This article needs additional citations for verification. (April 2013) (Learn how and when to remove this template message)
TNT equivalent is a convention for expressing energy, typically used to describe the energy released in an explosion. The "ton of TNT" is a unit of energy defined by that convention to be 4.184 gigajoules, which is the approximate energy released in the detonation of a metric ton (1,000 kilograms or one megagram) of TNT. In other words, for each gram of TNT exploded, 4,184 joules of energy are released.
This convention intends to compare the destructiveness of an event with that of traditional explosive materials, of which TNT is a typical example, although other conventional explosives such as dynamite contain more energy.
Kiloton and megaton
The kiloton and megaton of TNT have traditionally been used to describe the energy output, and hence the destructive power, of a nuclear weapon. The TNT equivalent appears in various nuclear weapon control treaties, and has been used to characterize the energy released in such other highly destructive events as an asteroid impact.
Historical derivation of the value
A gram of TNT releases 2673–6702 J (joules) upon explosion. The energy liberated by one gram of TNT was arbitrarily defined as a matter of convention to be 4184 J, which is exactly one kilocalorie.
An explosive's energy is normally expressed as the thermodynamic work produced by its detonation, which for TNT has been accurately measured as 4686 J/g from a large sample of air blast experiments, and theoretically calculated to be 4853 J/g.
A kiloton of TNT can be visualized as a cube of TNT 8.46 metres (27.8 ft) on a side.
|Grams TNT||Symbol||Tons TNT||Symbol||Energy [Joules]||Energy [Wh]||Corresponding mass loss|
|gram of TNT||g||microton of TNT||μt||4.184×103 J or 4.184 kilojoules||1.163 Wh||46.55 pg|
|kilogram of TNT||kg||milliton of TNT||mt||4.184×106 J or 4.184 megajoules||1.163 kWh||46.55 ng|
|megagram of TNT||Mg||ton of TNT||t||4.184×109 J or 4.184 gigajoules||1.163 MWh||46.55 μg|
|gigagram of TNT||Gg||kiloton of TNT||kt||4.184×1012 J or 4.184 terajoules||1.163 GWh||46.55 mg|
|teragram of TNT||Tg||megaton of TNT||Mt||4.184×1015 J or 4.184 petajoules||1.163 TWh||46.55 g|
|petagram of TNT||Pg||gigaton of TNT||Gt||4.184×1018 J or 4.184 exajoules||1.163 PWh||46.55 kg|
Conversion to other units
1 ton TNT equivalent is approximately:
- 1.0×109 calories
- 4.184×109 joules
- 3.96831×106 British thermal units
- 3.08802×109 foot pounds
- 1.162×103 kilowatt hours
|Megatons of TNT||Energy [Wh]||Description|
|×10−12 (i.e. 1 gram of TNT) 1||1.162 Wh||≈ 1 food Calorie (large calorie), which is the approximate amount of energy needed to raise the temperature of one kilogram of water by one degree Celsius at a pressure of one atmosphere.|
|×10−9 (i.e. 1 kilogram of TNT) 1||1.162 kWh||Under controlled conditions one kilogram of TNT can destroy (or even obliterate) a small vehicle.|
|×10−8 1||11.62 kWh||The approximate radiant heat energy released during 3-phase, 600 V, 100 kA arcing fault in a 0.5 m × 0.5 m × 0.5 m (20 in × 20 in × 20 in) compartment within a 1-second period.[further explanation needed]|
|×10−8 1.2||13.94 kWh||Amount of TNT used (12 kg) in Coptic church explosion in Cairo, Egypt on December 11, 2016 that left 25 dead|
|×10−6 (i.e. 1 ton of TNT) – 1×10−6 44||1.16–51.14 MWh||Conventional bombs yield from less than one ton to FOAB's 44 tons. The yield of a Tomahawk cruise missile is equivalent to 500 kg of TNT, or approximately 0.5 tons.|
|×10−6 1.9||2.90 MWh||The television show MythBusters used 2.5 tons of ANFO to make "homemade" diamonds.|
|×10−4 5||581 MWh||A real 0.5-kilotonne-of-TNT (2.1 TJ) charge at Operation Sailor Hat. If the charge were a full sphere, it would be 1 kilotonne of TNT (4.2 TJ).|
|×10−3 (1 kiloton of TNT) – 1×10−3 2||1.16–2.32 GWh||Estimated yield of the Oppau explosion that killed more than 500 at a German fertilizer factory in 1921.|
|×10−3 2.3||2.67 GWh||Amount of solar energy falling on 4,000 m2 (1 acre) of land in a year is 9.5 TJ (2,650 MWh) (an average over the Earth's surface).|
|×10−3 3||3.49 GWh||The Halifax Explosion in 1917 was the accidental detonation of 3,000 tons of TNT.|
|×10−3 4||9.3 GWh||Minor Scale, a 1985 United States conventional explosion, using 4,744 tons of ANFO explosive to provide a scaled equivalent airblast of an eight kiloton (33.44 TJ) nuclear device, is believed to be the largest planned detonation of conventional explosives in history.|
|×10−2 – 1.5×10−2 2||17.4–23.2 GWh||The Little Boy atomic bomb dropped on Hiroshima on August 6, 1945, exploded with an energy of about 15 kilotons of TNT (63 TJ), and the Fat Man atomic bomb dropped on Nagasaki on August 9, 1945, exploded with an energy of about 20 kilotons of TNT (84 TJ). The modern nuclear weapons in the United States arsenal range in yield from 0.3 kt (1.3 TJ) to 1.2 Mt (5.0 PJ) equivalent, for the B83 strategic bomb.|
|1||1.16 TWh||The energy contained in one megaton of TNT (4.2 PJ) is enough to power the average American household for 103,000 years. The 30 Mt (130 PJ) estimated upper limit blast power of the Tunguska event could power the same average home for more than 3,100,000 years. The energy of that blast could power the entire United States for 3.27 days.|
|3||3.5 TWh||The total energy of all explosives used in World War II, including the Hiroshima and Nagasaki atom bombs, is estimated to have been three megatons of TNT.|
|8.6||10 TWh||The energy released by a typical tropical cyclone in one minute, primarily from water condensation. Winds constitute 0.25% of that energy.|
|21.5||25 TWh||The complete conversion of 1 kg of matter into pure energy would yield the theoretical maximum (E = mc2) of 89.8 petajoules, which is equivalent to 21.5 megatons of TNT. No such method of total conversion as combining 500 grams of matter with 500 grams of antimatter has yet been achieved. In the event of proton–antiproton annihilation, approximately 50% of the released energy will escape in the form of neutrinos, which are almost undetectable. Electron–positron annihilation events emit their energy entirely as gamma rays.|
|24||28 TWh||Approximate total yield of the 1980 eruption of Mount St. Helens.|
|25, 50, 100||29 TWh, 58 TWh, 116 TWh||During the Cold War, the United States developed hydrogen bombs with maximum theoretical yields of 25 megatons of TNT (100 PJ). The Soviet Union developed a prototype weapon, nicknamed the Tsar Bomba, which was tested at 50 Mt (210 PJ), but had a maximum theoretical yield of 100 Mt (420 PJ). The effective destructive potential of such a weapon varies greatly, depending on such conditions as the altitude at which it is detonated, the characteristics of the target, the terrain, and the physical landscape upon which it is detonated.|
|26.3||30.6 TWh||Megathrust earthquakes 2004 Indian Ocean earthquake released record ME surface rupture energy, or potential for damage at 26.3 megatons of TNT (110 PJ).|
|200||232 TWh||The total energy released by the eruption of Mt. Krakatoa in Indonesia in 1883.|
|540||628 TWh||The total energy produced worldwide by all nuclear testing and combat combined, from the 1940s till now[when?] is about 540 megatons.|
|1,460||1.69 PWh||The total global nuclear arsenal is about 15,000 nuclear warheads with a destructive capacity of around 1460 megatons or 1.460 gigatons (1,460 million tons) of TNT.|
|62,500||73 PWh||The total solar energy received by Earth per minute is 440 exajoules.|
|875,000||1,000 PWh||Approximate yield of the last eruption of the Yellowstone supervolcano.|
|6,000,000 = ×106 6||6,973 PWh||The estimated energy at impact when the largest fragment of Comet Shoemaker–Levy 9 struck Jupiter is equivalent to 6 million megatons (6 trillion tons) of TNT.|
|×106 9.32||10,831 PWh||The energy released in the 2011 Tōhoku earthquake and tsunami was over 200,000 times the surface energy and was calculated by the USGS at ×1022 joules, 3.9 slightly less than the 2004 Indian Ocean quake. This is equivalent to 9,320 gigatons of TNT, or approximately 600 million times the energy of the Hiroshima bomb.|
|×106 9.56||11,110 PWh||Megathrust earthquakes record huge MW values, or total energy released. The 2004 Indian Ocean earthquake released 9,560 gigatons TNT equivalent.|
|×108 1||116,222 PWh||The approximate energy released when the Chicxulub impact caused the mass extinction 66 million years ago was estimated to be equal to 100 teratons (i.e. 100 exagrams or approximately 220.462 quadrillion pounds) of TNT. That is roughly 8 billion times stronger than each of the bombs that hit Hiroshima and Nagasaki and the most energetic event on the history of Earth for hundreds of millions of years, far more powerful than any volcanic eruption, earthquake or firestorm. Such an explosion annihilated everything within a thousand miles of the impact in a split second. Such energy is equivalent to that needed to power the whole Earth for several centuries.|
|×1015 5.972||6.94 × 1027 Wh||The explosive energy of a quantity of TNT the mass of Earth.|
|×1015 7.89||9.17 × 1027 Wh||Total solar output in all directions per day.|
|×1021 1.98||2.3 × 1033 Wh||The explosive energy of a quantity of TNT the mass of the Sun.|
|×1028 – 2.4×1028 4.8||2.8–5.6 × 1040 Wh||A type 1a supernova explosion gives off 1–×1044 joules of energy, which is about 2.4 to 4.8 hundred billion yottatons (24 to 48 octillion (2.4– 2×1028) megatons) of TNT, equivalent to the explosive force of a quantity of TNT over a trillion (1012) times the mass of the planet Earth. 4.8|
|×1030 – 2.4×1030 4.8||2.8–×1042 Wh 5.6||The largest type of supernova observed, gamma-ray bursts (GRBs) release more than 1046 joules of energy.|
|×1032 1.3||×1044 Wh 1.5||A merger of two black holes, first observation of gravitational waves, released ×1047 joules 5.3|
Relative effectiveness factor
The relative effectiveness factor (RE factor) relates an explosive's demolition power to that of TNT, in units of the TNT equivalent/kg (TNTe/kg). The RE factor is the relative mass of TNT to which an explosive is equivalent: The greater the RE, the more powerful the explosive.
This enables engineers to determine the proper masses of different explosives when applying blasting formulas developed specifically for TNT. For example, if a timber-cutting formula calls for a charge of 1 kg of TNT, then based on octanitrocubane's RE factor of 2.38, it would take only 1.0/2.38 (or 0.42) kg of it to do the same job. Using PETN, engineers would need 1.0/1.66 (or 0.60) kg to obtain the same effects as 1 kg of TNT. With ANFO or ammonium nitrate, they would require 1.0/0.74 (or 1.35) kg or 1.0/0.42 (or 2.38) kg, respectively.
RE factor examples
|Ammonium nitrate (AN + <0.5% H2O)||0.88||2700||0.42|
|Black powder (75% KNO3 + 19% C + 6% S, ancient explosives)||1.65||600||0.50|
|Tanerit Simply (93% granulated AN + 6% red P + 1% C)||0.90||2750||0.55|
|Hexamine dinitrate (HDN)||1.30||5070||0.60|
|HMTD (hexamine peroxide)||0.88||4520||0.74|
|ANFO (94% AN + 6% fuel oil)||0.92||5270||0.74|
|TATP (acetone peroxide)||1.18||5300||0.80|
|Tovex Extra (AN water gel) commercial product||1.33||5690||0.80|
|Hydromite 600 (AN water emulsion) commercial product||1.24||5550||0.80|
|ANNMAL (66% AN + 25% NM + 5% Al + 3% C + 1% TETA)||1.16||5360||0.87|
|Amatol (50% TNT + 50% AN)||1.50||6290||0.91|
|Tritonal (80% TNT + 20% aluminium)*||1.70||6650||1.05|
|Nickel hydrazine nitrate (NHN)||2.12||7000||1.05|
|Amatol (80% TNT + 20% AN)||1.55||6570||1.10|
|Nitrocellulose (13.5% N, NC; AKA guncotton)||1.40||6400||1.10|
|PBXW-126 (22% NTO, 20% RDX, 20% AP, 26% Al, 12% PU's system)*||1.80||6450||1.10|
|Diethylene glycol dinitrate (DEGDN)||1.38||6610||1.17|
|PBXIH-135 EB (42% HMX, 33% Al, 25% PCP-TMETN's system)*||1.81||7060||1.17|
|PBXN-109 (64% RDX, 20% Al, 16% HTPB's system)*||1.68||7450||1.17|
|Picric acid (TNP)||1.71||7350||1.17|
|Tetrytol (70% tetryl + 30% TNT)||1.60||7370||1.20|
|Dynamite, Nobel's (75% NG + 23% diatomite)||1.48||7200||1.25|
|Torpex (aka HBX, 41% RDX + 40% TNT + 18% Al + 1% wax)*||1.80||7440||1.30|
|Composition B (63% RDX + 36% TNT + 1% wax)||1.72||7840||1.33|
|Composition C-3 (78% RDX)||1.60||7630||1.33|
|Composition C-4 (91% RDX)||1.59||8040||1.34|
|Pentolite (56% PETN + 44% TNT)||1.66||7520||1.33|
|Semtex 1A (76% PETN + 6% RDX)||1.55||7670||1.35|
|Hexal (76% RDX + 20% Al + 4% wax)*||1.79||7640||1.35|
|RISAL P (50% IPN + 28% RDX + 15% Al + 4% Mg + 1% Zr + 2% NC)*||1.39||5980||1.40|
|Mixture: 24% nitrobenzene + 76% TNM||1.48||8060||1.50|
|Mixture: 30% nitrobenzene + 70% nitrogen tetroxide||1.39||8290||1.50|
|Octol (80% HMX + 19% TNT + 1% DNT)||1.83||8690||1.54|
|DADNE (1,1-diamino-2,2-dinitroethene, FOX-7)||1.77||8330||1.60|
|Gelignite (92% NG + 7% nitrocellulose)||1.60||7970||1.60|
|Plastics Gel® (in toothpaste tube: 45% PETN + 45% NG + 5% DEGDN + 4% NC)||1.51||7940||1.60|
|Composition A-5 (98% RDX + 2% stearic acid)||1.65||8470||1.60|
|Erythritol tetranitrate (ETN)||1.72||8100||1.60|
|PBXW-11 (96% HMX, 1% HyTemp, 3% DOA)||1.81||8720||1.60|
|Ethylene glycol dinitrate (EGDN)||1.49||8300||1.66|
|Octogen (HMX grade B)||1.86||9100||1.70|
|MEDINA (Methylene dinitroamine)||1.65||8700||1.93|
*: TBX (thermobaric explosives) or EBX (enhanced blast explosives), in a small, confined space, may have over twice the power of destruction. The total power of aluminized mixtures strictly depends on the condition of explosions.
(kilotons of TNT)
|Davy Crockett (nuclear device)||0.022||23||1,000|
|Fat Man (dropped on Nagasaki) A-bomb||20||4600||4,500|
|Classic (one-stage) fission A-bomb||22||420||50,000|
|Hypothetical suitcase nuke||2.5||31||80,000|
|Typical (two-stage) nuclear bomb||500–1000||650–1120||900,000|
|W56 thermonuclear warhead||1,200||272–308||4,960,000|
|W88 modern thermonuclear warhead (MIRV)||470||355||1,300,000|
|B53 nuclear bomb (two-stage)||9,000||4050||2,200,000|
|B41 nuclear bomb (three-stage)||25,000||4850||5,100,000|
|Tsar nuclear bomb (three-stage)||50,000–56,000||26,500||2,100,000|
|GBU-57 bomb (Massive Ordnance Penetrator, MOP)||0.0035||13,600||0.26|
|Grand Slam (Earthquake bomb, M110)||0.0065||9,900||0.66|
|Bomb used in Oklahoma City (ANFO based on racing fuel)||0.0018||2,300||0.78|
|BLU-82 (Daisy Cutter)||0.0075||6,800||1.10|
|MOAB (non-nuclear bomb, GBU-43)||0.011||9,800||1.13|
|FOAB (advanced thermobaric bomb, ATBIP)||0.044||9,100||4.83|
- Net explosive quantity
- Nuclear weapon yield
- Orders of magnitude (energy)
- Relative effectiveness factor
- Table of explosive detonation velocities
- Tonne of oil equivalent, a unit of energy almost exactly 10 tonnes of TNT
- "Tons (Explosives) to Gigajoules Conversion Calculator". unitconversion.org.
- "Joules to Megatons Conversion Calculator". unitconversion.org.
- Blast effects of external explosions (Section 4.8. Limitations of the TNT equivalent method) Archived August 10, 2016, at the Wayback Machine.
- "Appendix B8 – Factors for Units Listed Alphabetically". In NIST SI Guide 2008
- Cooper, Paul W. (1996). Explosives Engineering. New York: Wiley-VCH. p. 406. ISBN 0-471-18636-8.
- Muller, Richard A. (2001–2002). "Chapter 1. Energy, Power, and Explosions". Physics for Future Presidents, a textbook. ISBN 978-1-4266-2459-9. Archived from the original on 2007-05-28.
- Sorin Bastea, Laurence E. Fried, Kurt R. Glaesemann, W. Michael Howard, P. Clark Souers, Peter A. Vitello, Cheetah 5.0 User's Manual, Lawrence Livermore National Laboratory, 2007.
- Maienschein, Jon L. (2002). Estimating equivalency of explosives through a thermochemical approach (PDF) (Technical report). Lawrence Livermore National Laboratory. UCRL-JC-147683.
- Maienschein, Jon L. (2002). Tnt equivalency of different explosives – estimation for calculating load limits in heaf firing tanks (Technical report). Lawrence Livermore National Laboratory. EMPE-02-22.
- Cunningham, Bruce J. (2001). C-4/tnt equivalency (Technical report). Lawrence Livermore National Laboratory. EMPE-01-81.
- "Arc blast Tri-Nitro-Toluene TNT Trotyl equivalent – ARCAD INC". arcblasts.com.
- Atassi, Basma; Sirgany, Sarah; Narayan, Chandrika (December 13, 2016). "Local media: Blast at Cairo cathedral kills at least 25". CNN. Retrieved 5 April 2017.
- Homer-Dixon, Thomas F; Homer-Dixon, Thomas (2002). The Ingenuity Gap. p. 249. ISBN 978-0-375-71328-6.
- TECH REPS INC ALBUQUERQUE NM (1986). "Minor Scale Event, Test Execution Report". hdl:100.2/ADA269600.
- "Frequently Asked Questions – Electricity". United States Department of Energy. 2009-10-06. Retrieved 2009-10-21. (Calculated from 2007 value of 936 kWh monthly usage)
- "Country Comparison :: Electricity – consumption". The World Factbook. CIA. Archived from the original on 2012-01-28. Retrieved 2009-10-22. (Calculated from 2007 value of 3,892,000,000,000 kWh annual usage)
- "NOAA FAQ: How much energy does a hurricane release?". National Oceanic & Atmospheric Administration. August 2001. Retrieved 2009-06-30. cites 6e14 watts continuous.
- Borowski, Stanley K. (March 1996). Comparison of Fusion/Antiproton Propulsion systems (PDF). 23rd Joint Propulsion Conference. NASA Glenn Research Center. doi:10.2514/6.1987-1814. hdl:2060/19960020441.
- See Currently deployed U.S. nuclear weapon yields Archived September 7, 2016, at the Wayback Machine., Complete List of All U.S. Nuclear Weapons Archived December 16, 2008, at the Wayback Machine., Tsar Bomba Archived June 17, 2016, at the Wayback Machine., all from Carey Sublette's Nuclear Weapon Archive.
- "Status of World Nuclear Forces". fas.org.
- "Nuclear Weapons: Who Has What at a Glance". armscontrol.org.
- "Global nuclear weapons: downsizing but modernizing". Stockholm International Peace Research Institute. 13 June 2016.
- Kristensen, Hans M.; Norris, Robert S. (May 3, 2016). "Russian nuclear forces, 2016". Bulletin of the Atomic Scientists. 72 (3): 125–134. doi:10.1080/00963402.2016.1170359 – via Taylor and Francis+NEJM.
- Kristensen, Hans M; Norris, Robert S (2015). "US nuclear forces, 2015". Bulletin of the Atomic Scientists. 71 (2): 107. doi:10.1177/0096340215571913.
- http://www.nrdc.org/nuclear/nudb/datab14.asp[dead link]
- Kristensen, Hans M; Norris, Robert S (2015). "Chinese nuclear forces, 2015". Bulletin of the Atomic Scientists. 71 (4): 77. doi:10.1177/0096340215591247.
- "USGS.gov: USGS WPhase Moment Solution". Earthquake.usgs.gov. Archived from the original on 13 March 2011. Retrieved 13 March 2011.
- Maselli, A.; Melandri, A.; Nava, L.; Mundell, C. G.; Kawai, N.; Campana, S.; Covino, S.; Cummings, J. R.; Cusumano, G.; Evans, P. A.; Ghirlanda, G.; Ghisellini, G.; Guidorzi, C.; Kobayashi, S.; Kuin, P.; LaParola, V.; Mangano, V.; Oates, S.; Sakamoto, T.; Serino, M.; Virgili, F.; Zhang, B.- B.; Barthelmy, S.; Beardmore, A.; Bernardini, M. G.; Bersier, D.; Burrows, D.; Calderone, G.; Capalbi, M.; Chiang, J. (2013). "GRB 130427A: A Nearby Ordinary Monster". Science. 343 (6166): 48–51. arXiv: . Bibcode:2014Sci...343...48M. doi:10.1126/science.1242279. PMID 24263134.
- US Army FM 3-34.214: Explosives and Demolition, 2007, page 1–2.
- Whitehall Paraindistries
- Thompson, A.; Taylor, B.N. (July 2008). Guide for the Use of the International System of Units (SI). NIST Special Publication. 811. National Institute of Standards and Technology. Version 3.2.
- Nuclear Weapons FAQ Part 1.3
- Rhodes, Richard (2012). The Making of the Atomic Bomb (25th Anniversary ed.). Simon & Schuster. ISBN 978-1-4516-7761-4.
- Cooper, Paul W. (1996), Explosives Engineering, New York: Wiley-VCH, ISBN 0-471-18636-8
- HQ Department of the Army (2004) , Field Manual 5-25: Explosives and Demolitions, Washington, D.C.: Pentagon Publishing, pp. 83–84, ISBN 0-9759009-5-1
- Explosives - Compositions, Alexandria, VA: GlobalSecurity.org, retrieved September 1, 2010
- Urbański, Tadeusz (1985) , Chemistry and Technology of Explosives, Volumes I–IV (second ed.), Oxford: Pergamon
- Mathieu, Jörg; Stucki, Hans (2004), "Military High Explosives", CHIMIA International Journal for Chemistry, Schweizerische Chemische Gesellschaft, 58 (6): 383–389, doi:10.2533/000942904777677669, ISSN 0009-4293
- 3. Thermobaric Explosives, Advanced Energetic Materials, 2004., The National Academies Press, nap.edu, 2004