Difference between revisions of "Calorimeter"
Shawndouglas (talk | contribs) m (Fixed citation issue) |
|||
(22 intermediate revisions by 2 users not shown) | |||
Line 1: | Line 1: | ||
{{About|heat measuring devices|particle detectors|Calorimeter (particle physics)}} | |||
[[Image:Ice-calorimeter.jpg|150px|right|thumb|The world’s first '''ice-calorimeter''', used in the winter of 1782-83, by Antoine Lavoisier and Pierre-Simon Laplace, to determine the heat evolved in various chemical changes; calculations which were based on Joseph Black's prior discovery of latent heat. These experiments mark the foundation of [[thermochemistry]].]] | |||
A '''calorimeter''' (from Latin ''calor'', meaning heat) is an object used for calorimetry, the process of measuring the heat of chemical reactions or physical changes as well as heat capacity. More specifically, a calorimeter handles the [[enthalpy]] changes of chemical reactions by thermally isolating the reaction system from its surroundings.<ref name="AdvChemCalo">{{cite book |url=http://books.google.com/books?id=qciCdSFpFPkC&pg=PA149 |title=Advanced Chemistry |author=Clugston, Michael J.; Flemming, Rosalind |publisher=Oxford University Press |year=2000 |page=148 |isbn=0199146330}}</ref> A simple calorimeter just consists of a thermometer attached to a metal container full of water suspended above a combustion chamber and is sometimes referred to as a "coffee cup" calorimeter, whereas more sophisticated forms like "flame" and "bomb" calorimeters involve combustion of the substance in a burner or pressurized vessel. | |||
== | To find the enthalpy change per mole of a substance A in a reaction between two substances A and B, the substances are added to a calorimeter and the initial and final temperatures (before the reaction started and after it has finished) are noted. Multiplying the temperature change by the mass and specific heat capacities of the substances gives a value for the energy given off or absorbed during the reaction. Dividing the energy change by how many moles of A were present gives its enthalpy change of reaction. This method is used primarily in academic teaching as it describes the theory of calorimetry.<ref name="AdvChemCalo" /> It does not account for the heat loss through the container or the heat capacity of the thermometer and container itself. In addition, the object placed inside the calorimeter shows that the objects transferred their heat to the calorimeter and into the liquid, and the heat absorbed by the calorimeter and the liquid is equal to the heat given off by the metals.<ref name="ChemPrinCalo">{{cite book |url=http://books.google.com/books?id=2OxrDtDaSqIC&pg=PA378 |title=Chemical Principles |author=Zumdahl, Steven S. |publisher=Cengage Learning |year=2009 |page=378–87 |isbn=061894690X}}</ref> | ||
==History== | |||
In 1780, Antoine Lavoisier used a Guinea pig in his experiments with the calorimeter, a device used to measure heat production. The heat from the guinea pig's respiration melted snow surrounding the calorimeter, showing that respiratory gas exchange is a combustion, similar to a candle burning.<ref name="CalorieJournalNutr">{{cite journal |url=http://www.ajcn.org/cgi/content/full/79/5/899S |journal=American Journal of Clinical Nutrition |volume=79 |issue=5 |page=899S–906S |year=2004 |author=Buchholz, Andrea C; Schoeller, Dale A. |title=Is a Calorie a Calorie? |PMID=15113737 |accessdate=01 March 2013}}</ref> | |||
==Adiabatic calorimeters== | |||
An adiabatic calorimeter is a calorimeter used to examine a runaway reaction. Since the calorimeter runs in an adiabatic environment, any heat generated by the material sample under test causes the sample to increase in temperature, thus fueling the reaction. | |||
No adiabatic calorimeter is adiabatic — some heat will be lost by the sample to the sample holder. A mathematical correction factor, known as the phi-factor, can be used to adjust the calorimetric result to account for these heat losses. The phi-factor is the ratio of the thermal mass of the sample and sample holder to the thermal mass of the sample alone.<ref name="SHMMM83">{{cite book |url=http://books.google.com/books?id=8lANaR-Pqi4C&pg=PA410 |title=Springer Handbook of Materials Measurement Methods |editor=Czichos, Horst ; Saito, Tetsuya; Smith, Leslie R. |publisher=Springer |year=2006 |page=410–414 |isbn=3540303006 |accessdate=08 May 2013}}</ref> | |||
== | ==Reaction calorimeters== | ||
A reaction calorimeter is a calorimeter in which a chemical reaction is initiated within a closed insulated container. Reaction heats are measured and the total heat is obtained by integrating heat flow versus time. This is the standard used in industry to measure heats since industrial processes are engineered to run at constant temperatures. Reaction calorimetry can also be used to determine maximum heat release rate for chemical process engineering and for tracking the global kinetics of reactions.<ref name="IORCalor">{{cite book |url=http://books.google.com/books?id=NgV9yqD-sOYC&pg=PA200 |title=The Investigation of Organic Reactions and Their Mechanisms |editor=Maskill, Howard |publisher=John Wiley & Sons |year=2008 |page=200–202 |isbn=0470994169 |accessdate=08 May 2013}}</ref> There are four main methods for measuring the heat in reaction calorimeter: | |||
===Heat flow calorimetry=== | |||
The cooling/heating jacket controls either the temperature of the process or the temperature of the jacket. Heat is measured by monitoring the temperature difference between heat transfer fluid and the process fluid. In addition fill volumes (i.e. wetted area), specific heat, heat transfer coefficient have to be determined to arrive at a correct value. It is possible with this type of calorimeter to do reactions at reflux, although the accuracy is not as good.<ref name="IORCalor" /> | |||
===Heat balance calorimeter=== | |||
The cooling/heating jacket controls the temperature of the process. Heat is measured by monitoring the heat gained or lost by the heat transfer fluid.<ref name="IORCalor" /> | |||
===Power compensation=== | |||
Power compensation uses a heater placed within the vessel to maintain a constant temperature. The energy supplied to this heater can be varied as reactions require and the calorimetry signal is purely derived from this electrical power.<ref name="IORCalor" /> | |||
== | ===Constant flux=== | ||
Constant flux calorimetry (or COFLUX as it is often termed) is derived from heat balance calorimetry and uses specialized control mechanisms to maintain a constant heat flow (or flux) across the vessel wall. | |||
==Bomb calorimeters== | |||
[[File:Bombenkalorimeter mit bombe.jpg|thumb|Bomb calorimeter]] | |||
[ | [[File:Bomb Calorimeter.png|thumb|Bomb calorimeter]] | ||
A bomb calorimeter is a type of constant-volume calorimeter used in measuring the heat of combustion of a particular reaction. Bomb calorimeters have to withstand the large pressure within the calorimeter as the reaction is being measured. Electrical energy is used to ignite the fuel; as the fuel is burning, it will heat up the surrounding air, which expands and escapes through a tube that leads the air out of the calorimeter. When the air is escaping through the copper tube it will also heat up the water outside the tube. The temperature of the water allows for calculating calorie content of the fuel.<ref name="SHMMM83" /><ref name="AdvChemCalo" /> | |||
In more recent calorimeter designs, the whole bomb, pressurized with excess pure oxygen (typically at 30atm) and containing a weighed mass of a sample (typically 1-1.5 g) and a small fixed amount of water (to saturate the internal atmosphere, thus ensuring that all water produced is liquid, and removing the need to include enthalpy of vaporization in calculations), is submerged under a known volume of water (ca. 2000 ml) before the charge is electrically ignited. The bomb, with the known mass of the sample and oxygen, form a closed system - no gases escape during the reaction. The weighted reactant put inside the steel container is then ignited. Energy is released by the combustion and heat flow from this crosses the stainless steel wall, thus raising the temperature of the steel bomb, its contents, and the surrounding water jacket. The temperature change in the water is then accurately measured with a thermometer. This reading, along with a bomb factor (which is dependent on the heat capacity of the metal bomb parts), is used to calculate the energy given out by the sample burn. A small correction is made to account for the electrical energy input, the burning fuse, and acid production (by titration of the residual liquid). After the temperature rise has been measured, the excess pressure in the bomb is released. | |||
Basically, a bomb calorimeter consists of a small cup to contain the sample, oxygen, a stainless steel bomb, water, a stirrer, a thermometer, the dewar or insulating container (to prevent heat flow from the calorimeter to the surroundings) and ignition circuit connected to the bomb. By using stainless steel for the bomb, the reaction will occur with no volume change observed. | |||
Since there is no heat exchange between the calorimeter and surroundings → Q = 0 (adiabatic) ; no work performed → W = 0 | |||
Thus, the total internal energy change ΔU(total) = Q + W = 0 | |||
Also, total internal energy change ΔU(total) = ΔU(system) + ΔU(surroundings) = 0 | |||
→ ΔU(system) = - ΔU(surroundings) = -C<sub>v</sub> ΔT (constant volume → dV = 0) | |||
C | where C<sub>v</sub> = heat capacity of the bomb | ||
Before the bomb can be used to determine heat of combustion of any compound, it must be calibrated. | |||
The value of C<sub>v</sub> can be estimated by | |||
C<sub>v</sub> (calorimeter) = m (water). C<sub>v</sub> (water) + m (steel). C<sub>v</sub> (steel) | |||
m (water) and m (steel) can be measured; | |||
C<sub>v</sub>(water)= 1 cal/g.K | |||
C<sub>v</sub>(steel)= 0.1 cal/g.K | |||
In laboratory, C<sub>v</sub> is determined by running a compound with known heat of combustion value: C<sub>v</sub> = H<sub>c</sub>/ΔT | |||
Common compounds are benzoic acid (H<sub>c</sub> = 6318 cal/g) or p-methyl benzoic acid (H<sub>c</sub> = 6957 cal/g). | |||
= | Temperature (T) is recorded every minute and ΔT = T(final) - T(initial) | ||
A small factor contributes to the correction of the total heat of combustion is the fuse wire. Nickel fuse wire is often used and has heat of combustion = 981.3 cal/g | |||
In order to calibrate the bomb, a small amount (~ 1 g) of benzoic acid, or p-methyl benzoic acid is weighed. | |||
A length of Nickel fuse wire (~10 cm) is weighed both before and after the combustion process. Mass of fuse wire burned Δm = m(before) - m(after) | |||
The combustion of sample (benzoic acid) inside the bomb ΔH<sub>c</sub> = ΔH<sub>c</sub> (benzoic acid) x m (benzoic acid) + ΔH<sub>c</sub> (Ni fuse wire) x Δm (Ni fuse wire) | |||
ΔH<sub>c</sub> = C<sub>v</sub>. ΔT → C<sub>v</sub> = ΔH<sub>c</sub>/ΔT | |||
Once C<sub>v</sub> value of the bomb is determined, the bomb is ready to use to calculate heat of combustion of any compounds by ΔH<sub>c</sub> = C<sub>v</sub>. ΔT<ref name="Polik">{{cite web |url=http://www.chem.hope.edu/~polik/Chem345-1997/calorimetry/bombcalorimetry1.html |title=Bomb Calorimetry |author=Polik, W. |publisher=Hope College Chemistry Department |date=1997 |accessdate=01 March 2013}}</ref> | |||
== | ==Calvet-type calorimeters== | ||
The detection is based on a three-dimensional fluxmeter sensor. The fluxmeter element consists of a ring of several thermocouples in series. The corresponding thermopile of high thermal conductivity surrounds the experimental space within the calorimetric block. The radial arrangement of the thermopiles guarantees an almost complete integration of the heat. This is verified by the calculation of the efficiency ratio that indicates that an average value of 94% +/- 1% of heat is transmitted through the sensor on the full range of temperature of the Calvet-type calorimeter. In this setup, the sensitivity of the calorimeter is not affected by the crucible, the type of purge gas, or the flow rate. The main advantage of the setup is the increase of the experimental vessel's size and consequently the size of the sample, without affecting the accuracy of the calorimetric measurement.<ref name="HTACCalor">{{cite book |url=http://books.google.com/books?id=33_3DBLGzMYC&pg=PR619 |title=Handbook of Thermal Analysis and Calorimetry: Principles and Practice |editor=Brown, Michael E. |publisher=Elsevier |year=1998 |page=619–629 |isbn=0080539599 |accessdate=08 May 2013}}</ref> | |||
The calibration of the calorimetric detectors is a key parameter and has to be performed very carefully. For Calvet-type calorimeters, a specific calibration, so called Joule effect or electrical calibration, has been developed to overcome all the problems encountered by a calibration done with standard materials. | |||
The main advantages of this type of calibration are as follows: | |||
*It is an absolute calibration. | |||
*The use of standard materials for calibration is not necessary. The calibration can be performed at a constant temperature, in the heating mode and in the cooling mode. | |||
*It can be applied to any experimental vessel volume. | |||
*It is a very accurate calibration. | |||
== | An example of Calvet-type calorimeter is the C80 Calorimeter (reaction, isothermal and scanning calorimeter).<ref name="Calvet-type calorimeter">{{cite web |url=http://www.setaram.com/C80.htm C80 |title=Calorimetry C-80 |publisher=Setaram Instrumentation |accessdate=01 March 2013}}</ref> | ||
==Constant-pressure calorimeter== | |||
A '''constant-pressure calorimeter''' measures the change in enthalpy of a reaction occurring in solution during which the atmospheric pressure remains constant. | |||
An example is a coffee-cup calorimeter, which is constructed from two nested Styrofoam cups and a lid with two holes, allowing insertion of a thermometer and a stirring rod. The inner cup holds a known amount of a solute, usually water, that absorbs the heat from the reaction. When the reaction occurs, the outer cup provides insulation.<ref name="CCRConPresCalor">{{cite book |url=http://books.google.com/books?id=sorFoN-ne2EC&pg=PA226 |title=Chemistry and Chemical Reactivity |author=Kotz, John C.; Treichel, Paul M.; Townsend, John R. |publisher=Cengage Learning |year=2011 |page=226–227 |isbn=0840048289 |accessdate=11 May 2013}}</ref> Then: | |||
<math>Cp = \frac {W\Delta H}{M\Delta T}</math> | |||
where... | |||
:<math>Cp</math> = Specific heat at constant pressure | |||
:<math>\Delta H</math> = Enthalpy of solution | |||
:<math>\Delta T</math> = Change in temperature | |||
:<math>W</math> = mass of solute | |||
:<math>M</math> = molecular mass of solute | |||
The measurement of heat using a simple calorimeter, like the coffee cup calorimeter, is an example of constant-pressure calorimetry, since the pressure (atmospheric pressure) remains constant during the process. Constant-pressure calorimetry is used in determining the changes in enthalpy occurring in solution. Under these conditions the change in enthalpy equals the heat. | |||
==Differential scanning calorimeter== | |||
In a '''differential scanning calorimeter''' (DSC), heat flow into a sample—usually contained in a small aluminum capsule or 'pan'—is measured differentially, i.e., by comparing it to the flow into an empty reference pan. | |||
In a '''[[heat flux]] DSC''', both pans sit on a small slab of material with a known (calibrated) heat resistance K. The temperature of the calorimeter is raised linearly with time (scanned), i.e., the heating rate | |||
dT/dt = β | |||
is kept constant. This time linearity requires good design and good (computerized) temperature control. Of course, controlled cooling and isothermal experiments are also possible. | |||
== | Heat flows into the two pans by conduction. The flow of heat into the sample is larger because of its heat capacity ''C<sub>p</sub>''. The difference in flow ''dq''/''dt'' induces a small temperature difference Δ''T'' across the slab. This temperature difference is measured using a thermocouple.<ref name="HöhneDiff03">{{cite book |url=http://books.google.com/books?id=tRt-Z5Duz7QC&pg=PA1 |title=Differential Scanning Calorimetry |author=Höhne, Günther; Hemminger, W.F.; Flammersheim, H.J. |publisher=Springer |year=2003 |page=1–7 |isbn=354000467X |accessdate=11 May 2013}}</ref> The heat capacity can in principle be determined from this signal: | ||
<math>\Delta T = K {dq\over dt} = K C_p\, \beta</math> | |||
Note that this formula (equivalent to Newton's law of heat flow) is analogous to, and much older than, Ohm's law of electric flow: | |||
ΔV = R dQ/dt = R I. | |||
When suddenly heat is absorbed by the sample (e.g., when the sample melts), the signal will respond and exhibit a peak. | |||
<math>{dq\over dt} = C_p \beta + f(t,T) </math> | |||
From the integral of this peak the enthalpy of melting can be determined, and from its onset the melting temperature. | |||
Differential scanning calorimetry is a workhorse technique in many fields, particularly in polymer characterization. | |||
[http:// | |||
A '''modulated temperature differential scanning calorimeter''' (MTDSC) is a type of DSC in which a small oscillation is imposed upon the otherwise linear heating rate. | |||
This has a number of advantages. It facilitates the direct measurement of the heat capacity in one measurement, even in (quasi-)isothermal conditions. It permits the simultaneous measurement of heat effects that are reversible and not reversible at the timescale of the oscillation (reversing and non-reversing heat flow, respectively). It increases the sensitivity of the heat capacity measurement, allowing for scans at a slow underlying heating rate. | |||
'''Safety Screening''':- DSC may also be used as an initial safety screening tool. In this mode the sample will be housed in a non-reactive crucible (often gold, or gold-plated steel), and which will be able to withstand pressure (typically up to 100 bar). The presence of an exothermic event can then be used to assess the stability of a substance to heat. However, due to a combination of relatively poor sensitivity, slower than normal scan rates (typically 2-3°/min - due to much heavier crucible) and unknonwn [[activation energy]], it is necessary to deduct about 75-100°C from the initial start of the observed exotherm to '''suggest''' a maximum temperature for the material. A much more accurate data set can be obtained from an adiabatic calorimeter, but such a test may take 2–3 days from ambient at a rate of 3°C increment per half hour. | |||
==Isothermal titration calorimeter== | |||
In an '''isothermal titration calorimeter''', the heat of reaction is used to follow a titration experiment. This permits determination of the midpoint (stoichiometry) (N) of a reaction as well as its enthalpy (delta H), entropy (delta S) and of primary concern the binding affinity (Ka).<ref name="PBIsoCalor">{{cite book |url=http://books.google.com/books?id=6h3In_GcIzEC&pg=PT312 |title=Physical Biochemistry: Principles and Applications |author=Sheehan, David |publisher=John Wiley & Sons |year=2009 |edition=2nd |page=296–99 |isbn=0470856025 |accessdate=11 May 2013}}</ref> | |||
The technique is gaining in importance, particularly in the field of biochemistry, because it facilitates determination of substrate binding to enzymes. The technique is commonly used in the pharmaceutical industry to characterize potential drug candidates.<ref name="PLIIso">{{cite book |url=http://books.google.com/books?id=0Jqe2I5SwbkC&pg=PA32 |title=Peptide-Lipid Interactions |author=Simon, Sidney A.; McIntosh, Thomas J. |publisher=Academic Press |year=2002 |page=32–33 |isbn=0080925855 |accessdate=11 May 2013}}</ref> | |||
==References== | |||
<references /> | |||
<!---Place all category tags here--> | |||
[[Category:Laboratory equipment]] |
Latest revision as of 18:11, 19 September 2021
A calorimeter (from Latin calor, meaning heat) is an object used for calorimetry, the process of measuring the heat of chemical reactions or physical changes as well as heat capacity. More specifically, a calorimeter handles the enthalpy changes of chemical reactions by thermally isolating the reaction system from its surroundings.[1] A simple calorimeter just consists of a thermometer attached to a metal container full of water suspended above a combustion chamber and is sometimes referred to as a "coffee cup" calorimeter, whereas more sophisticated forms like "flame" and "bomb" calorimeters involve combustion of the substance in a burner or pressurized vessel.
To find the enthalpy change per mole of a substance A in a reaction between two substances A and B, the substances are added to a calorimeter and the initial and final temperatures (before the reaction started and after it has finished) are noted. Multiplying the temperature change by the mass and specific heat capacities of the substances gives a value for the energy given off or absorbed during the reaction. Dividing the energy change by how many moles of A were present gives its enthalpy change of reaction. This method is used primarily in academic teaching as it describes the theory of calorimetry.[1] It does not account for the heat loss through the container or the heat capacity of the thermometer and container itself. In addition, the object placed inside the calorimeter shows that the objects transferred their heat to the calorimeter and into the liquid, and the heat absorbed by the calorimeter and the liquid is equal to the heat given off by the metals.[2]
History
In 1780, Antoine Lavoisier used a Guinea pig in his experiments with the calorimeter, a device used to measure heat production. The heat from the guinea pig's respiration melted snow surrounding the calorimeter, showing that respiratory gas exchange is a combustion, similar to a candle burning.[3]
Adiabatic calorimeters
An adiabatic calorimeter is a calorimeter used to examine a runaway reaction. Since the calorimeter runs in an adiabatic environment, any heat generated by the material sample under test causes the sample to increase in temperature, thus fueling the reaction.
No adiabatic calorimeter is adiabatic — some heat will be lost by the sample to the sample holder. A mathematical correction factor, known as the phi-factor, can be used to adjust the calorimetric result to account for these heat losses. The phi-factor is the ratio of the thermal mass of the sample and sample holder to the thermal mass of the sample alone.[4]
Reaction calorimeters
A reaction calorimeter is a calorimeter in which a chemical reaction is initiated within a closed insulated container. Reaction heats are measured and the total heat is obtained by integrating heat flow versus time. This is the standard used in industry to measure heats since industrial processes are engineered to run at constant temperatures. Reaction calorimetry can also be used to determine maximum heat release rate for chemical process engineering and for tracking the global kinetics of reactions.[5] There are four main methods for measuring the heat in reaction calorimeter:
Heat flow calorimetry
The cooling/heating jacket controls either the temperature of the process or the temperature of the jacket. Heat is measured by monitoring the temperature difference between heat transfer fluid and the process fluid. In addition fill volumes (i.e. wetted area), specific heat, heat transfer coefficient have to be determined to arrive at a correct value. It is possible with this type of calorimeter to do reactions at reflux, although the accuracy is not as good.[5]
Heat balance calorimeter
The cooling/heating jacket controls the temperature of the process. Heat is measured by monitoring the heat gained or lost by the heat transfer fluid.[5]
Power compensation
Power compensation uses a heater placed within the vessel to maintain a constant temperature. The energy supplied to this heater can be varied as reactions require and the calorimetry signal is purely derived from this electrical power.[5]
Constant flux
Constant flux calorimetry (or COFLUX as it is often termed) is derived from heat balance calorimetry and uses specialized control mechanisms to maintain a constant heat flow (or flux) across the vessel wall.
Bomb calorimeters
A bomb calorimeter is a type of constant-volume calorimeter used in measuring the heat of combustion of a particular reaction. Bomb calorimeters have to withstand the large pressure within the calorimeter as the reaction is being measured. Electrical energy is used to ignite the fuel; as the fuel is burning, it will heat up the surrounding air, which expands and escapes through a tube that leads the air out of the calorimeter. When the air is escaping through the copper tube it will also heat up the water outside the tube. The temperature of the water allows for calculating calorie content of the fuel.[4][1]
In more recent calorimeter designs, the whole bomb, pressurized with excess pure oxygen (typically at 30atm) and containing a weighed mass of a sample (typically 1-1.5 g) and a small fixed amount of water (to saturate the internal atmosphere, thus ensuring that all water produced is liquid, and removing the need to include enthalpy of vaporization in calculations), is submerged under a known volume of water (ca. 2000 ml) before the charge is electrically ignited. The bomb, with the known mass of the sample and oxygen, form a closed system - no gases escape during the reaction. The weighted reactant put inside the steel container is then ignited. Energy is released by the combustion and heat flow from this crosses the stainless steel wall, thus raising the temperature of the steel bomb, its contents, and the surrounding water jacket. The temperature change in the water is then accurately measured with a thermometer. This reading, along with a bomb factor (which is dependent on the heat capacity of the metal bomb parts), is used to calculate the energy given out by the sample burn. A small correction is made to account for the electrical energy input, the burning fuse, and acid production (by titration of the residual liquid). After the temperature rise has been measured, the excess pressure in the bomb is released.
Basically, a bomb calorimeter consists of a small cup to contain the sample, oxygen, a stainless steel bomb, water, a stirrer, a thermometer, the dewar or insulating container (to prevent heat flow from the calorimeter to the surroundings) and ignition circuit connected to the bomb. By using stainless steel for the bomb, the reaction will occur with no volume change observed.
Since there is no heat exchange between the calorimeter and surroundings → Q = 0 (adiabatic) ; no work performed → W = 0 Thus, the total internal energy change ΔU(total) = Q + W = 0
Also, total internal energy change ΔU(total) = ΔU(system) + ΔU(surroundings) = 0 → ΔU(system) = - ΔU(surroundings) = -Cv ΔT (constant volume → dV = 0)
where Cv = heat capacity of the bomb
Before the bomb can be used to determine heat of combustion of any compound, it must be calibrated. The value of Cv can be estimated by Cv (calorimeter) = m (water). Cv (water) + m (steel). Cv (steel)
m (water) and m (steel) can be measured;
Cv(water)= 1 cal/g.K
Cv(steel)= 0.1 cal/g.K
In laboratory, Cv is determined by running a compound with known heat of combustion value: Cv = Hc/ΔT
Common compounds are benzoic acid (Hc = 6318 cal/g) or p-methyl benzoic acid (Hc = 6957 cal/g).
Temperature (T) is recorded every minute and ΔT = T(final) - T(initial)
A small factor contributes to the correction of the total heat of combustion is the fuse wire. Nickel fuse wire is often used and has heat of combustion = 981.3 cal/g
In order to calibrate the bomb, a small amount (~ 1 g) of benzoic acid, or p-methyl benzoic acid is weighed. A length of Nickel fuse wire (~10 cm) is weighed both before and after the combustion process. Mass of fuse wire burned Δm = m(before) - m(after)
The combustion of sample (benzoic acid) inside the bomb ΔHc = ΔHc (benzoic acid) x m (benzoic acid) + ΔHc (Ni fuse wire) x Δm (Ni fuse wire)
ΔHc = Cv. ΔT → Cv = ΔHc/ΔT
Once Cv value of the bomb is determined, the bomb is ready to use to calculate heat of combustion of any compounds by ΔHc = Cv. ΔT[6]
Calvet-type calorimeters
The detection is based on a three-dimensional fluxmeter sensor. The fluxmeter element consists of a ring of several thermocouples in series. The corresponding thermopile of high thermal conductivity surrounds the experimental space within the calorimetric block. The radial arrangement of the thermopiles guarantees an almost complete integration of the heat. This is verified by the calculation of the efficiency ratio that indicates that an average value of 94% +/- 1% of heat is transmitted through the sensor on the full range of temperature of the Calvet-type calorimeter. In this setup, the sensitivity of the calorimeter is not affected by the crucible, the type of purge gas, or the flow rate. The main advantage of the setup is the increase of the experimental vessel's size and consequently the size of the sample, without affecting the accuracy of the calorimetric measurement.[7]
The calibration of the calorimetric detectors is a key parameter and has to be performed very carefully. For Calvet-type calorimeters, a specific calibration, so called Joule effect or electrical calibration, has been developed to overcome all the problems encountered by a calibration done with standard materials.
The main advantages of this type of calibration are as follows:
- It is an absolute calibration.
- The use of standard materials for calibration is not necessary. The calibration can be performed at a constant temperature, in the heating mode and in the cooling mode.
- It can be applied to any experimental vessel volume.
- It is a very accurate calibration.
An example of Calvet-type calorimeter is the C80 Calorimeter (reaction, isothermal and scanning calorimeter).[8]
Constant-pressure calorimeter
A constant-pressure calorimeter measures the change in enthalpy of a reaction occurring in solution during which the atmospheric pressure remains constant.
An example is a coffee-cup calorimeter, which is constructed from two nested Styrofoam cups and a lid with two holes, allowing insertion of a thermometer and a stirring rod. The inner cup holds a known amount of a solute, usually water, that absorbs the heat from the reaction. When the reaction occurs, the outer cup provides insulation.[9] Then:
where...
- = Specific heat at constant pressure
- = Enthalpy of solution
- = Change in temperature
- = mass of solute
- = molecular mass of solute
The measurement of heat using a simple calorimeter, like the coffee cup calorimeter, is an example of constant-pressure calorimetry, since the pressure (atmospheric pressure) remains constant during the process. Constant-pressure calorimetry is used in determining the changes in enthalpy occurring in solution. Under these conditions the change in enthalpy equals the heat.
Differential scanning calorimeter
In a differential scanning calorimeter (DSC), heat flow into a sample—usually contained in a small aluminum capsule or 'pan'—is measured differentially, i.e., by comparing it to the flow into an empty reference pan.
In a heat flux DSC, both pans sit on a small slab of material with a known (calibrated) heat resistance K. The temperature of the calorimeter is raised linearly with time (scanned), i.e., the heating rate dT/dt = β is kept constant. This time linearity requires good design and good (computerized) temperature control. Of course, controlled cooling and isothermal experiments are also possible.
Heat flows into the two pans by conduction. The flow of heat into the sample is larger because of its heat capacity Cp. The difference in flow dq/dt induces a small temperature difference ΔT across the slab. This temperature difference is measured using a thermocouple.[10] The heat capacity can in principle be determined from this signal:
Note that this formula (equivalent to Newton's law of heat flow) is analogous to, and much older than, Ohm's law of electric flow: ΔV = R dQ/dt = R I.
When suddenly heat is absorbed by the sample (e.g., when the sample melts), the signal will respond and exhibit a peak.
From the integral of this peak the enthalpy of melting can be determined, and from its onset the melting temperature.
Differential scanning calorimetry is a workhorse technique in many fields, particularly in polymer characterization.
A modulated temperature differential scanning calorimeter (MTDSC) is a type of DSC in which a small oscillation is imposed upon the otherwise linear heating rate.
This has a number of advantages. It facilitates the direct measurement of the heat capacity in one measurement, even in (quasi-)isothermal conditions. It permits the simultaneous measurement of heat effects that are reversible and not reversible at the timescale of the oscillation (reversing and non-reversing heat flow, respectively). It increases the sensitivity of the heat capacity measurement, allowing for scans at a slow underlying heating rate.
Safety Screening:- DSC may also be used as an initial safety screening tool. In this mode the sample will be housed in a non-reactive crucible (often gold, or gold-plated steel), and which will be able to withstand pressure (typically up to 100 bar). The presence of an exothermic event can then be used to assess the stability of a substance to heat. However, due to a combination of relatively poor sensitivity, slower than normal scan rates (typically 2-3°/min - due to much heavier crucible) and unknonwn activation energy, it is necessary to deduct about 75-100°C from the initial start of the observed exotherm to suggest a maximum temperature for the material. A much more accurate data set can be obtained from an adiabatic calorimeter, but such a test may take 2–3 days from ambient at a rate of 3°C increment per half hour.
Isothermal titration calorimeter
In an isothermal titration calorimeter, the heat of reaction is used to follow a titration experiment. This permits determination of the midpoint (stoichiometry) (N) of a reaction as well as its enthalpy (delta H), entropy (delta S) and of primary concern the binding affinity (Ka).[11]
The technique is gaining in importance, particularly in the field of biochemistry, because it facilitates determination of substrate binding to enzymes. The technique is commonly used in the pharmaceutical industry to characterize potential drug candidates.[12]
References
- ↑ 1.0 1.1 1.2 Clugston, Michael J.; Flemming, Rosalind (2000). Advanced Chemistry. Oxford University Press. p. 148. ISBN 0199146330. http://books.google.com/books?id=qciCdSFpFPkC&pg=PA149.
- ↑ Zumdahl, Steven S. (2009). Chemical Principles. Cengage Learning. p. 378–87. ISBN 061894690X. http://books.google.com/books?id=2OxrDtDaSqIC&pg=PA378.
- ↑ Buchholz, Andrea C; Schoeller, Dale A. (2004). "Is a Calorie a Calorie?". American Journal of Clinical Nutrition 79 (5): 899S–906S. PMID 15113737. http://www.ajcn.org/cgi/content/full/79/5/899S. Retrieved 01 March 2013.
- ↑ 4.0 4.1 Czichos, Horst ; Saito, Tetsuya; Smith, Leslie R., ed. (2006). Springer Handbook of Materials Measurement Methods. Springer. p. 410–414. ISBN 3540303006. http://books.google.com/books?id=8lANaR-Pqi4C&pg=PA410. Retrieved 08 May 2013.
- ↑ 5.0 5.1 5.2 5.3 Maskill, Howard, ed. (2008). The Investigation of Organic Reactions and Their Mechanisms. John Wiley & Sons. p. 200–202. ISBN 0470994169. http://books.google.com/books?id=NgV9yqD-sOYC&pg=PA200. Retrieved 08 May 2013.
- ↑ Polik, W. (1997). "Bomb Calorimetry". Hope College Chemistry Department. http://www.chem.hope.edu/~polik/Chem345-1997/calorimetry/bombcalorimetry1.html. Retrieved 01 March 2013.
- ↑ Brown, Michael E., ed. (1998). Handbook of Thermal Analysis and Calorimetry: Principles and Practice. Elsevier. p. 619–629. ISBN 0080539599. http://books.google.com/books?id=33_3DBLGzMYC&pg=PR619. Retrieved 08 May 2013.
- ↑ C80 "Calorimetry C-80". Setaram Instrumentation. http://www.setaram.com/C80.htm C80. Retrieved 01 March 2013.
- ↑ Kotz, John C.; Treichel, Paul M.; Townsend, John R. (2011). Chemistry and Chemical Reactivity. Cengage Learning. p. 226–227. ISBN 0840048289. http://books.google.com/books?id=sorFoN-ne2EC&pg=PA226. Retrieved 11 May 2013.
- ↑ Höhne, Günther; Hemminger, W.F.; Flammersheim, H.J. (2003). Differential Scanning Calorimetry. Springer. p. 1–7. ISBN 354000467X. http://books.google.com/books?id=tRt-Z5Duz7QC&pg=PA1. Retrieved 11 May 2013.
- ↑ Sheehan, David (2009). Physical Biochemistry: Principles and Applications (2nd ed.). John Wiley & Sons. p. 296–99. ISBN 0470856025. http://books.google.com/books?id=6h3In_GcIzEC&pg=PT312. Retrieved 11 May 2013.
- ↑ Simon, Sidney A.; McIntosh, Thomas J. (2002). Peptide-Lipid Interactions. Academic Press. p. 32–33. ISBN 0080925855. http://books.google.com/books?id=0Jqe2I5SwbkC&pg=PA32. Retrieved 11 May 2013.