Thermal resistance in electronics

Thermal resistance is the temperature difference across a structure when a unit of heat energy flows through it in unit time. It is the reciprocal of thermal conductance. The SI units of thermal resistance are kelvins per watt, or the equivalent degrees Celsius per watt (the two are the same since as intervals 1 K = 1 °C).

The thermal resistance of materials is of great interest to electronic engineers, because most electrical components generate heat and need to be cooled. Electronic components malfunction or fail if they overheat, and some parts routinely need measures taken in the design stage to prevent this.

Explanation

Equivalent thermal circuits

The heat flow can be modelled by analogy to an electrical circuit where heat flow is represented by current, temperatures are represented by voltages, heat sources are represented by constant current sources, thermal resistances are represented by resistors and thermal capacitances by capacitors.

The diagram shows an equivalent thermal circuit for a semiconductor device with a heat sink.:$Q$ is the power dissipated by the device:$T\_J$ is the junction temperature in the device:$T\_C$ is the temperature at its case:$T\_H$ is the temperature where the heat sink is attached:$T\_\{AMB\}$ is the ambient air temperature:$R\_\{\; heta\; JC\}$ is the device's thermal resistance from junction to case:$R\_\{\; heta\; CH\}$ is the thermal resistance from the case to the heatsink:$R\_\{\; heta\; HA\}$ is the thermal resistance of the heat sink

Example calculation

Consider a component such as a silicon transistor that is bolted to the metal frame of a piece of equipment. The transistor's manufacturer will specify parameters in the datasheet called the "thermal resistance from junction to case" (symbol: $R\_\{\; heta\; JC\}$), and the maximum allowable temperature of the semiconductor junction (symbol: $T\_\{JMAX\}$). The specification for the design should include a maximum temperature at which the circuit should function correctly. Finally, the designer should consider how the heat from the transistor will escape to the environment: this might be by convection into the air, with or without the aid of a heat sink, or by conduction through the printed circuit board. For simplicity, let us assume that the designer decides to bolt the transistor to a metal surface (or heat sink) that is guaranteed to be less than $Delta\; T\_\{HS\}$ above the ambient temperature.

Given all this information, the designer can construct a model of the heat flow from the semiconductor junction, where the heat is generated, to the outside world. In our example, the heat has to flow from the junction to the case of the transistor, then from the case to the metalwork. We do not need to consider where the heat goes after that, because we are told that the metalwork will conduct heat fast enough to keep the temperature less than $Delta\; T\_\{HS\}$ above ambient: this is all we need to know.

Suppose the engineer wishes to know how much power he can put into the transistor before it overheats. The calculations are as follows.

:Total thermal resistance from junction to ambient = $R\_\{\; heta\; JC\}+R\_\{\; heta\; B\}$

where $R\_\{\; heta\; B\}$ is the thermal resistance of the bond between the transistor's case and the metalwork. This figure depends on the nature of the bond - for example, a thermal bonding pad or thermal transfer grease might be used to reduce the thermal resistance.

:Maximum temperature drop from junction to ambient = $T\_\{JMAX\}-(T\_\{AMB\}+Delta\; T\_\{HS\})$.

We use the general principle that the temperature drop $Delta\; T$ across a given thermal resistance $R\_\{\; heta\}$ with a given heat flow $Q$ through it is::$Delta\; T\; =\; Q\; imes\; R\_\{\; heta\},$.Substituting our own symbols into this formula gives::$T\_\{JMAX\}-(T\_\{AMB\}+Delta\; T\_\{HS\})=Q\_\{MAX\}\; imes\; (R\_\{\; heta\; JC\}+R\_\{\; heta\; B\}),$, and, rearranging,:$Q\_\{MAX\}\; =\; \{\; \{\; T\_\{JMAX\}-(T\_\{AMB\}+Delta\; T\_\{HS\})\; \}\; over\; \{\; R\_\{\; heta\; JC\}+R\_\{\; heta\; B\}\; \}\; \}$

The designer now knows $Q\_\{MAX\}$, the maximum power that the transistor can be allowed to dissipate, so he can design the circuit to limit the temperature of the transistor to a safe level.

Let us plug in some sample numbers::$T\_\{JMAX\}\; =\; 125\; ^\{circ\}mbox\{C\}$ (typical for a silicon transistor):$T\_\{AMB\}\; =\; 70\; ^\{circ\}mbox\{C\}$ (a typical specification for commercial equipment):$R\_\{\; heta\; JC\}\; =\; 1.5\; mathrm\{K\}/mathrm\{W\}\; ,$ (for a typical TO-220 package):$R\_\{\; heta\; B\}\; =\; 0.1\; mathrm\{K\}/mathrm\{W\}\; ,$ (a typical value for an elastomer heat-transfer pad for a TO-220 package):$R\_\{\; heta\; HA\}\; =\; 4\; mathrm\{K\}/mathrm\{W\}\; ,$ (a typical value for a heatsink for a TO-220 package)The result is then::$Q\; =$125-(70)} over {1.5+0.1+4 = 9.8 mathrm{W}

This means that the transistor can dissipate about 9 watts before it overheats. A cautious designer would operate the transistor at a lower power level to increase its reliability.

This method can be generalised to include any number of layers of heat-conducting materials, simply by adding together the thermal resistances of the layers and the temperature drops across the layers.

External links

* [http://www.ixysrf.com/pdf/switch_mode/appnotes/1aprtheta_power_dissipation.pdf] Example Thermal Resistance and Power Dissipation calculation in Semiconductor