Main Content

System-Level Heat Exchanger (TL-TL)

Heat exchanger based on performance data between two thermal liquid networks

Since R2023b

expand all in page

Libraries:
Simscape / Fluids / Heat Exchangers / Thermal Liquid

Description

The System-Level Heat Exchanger (TL-TL) block models a heat exchanger based on performance data between two thermal liquid networks. Each network has its own set of fluid properties.

The block uses performance data from the heat exchanger datasheet, rather than the detailed geometry of the exchanger. You can adjust the size and performance of the heat exchanger during design iterations, or model heat exchangers with uncommon geometries. You can also use this block to model heat exchangers with a certain level of performance at an early design stage, when detailed geometry data is not yet available.

You parameterize the block by the nominal operating condition. The block sizes the heat exchanger to match the specified performance at the nominal operating condition at steady state.

This block is similar to the Heat Exchanger (TL-TL) block, but uses a different parameterization model. The table compares the two blocks:

Heat Exchanger (TL-TL)System-Level Heat Exchanger (TL-TL)
Block parameters are based on the heat exchanger geometryBlock parameters are based on performance and operating conditions
Heat exchanger geometry may be limited by the available geometry parameter optionsModel is independent of the specific heat exchanger geometry
You can adjust the block for different performance requirements by tuning geometry parameters, such as fin sizes and tube lengthsYou can adjust the block for different performance requirements by directly specifying the desired heat and mass flow rates
You can select between parallel, counter, shell and tube, or cross flow configurationsYou can select between parallel, counter, or cross-flow arrangement at nominal operating conditions to help with sizing
Predictively accurate results over a wide range of operating conditions, subject to the applicability of the E-NTU equations and the heat transfer coefficient correlationsVery accurate results around the specified operating condition; accuracy may decrease far away from the specified operating conditions
Heat transfer calculations account for the variation of temperature along the flow path by using the E-NTU modelHeat transfer calculations approximate the variation of temperature along the flow path by dividing it into three segments

Heat Transfer

The block divides the two thermal liquid flows in the block, thermal liquid 1 and thermal liquid 2, into three segments of equal size. The block calculates heat transfer between the fluids in each segment. For simplicity, the equation in this section are for one segment.

If you clear the Wall thermal mass check box, then the heat balance in the heat exchanger is

Qseg,TL1+Qseg,TL2=0,

where:

  • Qseg,TL1 is the heat flow rate from the wall that is the heat transfer surface to thermal liquid 1 in the segment.

  • Qseg,TL2 is the heat flow rate from the wall to thermal liquid 2 in the segment.

If you select Wall thermal mass, then the heat balance in the heat exchanger is

Qseg,TL1+Qseg,TL2=MwallcpwallNdTseg,walldt,

where:

  • Mwall is the mass of the wall.

  • cpwall is the specific heat of the wall.

  • N = 3 is the number of segments.

  • Tseg,wall is the average wall temperature in the segment.

  • t is time.

The heat flow rate from the wall to thermal liquid 1 in the segment is

Qseg,TL1=UAseg,TL1(Tseg,wallTseg,TL1),

where:

  • UAseg,TL1 is the heat transfer conductance for thermal liquid 1 in the segment.

  • Tseg,TL1is the average liquid temperature in the segment.

The heat flow rate from the wall to thermal liquid 2 in the segment is

Qseg,TL2=UAseg,TL2(Tseg,wallTseg,TL2),

where:

  • UAseg,TL2 is the heat transfer conductance for thermal liquid 2 in the segment.

  • Tseg,TL2 is the average thermal liquid 2 temperature in the segment.

Thermal Liquid Heat Transfer Correlation

The block calculates the heat transfer conductance in both thermal liquids by using the same expression. For simplicity, the section shows equations in this section are for one side, but apply to both sides. The heat transfer conductance equation is:

UAseg,TL=aTL(Reseg,TL)bTL(Prseg,TL)cTLkseg,TLGTLN,

where:

  • aTL, bTL, and cTL are the coefficients of the Nusselt number correlation. These coefficients are block parameters in the Correlation Coefficients section.

  • Reseg,TL is the average Reynolds number for the segment.

  • Prseg,TL is the average Prandtl number for the segment.

  • kseg,TL is the average thermal conductivity for the segment.

  • GTL is the geometry scale factor for the thermal liquid side of the heat exchanger. The block calculates the geometry scale factor so that the total heat transfer over all segments matches the specified performance at the nominal operating conditions.

The average Reynolds number is

Reseg,TL=m˙seg,TLDref,TLμseg,TLSref,TL,

where:

  • m˙seg,TL is the mass flow rate through the segment.

  • μseg,TL is the average dynamic viscosity for the segment.

  • Dref,TL is an arbitrary reference diameter.

  • Sref,TL is an arbitrary reference flow area.

Note

The Dref,TL and Sref,TL terms are included in this equation for unit calculation purposes only, to make Reseg,TL nondimensional. The values of Dref,TL and Sref,TL are arbitrary because the GTL calculation overrides these values.

Pressure Loss

The pressure losses on the thermal liquid 1 side are

pA,TL1pTL1=KTL12m˙A,TL1m˙2A,TL1+m˙2thres,TL12ρavg,TL1pB,TL1pTL1=KTL12m˙B,TL1m˙2B,TL1+m˙2thres,TL12ρavg,TL1

where:

  • pA,TL1 and pB,TL1 are the pressures at ports A1 and B1, respectively.

  • pTL1 is internal thermal liquid 1 pressure at which the block calculates heat transfer.

  • A,TL1 and B,TL1 are the mass flow rates into ports A1 and B1, respectively.

  • ρavg,TL1 is the average thermal liquid 1 density over all segments.

  • thres,TL1 is the laminar threshold for pressure loss, approximated as 1e-4 of the nominal mass flow rate. The block calculates the pressure loss coefficient, KTL1, so that pA,TL1pB,TL1 matches the nominal pressure loss at the nominal mass flow rate.

The pressure losses on the thermal liquid 2 side are

pA,TL2pTL2=KTL22m˙A,TL2m˙2A,TL2+m˙2thres,TL22ρavg,TL2pB,TL2pTL2=KTL22m˙B,TL2m˙2B,TL2+m˙2thres,TL22ρavg,TL2

where:

  • pA,TL2 and pB,TL2 are the pressures at ports A2 and B2, respectively.

  • pTL2 is internal thermal liquid 2 pressure at which the block calculates heat transfer.

  • A,TL2 and B,TL2 are the mass flow rates into ports A2 and B2, respectively.

  • ρavg,TL2 is the average thermal liquid density over all segments.

  • thres,TL2 is the laminar threshold for pressure loss, approximated as 1e-4 of the nominal mass flow rate. The block calculates the pressure loss coefficient, KTL2, so that pA,TL2pB,TL2 matches the nominal pressure loss at the nominal mass flow rate.

Thermal Liquid Mass and Energy Conservation

The block uses the same expression for mass and energy conservation in both thermal liquids. For simplicity, the section shows equations in this section are for one side, but apply to both sides.

(dpTLdtsegments(ρseg,TLp)+segments(dTseg,TLdtρseg,TLT))VTLN=m˙A,TL+m˙B,TL,

where:

  • ρseg,TLp is the partial derivative of density with respect to pressure for the segment.

  • ρseg,TLT is the partial derivative of density with respect to temperature for the segment.

  • Tseg,TL is the temperature for the segment.

  • VTL is the total thermal liquid volume.

The summation is over all segments.

Note

Although the block divides both thermal liquid flows into N=3 segments for heat transfer calculations, it assumes all segments are at the same internal pressure, pTL. Consequently, pTL is outside of the summation.

The energy conservation equation for each segment is

(dpTLdtuseg,TLp+dTseg,TLdtuseg,TLT)MTLN+useg,TL(m˙seg,in,TLm˙seg,out,TL)=Φseg,in,TLΦseg,out,TL+Qseg,TL,

where:

  • useg,TLp is the partial derivative of the specific internal energy with respect to pressure for the segment.

  • useg,TLT is the partial derivative of the specific internal energy with respect to temperature for the segment.

  • MTL is the total thermal liquid mass for one side.

  • m˙seg,in,TL and m˙seg,out,TL are the mass flow rates into and out of the segment.

  • Φseg,in,TL and Φseg,out,TL are the energy flow rates into and out of the segment.

The block assumes the mass flow rates between segments are linearly distributed between the values of m˙A,TL and m˙B,TL.

Ports

Output

expand all

Rate of heat transfer to thermal liquid 1, returned as a physical signal, in W. The physical signals at ports Q1 and Q2 are usually equal in value with the opposite sign. However, if you select Wall thermal mass, then these two signals may have different values because the wall may absorb and release some of the heat being transferred.

Rate of heat transfer to thermal liquid 2, returned as a physical signal, in W. The physical signals at ports Q1 and Q2 are usually equal in value with the opposite sign. However, if you select Wall thermal mass, then these two signals may have different values because the wall may absorb and release some of the heat being transferred.

Conserving

expand all

Inlet or outlet port associated with the first thermal liquid network.

Inlet or outlet port associated with the first thermal liquid network.

Inlet or outlet port associated with the second thermal liquid network.

Inlet or outlet port associated with the second thermal liquid network.

Parameters

expand all

Configuration

Flow path alignment between the heat exchanger sides at nominal operating condition. The available flow arrangements are:

  • Counter flow - Thermal Liquid 1 flows from A to B, Thermal Liquid 2 flows from B to A — The flows run parallel to each other, in the opposite directions.

  • Parallel flow - Both fluids flow from A to B — The flows run in the same direction.

  • Cross flow - Both fluids flow from A to B — The flows run perpendicular to each other.

The choice between parallel flow and counter flow affects how the block determines the size of the heat exchanger. The counter flow setting is the most effective, and needs the smallest size to meet the specified performance. Conversely, parallel flow is the least effective, and needs the biggest size to meet the specified performance.

Flow direction at the nominal condition (from A to B, or from B to A) only affects the model initialization, when you select Initialize thermal liquid 1 to nominal operating conditions or Initialize thermal liquid 2 to nominal operating conditions. If you set different initial operating conditions, the flow directions can be different.

After the block determines the size of the heat exchanger, this setting does not play a role in how the block calculates the heat transfer during simulation. Instead, the heat transfer depends on the flow directions during simulation. For example, if you set the parameter to parallel flow but set up the model to run in counter flow, then the rate of heat transfer during simulation will not match the specified performance, even if the rest of the boundary conditions are the same.

If you set the parameter to cross flow, then the block models the flow paths as perpendicular inside the heat exchanger, so the flow directions during simulation do not matter.

Whether to enable the effect of thermal mass on the heat transfer surface. When you select this parameter, the block introduces additional dynamics to the simulation and takes longer to reach steady state, but this parameter does not affect the results at steady-state simulation.

Mass of the heat transfer surface.

Dependencies

To enable this parameter, select Wall thermal mass.

Specific heat of the heat transfer surface.

Dependencies

To enable this parameter, select Wall thermal mass.

Option to initialize the wall temperature to nominal operating conditions or specified values. If you select this parameter, the block calculates the initial wall temperature from the nominal operating conditions specified for both fluid sides. If you clear this parameter, you can specify the initial wall temperature directly with the Initial wall temperature parameter.

Dependencies

To enable this parameter, select Wall thermal mass.

Initial temperature of the wall. If you specify a scalar, the block assumes that the initial wall temperature is uniform. If you specify a two-element vector, then the block assumes that the initial wall temperature varies linearly between ports A1 and A2 and ports B1 and B2. The first element corresponds to the temperature at ports A1 and A2 and the second element corresponds to the temperature at ports B1 and B2.

Dependencies

To enable this parameter, select Wall thermal mass and clear the Initialize wall temperature to nominal operating conditions check box.

Flow area at the thermal liquid 1 port A1.

Flow area at the thermal liquid 1 port B1.

Flow area at the thermal liquid 2 port A2.

Flow area at the thermal liquid 2 port B2.

Thermal Liquid 1

Nominal operating condition to use for the thermal liquid 1 network: :

  • Heat transfer from Thermal Liquid 1 to Thermal Liquid 2 — Side 1 is cooled and side 2 is heated.

  • Heat transfer from Thermal Liquid 2 to Thermal Liquid 1 — Side 2 is cooled and side 1 is heated.

This setting relates only to the nominal operating condition parameters. It does not mean that heat transfer can only happen in the specified direction during simulation.

Mass flow rate from port A1 to port B1 during the nominal operating condition.

Pressure drop from port A1 to port B1 during the nominal operating condition.

Pressure at the thermal liquid 1 inlet of the heat exchanger during nominal operating condition.

Temperature at the thermal liquid 1 inlet of the heat exchanger during the nominal operating condition.

Whether to specify the performance of the heat exchanger for thermal liquid 1 at the nominal operating condition directly, by the rate of heat transfer, or indirectly, by the outlet condition.

Rate of heat transfer. The Nominal Operating condition parameter determines the thermal liquid network that the heat transfers from and to:

  • If Nominal operating condition is Heat transfer from Thermal Liquid 1 to Thermal Liquid 2, this parameter is the rate of the heat transfer from the thermal liquid side 1 to the thermal liquid side 2 during the nominal operating condition.

  • If Nominal operating condition is Heat transfer from Thermal Liquid 2 to Thermal Liquid 1, this parameter is the rate of the heat transfer from the thermal liquid side 1 to the thermal liquid side 1 during the nominal operating condition.

Dependencies

To enable this parameter, set Heat transfer capacity specification to Rate of heat transfer.

Temperature at the thermal liquid 1 outlet of the heat exchanger during the nominal operating condition.

Dependencies

To enable this parameter, set Heat transfer capacity specification to Outlet condition.

Total volume of thermal liquid 1 inside the heat exchanger.

Option to initialize thermal liquid 1 to nominal operating conditions or specified values. If you select this parameter, the block initializes thermal liquid 1 to the nominal operating conditions. If you clear this check box, you can specify the initial conditions directly with additional parameters.

Thermal liquid 1 pressure at the start of simulation.

Dependencies

To enable this parameter, clear the Initialize thermal liquid 1 to nominal operating conditions check box.

Thermal liquid 1 temperature at the start of simulation.

Dependencies

To enable this parameter, clear the Initialize thermal liquid 1 to nominal operating conditions check box.

Thermal Liquid 2

Mass flow rate from port A2 to port B2 during the nominal operating condition.

Pressure drop from port A2 to port B2 during the nominal operating condition.

Pressure at the thermal liquid 2 inlet of the heat exchanger during the nominal operating condition.

Temperature at the thermal liquid 2 inlet of the heat exchanger during the nominal operating condition.

Total volume of thermal liquid 2 in the heat exchanger.

Option to initialize thermal liquid 2 to nominal operating conditions or specified values. If you select this parameter, the block initializes thermal liquid 2 to the nominal operating conditions. If you clear this check box, you can specify the initial conditions directly with additional parameters.

Thermal liquid 2 pressure at the start of the simulation.

Dependencies

To enable this parameter, clear the Initialize thermal liquid 2 to nominal operating conditions check box.

Thermal liquid 2 temperature at the start of simulation. If the value is a scalar, then the block assumes that the initial temperature is uniform. If the value is a two-element vector, then the block assumes that the initial temperature varies linearly between ports A2 and B2, with the first element corresponding to port A2 and the second element corresponding to port B2.

Dependencies

To enable this parameter, clear the Initialize thermal liquid 2 to nominal operating conditions check box.

Correlation Coefficients

Proportionality constant in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 1. The default value is based on the Colburn equation.

Reynolds number exponent in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 1.

Prandtl number exponent in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 1.

Proportionality constant in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 2. The default value is based on the Colburn equation.

Reynolds number exponent in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 2. The default value is based on the Colburn equation.

Prandtl number exponent in the correlation of the Nusselt number as a function of the Reynolds number and Prandtl number for thermal liquid 2. The default value is based on the Colburn equation.

References

[1] Ashrae Handbook: Fundamentals. Atlanta: Ashrae, 2013.

[2] Çengel, Yunus A. Heat and Mass Transfer: A Practical Approach. 3rd ed. McGraw-Hill Series in Mechanical Engineering. Boston: McGraw-Hill, 2007.

[3] Mitchell, John W., and James E. Braun. Principles of Heating, Ventilation, and Air Conditioning in Buildings. Hoboken, NJ: Wiley, 2013.

[4] Shah, R. K., and Dušan P. Sekulić. Fundamentals of Heat Exchanger Design. Hoboken, NJ: John Wiley & Sons, 2003.

[5] Cavallini, Alberto, and Roberto Zecchin. “A DIMENSIONLESS CORRELATION FOR HEAT TRANSFER IN FORCED CONVECTION CONDENSATION.” In Proceeding of International Heat Transfer Conference 5, 309–13. Tokyo, Japan: Begellhouse, 1974. https://doi.org/10.1615/IHTC5.1220.

Extended Capabilities

C/C++ Code Generation
Generate C and C++ code using Simulink® Coder™.

Version History

Introduced in R2023b

See Also

|