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Examples and Problems

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Title: Examples and Problems


1
Examples and Problems
2
Problem 1.31
  • Chips of width L 15 mm on a side are mounted
    to a substrate that is installed in an enclosure
    whose walls and air are maintained at a
    temperature of Tsur T? 25oC. The chips have
    an emissivity of ? 0.60 and a maximum allowable
    temperature of Ts 85oC.
  • If heat is rejected from the chips by radiation
    and natural convection, what is the maximum
    operating power of each chip? The convection
    coefficient depends on the chip-to-air
    temperature difference and may be approximated as
    h C(Ts T?)1/4, where C 4.2 W/m2.K5/4.

3
Problem 1.31 (Contd.)
  • If a fan is used to maintain air flow through the
    enclosure and heat transfer is by forced
    convection, with h 250 W/m2.K, what is the
    maximum operating power?

4
Problem 1.44
  • Radioactive wastes are packed in a long,
    thin-walled cylindrical container. The wastes
    generate thermal energy non-uniformly according
    to the relation , where is
    the local rate of energy generation per unit
    volume, is a constant, and ro is the radius of
    the container. Steady-state conditions are
    maintained by submerging the container in a
    liquid that is at T? and provides a uniform
    convection coefficient h.
  • Obtain an expression for the total rate at which
    energy is generated in a unit length of the
    container. Use this result to obtain an
    expression for the temperature Ts of the
    container wall.

5
Problem 1.63
  • A rectangular forced air heating duct is
    suspended from the ceiling of a basement whose
    air and walls are at a temperature of T? Tsur
    5oC. The duct is 15 m long, and its cross-section
    is 350 mm 200 mm.
  • For an uninsulated duct whose average surface
    temperature is 50oC, estimate the rate of heat
    loss from the duct. The surface emissivity and
    convection coefficient are approximately 0.5 and
    4 W/m2.K, respectively.
  • If heated air enters the duct at 58oC and a
    velocity of 4 m/s and the heat loss corresponds
    to the result of part (a), what is the outlet
    temperature? The density and specific heat of the
    air may be assumed to be r 1.10 kg/m3 and cp
    1008 J/kg.K, respectively.

6
Problem 2.22
  • Uniform internal heat generation at
    W/m3 is occurring in a cylindrical nuclear
    reactor fuel rod of 50-mm diameter, and under
    steady-state conditions the temperature
    distribution is of the form T(r) a br2,
    where T is in degrees Celsius and r is in meters,
    while a 800oC and b -4.167 105 oC/m2. The
    fuel rod properties are k 30 W/m.k, ? 1100
    kg/m3, and cp 800 J/kg.K.

7
Problem 2.22 (contd.)
  • What is the rate of heat transfer per unit length
    of the rod at r 0 (the centerline) and r 25
    mm (the surface)?
  • If the reactor power level is suddenly increased
    to W/m3, what is the initial time rate of
    temperature change at r 0 and r 25 mm?

8
Problem 2.26 (a) (b)
  • One-dimensional, steady-state conduction with
    uniform internal energy generation occurs in a
    plane wall with a thickness of 50 mm and a
    constant thermal conductivity of 5 W/m.K. For
    these conditions, the temperature distribution
    has the form, T(x) a bx cx2. The surface at
    x 0 has a temperature of T(0) To 120oC and
    experiences convection with a fluid for which T?
    20oC and h 500 W/m2.K. The surface at x L
    is well insulated.

9
Problem 2.26 (contd.)
  • Applying an overall energy balance to the wall,
    calculate the internal energy generation rate
  • Determine the coefficients a, b, and c by
    applying the boundary conditions to the
    prescribed temperature distribution. Use the
    results to calculate and plot the temperature
    distribution.

10
Problem 3.2 (a)
  • The rear window of an automobile is defogged by
    passing warm air over its inner surface.
  • If the warm air is at T?,i 40oC and the
    corresponding convection coefficient is hi 30
    W/m2.K, what are the inner and outer surface
    temperatures of 4-mm-thick window glass, if the
    outside ambient air temperature is T?,o -10oC
    and the associated convection coefficient is ho
    65 W/m2.K?

11
Problem 3.29
  • The diagram shows a conical section fabricated
    from pure aluminum. It is of circular cross
    section having diameter D ax1/2, where a 0.5
    m1/2. The small end is located at x1 25 mm and
    the large end at x2 125 mm. The end
    temperatures are T1 600 K and T2 400 K, while
    the lateral surface is well insulated.
  • Derive an expression for the temperature
    distribution T(x) in symbolic form, assuming 1-D
    conditions. Sketch the temperature distribution.
  • Calculate the heat rate qx.

12
Example 3.5
  • The possible existence of an optimum insulation
    thickness for radial systems is suggested by the
    presence of competing effects associated with an
    increase in this thickness. In particular,
    although the conduction resistance increases with
    the addition of insulation, the convection
    resistance decreases due to increasing outer
    surface area. Hence there may exist an insulation
    thickness that minimizes heat loss by maximizing
    the total resistance to heat transfer. Resolve
    this issue by considering the following system.

13
Example 3.5 (Contd.)
  • A thin-walled copper tube of radius ri is used to
    transport a low-temperature refrigerant and is at
    a temperature Ti that is less than that of the
    ambient air at T8 around the tube. Is there an
    optimum thickness associated with application of
    insulation to the tube?

14
Problem 3.73
  • Consider 1-D conduction in a plane composite
    wall. The outer surfaces are exposed to a fluid
    at 25oC and a convection heat transfer
    coefficient of 1000 W/m2.K. The middle wall B
    experiences uniform heat generation , while
    there is no generation in walls A and C. The
    temperatures at the interfaces are T1 261oC and
    T2 211oC.
  • a) Assuming a negligible contact resistance at
    the interfaces, determine the volumetric heat
    generation and the thermal conductivity kB.

15
Problem 3.73 (Contd.)
  • b) Plot the temperature distribution, showing its
    important features.
  • c) Consider conditions corresponding to a loss of
    coolant at the exposed surface of material A ( h
    0). Determine T1 and T2 and plot the
    temperature distribution throughout the system.

16
Problem 3.101
  • A thin flat plate of length L, thickness t, and
    width W L is thermally joined to two large heat
    sinks that are maintained at a temperature To.
    The bottom of the plate is well insulated, while
    the net heat flux to the top surface of the plate
    is known to have a uniform value of .
  • Derive the differential equation that determines
    the steady-state temperature distribution T(x) in
    the plate.
  • Solve the foregoing equation for the temperature
    distribution, and obtain an expression for the
    rate of heat transfer from the plate to the heat
    sinks.

17
Problem 3.102
  • Consider the flat plate of problem 3.101, but
    with the heat sinks at different temperatures,
    T(0) To and T(L) TL, and with the bottom
    surface no longer insulated. Convection heat
    transfer is now allowed to occur between this
    surface and a fluid at T8, with a convection
    coefficient h.
  • Derive the differential equation that determines
    the steady-state temperature distribution T(x) in
    the plate.

18
Problem 3.134
  • As more and more components are placed on a
    single integrated circuit (chip), the amount of
    heat that is dissipated continues to increase.
    However, this increase is limited by the maximum
    allowable chip operating temperature, which is
    approximately 75oC. To maximize heat dissipation,
    it is proposed that a 4 4 array of copper pin
    fins be metallurgically joined to the outer
    surface of a square chip that is 12.7 mm on a
    side.

19
Problem 3.134 (contd.)
20
Problem 3.134 (contd.)
  • Sketch the equivalent thermal circuit for the
    pin-chip-board assembly, assuming
    one-dimensional, steady-state conditions and
    negligible contact resistance between the pins
    and the chip. In variable form, label appropriate
    resistances, temperatures, and heat rates.
  • For the conditions prescribed in Problem 3.27,
    what is the maximum rate at which heat can be
    dissipated in the chip when the pins are in
    place? That is, what is the value of qc for Tc
    75oC? The pin diameter and length are Dp 1.5 mm
    and Lp 15 mm.

21
Problem 4.10
  • A pipeline, used for transport of crude oil, is
    buried in the earth such that its centerline is a
    distance of 1.5 m below the surface. The pipe has
    an outer diameter of 0.5 m and is insulated with
    a layer of cellular glass 100 mm thick. What is
    the heat loss per unit length of pipe under
    conditions for which heated oil at 120oC flows
    through the pipe and the surface of the earth is
    at temperature of 0oC?

22
Problem 4.23
  • A hole of diameter D 0.25 m is drilled through
    the center of a solid block of square cross
    section with w 1 m on a side. The hole is
    drilled along the length, l 2 m, of the block,
    which has a thermal conductivity of k 150
    W/m.K. The outer surfaces are exposed to ambient
    air, with T?,2 25oC and h2 4 W/m2.K, while
    hot oil flowing through the hole is characterized
    by T?,1 300oC and h1 50 W/m2.K. Determine the
    corresponding heat rate and surface temperatures.

23
2nd Major Exam (062)
  • An aluminum heated plate is being cooled by air
    flowing over both sides and parallel to the plate
    as shown in the figure below with T25oC and h30
    W/m2K. At time t 0, the plate is 200?C.
  • Find the Biot number and check the validity of
    lumped analysis
  • Find the plate temperature at t10sec.
  • Find the time rate of change of the plate
    temperature at t0.
  • (Hint Neglect radiation)
  • Properties of Aluminum k200W/m.K, c900
    J/kg.K, ?2700kg/m3.

24
2nd Major Exam (062)
25
Problem 5.111 (modified)
  • A plane wall of thickness 20 mm is insulated on
    the left face and subjected to convection
    condition on the right face, as shown below.

26
Problem 5.111 (modified, contd.)
  • Consider the 5-node network shown schematically.
    Write the implicit form of the finite-difference
    equations for the network and determine
    temperature distributions for t 50, 100, and
    500 s using a time increment of ?t 1 s.
  • Use the one-term approximation given in section
    5.5 to obtain the temperature at the same
    location and times as in (a). Compare the two
    results.

27
Solution of Problem 5.111
28
Explicit method
  • Node 1
  • Node 2
  • Node 3
  • Node 4
  • Node 5

29
  • Stability condition

30
Implicit method
  • Node 1
  • Node 2
  • Node 3
  • Node 4
  • Node 5

31
Problem 6.26
  • Forced air at T? 25oC and V 10 m/s is used
    to cool electronic elements on a circuit board.
    One such element is a chip, 4 mm by 4 mm, located
    120 mm from the leading edge of the board.
    Experiments have revealed that flow over the
    board is disturbed by the elements and that
    convection heat transfer is correlated by an
    expression of the form
  • Estimate the surface temperature of the chip if
    it is dissipating 30 mW.

32
Problem 8.13
  • Consider a cylindrical nuclear fuel rod of
    length L and diameter D that is encased in a
    concentric tube. Pressurized water flows through
    the annular region between the rod and the tube
    at a rate , and the outer surface of the tube is
    well insulated. Heat generation occurs within the
    fuel rod, and the volumetric generation rate is
    known to vary sinusoidally with distance along
    the rod. That is ,
    where (W/m3) is a constant. A uniform
    convection coefficient h may be assumed to exist
    between the surface of the rod and the water.

33
Problem 8.13 (Contd.)
  • Obtain expressions for the local heat flux q(x)
    and the total heat transfer q from the fuel rod
    to the water.
  • Obtain an expression for the variation of the
    mean temperature Tm(x) of the water with distance
    x along the tube.
  • Obtain an expression for the variation of the rod
    surface temperature Ts(x) with distance x along
    the tube. Develop an expression for the x
    location at which this temperature is maximized.

34
Problem 8.31
  • To cool a summer home without using a vapor
    compression refrigeration cycle, air is routed
    through a plastic pipe (k 0.15 W/m.K, Di 0.15
    m, Do 0.17 m) that is submerged in an adjoining
    body of water. The water temperature is nominally
    at T? 17oC, and a convection coefficient of ho
    1500 W/m2.K is maintained at the outer surface
    of the pipe.

35
Problem 8.31 (contd.)
  • If air from the home enters the pipe at a
    temperature of Tm,i 29oC and volumetric flow
    rate of Vi 0.025 m3/s, what pipe length L is
    needed to provide a discharge temperature of Tm,o
    21oC? What is the fan power required to move
    the air through this length of pipe if its inner
    surface is smooth?

36
Problem 7.88
  • A tube bank uses an aligned arrangement of
    30-mm-diameter tubes with ST SL 60 mm and a
    tube length of 1 m. There are 10 tube rows in the
    flow direction (NL 10) and 7 tubes per row (NT
    7). Air with upstream conditions of T? 27oC
    and V 15 m/s is in cross flow over the tubes,
    while a tube wall temperature of 100oC is
    maintained by steam condensation inside the
    tubes. Determine the temperature of air leaving
    the tube bank, the pressure drop across the bank,
    and the fan power requirement.

37
Problem 11.7
  • The condenser of a steam power plant contains N
    1000 brass tubes (kt 110 W/m.K), each of
    inner and outer diameters, Di 25 mm and Do 28
    mm, respectively. Steam condensation on the outer
    surfaces of the tubes is characterized by a
    convection coefficient of ho 10,000 W/m2.K.
  • If cooling water from a large lake is pumped
    through the condenser tubes at
    , what is the overall heat transfer coefficient
    Uo based on the outer surface area of a tube?
    Properties of the water may be approximated as µ
    9.60 10-4 N.s/m2, k 0.60 W/m.K, and Pr
    6.6.

38
Problem 11.7(contd.)
  • If, after extended operation, fouling provides a
    resistance of R''f,i 10-4 m2.K/W, at the inner
    surface, what is the value of Uo?
  • If water is extracted from the lake at 15oC and
    10 kg/s of steam at 0.0622 bars are to be
    condensed, what is the corresponding temperature
    of the water leaving the condenser? The specific
    heat of the water is 4180 J/kg.K.

39
Problem 11.44
  • A shell-and-tube heat exchanger is to heat
    10,000 kg/h of water from 16 to 84oC by hot
    engine oil flowing through the shell. The oil
    makes a single shell pass, entering at 160oC and
    leaving at 94oC, with an average heat transfer
    coefficient of 400 W/m2.K. The water flows
    through 11 brass tubes of 22.9-mm inside diameter
    and 25.5-mm outside diameter, with each tube
    making four passes through the shell.
  • (a) Assuming fully developed flow for the water,
    determine the required tube length per pass.

40
Problem 11.25
  • In a diary operation, milk at a flow rate of 250
    liter/hour and a cow-body temperature of 38.6oC
    must be chilled to a safe-to-store temperature of
    13oC or less. Ground water at 10oC is available
    at a flow rate of 0.72 m3/h. The density and
    specific heat of milk are 10300 kg/m3 and 3860
    J/kg.K, respectively.
  • Determine the UA product of a counterflow heat
    exchanger required for the chilling process.
    Determine the length of the exchanger if the
    inner pipe has a 50-mm diameter and the overall
    heat transfer coefficient is U 1000 W/m2.K.

41
Problem 11.25 (contd.)
  • Determine the outlet temperature of the water.
  • Using the value of UA found in part (a),
    determine the milk outlet temperature if the
    water flow rate is doubled. What is the outlet
    temperature if the flow rate is halved?

42
Problem 12.29
  • The spectral, hemispherical emissivity of
    tungsten may be approximated by the distribution
    depicted below. Consider a cylindrical tungsten
    filament that is of diameter D 0.8 mm and
    length L 20 mm. The filament is enclosed in an
    evacuated bulb and is heated by an electrical
    current to a steady-state temperature of 2900 K.
  • What is the total hemispherical emissivity when
    the filament temperature is 2900 K?

43
Problem 12.29 (contd.)
  • Assuming the surroundings are at 300 K, what is
    the initial rate of cooling of the filament when
    the current is switched off?

44
Problem 13.50
  • A very long electrical conductor 10 mm in
    diameter is concentric with a cooled cylindrical
    tube 50 mm in diameter whose surface is diffuse
    and gray with an emissivity of 0.9 and
    temperature of 27oC. The electrical conductor has
    a diffuse, gray surface with an emissivity of 0.6
    and is dissipating 6.0 W per meter of length.
    Assuming that the space between the two surfaces
    is evacuated, calculate the surface temperature
    of the conductor.
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