Heat Insulation in Air-Conditioning - Industrial & Engineering

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ITU'DUSTRIAL A N D EKGINEERING CHEMISTRY

VOL. 28, KO. 7

I., I o w a State CoZZ. J. Sci., 5, 133 (1931). (3) Bryner, L. C., Christensen, L. M . , and Fulmer, E. I., IND. ESQ. CHEM.,28, 206 (1936). (4) Buswell, A. M., I b i d . , 22, 1168 (1930). (5) Buswell, A. M., and Boruff, C . S., Ibid., 25, 147 (1933). (6) Fulmer, E. I.,Ibid., 22, 1148 (1930). (7) Fulmer, E. I., Christensen, L. M., Hixon, R. M., and Foster, R.L., J. P h y s . Chem., 40, 133 (1936). (8) Fulmer, E. I., Christensen, L. M., and Kendall, A. R . , IND. ENQ.CHEM.,25, 798 (1933). (9) Hawley, R.C., Ibid.,13, 1059 (1921). (10) May, 0.E., and Herriok, H. T., U. S. Dept. Agr., Circ. 216 (2) Breden, C. R . , and Fulmer, E.

SOLVENT RATIOSFOR SEVERAL CARBOHYDRATES

TABLE VII.

Butanola-7 L Su X

7%

D

Time Hours .~

71 63 24 .~ 31 64 62 40 66 60 55 46 63 59 55 63 61 65 60 81 65 61 100 .. 118 .. .. 131 62 58 168 a D = dextrose: ~~

..

.. . .

_.

.. ..

73 67 65 67 62 58 65 64 L

Acetone-L Su X

7 %

D

EthanolSu

7 %

D

L

.. ..

.. 22 24 7 13 13 .. 26 25 .. 10 . . 25 12 13 22 27 29 24 14 26 19 23 26 31 24 30 28 12 17 25 40 23 28 29 14 16 25 54 24 29 30 15 25 55 10 30 34 54 .. .. 31 29 59 .. .. 28 25 31 9 17 60 26 60 . . * . 32 30 = levulose: Su = sucrose: X = xylose.

..

..

..

.. ..

.. ..

'i

3 7 3 8 11 4 4

X

.. 4e 45 32 17 15 15 12 12 10

(1932). \----I

(11) Underkofler, L. A,, Christensen, L. M . , and Fulmer, E. I., IND. ENQ.CHEM.,28, 350 (1936). (12) Veldhuis, M.K.,Christensen, L. M., and Fulmer, E. I., Ibid., 28, 430 (1936).

Literature Cited (1) Boruff, C. S., and Buswell, A. M., Ill. State Water Supply Div., Circ. 1 (1929).

RECBIVIOD April 25, 1936. Presented before the Division of Cellulose Chemistry at the 9lst Meeting of the Amerioan Chemical Society, Kansas City, Ma., April 13 to 17, 1936.

HEAT INSULATION IN AIRCONDITIONING

H

EAT is transmitted to or from pipes and ducts by radiation and convection. The radiant heat transfer per unit area is independent of the geometrical shape, whereas the convected heat depends to a considerable extent on the shape factor. I n this paper only pipes and rectangular or square ducts are considered.

Heat Transmission by Free Convection The heat transmission by free or natural convection can be determined from a formula published by the writer (9): qc = C

wher-e C

($)'"(TW.

~ ) o * 1 8 ' dt1.286

B. t. u./sq. ft./hr.

(1)

surface shape or height of vertical wall, in. (effect of diam. or height becomes constant a t 24 in.) Tav. = av. wall surface and surrounding air temp., O F. abs. dt = temp. zxcess between wall surface and surrounding air, F.

D

= a constant depending upon the = diam. of pipe or circular duct

For horizontal cylinders the value of C well established by various investigators.

=

1.016 has been = 1.394 has

C

T w o important functions of heat insulation in air-conditioning systems are the prevention of condensation on pipes and ducts and the prevention of heat transmission to or from the surrounding atmosphere. This paper presents a rational method for the determination of the correct thickness of insulation to apply, in order to prevent sweating, and also gives useful tables and graphs for the calculation of heat transmission from objects at subzero temperatures, as well as for objects above room temperature.

R. H. HEILMAN Mellon I n s t i t u t e of Industrial Research, Pittsburgh, P a .

been fairly well established for vertical plates. A value of C = 1.79 for horizontal plates warmer than the ambient air facing upward and 0.89 for horizontal plates wanner than air facing downward is indicated by the investigations of Griffith and Davis (I). More experimental work is needed on various sized plates in the three positions to determine accurately the effect of size and position. Table I gives the heat transmission by free convection from vertical walls 24 inches or more in height as calculated from Equation 1 for an ambient air temperature of 80" F. The values in Table I will not be changed appreciably by a considerable change in air temperature for a given temperature excess. For instance, a change in air temperature from 80" to 40" F. will increase the heat transmission given in Table I by only 1.3 per cent. Table I can also be used for calculating the free convection rate of transmission for various commercial shapes such as pipes and ducts. These calculations are simplified by the use, of the factors in Tables I1 and 111. Table I1 gives factors by which the values in Table I must be multiplied to obtain the convective transfer from various shapes whose characteristic dimensions are 24 inches or over, and Table I11 gives the factors t o be used in conjunction with the factors in Table I1 for obtaining the free convection from Table I for pipes and ducts whose characteristic dimensions are less than 24 inches. For example, the free convection transfer from a 3-inch 0 . d. horizontal cylinder for a temperature difference of 40" F. = 25.3 x 0.73 X 1.52 or 28.1 B. t. u. per square foot per hour. Similarly the free convection from the vertical side of a long horizontal duct 12 inches in height for the same temperature excess = 25.3 X 1.00 X 1.15 = 29.1 B. t. u. per square foot per hour.

Heat Transmission by Radiation The heat transmission by radiation from a surface to the surrounding surfaces can be calculated from the well-known Stefan-Boltzmann formula: q7 = 17.4 X 10-10 X p(T14 - T24)B. t. u./hr./sq. f t . (2)

JULY, 1936 ~~

~

INDUSTRIAL AND ENGINEERING CHEMISTRY

783

~~

TABLE I. HEATTR.4NSMISSION 0 0 0.4 0.9 1.3 1.8 2.2 2.6 3.1 3.5 4.0

0 ; F.

1 29 30 40 50 6' 70 8'

90

BY

FREECONVECTION

20 11.1 11.8 12.5 13 3 14.0 14 7 15.4 16.1 16.9 17.6

10

4.4 5.1 5.7 6.4 7.1 7.8 8.4 9.1 9.8 10.4

FOR

T e m p e r a t u r e Difference 30 40 18.3 25.3 19.0 26.1 19.7 26.9 20.4 27.7 21.1 28.5 29.3 21.8 30.1 22.5 23.2 30.9 31.7 23.9 32.5 24.6

TABLE 11:. FREECONVECTION FACTORS" FOR

LARGEVERTICAL

V.4RIOU.3 SHAPES

0.73

Horizontal cylinders 24 in. in diam. or over Long vertical cylinders 24 in. in diam. or over Vertical plates 24 in. in height or over Horizontal plates warmer than air facing upward Horizontal plates warmer than air facing downward Horizontal plates cooler than air facing upward Horizontal plates cooler khan air facing downward

SURFACES, I N

B.

between Body a n d Surrounding Air, F. 50 60 70 80 33.3 41.4 49.5 57.6 58.6 34.1 42.2 50.3 51.2 59.6 43.0 34.9 60.6 52.0 35.7 43.8 61.6 52.8 36.5 44.6 62 6 45.4 53.6 37.3 63.7 46.3 54.5 38.2 55.3 64.7 39.0 47.1 65.7 47.9 56.1 39.8 66.7 40.6 48.7 56.9

o'88 1.00 1.28

0.64

0.64 1.28

a These factors, multiplied b y t h e values i n T a b l e I, give the convection transmission.

T. U. PER S Q U a R E

90 67.7 68.8 69.9 71 . 0 72.1 73.2 24.4 15.5 76.6 77.7

-

Ti

Tz

= = =

Actual Factor Actual Factor

0. d.,

0. d.

or height, in. or height, in.

The radiation under black-body conditions, or for an emissivity of 1.0, is given in Table IV for cold surfaces as low as -40" F. t o warmer surfaces as high as 120' F.

DI-

1 2 3 4 5 6 7 8 1.88 1 . 6 4 1 . 5 2 1 . 4 3 1 . 3 7 1 . 3 2 1 . 2 8 1 . 2 5 9 10 12 14 16 18 20 22 1.22 1.19 1 . 1 5 1 . 1 1 1.09 1 . 0 6 1 . 0 4 1 . 0 2

a These factors, multiplied b y t h e factors in ,Table 11, multiplied b y t h e values i n Table I give t h e convection transmission.

PER

SQUARE FOOT PER HOUR

7

"effective" emissivity of surface and surroundings temp. of hotter surface, " F. abs. temp. of cooler surface, O F. abs.

120 101 102 103 104 105 106 107 108 109 110

FACTORY FOR VARIOUS AMETER PIPES OR V.4RIOUS H E I G H T PLATES

Temperature, O F. -20 -10 0 0 10 20 30 40 50 63 70 118 127 71.4 0 ' F. 78.0 85.0 92.4 100 137 54.2 59,3 65.2 78 0 109 119 128 78.7 85.7 93.3 101 138 -1"f 110 53.7 5 8 , 7 64.7 77.4 70.8 120 129 94.0 139 -2Of 79.4 86.5 102 53.2 76.7 111 70.1 58.2 64.1 87.2 121 130 80.1 94.8 103 140 52,7 76.0 112 69.5 - 3 O f 57.7 63.5 122 171 95.6 104 142 112 -4o+ 88.0 52.2 57.2 75.4 68.9 80.8 62.9 123 132 143 81.5 88.7 96.4 105 51.7 74 7 113 68.3 -5o+ 56.7 62.3 123 133 144 82.2 105 97.2 51.2 74 0 114 67.7 -Bo+ 89.4 56.2 61.7 124 132 145 82.9 98.0 50.7 67.1 90.2 73 4 -7o+ 106 115 55.7 61.1 125 135 98.8 55.2 66.4 146 83.6 90.9 72 7 50.2 -So+ 107 116 60.5 126 136 84.3 99.6 65.8 11.7 91.7 72 1 108 117 49,7 -go+ 54.7 59.9 Radiation f r o m walls of room a t 32O F. t o surface at -25O F. f o r effective emissivity of 0.95 = (102 a ExamIjle: per hr.

where p

F.

110 89.9 91.0 92.1 93.2 94.3 95.4 96.6 97.7 98.8 99.9

100

78.8 79.9 81.0 82.1 83.2 84.3 85.5 86.6 87.7 88.8

TABLE111. FREECONVECTION

TABLEIV. HEATTRANSMISSION BY RADIATION" FOR BLACK-BODY COXDITIONS IN B. T. u. ---Temperature, -40 -30

FOOTPER HOUR

7

80 148 149 150 151 152 153 151. 155 156 157 62.3)

-

90 159 163 161 162 163 164 168

167 165 169 0.95

100 170

110 183 lr'l 184 173 185 187 174 175 153 176 1'39 178 191 179 192 183 193 182 195 = 37.7 B. t . u.

120 196 197 199 230 201 203 204 206 207 209 per sq. ft.

The emissivities of a number of surfaces ordinarily encountered in engineering practice were determined by the writer and are shown in Table V. The effective emissivity aS used in the Stefan-Boltzmann formula is a function Of the individual emissivities, PI and PZ,of the radiating and receiving surfaces and also depends upon the extent and position of the surfaces. Hottel (3) has published formulas for a number of cases. There are a great many instances in engineering practice where the individual emissivity of the radiating surface is the same as the effective emissivity in Equation 2. For instance, the heat transmitted by radiation from a small pipe in a large room is dependent only on the emissivity of the pipe, and the emissivity of the walls of the room have no practical effect on the actual rate of heat transmission. However, where large rectangular ducts almost completely fill a room or tunnel, the effective emissivity of the duct surface and surrounding walls is approximately that for infinite parallel planes or 1 p = The emissivities given in Table V should, -+--1 Pl P2 therefore, be used with discretion when applying them to Table I V or the Stefan-Boltzmann equation.

.

Combined Heat Transmission by Radiation and Convection

FIQURE

1. SURFACE HEATTRANSMISSION VERTICALWALLS

FOR

To assist in the calculation of heat losses and surface temperature drops, the heat transfer by convection and radiation for an effective emissivity of 0.9 was calculated for temperature differences up to 70" F. for air temperatures of 30°,70°, and 80" F. The curves are shown in Figure 1. The heat transmission curve for the 30" F. air temperature was calculated for the purpose of obtaining heat transmission from vertical surfaces cooler than the surrounding air. The 70" and

IKDUSTRIAL AND ENGINEERING CHEMISTRY

784

80" F. air temperature curves were calculated for vertical surfaces warmer than the surrounding air. The appreciable difference between the heat transmission curves or the unit rate curves for the 30" and 70" F. air temperatures indicates the necessity of recognizing the considerably lower unit rate of heat transfer for subzero temperatures. This difference in heat transmission for the same temperature difference is due mainly to the dependence of radiation upon the fourth power of the absolute temperature. It is believed that most engineers either use a constant value for the unit rate of heat transmission or a heat transmission curve, such as the 70" F. air temperature curve, for practically all conditions in the air-conditioning and low-temperature heating fields. The curves given in Figure 1 cannot be used in determining the temperature drops or heat transmission for surfaces exposed to the direct rays of the sun. The surfaces TABLEV. EMISSIVITY VALUES FOR VARIOUS SURFACES

I'OL. 28, NO. 7

FIGURE 2. TEMPERATURE DIFFER~NCE BETWEEN AIR AND DEW POINTS AT DIFFERENT RELATIVE HUMIDITIES

temp. of air in room I temp. of surface of insulation 200 300 400 Surface 100 temp. of cooler medium in duct or pipe 0.17 Bright galvanized iron 0.14 0.15 0.16 heat loss per sq. f t . of outer surface of insulation 0.53 0.53 0.53 Badly tarnished galvanized iron 0.53 unit rate of heat loss from surface of insulation, 0.07 0.07 0.11 Very.bright copper 0.07 Tarnished copper 0.43 0.44 0.46 0.48 total loss by radiation and convection Aluminum foil 0.06 0.06 0.07 .. temu. difference from surface of insulation to air in room Aluminum paint 0.28 0.28 0.28 Asbestos lumber (smooth side) 0.79 0.79 0.79 o:i9 k = cokductivity of insulation Hard wood (sanded) 0.90 0.90 .. .. L = thickness of insulation for flat surfaces Black Micarta 0.77 0.79 .. .. rz .. Black Feltex paper 0.87 0.89 .. r2 log, - = L = equivalent thickness of insulation for cylindrical Mica-surfaced asphalt roofing 0.76 0.76 rl Window glass 0.88 0.89 0:so 0:io surfaces White canvas 0.88 0.89 0.88 where rl = radius of inner surface of insulation rz = radius of outer surface of insulation TABLEVI. THICKNESS OF CAREYCEL TO PREVENT SWEATINQ ON RECTANGULAR DUCTSWITH AIR INSIDE DUCTSAT 50" F. Then c -

-Temperature,

O

F.-

7

Let Ti

= = Ta = p = C =

TS

Per Cent Relative Temp. Difference between Room and .4ir inside Duct, F. Humidity 20 25 30 35 40 45 50 60 70 80 90

0.11 0.24 0.53 1.29

0.18 0.33 0.66 1.54

0.24 0.42 0.79 1.79

0.30 0.51 0.92 2.03

0.37 0.60 1.05 2.28

0.43 0.69 1.18 2.52

0.49 0.77 1.31 2.76

of air ducts on roofs will often attain temperatures much higher than the surrounding air temperature. Surface temperatures of 165" F. have been obtained on roof decks a t the MelIon Institute when exposed to the sun on summer days when the air temperature was approximately 100" F. The top of ducts exposed to the sun should, therefore, be more heavily insulated than the other surfaces in order to take care of the increased rate of heat transmission. Also a greater thickness of insulation should be applied to all surfaces of ducts exposed to the wind. The increased rate of heat transfer due to forced convection can be calculated from the formula : qje = 1 0.225 V where qfc = heat transfer by forced convection, B. t. u./sq. ft./ hr./" F. temp. difference V = velocity of wind, ft./sec.

In any practical case TI and T3will be known, and, for any assumed value of relative humidity (T1- T2) can be obtained from Figure 2 . C and n can be obtained from surface transmission or unit heat-loss curves, such as are shown in Figure 1or from the radiation and convection tables for values of T 1 and Tz. Conductivity k can be obtained from curves such as are given in Figure 3 a t a mean of temperatures T2 and

+

This formula is approximately correct for large surfaces exposed to air currents a t temperatures of approximately 70" to 80" F.

Determination of Thickness of Insulation Required to Prevent Sweating The thickness of insulation required to prevent sweating is that thickness which will raise the temperature of the outer surface of the insulation to a point slightly higher than the dew point for the corresponding air temperature and relative humidity. The difference in temperature between the air and the dew point for various humidities can be readily taken from a psychrometric chart. Figure 2 gives temperature differences between the air and dew point for air temperatures of 30" to 100" F. and for relative humidities of 50 to 90 per cent.

FIGURE 3. THERMAL CONDUCTIVITY OF INSULATINQ MATERIALS

INDUSTRIAL AND EKGINEERING CHEMISTRY

JULY. 1936 TABLE VII.

THERMAL CONDUCTIVITY O F VARIOUS MATERIALS Lb./

Conductivity at Mean Temp. of: 20' F. 100' F. 200' F. B . t . u . / h r . / s q . ft./

13.0 17.7 26.3 22.9 17.8 16.9 14.6 10.1 14.3

0.425 0.475 0.263 0.263 0,324 0.347 0.347 0.291 0.262

Density

Material

eu. ft.

Air-Cell 4 ply per in. (corrugated asbestos) Air-Cell: 6 ply per in. (corrugated asbestos) Armorack (hair felt) Aurora felt (rock wool) Careycel (cellular asbestos paper) Celotex (sugar cane fiber) Cork covering Corkboard Flaxlinum (flax fiber)

INSULATING

F./in. 0.516 0.630 0.536 0.612 0.317 0,385 0.300 0.344 0.379 0,446 0.358 0.373 0.389 0.444 0.320 0.355 0.329 0.413

Glass wool (loose)

785

Assuming first that the thickness of insulation required is 2 inches, then from Tables I to IV, the total rate of transfer by radiation and convection is 8.6 B. t. u., C = (8.6/6.6) = 1.30, and

(T

L = 0.341 70 - 30

-

'>

= 1.32

1.30

From Figure 4 for a 3-inch pipe and r2 log, the thickness required is 1.05 inches.

(T~/TI)

equal to 1.32,

This value will be found to be very close to the actual thickness required, since the free convection rate is not changed much for a variation in diameter of 7.5 t o 5.5. Recalculating for a 1-inch thickness, we have from Tables I to IV a total rate of heat, transfer by radiation and convection of 8.8 €3. t. u., and

8 . 2 0.284 0.323 0.372 11.4 0.257 0,305 0.359

Hair felt Insulate board (wood pulp) Kork-0-Board (peat moss) Magnesia 85y0, Multi-pl; (lamin,ated asbestos paper) Sponge felt (laminated asbestos paper) Perfecto covering (wool felt) Proteeto covering- .(hair felt and wool felt) Rocktex wool (loose rock wool) Rocktex blanket (rock wool felted between wire mesh) Rubber board (expanded) Seapack board (ceiba pod fiber) Weatherwood board (felted wood fiber) Weatherwood tile (felted wood fiber) Wool felt covering (smooth felt)

1 2 . 8 0.280 0.314 0.354 15.2 0.282 0.317 0.360

14.9 0,315 0,351 16.9 0,385 0,413 0,286 0,337 31.1 0.346 0.385 23.8 0.298 0.327 16.7 0.244 0.323 4.0 0.180 0.269 6.0 0.190 0.274 8 . 0 0,205 0,273 10.0 0.190 0.255 12.0 0.220 0.271

0.398 0.447 0.400 0.432 0.363 0.424 0.380 0.380 0.358 0.342 0,337

16.6 5.7 5.9 18.1 16.2 23.0

0.356 0.289 0.321 0.409 0.403 0.462

25.5

0.226 0.230 0.180 0.320 0.285 0.330

0.283 0.256 0.244 0 360 0.337 0.390

Ts. The thickness of insulation required to prevent sweating will then be slightly greater than the value obtained by the equation :

From Figure 4 the thickness corresponding t o a n r2 log, ( r 2 / r Ivalue ) of 1.29 = 1.04 inches. The thickness of insulation required will, therefore, be slightly greater than 1.04 inches. This value .is only 0.01 inch less than the value obtained by t h e first calcula,tion. I n view of the increasing importance of air-conditioning in industry and the heating and ventilating field, Table VI gives the thickness of Careycel insulation required to prevent sweating for air ducts carrying air at BO" F. with room temperatures of 70" t o 100" F. and relative humidities of 60 t o 90 per cent. An emissivity of 0.9 was used in these calculations.

Conductivity of Commercial Insulations Table VI1 gives the thermal conductivity of a number of commercial insulations. These values were obtained at

The process involved is illustrated by the following example : Determine the thickness of Careycel insulation required to prevent sweating on a large rectangular air duct, with the air inside the duct at 50' F. and the temperature of the room at 70' F. dry bulls, with a relative humidity of 80 per cent, the effective emissivity of the surfaces being 0.9. From Figure 2, T, - Tz = 6.6" or T1 = 70 - 6.6 = 63.4' F. Table I1 shows that the heat transfer by convection from a vertical surface is roughly midway between that from a horizontal surface facing upward and a horizontal surface facing downward; so for this example we will assume that the heat transfer by convection takes place. at a rate equal to that of a large vertical surface, or from Table I the convected loss for a temperature difference of 6.6' F. = 2.9 B. t. u. per square foot per hour. From Table IV the radiant heat transfer = 0.9 (137.0 - 130.4) = 6.0 B. t. u., or p = 2.90 6 . 0 . = 8.90 B. t. u. per square foot per hour. C = (8.9/6.6) = 1.35. The conductivity of Careycel at a mean tjemperature of (70 63.4)/2 or 66.7' F. from Figure 3 is 0.355. Substit,uting the above values in the equation:

+

+

L

= 0.355

(2

- - = 0.536 in. 1 .i5)

The thickness required is, therefore, slightly greater than 0.536 inch. For cylindrical surfaces, this method gives the equivalent thickness of insulation, or rz log, (rz/rJ. The required thickness of insulation can readily be determined by the method given for flat surfaces and the use of Figure 4. I n this case it is necessary to assume a thickness of insulation in order to determine the surface heat transfer rate which is different for pipes of various diameters. Assuming the same conditions as for the example illustrated, with the exception that the duct is a standard 3-inch pipe carrying brine a t 30" F., we have the following :

FIGURE 4. EQUIVALENT THICKNESS OF INSULATION

786

VOI.. 28, NO. 7

INDUSTIIIAI, AND ENGINEEIIING CHEMISTRY

Mellon Institute and arc the arerage results of a number of test.s on each type of material. For convenience in ea,lculating heat losses for various ruean t.emperature conditions, the conductivity of a few of these insulations is r&en in Figure 3. The thickness of insalation required to prevent sweating on the above air duct for any of the insulat.ions whoso conductivities are included will be found to be directly proportional to conductivities of the insulations chosen and the insulation used in calculating the table. I n conclusion, the author wishes to express his thanks to

It. \\-. Ortmiller who determined the conductivities of the various insulations.

Literature Cited ~xnt1. ~phys. i~ ~ b~anPcinl . , , R ~9 (1922). ~ ~ . (3 lieilmnn, R. H., Trans. Am. SOC.Mcch. Enzrs., F ~ S Yt e m (1) a r i s t h

~

Power. 51. 257 (1929). (')

HotteL 'I. 'L 'hid., 53(19b),

(1931).

February 11, 1936. Presented before the Symposium on Hest Transmission lield under the auspice8 of the Division of Industrial and Engi. neerinq Chemirtiy of tho Ameiiesn Chemiod Sooiety st Yale University, xer corm., neeember 30 and 31. lo: