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| [[Image:Ferrofluid Magnet under glass edit.jpg|thumb|350px|Ferrofluid on glass, with a magnet underneath.]]
| | {{About|specific activity radioactivity|the use in biochemistry|Enzyme assay#Specific activity}} |
| | {{multiple issues| |
| | {{technical|date=January 2014}} |
| | {{unreferenced|date=January 2014}} |
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| A '''ferrofluid''' ([[portmanteau]] of [[ferromagnetic]], and [[fluid]]) is a liquid which becomes strongly magnetized in the presence of a [[magnetic field]]
| | In [[nuclear sciences]] and technologies, "activity" is the SI quantity related to the phenomenon of natural and artificial [[radioactivity]]. The SI unit of "activity" is [[becquerel]] (Bq) while that of "'''specific activity'''" is Bq/g. The old unit of "activity" was [[curie]] (Ci) making "specific activity", Ci/g. |
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| Ferrofluids are [[colloidal]] liquids made of [[nanoscale]] [[Ferromagnetism|ferromagnetic]], or [[Ferrimagnetic interaction|ferrimagnetic]], particles suspended in a [[Wiktionary:carrier|carrier]] [[fluid]] (usually an [[organic solvent]] or water). Each tiny particle is thoroughly coated with a [[surfactant]] to inhibit clumping. Large ferromagnetic particles can be ripped out of the homogeneous colloidal mixture, forming a separate clump of magnetic dust when exposed to strong magnetic fields. The magnetic attraction of [[nanoparticle]]s is weak enough that the surfactant's [[Van der Waals force]] is sufficient to prevent magnetic clumping or [[agglomeration]]. Ferrofluids usually<ref name="two">{{Cite journal|doi=10.1007/s003390050569|title=First observation of ferromagnetism and ferromagnetic domains in a liquid metal (abstract)|publisher=Applied Physics A: Materials Science & Processing|year=1997|author=T. Albrecht|journal=Applied Physics a Materials Science & Processing|volume=65|page=215|bibcode = 1997ApPhA..65..215A|author-separator=,|author2=C. Bührer|display-authors=2|last3=fäHnle|first3=M.|last4=Maier|first4=K.|last5=Platzek|first5=D.|last6=Reske|first6=J.|issue=2 }}</ref> do not retain [[magnetization]] in the absence of an externally applied field and thus are often classified as [[Paramagnetism#Superparamagnets|"superparamagnets"]] rather than ferromagnets.
| | == Half-life == |
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| The difference between ferrofluids and [[magnetorheological fluid]]s (MR fluids) is the size of the particles. The particles in a ferrofluid primarily consist of nanoparticles which are [[suspension (chemistry)|suspended]] by [[Brownian motion]] and generally will not settle under normal conditions. MR fluid particles primarily consist of micrometre-scale particles which are too heavy for Brownian motion to keep them suspended, and thus will settle over time because of the inherent density difference between the particle and its carrier fluid. These two fluids have very different applications as a result.
| | Experimentally-measured specific activity can be used to calculate the [[half-life]] of a radioactive element. |
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| ==Description==
| | The definition of half-life ('''T<sub>1/2</sub>''') is that |
| [[File:Ferrofluid poles.jpg|thumb|right|Ferrofluid is the oily substance collecting at the poles of the magnet which is underneath the white dish.]]
| | the half life T<sub>1/2</sub> of an isotope is the length of time at which half |
| | of a given quantity has decayed into another isotope, usually of a different element: |
| | Or more generally: |
| | Starting with '''''N<sub>0</sub>''''', atoms of an element, the number of atoms, '''''N''''', |
| | remaining after time, '''''t''''', is given by: |
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| Ferrofluids are composed of nanoscale particles (diameter usually 10 nanometers or less) of [[magnetite]], [[hematite]] or some other compound containing [[iron]]. This is small enough for thermal agitation to disperse them evenly within a carrier fluid, and for them to contribute to the overall magnetic response of the fluid. This is analogous to the way that the ions in an aqueous [[paramagnetic]] salt solution (such as an aqueous solution of [[copper(II) sulfate]] or [[manganese(II) chloride]]) make the solution paramagnetic. The composition of a typical ferrofluid is about 5% magnetic solids, 10% [[surfactant]] and 85% carrier, by volume<ref>"By Anne Marie Helmenstine, Ph.D."http://chemistry.about.com/[http://chemistry.about.com/od/demonstrationsexperiments/ss/liquidmagnet.htm]</ref>.
| | : <math>N=N_0\left(\frac{1}{2}\right)^{t \over T_{1/2} }</math> |
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| Particles in ferrofluids are dispersed in a liquid, often using a [[surfactant]], and thus ferrofluids are [[Colloid|colloidal suspensions]] – materials with properties of more than one state of matter. In this case, the two states of matter are the solid metal and liquid it is in.<ref>[http://education.jlab.org/beamsactivity/6thgrade/vocabulary/index.html Vocabulary List]. Education.jlab.org. Retrieved on 2011-11-23.</ref> This ability to change phases with the application of a magnetic field allows them to be used as [[seal (mechanical)|seals]], [[lubricant]]s, and may open up further applications in future [[nanoelectromechanical systems]].
| | The natural log of both sides |
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| True ferrofluids are stable. This means that the solid particles do not agglomerate or phase separate even in extremely strong magnetic fields. However, the surfactant tends to break down over time (a few years), and eventually the nano-particles will agglomerate, and they will separate out and no longer contribute to the fluid's magnetic response.
| | : <math>\ln(N)=\ln(N_0)+\left(\frac{t}{T_{1/2} }\right)\ln\left(\frac{1}{2}\right)</math> |
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| The term [[magnetorheological fluid]] (MRF) refers to liquids similar to ferrofluids (FF) that solidify in the presence of a magnetic field. Magnetorheological fluids have [[micrometre]] scale magnetic particles that are one to three orders of magnitude larger than those of ferrofluids. | | The derivative with respect to time, ''t'' |
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| However, ferrofluids lose their magnetic properties at sufficiently high temperatures, known as the [[Curie temperature]].
| | : <math>\frac{1}{N}\frac{dN}{dt}=\frac{\ln\left(\frac{1}{2}\right)}{T_{1/2} }</math> |
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| Ferrofluids also change their resistance according to the following equation:
| | Multiplying both sides by ''N'' |
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| :<math>\rho = Ve^{-B^{2}} + p</math> | | : <math>\frac{dN}{dt}=\frac{N\ln\left(\frac{1}{2}\right)}{T_{1/2} }</math> |
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| With:
| | Yields |
| *<math>\rho</math> as the resistance in M<math>\Omega</math>
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| *V as the Vollema Value, different for each ferrofluid,
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| *B as the strength of the magnetic field in mT,
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| *p as the Pietrow constant, currently measured at 0.09912
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| ===Normal-field instability=== | | : <math>\frac{dN}{dt}=\frac{-0.693\,N}{T_{1/2} }</math> |
| When a paramagnetic fluid is subjected to a strong vertical [[magnetic field]], the surface forms a regular pattern of peaks and valleys. This effect is known as the ''normal-field instability''. The instability is driven by the magnetic field; it can be explained by considering which shape of the fluid minimizes the total energy of the system.<ref>Andelman & Rosensweig, pp. 20–21.</ref>
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| From the point of view of [[magnetic energy]], peaks and valleys are energetically favorable. In the corrugated configuration, the magnetic field is concentrated in the peaks; since the fluid is more easily magnetized than the air, this lowers the magnetic energy. In consequence the spikes of fluid ride the field lines out into space until there is a balance of the forces involved. <ref>Andelman & Rosensweig pp. 21, 23; Fig. 11</ref>
| | ''dN''/''dt'' represents the decay rate of atoms. The negative sign shows that the rate is negative, so the number of atoms is decreasing with time. Rearranging terms: |
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| At the same time the formation of peaks and valleys is resisted by [[gravity]] and [[surface tension]]. It costs energy to move fluid out of the valleys and up into the spikes, and it costs energy to increase the surface area of the fluid. In summary, the formation of the corrugations increases the [[specific surface energy|surface free energy]] and the [[gravitational energy]] of the liquid, but reduces the magnetic energy. The corrugations will only form above a critical magnetic [[field strength]], when the reduction in magnetic energy outweighs the increase in surface and gravitation energy terms.<ref>Andelman & Rosensweig p. 21</ref>
| | : <math>T_{1/2}=\frac{-0.693\,N}{\frac{dN}{dt} }</math> |
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| Ferrofluids have an exceptionally high [[magnetic susceptibility]] and the critical magnetic field for the onset of the corrugations can be realised by a small bar magnet.
| | === Example: half-life of Rb-87 === |
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| [[Image:Ferrofluid close.jpg|thumb|[[Macrophotograph]] of ferrofluid influenced by a magnet.]] | | One gram of [[rubidium]]-87 and a radioactivity count rate that, after taking solid angle effects into account, is consistent with a decay rate of 3200 decays per second corresponds to a specific activity of {{val|3.2|e=6|u=Bq/kg}}. Rubidium's atomic weight is 87, so one gram is one 87th of a mole, or ''N''={{val|6.9|e=21}} atoms. Plugging in the numbers: |
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| ===Common ferrofluid surfactants=== | | : <math>T_{1/2}=\frac{-0.693(6.9\times 10^{21})}{-3200\text{ s}^{-1} }=1.5\times 10^{18}\text{ s or 47 billion years}</math> |
| The [[surfactant]]s used to coat the nanoparticles include, but are not limited to:
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| * [[oleic acid]]
| | == Formulation == |
| * [[tetramethylammonium hydroxide]]
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| * [[citric acid]]
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| * [[soy lecithin]]
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| These [[surfactant]]s prevent the nanoparticles from clumping together, ensuring that the particles do not form aggregates that become too heavy to be held in suspension by [[Brownian motion]]. The magnetic particles in an ideal ferrofluid do not settle out, even when exposed to a strong magnetic, or gravitational field. A surfactant has a [[chemical polarity|polar]] head and non-polar tail (or vice versa), one of which [[adsorption|adsorbs]] to a nanoparticle, while the non-polar tail (or polar head) sticks out into the carrier medium, forming an inverse or regular [[micelle]], respectively, around the particle. [[steric effects|Steric]] repulsion then prevents agglomeration of the particles.
| | Radioactivity is expressed as the decay rate of a particular [[radionuclide]] with decay constant ''λ'' and the number of atoms ''N'': |
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| While surfactants are useful in prolonging the settling rate in ferrofluids, they also prove detrimental to the fluid's magnetic properties (specifically, the fluid's [[magnetic saturation]]). The addition of surfactants (or any other foreign particles) decreases the [[packing density]] of the ferroparticles while in its activated state, thus decreasing the fluid's on-state [[viscosity]], resulting in a "softer" activated fluid. While the on-state viscosity (the "hardness" of the activated fluid) is less of a concern for some ferrofluid applications, it is a primary fluid property for the majority of their commercial and industrial applications and therefore a compromise must be met when considering on-state viscosity versus the settling rate of a ferrofluid.
| | : <math>-\frac{dN}{dt}= \lambda N</math> |
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| [[Image:Ferrofluid in magnetic field.jpg|right|thumb|A ferrofluid in a [[magnetic field]] showing normal-field instability caused by a [[neodymium magnet]] beneath the dish]]
| | Mass of the radionuclide is given by |
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| ==Applications==
| | : <math>\frac{N}{N_A} [\text{mol}] \times {m} [\text {g } \text{mol}^{-1}]</math> |
| ===Electronic devices===
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| {{main|ferrofluidic seal}} | |
| Ferrofluids are used to form liquid [[Seal (mechanical)|seals]] around the spinning drive shafts in [[hard disk]]s. The rotating shaft is surrounded by magnets. A small amount of ferrofluid, placed in the gap between the magnet and the shaft, will be held in place by its attraction
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| to the magnet. The fluid of magnetic particles forms a barrier which prevents debris from entering the interior of the hard drive. According to engineers at Ferrotec, ferrofluid seals on rotating shafts typically withstand 3 to 4 psi;{{Citation needed|date=July 2011}} additional seals can be stacked to form assemblies capable of higher pressures.
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| ===Mechanical engineering===
| | where ''m'' is [[mass number]] of the radionuclide and ''N<sub>A</sub>'' is [[Avogadro's constant]]. |
| Ferrofluids have [[friction]]-reducing capabilities. If applied to the surface of a strong enough magnet, such as one made of [[NdFeB]], it can cause the magnet to glide across smooth surfaces with minimal resistance.
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| ===Aerospace===
| | Specific radioactivity ''S'' is defined as radioactivity per unit mass of the radionuclide: |
| NASA has experimented using ferrofluids in a closed loop as the basis for a spacecraft's [[attitude control]] system. A [[magnetic field]] is applied to a loop of ferrofluid to change the [[angular momentum]] and influence the rotation of the spacecraft.
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| ===Analytical instrumentation=== | | : <math>S [\text {Bq/g}] = \frac{\lambda N}{m N/N_A} = \frac{\lambda N_A}{m}</math> |
| Ferrofluids have numerous [[optical]] applications because of their [[refractive]] properties; that is, each grain, a [[magnet|micromagnet]], reflects [[light]]. These applications include measuring [[specific viscosity]] of a liquid placed between a [[polarizer]] and an [[analyzer]], illuminated by a [[helium-neon laser]].
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| ===Medicine===
| | In addition, decay constant ''λ'' is related to the half-life ''T<sub>1/2</sub>'' by the following equation: |
| In [[medicine]], ferrofluids are used as [[contrast agent]]s for [[magnetic resonance imaging]] and can be used for [[cancer]] detection. The ferrofluids are in this case composed of [[iron oxide]] nanoparticles and called SPION, for "Superparamagnetic Iron Oxide Nanoparticles" | |
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| There is also much experimentation with the use of ferrofluids in an [[experimental cancer treatment]] called [[magnetic hyperthermia]]. It is based on the fact that a ferrofluid placed in an alternating magnetic field releases [[heat]].
| | : <math>{\lambda} = \frac{ln2}{T_{1/2}}</math> |
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| ===Heat transfer===
| | Thus, specific radioactivity can also be described by |
| An external magnetic field imposed on a ferrofluid with varying susceptibility (e.g., because of a temperature gradient) results in a nonuniform magnetic body force, which leads to a form of [[heat transfer]] called [[thermomagnetic convection]]. This form of heat transfer can be useful when conventional convection heat transfer is inadequate; e.g., in miniature microscale devices or under [[microgravity|reduced gravity]] conditions.
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| Ferrofluids are commonly used in [[loudspeaker]]s to remove heat from the [[voice coil]], and to passively [[damping|damp]] the movement of the cone. They reside in what would normally be the air gap around the voice coil, held in place by the speaker's magnet. Since ferrofluids are paramagnetic, they obey [[Curie's law]], thus become less magnetic at higher temperatures. A strong magnet placed near the voice coil (which produces heat) will attract cold ferrofluid more than hot ferrofluid thus forcing the heated ferrofluid away from the electric voice coil and toward a [[heat sink]]. This is an efficient cooling method which requires no additional energy input.<ref name="one">{{cite web|url=http://64.233.167.104/search?q=cache:suVXfrtIuZkJ:www.sbfisica.org.br/bjp/download/v25/v25a10.pdf+ferrofluid+curie+heat+pump&hl=en&ct=clnk&cd=5&gl=us&lr=lang_en&client=firefox-a|title=New Applications of Heat and Mass Transfer Processes in Temperature Sensitive Magnetic Fluids|accessdate=August 31, 2007|publisher=Brazilian Journal of Physics|year=1995|author=Elmars Blums}}</ref>
| | : <math>S = \frac{ln2 \times {N_A}}{T_{1/2} \times {m}}</math> |
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| Ferrofluids of suitable composition can exhibit extremely large enhancement in thermal conductivity (k; ~300% of the base fluid thermal conductivity). The large enhancement in k is due to the efficient transport of heat through percolating nanoparticle paths. Special magnetic nanofluids with tunable thermal conductivity to viscosity ratio can be used as multifunctional ‘smart materials’ that can remove heat and also arrest vibrations (damper). Such fluids may find applications in microfluidic devices and microelectromechanical systems ([[MEMS]]).<ref>{{cite journal|doi=10.1021/jp204827q |title=Tuning of Thermal Conductivity and Rheology of Nanofluids Using an External Stimulus|year=2011|last1=Shima|first1=P. D.|last2=Philip|first2=John|journal=The Journal of Physical Chemistry C|volume=115|issue=41|pages=20097}}</ref>
| | This equation is simplified by |
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| ===Optics===
| | : <math>S [\text {Bq/g}] \simeq \frac{4.17\times 10^{23}}{T_{1/2} [s]\times m}</math> |
| Research is under way to create an [[Ferrofluid mirror|adaptive optics shape-shifting magnetic mirror]] from ferrofluid for Earth-based astronomical [[Optical telescope|telescope]]s.<ref>{{cite news|publisher=New Scientist|title=Morphing mirror could clear the skies for astronomers|date=7 November 2008|author=Jeff Hecht|url=http://www.newscientist.com/article/dn15154-morphing-mirror-could-clear-the-skies-for-astronomers.html?feedId=online-news_rss20}}</ref>
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| Optical filters are used to select different wavelengths of light. The replacement of filters is cumbersome, especially when the wavelength is changed continuously with tunable type of lasers. Optical filters, tunable for differing wavelengths by varying the magnetic field can be built using ferrofluid emulsion.<ref>{{cite journal|doi=10.1088/0957-0233/14/8/314|title=A tunable optical filter|year=2003|last1=Philip|first1=John|last2=Jaykumar|first2=T|last3=Kalyanasundaram|first3=P|last4=Raj|first4=Baldev|journal=Measurement Science and Technology|volume=14|issue=8|pages=1289|bibcode = 2003MeScT..14.1289P }}</ref>
| | When the unit of half-life converts a year |
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| ===Art===
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| Some art and science [[museum]]s have special devices on display that use magnets to make ferrofluids move around specially shaped surfaces in a [[fountain]] show-like fashion to entertain guests. [[Sachiko Kodama]] is known for her ferrofluid [[art]].
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| The Australian electronic rock band, [[Pendulum (band)|Pendulum]], used ferrofluid for the music video for the track, [[Watercolour (Pendulum song)|Watercolour]]. The design house Krafted London was responsible for the ferrofluid FX in the video. The post-metal band [[Isis (band)|Isis]] also uses a ferrofluid in the music-video for 20 Minutes/40 Years.
| | : <math> S [\text {Bq/g}] = \frac{ln2 \times {N_A}}{T_{1/2} [s] \times {m}} = \frac{ln2 \times {N_A}}{T_{1/2}[year] \times365\times24\times60\times60 \times m} \simeq \frac{1.32\times 10^{16} }{T_{1/2}[year] \times m}</math> |
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| CZFerro, an American art studio, began using ferrofluid in its productions in 2008. The works consist of ferrofluid displayed in a unique suspension solution. These works are often used as [[conversation piece]]s for offices and homes.
| | For example, specific radioactivity of [[Isotopes of radium|radium 226]] with a half-life of 1600 years is obtained by |
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| == See also ==
| | : <math> \frac{1.32\times 10^{16} }{1600[year] \times 226} \simeq {3.7} \times 10^{10} [\text {Bq/g}] </math> |
| {{portal|physics}} | |
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| * [[Smart fluid]]
| | This value derived from radium 226 was defined as unit of radioactivity known as [[Curie]] (Ci). |
| * [[Magnetic field viewing film]]
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| * [[Magnetorheological fluid]]
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| * [[Electrorheological fluid]]
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| * [[Magnetohydrodynamics]]
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| * [[Magnetic ionic liquid]]
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| * [[Plasma physics]]
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| * [[Fluid mechanics]]
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| * [[Continuum mechanics]]
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| == References ==
| | [[Category:Units of radioactivity]] |
| {{Reflist|30em}}
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| ==Bibliography==
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| * {{ cite book |first=David |last=Andelman |first2=Ronald E. |last2=Rosensweig |chapter=The Phenomenology of Modulated Phases: From Magnetic Solids and Fluids to Organic Films and Polymers |pages=1–56 |editor-first=Yoav |editor-last=Tsori |editor2-first=Ullrich |editor2-last=Steiner |year=2009 |title=Polymers, liquids and colloids in electric fields: interfacial instabilities, orientation and phase transitions |publisher=World Scientific |isbn=978-981-4271-68-4 }}
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| * {{ cite journal | last = Berger | first = Patricia | year = 1999 | month = July | title = Preparation and properties of an aqueous ferrofluid | journal = Journal of Chemical Education | volume = 76 | issue = 7 | pages = pp. 943–948 | issn = 00219584 | doi = 10.1021/ed076p943 | author-separator = , | author2 = Nicholas B. Adelman | author3 = Katie J. Beckman | author4 = Dean J. Campbell | display-authors = 3 | last5 = Ellis | first5 = Arthur B. | last6 = Lisensky | first6 = George C. }}
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| == External links ==
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| {{Commons|Ferrofluids}}
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| * [http://www.youtube.com/watch?v=PvtUt02zVAs How ferrofluid works video]
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| * [http://www.ifs.tohoku.ac.jp/nishiyama-lab/Research.html A comparison of ferrofluid and MR fluid (at the bottom of the page)]
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| * [http://jchemed.chem.wisc.edu/JCESoft/CCA/CCA2/MAIN/FEFLUID/CD2R1.HTM Chemistry comes alive: Ferrofluid]
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| * [http://www.ferrofluide.de/ Research project about ferrofluides]
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| * [http://web.archive.org/web/20040603005615/http://www-theory.mpip-mainz.mpg.de/~hwm/ferro.html Flow behavior of ferrofluids]
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| * [http://www.photonics.com/Content/ReadArticle.aspx?ArticleID=15447 MIT Explores Ferrofluid Applications]
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| * [http://www.kodama.hc.uec.ac.jp/protrudeflow/index.html Ferrofluid Sculptures by Sachiko Kodama] [http://video.google.com/videoplay?docid=7932498063864415301 (Google Video)]
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| * [http://www.dansdata.com/magnets.htm#ff Daniel Rutter has some fun with Ferrofluid]
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| * [http://www.inventus.at/index.php?id=74 High pressure valve]
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| * [http://www.flypmedia.com/issues/12/#15/1 Ferrofluid Sculptures] FLYP Media video story on Sachiko Kodama, an artist who works with ferrofluid.
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| * [http://www.youtube.com/watch?v=21WzdjqAG0s Liquid seal for Sterling piston (video)]
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| * [http://www.nanomagnetics.us Dynamic Etalon utilizing ferrofluid- image gallery, references, published papers]
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| * [http://chemistry.about.com/od/demonstrationsexperiments/ss/liquidmagnet.htm FerroFluid Synthesis]
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| * [http://mrsec.wisc.edu/Edetc/nanolab/ffexp/index.html Interdisciplinary education group: Ferrofluids] (contains videos and a lab for synthesis of ferrofluid)
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| * [http://voh.chem.ucla.edu/classes/Magnetic_fluids/ Synthesis of an Aqueous Ferrofluid] — instructions in [[PDF]] and [[DOC (computing)|DOC]] format
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| [[Category:Nanomaterials]]
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29 yr old Orthopaedic Surgeon Grippo from Saint-Paul, spends time with interests including model railways, top property developers in singapore developers in singapore and dolls. Finished a cruise ship experience that included passing by Runic Stones and Church.
Template:Multiple issues
In nuclear sciences and technologies, "activity" is the SI quantity related to the phenomenon of natural and artificial radioactivity. The SI unit of "activity" is becquerel (Bq) while that of "specific activity" is Bq/g. The old unit of "activity" was curie (Ci) making "specific activity", Ci/g.
Half-life
Experimentally-measured specific activity can be used to calculate the half-life of a radioactive element.
The definition of half-life (T1/2) is that
the half life T1/2 of an isotope is the length of time at which half
of a given quantity has decayed into another isotope, usually of a different element:
Or more generally:
Starting with N0, atoms of an element, the number of atoms, N,
remaining after time, t, is given by:
The natural log of both sides
The derivative with respect to time, t
Multiplying both sides by N
Yields
dN/dt represents the decay rate of atoms. The negative sign shows that the rate is negative, so the number of atoms is decreasing with time. Rearranging terms:
Example: half-life of Rb-87
One gram of rubidium-87 and a radioactivity count rate that, after taking solid angle effects into account, is consistent with a decay rate of 3200 decays per second corresponds to a specific activity of Template:Val. Rubidium's atomic weight is 87, so one gram is one 87th of a mole, or N=Template:Val atoms. Plugging in the numbers:
Formulation
Radioactivity is expressed as the decay rate of a particular radionuclide with decay constant λ and the number of atoms N:
Mass of the radionuclide is given by
where m is mass number of the radionuclide and NA is Avogadro's constant.
Specific radioactivity S is defined as radioactivity per unit mass of the radionuclide:
In addition, decay constant λ is related to the half-life T1/2 by the following equation:
Thus, specific radioactivity can also be described by
This equation is simplified by
When the unit of half-life converts a year
For example, specific radioactivity of radium 226 with a half-life of 1600 years is obtained by
This value derived from radium 226 was defined as unit of radioactivity known as Curie (Ci).