Precision Analog Applications Seminar Thermocouple Application Section 3 Texas Instruments Precision Analog Applications Seminar Thermocouples Outline This session will focus on the thermocouple Theory Measurement and reference junctions Parasitic junction Cold junction compensation Software Hardware Thermocouple circuits Nonlinearity and compensation Source: Omega Engineering Inc. Thermocouples are a popular temperature sensor choice due to their wide temperature range capability and rugged design. This session will focus on basic thermocouple theory, principles and how one goes about applying them in a manner such that they produce their best performance. Texas Instruments Precision Analog Applications Seminar Thermocouples A common and important use of thermocouples by engineers! Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals – Cool Seebeck Voltage + Conductor Thermal energy movement Hot Electrical charge carrier movement TC Temperature gradient (∆T) TH A simple wire of any metal will produce a voltage when there is a temperature difference between the two ends. Yes… believe it. www.dataforth.com/catalog/pdf/an106.pdf When one end of a conductive material is heated to a temperature larger than the opposite end, the electrons at the hot end are more thermally energized than the electrons at the cooler end. These more energetic electrons begin to diffuse toward the cooler end. Of course, charge neutrality is maintained; however, this redistribution of electrons creates a negative charge at the cool end and an equal positive charge (absence of electrons) at the hot end. Consequently, heating one end of a conductor creates an electrostatic voltage due to the redistribution of thermally energized electrons throughout the entire material. This is referred to as the “Seebeck effect.” While a single wire does not form a thermocouple, this “Seebeck effect” is the fundamental property that governs thermocouple operation. Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals – Seebeck coefficient (µV/°C) Conductor A + Open-circuit voltage = 0V – Conductor B Equal Seebeck coefficient (µV/°C) + Direct measurement of the Seebeck voltage of a single wire is impossible. Another wire of the same metal produces an identical Seebeck voltage resulting in a net voltage of 0V at the measurement points. Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals Source: www.efunda.com/ Different metals, metal alloys and semiconductor materials are employed in the construction of thermocouples. Their thermoelectric sensitivities, or Seebeck coefficients, can vary significantly in magnitude and may be positive or negative. The materials listed have been well characterized, standardized, and form the basis for the commonly available thermocouples. Note that different tables may list a somewhat different Seebeck coefficient for a given material. Be sure to note the temperature at which the coefficient is specified. Thermocouples are not perfectly linear across temperature. They may produce a different Seebeck voltage coefficient within the different temperature ranges that they operate. This occurs because the Seebeck voltage generated is dependent on a complex mix consisting of the Seebeck, Peltier and Thomson effects. Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals + 0.002V – larger Seebeck coefficient Virtually no voltage developed here! smaller Seebeck coefficient Nearly all the voltage developed across here! Perhaps the most misunderstood issue regarding thermocouples is that no voltage is produced at the measurement junction. The junction completes the circuit so that current flow can take place. A voltage is developed along each wire as the temperature changes. The voltage difference is observed at the receiving end because the two differing metals have different Seebeck coefficients and produce a voltage difference at the meter point. Misinformation about thermocouples abounds on the internet with statements such as “… the junction between two metals generates a voltage which is a function of temperature.” Many other references and web sites make the same error. A more accurate explanation can be found at: www.dataforth.com/catalog/pdf/an106.pdf Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals The thermocouple junction + Conductor A Positive Seebeck coefficient Thermocouple Junction – Conductor B Negative or less positive Seebeck coefficient A thermocouple junction is formed when two dissimilar metals, metal alloys or semiconductor materials are joined together. However, the practical thermocouple not only consists of the junction, but connecting leads made of the same dissimilar metals. In use, the thermocouple junction is exposed to the “hot” (or cold) temperature point. The leads connect between the junction and a measurement device located at a different temperature such as room. It is along these lead lengths where the temperature gradient is present resulting in the generation of the two individual Seebeck EMF’s. Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals Thermocouples types and their response All curves relative to 0°C reference Thermocouples are classified by type which is associated with their useable temperature range, sensitivity and accuracy. The commonly used metals include: chromium, copper, nickel, iron, platinum, rhodium, and rhenium. This chart provides the thermal response of several different types of thermocouples. Notice that the copper-constantan “type T” thermocouple has a limited use temperature range compared to the others. Also note the differences in the thermocouple sensitivities and their linearity ∆V/∆T. Those having a more limited temperature range tend to have better linearity characteristics. Because of poor linearity some higher temperature thermocouples aren’t intended for measuring temperatures below 0°F (-18°C). As previously mentioned the Seebeck coefficient may be listed with a different value, which may depend on the source of the information. The specified temperature was mentioned as a cause for the difference. For example, the copperconstantan “type-T” thermocouple is listed with a Seebeck coefficient of 41µV/°C at 25°C*, and 38.75µV/°C at 0°C, in the Agilent Technologies, Application note 290. A value of 38µV/°C is often listed. NOTE: A similar value is given at the “efunda” website which lists a “type-T” Seebeck coefficient of 40.6µV/°C at 25°C. Texas Instruments Precision Analog Applications Seminar Thermocouples Theory – the fundamentals Positive Seebeck coefficient + 6.5µV/°C Copper 41.5uV/°C – Electrical charge carrier movement Thermal energy flow -35µV/°C Constantan Negative Seebeck coefficient Temperature measurement junction Electrical charge carrier movement Different thermocouple materials have different capacities for moving charge carriers in response to thermal flow. The current level in one conductor will overcome or complement the potential for thermally generated current flow in the other conductor. The result is a continuous current flow that is the difference between the currents generated in the two conductors. For this example, the two selected metals are copper and constantan which have Seebeck coefficients of approximately +6.5µV/°C and -35µV/°C, respectively. The difference between these two coefficients results in a thermocouple sensitivity of about +41.5µV/°C at 0°C. Texas Instruments Precision Analog Applications Seminar Thermocouples Reference junctions Added reference junction V Conductor A Conductor A Temperature measurement junction Conductor B The thermocouple example in the previous slide had a thermoelectric sensitivity of about 41.5µV/°C. That is an important bit of information, but equally important and missing is a temperature reference point. A temperature change can be measured, but the actual temperature is still an unknown. Adding a second junction and holding it at a known reference temperature allows an unknown temperature at the other junction to be found. Since the circuit is a continuous loop in which current flows it can be opened and a meter inserted. The voltmeter has a high internal resistance and produces a voltage proportional to the current. Keep in mind that the voltage is strictly dependent upon temperature; the relationship between Seebeck voltage and temperature is fixed. However, the relationship between temperature and current is variable and will depend on the overall circuit resistance. Texas Instruments Precision Analog Applications Seminar Thermocouples Reference junctions A Thermocouple Circuit Reference Junction Measurement junction V Copper Copper Constantan Tunk °C 0°C ice bath Tunk = Tref + ∆T = Tref + V / S where: S = Seebeck sensitivity Placing the reference junction in an ice bath with a temperature very close to 0°C allows for the unknown temperature to be determined using the following relations: V = S · ∆T ∆T = V / S where: V = measured voltage, S = Seebeck coefficient (V/°C) Then: Tunk = Tref + ∆T = Tref + V / S Texas Instruments Precision Analog Applications Seminar Thermocouples Reference junctions An example Reference Junction Measurement junction V Copper Copper Constantan Tunk °C 0°C ice bath Tunk = 0°C + [(3.528mV) / (41.5µV/°C)] = 85.0°C For example: If a copper-constantan thermocouple produces a voltage of 3.528mV then, Tunk = 0°C + [(3.528mV) / (41.5µV/°C)] = 85.0°C Texas Instruments Precision Analog Applications Seminar Thermocouples Parasitic junctions Reference junction J1 V Conductor C1 Conductor C2 (Cu) (Cu) Conductor A1 Conductor A2 (non Cu) (non Cu) J3 J4 ∆t Measurement junction J2 Conductor B A copper-to-copper connection is unique to the case of the “type T” thermocouple. But when a thermocouple other than the “type T” is employed parasitic thermocouples are created at the meter connections or leads leading to the meter function. These parasitic thermocouples may introduce measurement errors. Each generates a Seebeck voltage dependent on the junction materials and relevant temperature gradient. Texas Instruments Precision Analog Applications Seminar Thermocouples Parasitic junctions Region of large temperature change Measurement point Extension Grade Wire Measurement Grade Wire One way to avoid the problems associated with creating parasitic thermocouple junctions is to use extension wires similar in characteristics to the actual thermocouple section. Thermocouple wire can be relatively expensive and comes in various accuracy grades. Measurement-grade wire is made of higher purity metals and more accurately controlled alloys, thus providing greater accuracy. This higher quality wire is often used only in the region of greatest temperature change where virtually all the voltage is produced. Depending on the application, this may be only in the first few centimeters near the measurement junction. Lower quality wire called “extension grade” can be used to connect to the measurement system without seriously degrading accuracy. Texas Instruments Precision Analog Applications Seminar Thermocouples Parasitic junctions Reference junction J1 V Conductor C1 Conductor C2 (Cu) (Cu) Conductor A1 Conductor A2 (non Cu) (non Cu) J3 J4 Isothermal block Measurement junction J2 Conductor B With the “type T” thermocouple the copper line can be opened and directly connected to copper extension lines without forming parasitic thermocouples. But with other materials that won’t be the case. Even then it’s not the end of the world because the two parasitic junctions, J3 and J4, will produce equal and opposite voltages - provided they are identical and at the same temperature. Moderately accurate measurements will be obtained even if they aren’t. A way to help assure this is to make the extension wire connections at an isothermal block. The block maintains the two junctions at the same temperature and provides nearly identical electrical connection characteristics. The block must be insulated for the electrical connections and provide for good thermal conductivity between them. Texas Instruments Precision Analog Applications Seminar Thermocouples Parasitic junctions Isothermal block example Thermocouple attachment terminals (multiple) Copper isothermal block Reference temperature sensor (PN junction) This is an image of an isothermal block that is intended for 4 individual thermocouples. The copper isothermal block fits over plastic terminal blocks. It has sufficient thermal mass such that all of the terminals should be held very close in temperature. It also has holes along the front edge for the thermocouple wires to pass through and holes on the top to access the terminal block screws. Texas Instruments Precision Analog Applications Seminar Thermocouples Cold junction compensation V Reference junction Conductor C1 Conductor C2 (Cu) (Cu) Conductor A1 Conductor A2 (non Cu) (non Cu) J1 J3 Isothermal block at Tref J4 Measurement junction J2 Conductor B Often it is not practical to include an ice bath reference as part of the measurement system. Shown here the reference junction has now been located at the isothermal block along with the parasitic junctions. As long as the parasitic junctions are held at a common temperature they will cancel each other’s Seebeck voltage contribution. The reference junction will still require establishment of a reference temperature, but this can be accomplished by software or hardware compensation techniques. Texas Instruments Precision Analog Applications Seminar Thermocouples Cold junction compensation Cold junction compensation Software implementation basis RT used to establish absolute Temperature, Tref, of J1 V RT Conductor A Reference junction J2 J1 Isothermal block at Tref Measurement junction Conductor B A secondary temperature sensing transducer such as a thermistor, RTD or semiconductor junction may be attached at the isothermal block to indicate the block’s temperature. RT has a resistance that is proportional to the isothermal blocks temperature. The temperature response characteristics of this secondary transducer must be an established known in order to be utilized. The resistance is then converted to another electrical property such as voltage, and then to its digital equivalent. This compensation voltage can than be summed with the measured voltage in the software. This technique is known as software compensation. One may question why one wouldn’t use this reference transducer to measure the temperature in the first place? The answer is that transducers of this type have a limited useful temperature range when compared to a thermocouple. And they also lack the physical properties required for many high temperature and/or physically demanding applications. Thermocouples are rugged, high temperature transducers that are often subjected to harsh environments with conditions that far exceed what the other transducers can withstand. Texas Instruments Precision Analog Applications Seminar Thermocouples Cold junction compensation V Reference Junction “J1 equivalent” Conductor A VJ1 Measurement junction J2 + Temperature dependent Voltage Conductor B VJ1 can be set to the 0°C equivalent voltage An electronic “ice point reference” When subjected to an ice bath the reference junction develops a voltage specific to 0°C. An equivalent voltage source can be substituted in place of the junction to serve as a 0°C voltage reference. This electronic substitution for the ice bath is referred to as an “electronic ice point reference.” This standard voltage is dependent on the particular thermocouple type and the values are established by the NIST. Electronic ice point references are available for many different types of thermocouples. Texas Instruments Precision Analog Applications Seminar Thermocouples Cold junction compensation Cold junction compensation Hardware implementation basis Isothermal block V Σ + Measurement junction J2 + T Temp sensing transducer Sense Amplifier In a practical hardware compensation scheme the secondary transducer’s voltage is appropriately gained and summed within the measurement circuit’s path. The secondary temperature sensing transducer is mounted to the isothermal block. This can be a thermistor, RTD etc. Its resistance tracks the temperature of the isothermal block and is converted by the sense amplifier to a voltage that is summed or subtracted at the summing junction. The secondary sense transducer response over temperature has to be taken into account so that the correct voltage is summed into the measurement path. Texas Instruments Precision Analog Applications Seminar Thermocouples Applications Basic thermocouple amplifier featuring INA126 instrumentation amplifier G = 100V/V V- T meas U1 INA126 Rg R1 10k Vtc Rg + + Isothermol Block R2 10k V+ C1 470n Ref + RG 842 - Vref 2.5 C2 100n R2: Provides Input CommonMode Current Path C3 100n V- V+ V1 15 V2 15 NOTE: no cold junction compensation! Since thermocouples produce DC signal levels in the tens or hundreds of microvolts it is necessary to provide additional gain for further signal processing. Interfacing the thermocouple is a simple matter of using a 3-amplifier, instrumentation amplifier. In this case an INA126 MicroPOWER instrumentation amplifier is employed and provides a voltage gain of 100V/V. Despite its very low power usage (Iq = 200µA max) its speed is completely adequate for this type of application. Note that this simple circuit does not include a reference, or equivalent, and only temperature change would be observed. The other complexities can be added to suit the application. It should be noted that with amplifiers like the INA126 that have extremely high input impedance (≈109) that a path must be provided for the input bias currents. With floating transducers, like the thermocouple, this is easily accomplished by adding a resistor off one side to ground (R2). One might be tempted to think that this circuit is not useable in its present state; however, it may be suitable for low accuracy applications. The main drawback is the lack of cold junction compensation, but may only introduce a small error if the temperatures being measured are high. For example, with measurement temperatures in excess of 1000°C, the error caused by not including the cold junction temperature would likely be tolerable. Texas Instruments Precision Analog Applications Seminar Thermocouples Applications Single supply OPA335 thermocouple amplifier features moderate temperature accuracy 4.096V V+ - C1 100n + REF3040 R1 6.04k R4 31.6k RG 150k U1 OPA335 D1 1N4148 R2 2.94k R5 549 T meas - R6 6.04k Isothermol Block + Vo + R3 60.4 P1 200 + V+ V1 5 C2 100n - Type – K Thermocouple 40.7uV/°C Zero Adjust This is a complete thermocouple amplifier for a type K thermocouple. It features an OPA335 CMOS, zero-drift op-amp and includes cold junction compensation (isothermal block) and incorporates a diode thermal sensing circuit for hardware compensation. This circuit will produce moderately accurate results limited somewhat by the inexact diode characteristics. Although a PN junction is the most linear of all temperature sensors, its accuracy at a given temperature can vary due to the diode’s saturation current characteristics. A 10:1 difference in the diode saturation current results in a 60mV difference in forward junction voltage. From one batch of diodes to the next, the forward voltage can be quite different which would result in a different cold junction temperature. Texas Instruments Precision Analog Applications Seminar Thermocouples Applications INA128 Precision thermocouple amplifier with cold junction compensation (G = 100V/V) 10.0V REF102 PT100 100 U1 INA128 - + type - K 40uV/ C - V- R3 100 RG 505.1 Pt100 100 Ohms at 0C V+ R2 97.6k Rg Rg + + V+ Isothermol Block Material E + Chromel - Constantan + Iron - Constantan + Chromel - Alumel + Copper - Constantan J T Vtc C1 470n Ref Vref 2.5 ISA Type K R4 10k C2 100n C3 100n V1 15 V2 15 + R1 97.6k Seebeck Coeff uV/°C 58.5 66.5kΩ 50.2 76.8kΩ 39.4 97.6kΩ 38.0 102kΩ V- V+ R1, R2 This thermocouple amplifier uses the INA128 precision instrumentation amplifier in a gain of 100V/V. Cold junction compensation is accomplished with a Pt100 RTD. It exhibits very good linearity over most of its operating range and the accuracy can be specified with a fraction of a degree. Therefore, from one RTD batch to the next, the temperature accuracy performance can be duplicated. The table lists the resistor values for R1 and R2 associated with various thermocouples. These resistors establish RTD bias such that the associated voltage corresponds to the block temperature. Texas Instruments Precision Analog Applications Seminar Thermocouples Nonlinearity and compensation Thermocouple Linearity (or Nonlinearity!) Seebeck coefficient vs. Temperature Source: Agilent Technologies, Application note 290 Up to this point we have been using a fixed constant for the Seebeck coefficient, but mention has been made that it will vary within the thermocouple’s useable temperature range. For some types of thermocouples the coefficient may be 2 to 3 times higher within portions of the operating temperature range. This lack of linearity, or nonlinearity, will result in large temperature measurement errors if some form of linearization is not applied. There are a number of ways one may go about correcting for the thermocouple’s nonlinearity, but all rely on applying linearization coefficients to the measured voltage. The coefficients are often mathematically derived or acquired from look-up tables. Categorization and fast algorithms can be used to speed up the process. The choice really depends on the power of the data acquisition system employed in the measurement system. Texas Instruments Precision Analog Applications Seminar Thermocouples Nonlinearity and compensation Nonlinearity correction using An MSC1202 intelligent ADC MSC1202 (See SBAS328) 8051 CPU – 4kB flash memory 16-bit ∆Σ ADS Current DAC 8-differential or single inputs Bias return resistor not shown This circuit does not use a linearization circuit for the thermistor, it simply uses a general-purpose equation to convert the resistance into a temperature. That temperature is then used to calculate the voltage for the thermocouple type which is used at that same temperature. This procedure calculates the voltage from 0°C to TREF. The voltage is then added to the voltage measured from the thermocouple. The total voltage is then used to calculate the temperature at the end of the thermocouple. See TI applications report SBAA134 for an extensive treatment of thermocouple temperature measurements with ∆Σ ADCs. Texas Instruments Precision Analog Applications Seminar Thermocouples Nonlinearity and compensation Polynomial Correction The polynomial equation has the form: T = a0 + a1x + a2x2 + a3x3 . . . +anxn where: T = temperature x = thermocouple EMF in volts a = polynomial coefficients associated with the order n = maximum polynomial order For example: Poly order 0 1 2 3 4 5 6 7 8 Type T, Copper - Constantan -160 to 400C, +/-0.5C "a" 0.10086091 25727.94369 -767345.8295 78025595.81 -9247486589 6.97688E+11 -2.66192E+13 3.94078E+14 Type K, NiCr - NiAl 0 to 1370C, +/-0.7C "a" 0.226584602 24152.109 67233.4248 2210340.682 -860963914.9 48350600000 -1.18452E+12 -1.3869E+13 -6.33708E+13 Common thermocouples have been well characterized by the NIST and the applicable polynomial coefficients are available in the NIST’s Thermocouple Tables (page Z-203). The polynomial order is established for a maximum error of ±1°C. The required order to achieve this will depend on the thermocouple type. If the application has a limited temperature range then a lower order polynomial correction will be sufficient. The mathematical expression shows how the polynomials are applied to the measured EMF (voltage). The tables lists as an example the coefficients for both a type-T and type-K thermocouple. Texas Instruments Precision Analog Applications Seminar Thermocouples Summary In Conclusion, the thermocouple: Produces a difference voltage in response to a temperature gradient developed along its length Must be referenced to a known temperature reference, a “cold junction,” for accurate temperature measurement Can be interfaced with bridge amplifier circuits that provide built-in, “cold junction” compensation Requires linearization for best over-temperature linearity response Texas Instruments