic bomb was 15 kilotons )|
Lincolnshire earthquake (UK), 2008
|5.4||150 kilotons||625 TJ||2008 Chino Hills CA earthquake|
|5.5||178 kilotons||747.6 TJ||Little Skull Mtn. earthquake (NV, USA), 1992|
Alum Rock earthquake (CA, USA), 2007
|6.0||1 megaton||4.2 PJ||Double Spring Flat earthquake (NV, USA), 1994|
|6.5||5.6 megatons||23.5 PJ||2010 Ferndale CA earthquake|
|6.7||16.2 megatons||67.9 PJ||Northridge earthquake (CA, USA), 1994|
|6.9||26.8 megatons||112.2 PJ||San Francisco Bay Area earthquake (CA, USA), 1989|
|7.0||32 megatons||134.4 PJ||2010 Haiti earthquake|
|7.1||50 megatons||210 PJ||Energy released was equivalent to that of Tsar Bomba, the largest thermonuclear weapon ever tested.|
|7.5||178 megatons||747.6 PJ||Kashmir earthquake (Pakistan), 2005|
Antofagasta earthquake (Chile), 2007
|7.8||600 megatons||2.4 EJ||Tangshan earthquake (China), 1976|
|8.0||1 gigaton||4.2 EJ||Toba eruption 75,000 years ago; which, according to the Toba catastrophe theory, affected modern human evolution|
Shaanxi earthquake (China), 1556, San Francisco earthquake (CA, USA), 1906
|8.5||5.6 gigatons||23.5 EJ|
|9.0||32 gigatons||134.4 EJ|
|9.2||90.7 gigatons||379.7 EJ||Anchorage earthquake (AK, USA), 1964|
|9.3||114 gigatons||477 EJ||Indian Ocean earthquake, 2004 (40 ZJ in this case)|
|9.5||178 gigatons||747.6 EJ||Valdivia earthquake (Chile), 1960 (251 ZJ in this case)|
|10.0||1 teraton||4.2 ZJ||Estimate for a 2 km (~1.2 mi) rocky meteorite impacting at 25 km/s (~55,000 mph)|
See also Edit
- Seismic scale
- Moment magnitude scale
- Japan Meteorological Agency seismic intensity scale
- Order of magnitude