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vol. 13, pp. 24-25; Encyclopedia of American Biography, 1974, pp. 1035-1036; P. L. Alger and C. D. Wagoner,
“Charles Proteus Steinmetz,” IEEE SPECTRUM, pp. 82-95, Apr. 1%5; Steinmetz the Philosopher, compiled by
Philip L. Algerand Ernest Caldecott (Schenectady, NY, 1%5); Ronald R. Kline,“Professionalismandthe Corporate Engineer:Charles P. Steinmetz and the American Institute of Electrical Engineers,” IEEE TRANS.
EDUCATION, vol. E-23, pp. 144-150, Aug. 1980; Ronald R. Kline “Charles P. Steinmetz and the Development of Engineering Science,” Ph.D. dissertation, University of Wisconsin-Madison, 1983; James E. Brittain, “C.P. Steinmetz and E. P. W. Alexanderson: Creative Engineering in a Corporate Setting,” Proc. /€€E, vol. 6 4 , pp. 1413-1 41 7,1976.
ON THE LAW OF HYSTERESIS.
BY CHAS. PROTEUS STEINMETZ.
In the number 137,of December 17th, 1890,-of theElectrical Engineer I published a short article under the title “Note on the Lawof Hysteresis,”where I showed that in a setof determinations of the lossof energydue to hysteresisby reversals of magnetism, for different magnetizations, made by Ewing, this loss of energy due to hysteresis can fairly well be expressed by the equation:
H =VB.~,
where H istheenergy consumedbyhysteresisduringone magnetic cycle, in ergs per cubic centimetre,B the magnetiza-
tion in lines of magnetic force per squarecentm i etre,and q() a numerical coefficienti,n this case = .002.
Considering that even the simplelawofmagnetism-that is, the dependence of the magnetization B upon the magnet@
motive force F (for instance, in ampere turns per centimetre
length of themagneticcircuit) has until now defied all attempts of mathematicalformulation, it appeared astrange feature that the apparently much more intricate phenomenon of hysteresis, or rather of theconsumption of energy by hysteresis,shouldyieldtoanalyticalformulation in such a simple way, to be directly proportional to the 1.6th power of the magnetization. At the samtieme the coincidenceof Ewings tests with the curve of the 1.6th power was near enough to be considered as something more than a mere incident, but at least as a clue to a law of hysteresis, the moreas this law held not only for low and medium magnetizatiobnu,t even for very high saturation, withoutshowing any kink at that point where the magnetic characteristicgoes over the bend or “knee” and thereby entirely changes its shape, nor any marked tendency of deviation of the extremest observed values from the calculated m e .
Reprintedfromthe American lnstitute of ElecfricaEl ngineers Transactions, vol. 9, pp. 344,1892. Copyright 1892 by the American Institute of Electrical Engineers.
If any quantity has a nght to be ded “magnetic resistance,” it is this
coefficient 7 ; for 7 is the c&cient of conversion of magnetic energy into
heat, while as “electric resistance” we define thecwfficent of conversion of electric energv into heat.
The term generaIiy denoted magnetic resistance”-that is, the inverse value ofmagneticconductivity,docsnotdeserve this name at all, but is &re properly caned “reluctance.”
F
1.50 1.95 2.56 3.01 3.76 4.% 6.62 7.04 26.5 75.2
3,830 5,950
7,180 8,790 10,590 11,480 11.W 13,700 15,560
WLE I.
H:
1160 2190 2940 3990 5560 6160 6590 8690
10,040
CalC
375 1082 2190 2956 4080 5510 6260 6690 8310 10,190
iT
H - H:=
calc +3o5bs + 58
... - 16
-90
+so
- 100 - 100 + 380
- -150
Av: i98
-
s:
+ 8.5 + 5.0
... - .5 -23
+ .9
-1.7
- 1.5 + 4.4
-1.5
f2.6
In Fig. 1 and Table I, I give from the article referred to, the calculatedcurve of hystereticloss, as adrawnline,with Ewings tests marked as crosses, and in dotted line the curve of magnetomotiveforce F, c o r r v n - tothedifferent
magnetizations, as abscsisae.
In the table, I: F = the M.M.F.,in absolute units,
B = the magnetization,in lines of magnetic forceper square centimetre,
H = the observed values, and
ObS
STEINMETZ:ON THE LAW OF HYSTERESIS
197
H = the calculated valuesof hysteretic loss,in ergs per cubic centimetre,
H - H = thedifference between both, in ergs and in
calc obs percentages.
To study morecompletely this phenomenon of hysteresis
and of the energy consumption caused thereby, I endeavored
to make a number of determinations with different magnetic
circuits and at different magnetizations.
To be enabled to carry out these experiments, I am highly
obliged to Mr. Rudolph Eickemeyer, of Yonkers, N. Y.,who,
being greatly interestedin the laws of the magnetic circuit and
havingdoneconsiderablework himself in this branch of
msa,l electrical science, not only put the large facilities of his well-
known factory at my
but also guided the experiments
with his valuable advice. Apart of the instrumentsused in the
tests are of Mr. Eickemeyer's invention and coveredby his
patents.
To beabletodealnotonlywiththesmallamounts
of
energy which the reversal of magnetism in a tiny bit of iron
wire sends through the ballistic galvanometer, but to reduce
the determinations to readings of considerable power-values,
and where a much greater exactnesscan be reached, andat the
same time to determine the dependence of the hysteretic loss
of energy upon the velocity of the magnetic cycles, I decided
to use alternatingcurrents, at least as far as this could be
done, whereby the determination of the energy consumed by
hysteresis is r e d u d to a simultauwus wattmeter, voltmeter,
ammeter and speed reading.
At the same time this electro-dynamometer method has the
advantage that the magnetic cycle is completed in a steady,
continuous motion,while in the ballistic method the magnetic
cycle is completed by sudden changes in the magnetization,
which jumps from point to point,to enable the productionof
the induced current. This feature introduces an errorinto the
ballistic method, for if a magnetic cycle is gone through by
sudden changes, a larger amount of energy may be consumed
than if the magnetization varies steadily in harmonic vibra-
tion.
Suppose, around a magnetic circuit, an alternating current
of N complete periods per second is sent in n convolutions.
Let C=the effective strength of the current,
E =the effective E. bf. F. induced in the circuit by self-in-
duction, after subtracting theE. M. F.'S induced by the
self-induction of the instnunents,
W =the energy consumed in the circuit, after subtracting
the energy consumed by the electric resistance.
Then, I beingthelength and s thecross-section of the
magnetic circuit, allin centimetres, amperes,volts, watts, etc.,
Let B==themaximum magnetization in lines of magnetic
force per squareamtimetre,
H ==the loss of energy by hysteresis, in ergs per cycle and
cubic centimetre;it is
hence
w = L ~ N Hx 10-7
H = - LWrN X 10+7
the hysteretic loss of energy, and
hence
E = f i m B N n X lo-'
B=
E X
amNn
the maximum magnetism.
For higher frequencies, 80 to 200 periods per second, the
alternating currentwas derived from a1H. P. 50 volt Westing-
housedynamo. This was drivenbya 3 HP.. Eckemeyer
continuouscurrentmotor. Byvarying theexcitation of the
motor field and varying the E. M. F. supplied to the motor, the
speed and therefore the frequency of the alternating current
could be variedin wide limits.At the same time, supplied with
constant E. M. F. andlikealtlheEickemeyermotors
of
unusually small armature reaction, this electromotor kept al-
most absolutely constant speed under varying load, the more
as it never ran with full load.
For low frequencies, this bipolar continuous current motor
wasused as abipolaralternatingdynamo, as shown in a
patent of Mr. Stephen D. Field. On the continuous current
commutator two sliding rings weremountedandconnected
with opposite commutator bars. In the ordinary continuous
current brushes a continuous current was sent in, which set
themachine in motion as an electromotor,whilefromthe
slidmgringsby two separatebrushes,alternatingcurrents
were taken off. By varying the E. M. F. supplied to the motor,
the E. M. F. of thealternatingcurrent wasvaried,while a
variation of themotofrieldgavethevariations
of the
frequency. The curve of E. M. F. was very nearly a sine-wave,
the ratio of maximum E. M. F. to effective E. M. F. found
= 1.415,whilethesine-waverequires 1.414-ht is, essen-
tially the same.
To determinewhetherthechange of theshape of the
alternating currentby varyingload and varying excitationhad
any influenceupon the readmgs, the variationsof the alternat-
ing E. M.F. were produced:
1. By varying the excitation of the field of the Westmghouse
dynamo.
2. By running the Westmghouse dynamo fully excited feed-
ing the secondaries of a bank of converters, feedmg from
the fine wirecoils of these converters the fine wirceoils of
another bank of converters, and taking current off from
the secondariesof these converters, connected from onteo
six in series.
3. Bychangmg the E. M. F. bymeans of a Westinghouse
converter of variable ratio of transformation.
4.By loadmg the dynamo when small currents wereused for
the tests.
But afterhavingfound that allthesedifferentways of
varying the alternating E. M. F. gave no perceptible difference
whatever in the readmgs, I afterwards used the most conveni-
ent way to vary the excitationof the dynamo field and, where
higher E. M. F'S wereneeded,toincreasethe E. M. F. by an
interchangeable converterw, hich gave the ratios:1:1,2,3,4,5.
For thedetermination of thefrequency,adirect-reading
speed indicator (horizontalball governor, actinugpon a spring)
was used, which was carefully calibrated.
For theelectricreadings,instruments of theelectro-dy-
namometer type were used,zero-reading-that is, the movable
coil was carried back by the torsion of a steel spring to zero
position.
*This formula holds rigidly only for the sine-wave, but as shown in the follow& the currents &LI in the tests were at least very near sim-waves.
Besidegadeviationfromthcsiacshapewouldnotaltcrtherrsultsatall,
but only slightly change the coefficient q.
198
PROCEEDINGS OF THE IEEE. VOL. 72, NO. 2, FEBRUARY 1984
These instruments were specially built for alternating cur-
rents, with very low self-induction and low internal resistance,
using bifilar german silver wire as additional resistance.
In theammetertherange of readingswasfrom 3 to 40
amperes, the internal resistance = .011 o.
Thenormalinductance (that is, E. M. F. of self-induction
induced by one ampere alternating current, flowing through
the instrument with a frequency of 100 complete periods per
second): = ,045 o.
In thevoltmetertherange ofrea-was
from .5 volts
upwards, but to avoid the necessity e: corrections for self-in-
duction sufficient additional resistance was used to decrease
the correction under1 per cent., and then the lowest readings
were from 3 to 6 volts.
The internal resistance of thevoltmeter is = 2.5 w , its
normal inductance = 4.12 w .
In the wattmeter the resistanceof the coarse wire coil (fixed
coil) was = .026 o,is normal inductance = .073 u.
The internal resistanceof the fine wire coil was = .25 o,its
normal inductance = .33 a.
In most of the readings sufficient additional resistance was
used to make the correction for self-induction of the fine wire
coil neghgible. Only in a few readings where it exceeded 1 per
cent. it was taken in account.
For small currents an Eickemeyer ammeter was used, which,
while reading from .7 to 3 amperes, though built originally for
continuous currents, had alreadbyeen used by me for alternat-
ing currents and had been checked for its constancy of read-
ings several times, and always found to give
no perceptible
difference in its readingsfor continuous currentsand for
alternatingcurrentsupto over 200 complete.periods per
second, the highest frequency I could reach
Its internalresistance is = 1.1 o,its normalinductance
= 2.03 o.
Several sets of readings for different frequencies were taken
on an old Westinghouse voltmeterconverter.Thefinewire
coil and one of the 50 volt coils were left open.Into the other
coarse wire coil an alternating current was sent, in series to
ammeter and coarse wire coil of wattmeter, while the voltme-
ter and the fine wire coil of the wattmeter were connected in
shunt around the whole circuit.
Hence a correction had to be applied for the self-induction
of ammeter and coarse wire coil of the wattmeter and for the
resistance of thecircuitO. nly in veryfew
this correc-
tion amounted to somewhat more than 10 per cent. Generally
it was much smaller.
Theinstruments were calibratedseveral timesandtheir
constants found to remain constant.
The speed indicator was calibrated carefully andits correc-
tions added.
Each r e a consisted of an ammeter readmg, a voltmeter
reading, a wattmeter reading and aspeed readmg.
Before and after each set of readings the zero positions of
theinstruments weredetermined, and onlythose sets of
rea- readings used where the zero positionhad remained constant.
Before and after each set of alternating current
a
continuous currentwas sent into the circuit and faew readings
for different currents taken. Voltmeter and ammeter readmgs
combinedgavetheresistance of the circuit, andboth com-
bined with the wattmeter readmg gave a checkfor the instru-
ments,herebeing watts = volts X amperes. Only those sets
were used againwhere an entireagreementwasfound,and
with the alternating current firstreadings with small currents,
then with large currents, and then again with small currents
taken, so that I believe every possible care was exercised to
avoid any errors in the tests.
As beforesaid,thefirst sets of testsweremade on the
magnetic circuit of a small Westinghouse converter.
The constants of this converter, so far as they are of interest
here, are:
Mean length of magnetic circuit,21 cm.
Mean cross-section of magnetic circuit,= 43.67 an.*
Hence volume of iron, = 917. a d .
Resistance of secondary coil, = .2 w .
Further sets of readings were taken on a magnetic circuit,
built up of very thin sheets of iron, alternately 8 in. x 1 in.
and 3 in. X 1 in., in rectangular shape,very carefully insulated
against eddy currents with layers of thin paper between the
sheets. On the two long sides two coils of each 50 turns,very
coarse wire (3 No. 10 in parallel), were wound and connected
in series, thereby givingn = 100 turns of an internal resistance
of .048 w .
Here the mean lengthof the magnetic circuitwas I = 41 c m .
The cross-section,s = 3.784
Thecircuitconsisted of 58 layers of sheet-iron of the
thicknesss = .02577 t3) and the width o = 2.579.
The whole volume of iron was = 155 c m . 3
The sheet-ironpieces were first freed from scales by dipping
into dilute sulphuric acid.
In one set of tests an open magnetic circuit was used, by
leaving the short end pieces (3 in.x 1 in.)off, and using two
pileseach of 66 pieces (8 in. X 1 in.) of thesame iron, the
same pieces as used in the former closed circuit tests.
In thesereadings,forthedetermination of thehysteretic
loss, onlyvoltmeterandwattmeter,but no ammeter,were
used,andtheconductivitycurvedeterminedseparatelyby
voltmeter and ammeter.
The calculation of the rea-was
done in the following
way:
After applying the corrections for self-induction of instru-
ments, resistance andspeed, the rea- were reduced to lines
of magnetic force per@are centimetre B and consumptionof
energy by hysteresis per magnetic cycleH , in ergs.
Then the resultswere plotted on cross-section paper and if
any valuewas foundto be verymuch out of thecurve
connecting the other values, it was stricken out as evidently
erroneous,not consideringit worth whileto determinewhether
it was a wrongreading of anyone of the instnunents or a
mistake in the calculation.
Then from the other values of B and H , under the supposi-
tion that H were proportional to anypower x of B:
H = qBX
this exponent x was determined. Thisvaluexwillbeseenalwaystobesonearto1.6that1.6
can be considered at least as first approximationto x. Then, under the assumption
x = 1.6
hence
H VB'.~
the coefficient q was calculated, and now the equation
H =vB'.~
STEINMETZ: ON T H E LAW OF HYSTERESIS
199
plotted in a curve, as given in the figures, and the observed
values of H drawn in and marked.
Fromthe c w e were taken thecalculatedvalues of H ,
correspondingtotheobservedvalues
of B, thedifference
Hdc - Bobs determined, and expressed in per cents. of Hdc.
These values are given in thetablesandshown in the
curves.
MAGNETIC CIRCUIT OF THE
WESTINGHOUSCEONVERTER. FIG.2; TABLE1S1.
MAGNEnC CRARACIERISIIC.
F. = M. M. F., in ampere turns per centimetre length of magnetic circuit.
B.= Magnetization, in lines of magnetic force per s q w e
centimetre.
TABLE II. (1)
F.
I:
8 9 10
B.
F.
1500
y.o~~ 0
6800
%a,
I I
::
i!
11.750
20
1i8m
25
13,600
30
14,100
35
14,350
40
B.
15.080 15570 15,630 15.880 16;4m 16.950 172m 17,780
F.
B.
18500
55
18,820
19,140
19,440
m
19,740
75
mom
80 85
2m,056w0
90
2o.m
Coefficient of hysteresis: q = BO2315
hence, theoretical curve: H = BO2315 B.6
TABLE II. (4)
- Frequency: N = 137 complete periods per second:
B.
H.
ObS
H.
calc
cHa.k.
-
H.
obs.
%
4ooo 4670 5510 5760 5840 6690
E
12,430 13,7SO
1490 1818 2358
2482 2540 3285 3358 3374 8336
10.m
1410 1800 2350 2520 2580 3180 3290 3370 8610
10,1oO
av:
-80
- 18
-+
8 38
+40 - 105 - 68
+-2744
+loo
f 73.5
- 5.7 - 1.0 - .3 - 1.5
+ 1.6
- 3.3 - 2.1 - .1 + 3.6
+ 1.0 i-zb
Exponent of power, derived fromtests:
- X 1.5887 1.6
Coefficient of hysteresis: q = .002438
hence, theoretical curve.
H = .002438B.6
WSTERESSI.
B.= Magnetization, in lines of magnetic force per square
centimetre. H . = Loss of energy by hysteresis, in ergs percycle,and
cubciecntimetre, = watt-second.
TABLE II. (2)
Freauencv: N.= 28 comlete Deriodsm second.
3510
-10,560 13,800 17,W
1178 6286
10286 15,357
110.180
15.600
E-1 ii 1 -106
+ 243
PV:
- Exponent of power, derived fromtests: X = 1.6111 1.6
TABLE II. ( 5 ) Frequency. N 5 205 complete periods per second.
I B. I E.
1790
376
1990
463
2380
585
2620
735
3060
893
3390
1054
3660
1297
3710
1288
4620
1822
mm 2024
4990
2034
5910
2693
6100
2844
6550
3039
7290
3673
4341
H.
- calc
400 460 610 720 920 1100 1240 1250
I1800
2070 2010 2620 27x1
4530 u60
%
-
+ 24
+ 6.0
-3
+ 35
+-5..77
+-2175
+46
+-2.1
+ 42..92
- 57
- 4.6
- 38
- 3.0
-22
- 1.2
+46
+ 2.2
- 24
- 1.2
-73
-2 8
-96
-+31.5.3
- .9
_- -+-
1.0 2.1 2.2
-- f 2 7
Coefficient of hysteresis: q = .002410
hence, theoretical curve:
Exponent of power, derived from tests:
- x = 1.6012 1.6
Coefficient of hysteresis:
H = .00241B.6
q = .002434
TABLE! II.(3) Frequency: N = 36 complete periods persecond
hence, theoretical curve.
H = .002434B.6
From these 4 sets of readings, we get the results:
7090 10,250
13,410 17,080 19,340
3333 5667
9694 14,417 16,111
3500 6310
9700 14,400 17,600
++ 614637 + 17
+ 1489
~-
Exponent of power, derived from tests:
- X = 1.6476 1.6
+ +
4.8 10.2
36
1. N = 28 4 m w :X =1.61117 =.002410
2.
5
1.6476 BO2315
+ +
.1 .1
+ 8.4
3. 137 10 ”
205 4.
18
1.5887 BO2438
1.6012 .m34
f.
Therefrom we derive the average, by giving to each value as
- weight the number of readmgs, whereit is based upon: X = 1.60513 1.6
200
PROCEEDINGS OF T H E IEEE, VOL. 72, NO. 2, FEBRUARY 1 9 6 4
= .0024164
Hence:
H -- .0024164B'.6
This curve is used for calculating the values given as H&, and is plotted in Fig. 2 in drawn line.
The observed values of H are drawn in Fig. 2: The magnetic characteristicis drawn in dotted lines.
From this curve of hysteretic loss
H = .0024164B'.6 we derive the values:
TABLE II. (6)
1 B. I H. 1 B.
H.
152 462 884
m 1400
2680 3430 4240
5130 6070
7070 8130
13,000 14,000 15,000 16,000 17,000 18.000 19,000 20,000 25,000
3c4000 35,000
40,000
9230
lop00
11,610
12Im
14,180
15.550 16,970 18,uy)
26,290 35,210 45,060 55,800
11,160
II.-MAGNE~c CIRCUIT BUILTUP OF WELL INSULATELDAYERSOF VERYTHIN SHEET-IROFNI.G.3; TABLE1S11.
MAGNElTC CHARACIERISTIC.
F = M. M. F. in ampere tums per centimetrelength of
magnetic circuit. B = magnetization in lines of magneticforce per square
centimetre.
TABLE III.(1)
F.
B.
F.
B.
F.
B.
2
1700
12
1137,7,50 2
45
3
4200
14
14260
50
17,wO
4
7400
16
14,600
55
lSf00
5
9200
18
14,900
60
18,650
6
10.400
20
15200
65
19,030
7
15,700
25
19,380
70
8 9
11,850 12,470
30 35
1169,2,70300
75
16,680
80
m,oso
10
13,070
40
17,050
85
m,m
90
20,750
HYsTmFSIs
B = magnetization in lines of magneticforcepersquare centimetre.
STEINMETZ: ON T H E LAW OF HYSTERESIS
201
H = loss of energy by hysteresis, in ergs per cycle and cubic centimetre, = 1 0 -w~att-seconds.
CLOSED MAGNETIC CIRCUIT.
Frequency: N = 85 complete periods per second.
4220 7690
10,470
7160
11,110
8370
14,030 12,600
14.890
13,730
' 17,190 17,040 17,940 17,570
TABLE III.(2)
H
cak.
3140
4700 7700 8464 12280 13,540 17,040
- 18,240 av :
H . - H.=
cak. obs
- 180 - 270 3420
+480
+540
+%
- 320
- 190
+ +
... 670
315 =
s
- 5.7
- 7.9
++170..02
- + -
1.1 2.6 1.4
...
x + 3.7
Exponent of power, derived from tests:
- X = 1.6041 1.6
Coefficient of hysteresis:
7 = .00285
hence, theoretical curve:
H = .900285B'.6
TABLE III. (3)
Frequency, N = 138 complete periods per second.
B.
5220 5750 6540 7070 8210 8520 9570 10,450 11,990 14,570 14,aaO 16,770 17,970 19,320
H.
obS.
3030 3620 4320 4830 5950 6090 7850 8780 11,060 15,840 16,160
20.350 20,620 23,180
H.
calC.
3015 3550 4355 4890 6160 6530 7840 9040 11,230 15,340 15,580 19260 21,440
- 24,120 av:
H. - H . =
calc. obs.
- 15 - 70 + 35
++26100
+440
- 10
++216700
+ 3.4
I i+21:;.5
- 1090
- 5.6
- + 820
+940
f 371
+ 3.9
+ 3.8
Exponent of power, derived from tests: x = 1.6044 = 1.6
Coefficient of hysteresis: q = .00335
hence theoretical curve:
H = .00335B'.6
TABLE III. (4)
I I I 1 Frequency,N = 205 completeperiods per second:
B.
H. H.
H -H.-
ob%
cak.
cak obs
6360 I340 10.030 10,860
1WO 14,600 14,700 15,750 16,700
4440 5380 9510
9980
13,700 17,390 17,830
19,700 21,990
4660 5780 9510
l0,6X,
12,940 17,160
17.343 19560 21500
aV:
+m
+400
. .. + 690 - I60
-230
- 490
*--364900 425
+ 4.8 + 6.9 ...
+6.5
- 5.9
-- 1.3 2.8
- 1.7
r-n3.2
Exponent of power, derived from tests: x = 1.697 = 1.6
Coefficient of hysteresis: I) = .00373
hence theoretical curve: H = .00373B1.6
OPEN MAGNETIC CIRCUIT.
- Twogapsof 4 cm. length.
I 2. z.;;= 1 ", TABLE III. (5)
Frequency, N = 138 complete periodsper second.
B.
H.
obS.
3150 3640 4690 5490 6270 10.250 11,Ooo 12280
1570
1560
2110
2020
2930
2950
-90
+ 20
4380
3780 3510 4690
++237100
10,290 10,450 -160
I11,810
14250
11,520
13a,v7:40
I
I
-+4..47
++76.26
-1.6
Exponent of power derived from tests:
- X = 1.6040 1.6
Coefficient of hysteresis: q = .00394
hence theoretical curve:
H = .00394B'.6 From these four sets of readings we get the results:
N = 85
138 205
CLOSED MAGNETIC CIRCUIT.
9 readings: x = 1.6041
14 I'
1.6044
9
'I
1.6970
7 = .OO285 .00335 .00373
OPEN MAGNETIC CIRCUIT.
N = 138 8 readings: x = 1.6040 q = .00393
Herefrom it seems that theconsumption of energyby
hysteresipsemr agneticcycle
increases with increashg
frequency-that is, with increasing velocity of the magnetic
change.
The three values of three coefficients of hysteresis for closed
circuit in their dependence upon the frequency N, can be
expressed by the empirical formula:
+ 7 = (0017 .000016N - .00000003 N2)
To compare the values of hysteretic loss for different fre-
quencies, in Fig. 3 the curve of hysteretic loss for N = 100
complete periodsper second is plotted, giving:
q100 = .003
hence
H = .003 B'.6
and the observed values of H are not cllrectly drawn in, but the observed valuesof H multiplied withthe factor:
'Iloo
I)&.
to compare the differentfrequencieswith each other. These valuesare plotted for:
202
PROCEEDINGS OF T H E IEEE, VOC. 72, NO. 2, FEBRUARY 1%
26.000,-
a
] N-8
5wit 138
h
the
m
a
r
k r+
closedmagcnirectuicit.
205
1
1
N = 138 with themark 0 ;Open magnetic circuit.
From this m e of hysteretic loss,
H = .003B1.
we derive the values, for the frequency of N = 100 complete periods per second.
TABLE III. (6)
II1740 2490 3330 4260
4M 780oao0oQo0o
9oM)
6360
10.000
7530
11,000
w@Jo
8790 10.080
B.
13,000 14,000 15,000 16,000 17,000 18,000 19,000
m2so;oaO,o
30,000 35,000 40,000
H.
11,460
15,990 17,610 19590 21,060 22.830 32340 43,680 55,950
a92m
Especiallynoteworthy is thelastset ofreadings, an open magneticcircuit, in so far as it provesthefallacyofthe general opinion that the hysteretic lossof energy in the iron is smaller in the open magnetic circuit than in the closed circuit.
For the coefficient of hysteresis observed on open magnetic circuit
q = m393
is even greater than that for closed magnetic circuit,
q = .00335
But this discrepancy is easily explained by the fact that in theclosedmagneticcircuitthemagnetization is nearly uniformthroughoutthewhole iron. But in the open magnetic circuit the magnetic field intensity differs considerably from point to point, bemg a maximum in the middle of the mag-
netizing coils,a minimumat the ends of the iron sheets.Now,
the values ofB given in the table,are the average vahaesof the
magnetization, and the values H,the average valuesof hyster-
etic loss. But the average valuoef the 1.6th powersof different
quantitiesB is larger than the 1.6th powerof the average value of B.
STEINMETZ: ON THE LAW OF HYSTERESIS
203
For instance, in acubic cm. of iron magnetized to B = 12,000 is H = 10,080; in a cubic cm. of iron magnetized to B = 6OOO is H = 3330; hence of these 2 cubic centimetres the
- average magnetization is B = 9o00,and the averageH 6,705 ergs
but to B = 9o00 c o r r q n h H = 6360 ergs; that is, about 5 per cent. less, and the difference becomes still greater, if the values B differ still more.
Talung this into account,it seems that the loss of energy due to hysteresis depends onlyupon the intensityof magnetization, and perhaps upon the frequencyb,ut is independent of open or c l o d magnetic circuit, as is to be expected.
III.-FIG. 4. TABLEISV.
A third setof determinationsof the hystereticloss of energy is given in the following:
Again a magnetic circuit was built upof 17 layers of a soft kind of sheet-iron, each layer consisting of two pieces of 20 cm.length, 2.54 cm. width, and two piecesof7.6 cm.length
and 2.54 cm.width, of the thicknessS =i .M86cm., that is, of considerably greater thickness than in the former set of tests.
Here evident proof of the inductionof eddy-aments in the iron was found. EspeQally perceptible was a decrease in the watts consumedby the iron, when a larger M. M. F. ofhigh frequency was leftacting upon the ironT. his decrease mustbe attributed to the increaseof the electricresistance of the iron, caused by its increasing temperature.
To eliminate this source of error as far as possible, before eachset of tests an alternating ament ofhigh frequency ( N = 200) andconsiderablestrengthwassent through the magnetizing coils and left on for ten to fifteen minutes, and thenfirstreadingswith lowmagnetization,thenwithhigh, and thenagainwithlowmagnetizationweretakenB. ut, nevertheless, as was to be expected, in these tests the observed values agreedless with each other thanin the former readings.
The method of determination, the apparatus, etc., were the same as in the second set of tests, only that ammeter, voltmeter, and wattmeter were used at the same time. In calculating these tests, the law of the 1.6th power was assumed as true, and the loss of energy in the iron expressed by the equation,
+ H = vB'.~ tNB2
where
Hl = T B ' . ~
is the true hystereticloss per cycle and ad., which is indepen-
dent of the frequency, and
Hz = cNB2
is the lossofenergyby eddy-currents per cyclewhich is proportional to the frequency N.
From this expression
+ H = H I Hz
the coefficients 7 and c were calculated and the agreement or dsagreement of thex coefficients7 and c allow now to check the correctness or incorrectness of the law of the 1.6th power.
These tests gave the following results:
Fig. 4.
MAGNmC CHARACIWSTICS.
1 1 F = M. M. F., in ampere turns percentimetrelength
magnetic circuit. B = magnetization, in lines of magneticforceper
centimetre.
TABLE TV. (1)
of
B.
B. F. B.
1.5
2,700
11,700
18
15,450
4,350 7,100
lZ,ZIIO 20 15,800
12,700
25
16,400
4
8,850
10
13,100
30 16,800
5
10.000
12
13,900 35
17,200
6
10,800
14
14,500 40 17,500
16
15,000
WsrmEslS.
B = magnetization, in lines of magnetic force per
-centimetre. H loss of energy by hysteresis,in ergs per cycle and a d .
(= joules) = Hl + Hz
Hl = v B ' . ~ = lossof energy by hysteresis proper, in ergs
per cyclaend ad. (= joules).
204
PROCEEDINGS OF THE IEEE, VOL. 72, NO. 2, FEBRUARY 1 9 8 4
H2cNB2= loss of energy by eddy-currents,in ergs per cycle and ad.( = joules).
TABLE IV.(2)
Frequency, N = 78.
q = .00331
c = .751 X
B.
4171 58x) 9520 13,160 14,320 16,050
HI
2,060 3340 7,740 12,w
17280
HZ
1,080
12,720 15,900
H.(4) H.
calc
obs.
3,140 3,060 5,660 2,152,6040 13,340 51,630,4040 23,670 120,47,15040 1247,,86800 26,460 33,180 33,180
av:
A
+ 80 + 20
- 100 - 870
-1140
.._
( T::;}
=%
+ +
2.6 .3
- .8
-3.7
+4.0
*1.9(+.4)
B.
4880 6780 7720 10,200 12,080
TABLE IV.(3)
Frequency, N = 140.
q = .00331
c = .730 X
HI
4.490 5,530 8,640
H 2 H. (4) H.
A
calc.
obs.
2,720 2,650 9,760
6,830 11,940
5,280 5,297,4020 12,600 201400
- 5,36++0
80 340
2102,,53+8600124800
16,700 33,840
11,300 19,860
29,100 1573,2,000
2583,,07-+00100170000
=%
+1.5
+ 3.4
- 1.9
+ .9
+
4.0 1.3
(T:::} av:
+2.2(+.2)
TABLE N.(4)
Frequency, N = 207
q = .00336
c = .757 x 1 0 - 6
1 1 1 1 1 1 -670 1 1 I 2710 4720
7540
- I
1,030
5;320
- I calc. I obs. I
I
1.290
2,340 2,32-0 20
- .8
Tf 6.480 6.430- 35.0910 2.510- .8
9;970 15390 l 5 & 0
12380 112,7603,80803,5080.5000
13200 1340,043,402.40,6000
+800
+1.8
L
I
I
I
I
.
I
J
Therefrom we get the results:
N = 78, 6 readmgs, q = .00331 c = .751 x
140, 6 If
.00331 .730 X
207, 5 "
.00336
.757 x 1 0 - 6
Thevaluesfoundfor q are so nearlyalike that we can consider them as constant, and take theirmean value
q = .00333
as the coefficient of hysteresis. Eventhevaluesfoundfor c are not much different from
eachother,not more than was to be expectedfromthe unavoidable differences in the temperature of the iron, which because of thehighelectrictemperaturecoefficient of iron makes E rather variable.
Taking the average of E, we derive
c = .746 x
and as formula of iron loss,
+ H = .00333B'.6 .I46 X 10-6NB2
4 H d is calculated by using for 7 the mean value 7 = ,00333, but for c the individual values, corresponding to the particular set ofobservations.
In Fig. 4 are drawn the four curves,
1.True hysteretic loss, H = .00333 B'.6
2. Iron loss for N = 78
+ .00333 B'.6 .oooO5856 B2
3. ' I
'I
140
.0001022 B2
4. If
If
209
.0oO1567 B2
The observed valuesare plotted by crosses, +
IV.-FIGS.5 AND 6;TABLEVS AND VI.
Two other sets of determinations of the hysteretic lossof
energy, for the frequency 170 complete periods per second,
weremade on two laminated horse shoe magnetsw, ith
laminated keeperor armature.
The method of observation and of calculation was the same
as in III., and the same precautions weretaken.
The dimensions of the horse shoe magnets were:
Mean length of magnetic circuit: 38 cm.
" cross-section: 70
" volumeof iron: 2660 ~ m . ~
I' distance of keeper from magnet, in the first case:
, .15 cm.
' I distance of keeper from magnet, in the second case:
.08cm.
eachmagnet consisting of 300 sheets well insulated iron, of
the thickness .0405 cm.
In the first set of readmgs, considerable eddy-currents were
found; in the second set, only asmall amount of eddies.
The magnetic conductivityof the iron was not determined,
becausethereluctance of themagneticcircuitmainly con-
sisted of that of the air gap between magnet and keeper.
The results were,
B =magnetization, in hes per
Hobs.= observed loss of energy in the iron,in ergs per cycle
anfodr
N = 170.
Hl =true hysteretic loss of energy.
H2 =loss of energy by eddy-currents.
+ HdC.=whole calculated loss of energy, = Hl H2
TABLE V.
Frequency, N = 170.
7-= .-w5
E = 1.16 X
670
1020 1100 1200 1310 1490 1930 2600
- Hl - H 2 51 23 68 34
108 59 132 78 150 90 178 111
210 138 293 208 345 234 392 290 436 343 539 445 820 742 1310 1280
- - H. H.
calC. ObS.
74
70
102 102
166 166
210 219
240 234
289 300
348 333
501 524
579 549
682 695
779 795
984 985
1562 1547
2590 2670
-
- av:
Therefore we get the formula for theloss in the iron,
+ H = .0045B'.6 1.16N X 10-6B2
STEINMETZ: ON THE LAW OF HYSTERESIS
205
zation up to high saturation, while the tests in IV. cover the
rangefrom 85 to 2600 lines per
that is, frommedium
down to very low magnetization.
The law is found exactly the same,
H = vB'.~+ ENB'
and herewith proved for the full range from 85 lines per m 2 up to 19,340 lines, a ratio from 1 + 230.
In Fig. 5 are shown
1. Thecurve of true hysteretic loss,
Hl= .0045B'.6
2. Thecurveof the wholeloss in the iron,
+ H = HI H 2 with the observed values marked by crosses +
TABLE VI.
Frequency, N = 170
-1 = .00421
I B.
- H1
I 2;.
85 5.2 .3 5.5 I82 17.3 1.3 18.6 211 22.0 1.7 23.7
560* 105 11 116
670 140 15 155 685 145 16 161 775 176 21 197 800 186 22 208 loo0 265 35 300 lorn 2% 41 337 1130 322 47 369 1250 319 56 435 1380 445 69 514 2200 940 170 1110 2420
-c = .2083 X
H.
- obs.
5.6 16.9 23.5 122 146 157 202 200 300 353 386 430 514 1130 1268
H. - H.
calc. obs.
- .1 + 1.7 + .2
-6 +9 +4 -5 +8 ...
- 16 - 17
is
- 26 - 20 + 30
+ 38
- av :
*-90 10
-
=%
-
- 1.8
+ 10.0
+ +
.9 5.0 6.1
+ 2.6
- +
2.4 4.0
... - 4.0 - 4.3
+ 1.2 - 4.1 - 1.8
- + 2.4
+ 21.2
- 24.6
+- 34
Therefore we get the formula for the lossin the iron,
H = .00421B1.6+ .2083 X 10-6NB2
In Fig. 6 are shown, 1. The curve of true hysteretic loss,
Hl= .00421B'.6
2. The curve of the whole loss in the iron,
H HI + H 2
+ with the observed values marked by c r o w
Especially interesting are these two sets of readmgs in so far
as they cover quite a different range of magnetization as the
tests in I. to rn.
In I. to m. the tests cover the range from 1790 to 19,340
lines ofmagnetic forceper
that is, for mediummagneti-
This seems not to agree with Ewing's theory of the molecular magnets. According to this theory, for very small magnetizationthehysteresisshould be expected to dmppear, or almost disappear, and thceycle be reversible. Thenfor medium magnetization, where the chains of molecular magnets break up and rearrange, hysteresis should increase very rapidly, and slowly again for saturation. Nothing of this is the case, but hysteresis seems to follow the same law over the whole range of magnetization, and is certainly not zero for even such a low magnetization as 85 lines per
MAGNETOMETER TESTS.
The method used in the foregoing has the great advantage that
1.It allowsthetaking of agreaternumber of readings, over a wide range of magnetization, in a short time, bmy erseimultaneouisnstrumenrteadingsa,nd thereby reduces the probable error by increasing the number of observations.
2. It allowsthe use of electro-dynamometers,as themost reliable electric measuring instruments.
3. It dealswithlargeramounts ofenergy, countingby wattsor even hundreds of watts,wherebyamuch greater accuracy can be reached than by the ballistic galvanometer.
4. It measures the hysteresisundertheinfluence of an harmonically, andnot suddenly varyingM.bi. F., that is underthe same conditions, where it becomes of importance for practical engineering.
But it has the great disadvantagtehat it canbe used only for testing sheet-iron or other thoroughly laminated iron, where
eddies are either inappreciableor can be calculated also. For
M6
PROCEEDINGS OF THE IEEE, VOL. 72,N O . 2, FEBRUARY 1984
testing solidiron and steel pieces,this method cannotbe used, because of thetremendousamount of eddieswhichwould flow in a solid piece of iron.
To determine.thehystereticloss ofenergy in steeland cast-iron the Eickemeyer differential magnetometer was used. Complete description of this instrument and its use is to be found in the Electrical Engineer, March 25th. 1891,wherefrom is taken apart of the following description. In Fig. 7 is shown this instrument, which I shall be gladto show in our factory to a n m y who is interested in it. In Figs. 8 and 9 are diagrams of its action.
Theprinciple of this instrument resemblessomewhatthe principle of the well-known differential galvanometer, applied to the magnetic circuit. In Fig. 8, suppose F1 and F2 were two E. M. F.S connected in series; forinstance, two cellsof a battery, x and y the two resistances which we want to compare. Either resistance x and y is shunted respectively by a conductor a and b of equalresistance,whichinfluencesa galvanometer needle G in opposite directions but with equal strength.
Thenthezeroposition of theneedle G shows that the electric currentc,, flowing in u, is equal to the currenctb in b. But let the currentin x be c,, and iny, cy; then we must have
+ + ca cy = cb cx
0
Fre. 8
becausethecurrents c, and cy arethe two branches of the same integral currentas c b and c,
Therefore, if c, = cb, then
c, = cy
But if c, = cb, and a = b, the difference of potential at the
R e .9
ends of a (or,what is thesame thing, y ) is equal to the
difference of potentialattheends of b or x and,therefore,
or “number of lines ofmagneticforce;”insteadof“elec-
the current in x and y , and the potential differences being thetromotiveforce”or
“potential difference,”say “magneterne
same, it follows that x = y .
tive foinracsnetde;”ad
of “elercetsrisctanscaey,”
“reluc-
That is, this method of connection allows us to compare an tance,” and we have the principle of this instrument.
unknown resistance x with a standard resistancey .
Its magnetic circuit consists of two pieces of best Norway
Now, instead of “electric current,” say “magnetic current” iron, Ln shaped, shown in theillustration of thecomplete
STEINMETZ: ON THE LAW OF HYSTERESIS
207
instrument, Fig. 7,and in the diagramFig. 9, at F~ and F2. The
middle portion is surrounded by a magnetizing coil c. There-
fore if coil c is traversed by an electric current, the frontpart
s1 of the left iron piece becomes south, and the back part n
north polarity.Thefront part of therightironpiece n be-
comes north, and the back part south;and the lines of
magnetic force travel in the front from the right to the left,
from n 2 to s,; in the back the opposite way, from the left to
the right, or from nl to sz, either through the air or, when n 2
and sl,or nl and s2, are connected by a piecoef magnetizable
metal, through this and through the air.
In the middle of the coil c stands a small soft iron needle
with an aluminium indicator,which plays over a scale K, and
is held in a vertical position by the lines of magnetic force of
the coil c itself, deflected to the left by the lines of magnetic
force traversing thefront part of the instrument fromn z to sl,
deflected to the right by the lines traversing the back fromn,
to s2. This needle shows byits zero position that the magnetic
flowthroughthe air in front from n 2 to s1 hasthesame
strength as themagneticflowinthebackfrom
n1 to s2
through the air.
Nowwe put apiece of soft iron x on thefront of the
instrument. A large numberof lines go throughx , less through
the air from n 2 to s,, but all theselinesgofrom nl to s2
throughthe air at theback part of themagnetometer,the
front part and back part of the instrumentbeing connected in
series in the magnetic circuit. Therefore the needisledeflected
to the right by the magnetic flow in the back of the instru-
ment.
Now we put another piece of iron,y, on the backpart of the
instrument. Then equilibriumwould be restoredas soon as the
samenumber of lines of magneticforcegothrough x , as
through y, because then also thesamenumber of lines go
through air in the front as in the back. As will be noted, the
air here takes the place of the resistancesa and b, influencing
the galvanometer needle G, as in the diagram,Fig. 8.
The operationof the instrument is exceedingly simple andis
as follows: Into the coil c an electric current is sent which is
measured by the ammeter A, and regulated by the resistance-
switch R Then the needle which before hadno fixed position,
points to zero.
Now the magneticstandard,consistingof a cylindrical piece
ofNorway iron of 4 cross-sectionand 20 cm. length is
laid against the back of the instrument, with both ends fitted
into holes in large blocks of Norway iron, A,, A , , which are
laid against the poles S,N of the magnetometer, so that the
transient resistance from pole-faceto iron is eliminated.
The sample of iron that we wish to examine is turned off to
exactly the same size, 4 cm. cross-section and 20 cm. length,
and fitted into blocks A,A2 in front of themagnetometer.
Then so many fractional standard-piecesof Norway iron are
added in front, that theneedleof the instrument points to
zero. This means that the 4 cm. Norway iron in the back,
cany underthesamedifference of magneticpotential,the
samemagnetism as the 4 of the examined sampleplus
the x cm. of fractional standard, added in the front. Hence,
4 cm. of the examined sample are equal in magnetic Conduc-
tivityto (4 - x ) cm. of Norwayiron,andthemagnetic
conductivity of this sample is (4 - x)/4 x 100 per cent. of
that of Norway iron,for that differenceof magnetic potential,
viz., magnetization, that corresponds to themagnetometer
current.
To get absolute values, the instrument has been calibrated
in the followingway: In the front and in the back the
magnetic circuit of the instrument has been closed by 4 cm.
Norway iron. Then another piece of iron, and of any desired
size, has been addedin the front.Tbis piece, y, carrying some
magnetism also, equilibrium was disturbed. Then through a
coil of exactly 110turns,surrounding this piece y, an electric
current i was sentandregulated so that equilibrium was
restored. In this case no magnetism passed through y , or in
other words, the M. FM..of the currenti 110 i ampere turns,is
equal to thedifferences of magneticpotentialbetweenthe
pole-faces of the instrument. In this way, for any strength of
current in the maincoil C of the magnetometer, the difference
of magnetic potential produced therebeytween the pole-faces
of the instrument, was determined and plotted in a curve, for
convenience in ampere turnsper cm. length.
Now,theNorwayironstandardwascompared
on the
magnetometer with sheet-iron, of which, from tests with low
frequency alternating currents, the magnetization correspond-
ing to any M. M. F. wasknown, andtherefromderivedthe
magneticcharacteristic of theNorway iron standard, and
plotted in a curve also.
In the way explained before, theiron sample that was to be
determined, was balanced by themagnetometerbyNorway
iron, thereby giving its magnetic conductivity.in per cent. of
that of the Norway iron standard, the magnetometer current
read, from the curves taking theM.M.F. corresponding thereto
-denotedwithF-andthemagnetization
of theNorway
iron, corresponding to this m M. F., F, andfromthede-
terminedpercentage of conductivity of theexamined sam-
ple, the magnetization B of this sample correspondingto the
M. M. F. F.
With this instrument a numberof magnetic cyclesof differ-
ent samples of steel and cast-iron were determined.
First, a powerful alternating current was sent through the
magnetometer and around all the iron pieces used, to destroy
any trace of permanent or remanentmagnetism.
Then the examined sample was laid against the front, the
standard against the back of the magnetometer, balanced, and
a larger number of magnetic cycles completed between given
limits, for instance, +95 and -95 ampere turns M. M. F. per
cm. length. Then readings were taken from maximum m m F.
+95 down to zero, and again up to the maximum -95, down
over zero and up to +95, thereby completing a whole mag-
neticcycle, andthen of a secondmagneticcycle, a few
readings were taken as check for the first one.
In this way for different M. M. F.s the curve of hysteresis
was found, and by measuring its area the loss by hysteresis
determined.
The further calculation was done in a somewhat different
way. Generally the number of cycles was not large enough to
determine conveniently the exponent by analytical methcds.
Therefore the law of the 1.6 M. power:
H =vB.~
wasassumed as true,andforeach cyclefrom the known values of H and B determined the co-efficientq.
If fordifferent cycles the valuesof q agreed, this would provetheassumption,the correctness of thelaw of1.6th power, while a dtsagreement would disprove it.
In the following fora number of samplesthemagnetic cycles are given:
F=M.M.F.,inampereturnspercm.length. B, and Bd = theintensity of magnetization, in kilolines,
corresponding to M. M. F. F,for the rising and the decreasing
branch of the magnetic curve. The area of the looped curve, representing the loosfsenergy
208
PROCEEDINGS OF THE IEEE, VOL. 7 2 , NO.2, FEBRUARY 1%
by hysteresis is derivedby adding the values of B,, and subtractingtherefrom the s u m of thevalues B,,Bd and B,, being given from5 to 5 ampere turns,or .5 absolute units, the difference of the sums of Bd - B, just gives thelossby hysteresis, in ergs per cycle.
CAST-STEEAL,NNEALEDAND HARDENED. FIG.10; TABLVEII.
Of one kind of steel, two test pieces were cast, at the same casting, turned off to standard size and, by comparing them in the magnetometer, foundto be exactly alike.
Then the one piece was hardened, the other left annealed. Magnetometer tests gave the following magnetic cycles:
Herefrom as coefficient of hysteresis, was found
T = .024941.025121.02490I.0079971.007%2,
- - 7 = .024987 a- 1 = .007980
.025
.0080
Hence, when anneded, the hysteretic loss is
when hardened
H = .008 B'.6
H = .025B'.6 and calculated by means of these formulas, we derive
H = 48,40707,501001,50304,73405,100
calc.
- r
-F. Br Bd
0
f 5.0
5 -4.4 + 5.6
10 -3.1 6.1
15 6-.25.7
20 0 6.9
25 63.9 7.3
30 5.5 1.6
35 6.1 8.0
40 7.1 8.3
45
8.5
50 (44.5.)
55
60
65
10
15
80
a5
90
9s
100
105
- 110
H-
- Ibz
r TABLEVII.
Md.
Br Bd
* 1.0
-6.4 + 1.5
-5.6 1.9 -4.4 8.2 -1.9 8.6 +1.9 9.0
4.2 9.3 6.2 9.6 7.6 9.9 8.1 10.2 9.6 10.5 10.4 10.8 10.9 11.1
11.4 (64.5.)
77,800
Br Bd
Br Bd
f 1.8
f 6.6
-7.3 + 8.2 - 1.4 + 10.7
-6.8 8.6 C3.4 11.9
-5.6 8.9 128..54
-2.3 9.2 1120.8.9
+.4 9.5 12.2 13.1
2.5 9.8 13.0 13.4
4.2 10.1 13.5 13.7
5.8 10.4 13.9 14.0
1.2 10.1 14.1
8.4 11.0
9.6 11.2 10.4 11.5 10.9 11.8 11.4 12.0
11.9 12.3 12.2 12.5 12.5 12.7 12.98
13.0 13.1
13.2 13.3 13.4 13.4
(44.5.)
13.5 (108.0.)
101,100
Br Bd
f -2.6
8.6
+ 11.3
t3.7 12.3
8.4 12.7
10.8 13.0
12.0 13.3
12.1 13.6
13.2 13.9
13.5 14.2
13.8 14.5
14.1 14.1
14.4 15.0
14.7 15.2
15.0 15.4
15.3 15.6
15.6 15.8
15.8 16.0
16.0 16.1
16.2 16.3
16.4 16.5
16.6
(101,O.)
45,000
STEINMETZ: ON THE LAW OF HYSTERESIS
209
and
H - H = +lo0 -300 +400 -70 +lo0
calc. obs.
= per cent. of
H + .2 - .4 + .4 - .2 + .2
calC.
In Fig. 10 are drawn some of the magnetic curves for both samples.
It is especially interesting to note that though the chemical constitution of both samples is exactly the same, their magnetic behavior is entirely different,so that the magnetic properties of iron seem to be determined much more byitsphysical than its chem'cd constitution.
ANOTHER SAMPLEOF CAST-STEEOLF Low MAGNETIC CONDUCTMTY. FIG. 11.
TABLE VIII.
Br Bd
Br bd
Br Bd
10
* 2.5
+ .6 4.1
k 2.8
- 1.9 + 3.6 - .4 4.3
f -2.1
3+.13.9
- 4.6
f -2.7
3+.44.2
-1.3 4.8
15
2.7 4.6
+2.7 4.9
+2.2 5.2
+2.3 5.4
3.9 5.1
4.0 5.5
4.2 5.8
5.93.8
5.64.7
4.9 6.0
5.1 6.2
4.8 6.4
6.0
5.5
30
5.6 6.4
5.7 6.6
5.5 6.7
35
6.63.2
6.2 6.7
6.1 6.9
7.16.0
40
6.38
6.6 7.0
7.26.6
7.46.5
45
(37.0)
7.0 7.3
7.57.0
7.7 .0
50
7.4 7.5
7.78.4
7.79.4
55
7.64
8.17.8
8.27.8
60
(52.0)
8.48.1
8.58.1
65
8.68.4
8.8 .4
70
8.7 8.8
8.7 9.0
75
9.928..095
80
(75.0)
9.59.3
85
9.5 9.6
90
I 95
9.8 9.8
14,600
19,900
4=
,0119
,0122
- Average, TJ = .001195 .012
Herefrom,
H =
calc
H-H
calc. obs.
= per cent. of
H
calc.
H = .012B'.6
14,62019,52025,140 +20 -380 +140
+.l -1.9 +.6
30,020 +420
+1.4
With regard to hysteresis, this kind of cast-steel is 50 per cent. worse than the aunealed cast-steelNo. 1,but still twice
as good as the hardened sample.But, magnetically,it is poor
- -that is, oflow conductivity, giving for 40 ampere turns
M. M. F. per centimetre length only 6600 lines of magnetic
forcepersquarecentimetre,whilethe annealed steelgives
- 14,OOO-that is, more than twice as many, and even the
- hardened steelgives more, 8OOO.
SOFTMACHINE STEELF. IG.12.
TABLE E.
I. III. 11.
F
Br Bd
Br Bd
Br Bd
0 5
+i8.3
-5.7 10.2
10
+l.2 11.6
15
18.017.72700 14.210.913.411.0
18.218.02755 14.812.413.812.6
30
13.5 14.2
35
40
14.8 18.8
45
(39.0)
H-
obs.
'I=
~,400
.w
5 -7.5
9+.611.2
-2.0 12.4
+7.2 127.16.43.5
1153..33 1114145.4.5.2.70 164.07 1165.4.3
50
15.9 16.8
55 17.016.4
60
16.9 17.4
65
17.3 17.7
80 18.418.3 85 18.718.6 90
(90.0)
64.ooo
,00928
Average, TJ = .00936 hence
H-
calc
A=
-400
64,600
+600
= 2 1.0per cent.
21 0
PROCEEDINGS OF THE I E E E , VOL. 72, NO. 2, FEBRUARY 1984
CAST-IRONFI.G.13.
TABLE X.
I
_+ 2.5
* 3.5
- F
50
55
10 3.9- .6
15 4+.4 .9
-1.7
5-.2 .2
4.7 60 65 8.2 8.9
20
2.6 4.9 +1.6 5.7 70 8.6 9.2
25 6.1 3.83.0 5.4
75 9.0 9.4
30 6.5 4.64.0 5.8
80 9.4 9.7
35
5.24.9 6.1
6.8 85 9.1 9.9
40
5.8 6.47.2 5.5
90 10.0 10.1
6.3
45 7.6 6.1 6.6
95
50
6.8
(95.0)
H =
&IS.
7-
(50.0) 22,300ergs
I 42,000ergs ,01589 .01647
Average, 7 = .01616
H-
CalC.
H- H=
Calc. obs.
= per cent.,
22,000
- 300 - 1.5
42,800
+800
+ 1.9
MAGNETIC IRONORE.FIG.14; TABLEXI.
In the following are given the magneticcurves of a piece of magnetic iron ore, apparently pureFe3 04,of the dimensions,
1 in.x 1in.x 2 3 in.
TABLE XI.
MAGNETIC CHARACTERISTIC.
F = M. M. F., in ampere turnsper centimetrelength of
magnetic circuit. B = magnetization, in lines of magnetic force per
square centimetre.
F
F
B
F
B
10 20 30 40 50 60 1
750
70
1510
80
2000
90
2320
100
2354670 0
110
2760
120
I
23973700
140
3309830 0
160
3220
180
3350
200
220
3580
240
1
4070 4200
4310 4400
IF
0 10 20 30 40
3410
& I TABLEXII.
CYCLIC MAGNETIZATION. AdI&IF
I 1 *m
37346041f0310020
0 + 1520 -200 + 1660 140
+1200 1920 +lo00 2020 150
1800
2280 160
2160 223m0
2117%50 2520 170
3440
3530
3280 3410 3530 3640
33783200
33820
3910
4050 4120 4190 4250 4320 4Mo
3900 3980
4110 4170 4230 4280 4uO 4370
(240.)
H = 9,340 ergs 13,780 ergs
obS.
STEINMETZ:O N THE LAW OF HYSTERESIS
21 1
t) = .02.00429041
Average, t) = .02045
C w e of hysteresis, H = .02045 B'.6
H = 9,320er1g3s,810-
calc.
H - H = -2Oergs +30ergs
calc. obs.
+ = - .2per cent.
.2 per cent.
As seen, thecoefficient of hysteresis of magnetic iron ore,
t) = .020, ranges between that of cast-iron, t) = .016,and of
hardened steel, 7 = ,025.
The magnetic conductivity is approximately 20 per cent. of
that of wrought-iron.
In Fig. 15 is given a comparison of the hysteretic curves of
Hardened steel,
h e a e ld steel,
cast-iroq
Magnetic iron ore,
inthesamesize.
This figureshowsweltlhe
three characteristicforms of
21 2
PROCEEDINGS OF THE IEEE, VOL. 72, NO. 2, FEBRUARY 1984
Flu. 15.
TABLE XIII.
H in ergspercycleand
I
H = vB.~[+ d B in lines of magnetic
R21
Zmel per
I
F i n ampere turnsper - cmI.
Material.
Hysteretic Coefficient.
Magnetizationat the M.M. F.
Residual MagnetismR./Coercitive ForceC
- t C
9
F=lO =40 -90 F o r F - 4 0 =90 F o r F = 4 0 =90 F o r F = 4 0 =90
very soft iron wire @wing) ...................
WestlngbwEe converter,s h e e t - i r o n ........... Very thin sheet-iron, standard ................. n i c k sbcet-iron.. ............................... Sheet-iron ....................................... Sheet-iron ....................................... Soft annealed cart-steel ........................ Soft machinc steel............................... Cast-steel of low mapetic conductivity ...... CaJt-iron ......................................... Hard& cast-steel ............................ Magnetic iron ore...............................
,0020 ,0024
.00”
.00333t 00421$
.w509
.0080
.oow ,0120 ,0162 ,0250 ,02045
12800 14400 13100 13100
...
251
m
1600 1200
750
14700 17800 17100 17m
... ...
14OOO 14800 6400
6100 8ooo 2320
16600 20800 20700
...
... ... 1683200 18800
9800 10100
12903 3220
5100 8300 3300
4m
(1.9) (1.5)1
(1.8)
(2.0)
(2.3)
(2.8)
(2.5)
(3.1)
(3.2)
(3.9)
(3.4)
(4.2)
6.0
7.0.00114,00133
91M1).o1
9.1
.0.00100038*5***
2600
9.1
11.6.00104,00132
21304000
10.4
15.2 .,0000110566..
752030.5
19.0
,00107,00132
900
10.0
Average .......0.0108,00132
.XI204
*, For N = 100.
+,€ = .746 x 10-6. *,c = .2083 X *, c = 1.16 X
II, This, and thefollowingvalues of this c o l u m n are derived as averageof risinganddecreasing characteristic, because at F = 10 the magnetism is still very unstable.
,Computed by means of the averagevalues of f = .00132 and = .00108. L
**, Left out by takingtheaverage of 3 .
C
branch of themagnetic
chuyrvsteesr:etic
1. The hardened steel m e , of high coercitive force,has the bend or “knee” on the negutiue side, so that for zero M. M. F. the remanent” magnetismis still in the satura-
tion part of the curve-that is, in stable equilibrium; therefore permanently magnetizable. 2. The soft iron curve, with the bend on the positiue side, so that for zero M.M.F. the “remanent” magnetism, though
still very htgh, is already below the range of saturation,
STEINMETZ:ON T H E LAW OF HYSTERESIS
213
TABLE X I V .
W = yH',6
Win watts per cubic inch an1d00complete periods per second. H in lirles of magnetic force per square inch.
7
Very soft iron wire @wing) ...................166 X IO-''
Watlnghousc convener, sheet-iron ........... 201
2.90
2V.4e9ry thin shee2t-.i1r1on .............1...7..4........... 249
2.77 'Thickk t -2i.r34o n . . .............1...9..4.............. 277
sheet-iron ...........................6..6..9........ 4.69350 4.07
sheet-iron ....................................... 374 7.17
8.88 7.73 6.63Soft a5n.6n0ealed4c.6a4st-sle3d.75.......2..9..3.......2...1.9.. 663
9.06 S7o.7f8t mac6h.5in7e ste5.e4l5......4....4.0.......3...4..4......2..5..7 778 Cast-steelof low magxtic conductivity ...... 994 Cast-iron........................................ I346
Hardened cast-steel .......................... .2077
H - 10,000 20,000 30,000 40,05000,06000,07000,000 1.66
3.50
2.96
2.45
1.918.15 1.55
5.02
4.36
3.75
3.17 1.23 2.612.66
5.62 4.39 3.28
13.140.99.471.650.944.44
14.6
11.7 39.8 9.18 27.8 6.85 24.2
8 0 , 0 0 0 90,010000,000
1.40 1.16 2.13.412.01 1.70
110,OOO 120,010500,000
13.9.148 2.23 269 3.84
2.12
'6.95 8.39
20.7
17.5
'9.94 11.6 25.187.165.7
' 10.4 13.3
' ~ 14.9 19.0
H = 25,000; alternate current transformer, American styl(ehighfrequency).
H = 35,000; "
"
European " low
"
Only the values smaller than .25 W , can be of practical use; in those larger than 10 the iron gets at least red hot if in larger quantities.
on the branchof unstable equilibre. Therefore the rema-
nent magnetism is very unstable and easily destroyed,
the more as the mcitive force is very small.
3. The cast-ironc w e , which has no marked knee at all, but
a steady curvature of low remanent magnetization, but
with regard to coercitive force ranging between1and 2.
The curve of the magneticiron ore showsall the characteris-
tics of a cast-iron curve.
Havingderived,now,alargernumber
of values of the
hysteretic coefficient q for different kinds of iron and other
material, we shall put them together for comparison in Table
xIn.
It is remarkable, in these results, that for several samplesof
each set the quotientq / C gives almost exactly the same value,
while other valuesdisagree therefrom. Fromthis average value
of q/C are calculated the values of the coercitive force C of
sheet-iron, given in the brackets.
For convenience, in the following table are given the values
W of consumption of energy in watts per cubic inch, for100
completeperiods(magneticcycles)persecond,andforthe
magnetization of H lines of force per square inch, giving as
coefficient of hysteresis the value 7 = 8.3 x 10-6q
In Table XIV., I havegiven anumber of experimental
values of the consumption of energy by hysteresis and believe
to have shown that this consumption of energy can fairly well
be expressed by the empirical formula,
H = qBX
where the exponent x is equal, or at least very nearly, to 1.6,
and the coefficient q a constant of the material, which ranges
from .002 up to .025 and more, and may possibly have aslight
dependence upon the velocity wherewith the magnetic cycle is
performed, as thesecondsetof
alternate-ament readings
seems to indicate.
In the following table, I give the valuesof thehysteretic
resistance TJ for some iron samples, subjected to a magnetic
cycle between F = +190 and -190 ampere tums per centi-
metre, calculated from Hopkinson's tests' by the assumption
of the lawof hysteresis.
q =the coefficientof hysteresis. B =the maximum magnetization in lines of magnetic force per
square centimetre.
5From"Mender ftu Electrotechniker," by Uppenborn, &rlin, Germany.
R =the remanent magnetization in lines of magnetic force per square centimetre.
TABLEX V .
Material.
coaditiom
- 1 B R
wrought-iron ............ SoftBcJscmrstcel ...... Soft Wittworth steel .....
Annealed ........... ,00202 18,250 7250
.OM62 1 8 7,~860
,00257
7,080 19,840
.00598 18,740 9,840
.a9 " .32 ''
.00786 16,120 10,740 .00954 18,800 11,040
.89 "
Siliconsteel ................ 3.44 "
.01844 16,120 8,740
,00937
11,070 15,150
3.44 "
,00784 14,700 8,150
3.44 It
Manganevsteel ........... 4.73
8.74
12.36 I'
,01282 14,700 8,080
.05%3
...
4,620 747
220 ...
... 310 ...
4.73
,04146 10,580 5,850
8.74 '*
.08184 1,985 540
4.73
I 8.74
Chrome-steel ............. .62
1.2 .62
''
" " "
1.2
"
"
"
,06706
...
4,770 733
2,.1.6.0
,01179 15,780 9,320
,01851 14,680 7,570
,00897 14,850 7370
,01638 13,230 6,490
.62 " " Oil-hard. ,03958 13,960 8,600
1.2
"
"
"
,04442 12,870 7,890
Tungsf.=sf=l ............
,01516 15,720 10,140 ,01435 16,Mo 11,010
,04776 14,480 8,640
2.35
very hard
Grey cast-iron............ 3.45 p. c. C.1.;7 p. c. Me
.. White cast-iron........... 2.04 C.: .34 " " .. . . . . . . . . . . . .
,05778 12,130 6,820
,01826 9,150 3,160
,01616 9,340 5,550
- ... 385
77
These valuesof the hysteretic resistancveary from .002up to
082,41 times the first value.
But especially markedis, that q depends much lessupon the
chemical constitutionof the iron sample, than upon its physi-
cal condition, annealing decreasing, and hardening increasing
the hysteresis very considerably.
So far as the chemical constitution is concerned, the purer
the iron the lower is its hysteresis, while any kind of foreign
matter increases the hysteresis. Especiallymanganeseincreases
the hysteretic loss enormously, much less wolfram and chre
mium, least silicon and carbon. Comected with the increak
of hysteresis is always a decrease in magnetic conductivity.
I wish to adda few remarks on twoallegedphenomena
connected with hysteresis, which have been talked about con-
siderablyw, ithoutyetbeingmadeclear;thedecreaseof
hysteresisfor open magneticcircuit,andthedecrease
of
hysteresis of a transformerwith increasing load.
With regard to the first, as shown, actual tests do not show
a smaller valueof hysteresis foropen than for closedmagnetic
circuit.
21 4
PROCEEDINGS OF THE IEEE, VOL. 72, NO. 2, FEBRUARY 1964
And it can not be understood how that could be.
For consider an iron moleculeof the magnetic circuit ex-
posed to the harmonically varying M. M. F. and performing a
magnetic cycle. Evidently it can make no difference for this
iron molecule, whether some trillion of molecules distant the
magneticcircuitendsin air, or is closedentirely in iron,
supposing that the M. M. F. and the magnetism, and therefore
also the magnetic reluctivity, are thseame in both cases.
Neither can it make any difference whether the M. M. F. is
causedonlybyonesine-wave of electriccurrent, or is the
resultant of several M. M. F.s,as in the loaded transformer. It
is the same as with theelectriccurrent,wheretheenergy
converted into heat in each molecule of the conductor does
not depend either, whether the material of the conductor on
some other point changes, or whether one or more E. M. F.S
are acting upon the circuit.
Hence, until absolutely exact and undoubtable determina-
tions of the hysteretic loss for fully loaded transformers araet
hand, the assumptionof a decrease of hysteresis with increas-
ing load must be rejected.
That an apparent decreasewithincreasingloadhas been
observedseveraltimesmay
be conceded,forbesidesthe
exceedingly great liability to errors in these tests, where the
hysteretic loss comes out as the small difference of two large
values, primary energy and secondary energy, and therefore is
verymuchaffectedbytheslightest error in anyone of the
components, it mustbeunderstoodthatthemainpossible
errors in the determinations on fully loaded transformers all
point this way. Neglect of secondary self-induction, decrease
of magnetization with increasing load, slowing down of the
dynamealternator, etc., all cause an apparent decrease in the
hysteretic loss for increasing load. At least in one set of tests,
those made by Prof. Ryan, at Cornell University, on a small
Westinghouse converter, I was able to show in my “Elemen-
tary GeometricalTheory of theAlternateCurrentTrans-
former”6thattheobserveddecrease of thehystereticloss
disappears by reducingthedifferentreadingstothesame
magnetization and the samefreq~ency.~
If, indeed, the shape of the waveof M. MF..varies, then a
certaindifference in thevalue of thehysteretic loss can be
imagined.Compare it with amechanical or elasticcycle.A
moving pendulum, or an oscillating spring, for instance, con-
tinuouslyconvertspotentialenergy into kineticenergyand
back; in each oscillation consuming, that is, converting into
heat, a part of the energy by internal and external friction.
Now, if this motion of spring or pendulumis truly harmonic,
less energy is converted into heat than if the motion varies
abruptly, is jerking, etc. S o , in a magnetic cycle, between the
same limits of magnetizationthehystereticlossmight
be
smallest, when the cycle is entirely harmonid, but mght be
larger if the M.M.F.varies abruptly; forinstance, when caused
by an intermittent current.
Now, in atransformer with open secondary the M. M. F.
acting upon the iron is that of the primary current, and this
current is rigidly determined in its shape by the E. M. F. of the
d ~ and th~e E. M.oF. ofSelf-indUctiOn.But in a loaded
transformer the secondary current is proportional to the
changes of the magnetism, therefore increases very consider-
ably in the moment of a sudden changeof magnetism. Hence,
w - w 6 D e c 1891. Electrid Engineer, New Yoh
7~ latest tests of
prov~that,in a
traaJfm the
lossbyhystacJisisnotsmaIkrthanforopensccondaycircrdt
if a sudden and abrupt change in the primary current OCCUTS, just as suddenly the secondary current increases in the oppe site direction, and therebymakes a sudden changeof resulting M. M. F. andmagnetismimpossible, so that the fully loaded transformer compares with the elastic spring which oscillates freely, while the open-circuited transformer compares with a spring,wherethemotion is determinedbyarigidly-acting outside force.
Hence, if the shape of thealternatingprimarycurrent differs considerably from the sine law, a certain decrease of
the hysteretic lossfor increasing loadcan be expected, though certainly not such an enormous decreaseas some former tests
seemed to point out.These tests must undoubtedlyhave given erroneous results, perhaps causedbytheneglectofthesecondary self-induction, which, even if very small and causing onlyaslighterror in thesecondaryenergy,mustcause an enormouserrorinthehystereticloss,thesmalldifference between the two large values-primary and secondary energy.
That an electremagnet without keeper loses its magnetism quickerthanamagnetwithkeeper, or a closedmagnetized iron ring, is a phenomenon, which hasnothing whatever to do with this loss of energy by hysteresis, but is merely due to the demagnetizingforce of theremanentmagnetism. For the remanent magnetism in an open magnetic circuit causes between itspolesacertaindifference of magneticpotential, whichinthemomentof breaking the electric circuit acts as demagnetizingM. M. F., and, if the coercitive force is small,as in wrought-iron or annealed steeal,lmost entirely destroys the remanent magnetism, while in aniron of large coercitive force it affectsthepermanentmagnetismverylittle. In theclosed magnetic circuit the remanent magnetism causes no or very littledifference of magneticpotential,andtherefore no destruction of the remanent magnetism by its own demagnetizing M.M.F. takes place. But with the hysteretic loss of energy this phenomenon has nothingto do.
To combine the results, whaIt believe to have proved isthat loss of energy in iron caused by reversals of magnetism can be expressed by the analytical formula:
+ H = v B . ~ r N B 2 .
where
q =the cuefficient of hysteresis,
e -the cuefficient of eddy currents,
N =the frequency of the altemations of magnetism,
qB.6 =the loss of energy by hysteresis propero, r by
molecularfriction, and
eN, B2 =the loss of energy by eddy currents,per magnetic
cycle andperproportional
to thefrequency N.
- n
Pa 1 w
42 85 115 142 164 185 205 223 2u) 258 275 292 308 324 339 353 366
TABLEX V I .
B 81.6
9ooo 2122 9500 2313 10.000 2.511 10,500 2.716 llp00 2.925 11,500 3.141 12.000 3.363 12,500 3.589 13,000 3.821 13,500 4.060 14,000 4.303 14Joo 4.580 15,000 4.807 15,500 5.062 16,000 5.329 16,500 5.598
pcr 1 w
378 389 400 41 42 43 44 45 46 47 48 49 50 51 53 54
m per 100
55 56 57 58 59 59 60 63 66 70 73 76 82 89 96 103
STEINMETZ: O N THE LAW OF HYSTERESIS
215
For convenience, I give in Table XVI, the values of the 1.6th powerof the numbers, from 500 to 50,OOO with the parts proportional, or the increaseof B.6 for 100 lines of magnetic force.
YonLca N.Y..Dmmber 7th 1891.
DISCUSSION.*
THECmuwm:-Gentlemen, thepoet has informed us
that “better Gfty years of EuropethanacycleofCathay.”
What he would have done had he met a cycle of magnetism,
we can but conjecture. “he Institute has therefore good rea-
son,I conceive, to congratulateitself that one of its members
does not shrink from such a conflict. I am sure I shall but
express the sentiments ofeverymember present, when I say
that we are much obligedto Mr. Steinmea for his very elegant
and exhaustive treatment of a subject whose title, to say the
least,hasamostunpromisinganduninterestingsound-a
subject d e d q with the causes of those indspositions of iron
to change its magnetic conditionwhich in our old telegraphic
days wewerewont to s u m up by theunscientificterm of
“ residual magnetism.”
Beforecallingforgeneral discussion, I wouldliketo ask
Mr. Steinmetz whether, in his experiments and tests, he had
determined whether or not there was any real foundation in
factforthedistinction whichProfessor Ewing has drawn
between the molecular friction, which hecalls “static hystere-
sis, andtherealtime-lag,whichhedenominated
“viscous
hysteresis.”
MR. STEINMEIZ:--I. reallaym not yet prepared to answer
the question whether viscous or time hysteresis exists or not.
My tests in only one setof determinationsgave me an increase
of hysteretic loss with increasing frequency, which seems to
point to the existence of a viscous hysteresis. For if a viscous
hysteresis exists,it would show byan apparent increaseof the
coefficient of hysteresis, with increasing frequency. But most
of the tests do not show this, but give the same coefficient of
hysteresis for different hequencies.
At any rate, if there exists such a time-hysteresis-which I
shall try to find out-it follows the law of the 1.6th power
also.
But I think, only at much higher frequencies than those I
have used in my tests, can we hope to meet with viscous
hysteresis. I hope to be able at a future meetingto give more
detailed informationon this and some other phenomena con-
nected with the magnetic hysteresis.
THE Cmmwm-Gentlemen, thesubject is beforeyou.
While a fewof us were in the parlor, prior to the reading of
the paper, I heard Mr. Steinmek condolmgwithhimself in
relation to the weather and expressing the hope
that there
would still be a very considerable discussion.It is therefore to
be hoped that any of us who may feel able to grapple with
such a subject will not hesitate to do so.
MR. CHAWSS. BRADLEY:-I do not feel able to discuss
this paper, but I know it will prove very valuable to us. Our
work of late has been upon transformers.I am connected with
the Fort Wayne Electric Company, whose transformers now
use about 2,000 lines of force to the square centimetre, andwe
have been trying to increasethelines oforceW. e
en-
counteredthe veryphenomenatreated in this paper,and
*Discussionby Messrs. Bradley, Kenuelly, Lochvood and Pupin.
therefore it is very interesting to me, and I think that we ought
to congratulateourselves upon havinga member who can
tacklesuchasubject. It is veryseldom that in America,
anything of this kind is taken up. We see it very often in
Europe, but ourcommercialage will hardly permit us to
devote our time to such experiments and carry them out as
they should be.
MR. JOSEPH WETZLER:-Agentlemanwho is present but
who is not a member, has asked me to inquire of the author
whetherhemadeany experiments on mitis iron and, if so,
what his results were.
MR. STEINMETZ:-m~ e r made any experiments with re-
gard to hysteresis, on mitis iron-only on different kinds of
cast-iron.
MR. A. E. KENNELLyz-Mr. Pr&dent and gena-
I
think that we have to congratulate ourselvesupon a magnetic
and physical treat in the paper that we have just listened to.
Mr.Steinmekhasbeen,Ithink,thefirsttopointoutthis
remarkablelawofhysteresis-thevariation
of theenergy
consumed per cycle, with the total flux per square centimetre
that passes through it. I think that it is perhaps preferable to
expresstheexponent in theequation as a vulgar fraction
instead of as a decimal-not that it alters the factsin any way,
but merely because it gives us a little more hope of being able
to understand whatthe equation means,if not now, at least let
us say in thefuture. If, instead of writing the energy-
~ rste.inmetz calls it H,as q ~ 1 . 6w, e write it q ~ fit, gives us
some hopeof being able to transform that in a simpleher,
which will give us thefundamental law concerned I think
there is very little doubt that the law Mr. Steinmek giva is
the true one. It is, first of aU, as he showed us some time ago,
in accordance with the values observed by Professor Ewing,
and so far as my own knowledge goesI am able to corroborate
it, for I have observed the same law in the case of one sample
of wrought-irontakenbyaballisticmethod,
and another
sample of wrought-irontakenbywattmetermethcd,both
givingthe 9 power,although I do not knowwhat the exact
value of the coefficient q was in those particular instances.It
is very puzzling to understand what that peculiar fraction 9
means. It is rather too high andunwieldyafraction to be
understood at a glance. But whatever its inner meaning may
be, its outward and visible indications are clear enough, be-
cause if you double the flux density in a piece of iron you will
trebletheenergywhich
is consumed init per cycle, by
hysteresis, independentof the energythat is umsumed in it by
eddy currents. Of course,if you have any m e which starts
from the zero point andrises up in that way, and if you take
arbitrary distances like thisin the formof u, u2, ua3n,d so on,
then if you want to find out whether that curve follows any
such law as
Y - bX”
you have only got to mark off the ordinates corresponding to
those abscissae, and to see if with the powers ofu along Xyou
have a constant ratio from one to another in the ordinates. If
you do, thatratio will be un. In this case,if u is 2, un is almost
exactly 3. For the 1.6thpower of 2 is 3.03, which means that if
yoduoubltehe
maximum magnetization in a piece of
wrought-iron, youwill have 3.03 times the hysteresis loss, and
this is a simple way of stating the resultswhich Mr. Steinmek
has pointed out.
MR. STEINMETZ:p-~ointed out by Mr. Kennelly, thislaw
of hysteresis gives a very simple numericalmeaning. It means
21 6
P R O C E E D I N G S O FTHE IEEE, VOL. 72, NO. 2, FEBRUARY 1%
that by doubling the magnetization you approximately treble
thehystereticloss and quadrupletheeddy loss. So if you
make but two tests therefrom, you can find out the amountof
energyconsumedbyeddiesandtheamountconsumedby
hysteresis for any magnetization.
And, in general, youwill see at once whether theratio of the
iron lossfordoubledmagnetization is nearer to three, or
rather 3.031, or to four, that is, whether hysteresis or eddies
consume more energyin the iron.
I would like to add a few remarks regarding the results of
the tests given in the paper.This law of hysteresisis of interest
from another pointof view:
We all know,now, that energy is always the same and
indestructible, and merely changes its form and appearance,
so that a certain quantity of any kindof energy converted into
any other kind of energy always gives an exactly determined
amount of the other formof energy, which we call the law of
conservation of energy.
But this lawof conservation of energy needs a certain
restrictionor,rather, addition, because everyconversionof
one formof energy into another is not possible, but only those
where the value of a certain integral, called by Clausius the
"entropy," is positive or more correctly, is not negative, though
the case, that the integralof entropy equals zero, hardly exists
in nature otherwise but as mathematical fiction, or, in plain
FJ1PljSh. only those conversions whereby the sum of the latent
heat of the universe increases.
Accordmg to this law of entropy, if the complete conversion
of one form of energy into another is possible, the opposite
conversion is notcompletelypossible. Or if we converta
certain amount of one formof energy into another form of
energy,and this back again into thefirstform ofenergy,
whichwe call a cyclicconversionofenergy-we do not get
back the origrnal amount of energy, but less, and a part of the
energy has been lost;that means, converted into and dis-
sipated as heat.
Therefore no completecyclicconversionofenergyexists,
but byanysuchcycletheamountofavailableenergy
has
decreased by that fraction that was converted into heat.
Now, these cyclic conversionsof energy are of great impor-
tance in nature.
For instance, a moving pendulum, an osciuating spring, a
discharging condenser completes cyclic processeIsn. the mov-
ing pendulum, continuously kineticmechauical energy is con-
verted into potential decal energy, when it moves from
the vertical position into its greatest elongation, while when
movingfromelongation into verticalposition its potential
energy is reconverted into kinetic e n e r g y , thereby completing a
cycle, so that in vertical position all the energy is kinetic, in
elongation all the energy potential.
In the same way, in the oscillating spring, a cycle is per-
formed between potentialenergy of elasticity and kinetic
energy of motion, in the discharging condenser between elec-
trostatic and electrodynamic energy, and that the pendulum
and the spring come to rest, and the condenser discharges, is
due to the continuous lossof energy by dissipation as heat,
caused by the law of entropy.
Now, in none of these cyclic conversionsof energy, so far as
I know, was the law known,which determinesand analy-hcally
formulatesthe lossof energy by conversion into heat. The
electromagneticcycle is thefirstone where in the lawof
hysteresis, this law of dissipation of energy by heat, finds an
analytical formulation.
In the alternating electromagnetism wehave such a cyclic conversion of energy from electric into magnetic energy and back. Magnetism represents a certain amount of stored up or potential energy determined by the integral
1FdB
Now, as long as the magnetism increases, electric energy is
transferred from the electric curreanntd converted into poten-
tial magnetic energy. While the magnetism decreases, potential
magnetic energy is reumverted into electric energy, and ap-
pears in the electric CirCUit aS E. M. F.
But the full amount ofenergy is not givenback to the
electric circuit, but less. Less by that amount that has been
converted into heat by hysteresis.
Hence the lawof hysteresisis the dependenceof the integral
of entropy in the electromagnetic cycle, upon the intensity of
magnetization, and thereforeof interest.
DR M. 1. Pwnc-I agree fully with Mr. Steinmetz's last
remarks that no process in nature is perfectly reversible and
that the phenomenon of magnetic hysteresis is only a special
case of theirreversibility of ~ ~proceasses. Ilt is onlya
special case of the general law which was first announced by
the late Professor Clausius, thelaw namely that the entropyof
the universe is tending toward a maximum, that is, that there
is a certainfunctionof the propertiesof matter of the universe
which increases as the amount of heat energy increases in the
universe. Now, as in every process thereis a certain amounotf
energy convertedinto heat, the amountof heat in the universe
is continually increasing. "herefore the entropy is continually
increasing and thereforesteadilyapproaching its maximum.
Professor Rankine made aguess as to how many years would
elapse before the whole energy of the universe will be con-
verted into heat, when there will be no life, no natural phe-
nomena excepting heat vibrations.It is very far off yet.
Closely connected with this magnetic hysteresis is, I think
the so called electrestatic hysteresis. Of course experimental
researches in this field have not been carried on far enough
yet, to enable us to speak with any definiteness, but stin it is
beyond all doubt that if youpolarizeadielectricandde-
polarize it again, a certain amount of heat is developed. I
think oneof the obstacles to the commercial introduction of
the condenser,is its getting hot.Now some thinkit gets hot on
account of the convection currents which are passing between
the plates of the condenser by means of the air currents and
the dust that is in the air; but if you use paraffine so that it
will preventthoseconvectioncurrents,eventhenyou
will
0bseri.e heat developed in the paraffine which must be attri-
butedtothe same cause whichdevelopsheatwhen iron is
magnetized and demagnetized; that is hysteresis. Polarization
and depolarization of paraffine, and in fact any other dielec-
tric, is not a perfectly reversible process.
Allow me now to commentupon a few points broughtup in
Mr. Steinmetz's paper. I always believed thoroughlyin Profes-
sor Ewing's views with regard to the following experimentally
well supported assumption, namely that in very low magneti-
zationsthe actof magnetizing and demagnetizinigs practically
reversible,and that when a high point of saturation,say
24,000 or 25,000 lines per square centimetre is reached, that
after that the loss dueto hysteresis doesnot increase. I do not
see why it should increase,because after that the iron does not
receiveanystrongermagnetization.Theadditional lines of
forceafterpassingthesaturationpointaredue
to thein-
STEINMETZ: ON THE LAW OF HYSTERESIS
21 7
creased magnetizationof the air itself, and that magnetization
is practically re~ersible.I~see that Mr. Steinmetz has found
out anincrease,independent of thedegree of saturation.
There is a discrepancy, and I am inclined to side with Profes-
sorEwing, until I am convincedby Mr. Steinmetzthathis
method of measurement and observationcouldnot be ob-
jected to in any particular whatever. Unfortunately
Mr. Steinmetz has not discussed his method so that one can
examine it critically. He has given the general idea, theinstru-
ments employed, etc.,but there is no discussion of the theory
of themethod,and also of theprobablepercentageof his
errors of observation. I am sure that Mr. Steinmetz will do
that at some future time. It would be very interesting andvery
important indeed to knowwhetherthatdisagreement is in
favor of Mr. Steinmetz orof Professor Ewing.
There is on page 49 adiscussion of thevariation of the
hysteresislosswiththeload." In that discussion Mr. Stein-
metz says as long as the secondary currentis open, the form of
the wave of the primary currentmay not be a sine curve;but
that whenthesecondarycurrent is started, the waveof the
magneto-motiveforce is forced into theshape of thesine
curve on account of thereaction of thesecondarycurrent.
Now I would beg to disagree withMr. Steinmetz; I think it is
just theopposite. It doesnotmakeanydifferencewhatthe
electromotiveforceis, as long as thereisaverylargeself-
induction in the circuit,-as there certainly is in the primary
circuit as long as thesecondary is open,the waveof the
primary circuit is independent of the waveof the impressed
electromotive force and is practically a sine wave.Butwhen
the secondary circuit is closed, then the impressed electromo-
tive force, being assisted by the electromotive forces
in the
secondary circuit, asserts itself and gives the primary current
its own shape,andthestrongerthesecondarycurrent,the
largerassistancetheprimaryimpressedelectromotiveforce
getsfrom it. Thesecondarycurrent aids theprimaryim-
pressed E. M. F. to assert itself and force the primary current
into its shape, that is, the shapeof the impressed E. M. F. That
can be proved very easily both from theoretical and practical
standpoints. So that I do not see the force of Mr. Steinmetz's
argument.
MR. SnINMETz:-Themethod used in my tests was the
well-known electredynamometer method, as explained in the
paper, withsomeslightmodifications to insurethegreatest
possible exactnessin the results.
With regard to the difference between open circuited and
fullyloadedtransformers,I think ProfessorPupin misun-
derstood me. I didnotsaythatthe waveof theprimary
crurenr in the transformer under full I d resembles the sine
wavemore than with open circuit, for that wouldhave been
wrong. WhatI said was that thewave of the magnetism and of
the resulting M. M. F. in the transformer underfull load resem-
blesmore the sine wave than it does in the open circuited
transformer.
Suppose theimpressed E. M. F. at the terminals of the transformer differs from the sineshape, differs even consider-
ably. Then the primary current, which at open circuit repre-
sents the resulting M. M. F., will differ much less from the sine
Shape than the impressed E. M. F.,
Smoothed out and
rounded off to a very great extent by the heavy self-induction
of the open circuittransformer. For in themoment of any
9AE Kenwlly,on "Magnetic ReluaancC" W s c n o ~ svo,l viii.No.
m.
lli'kw%cnO~
vol ix, p. 49 (thisissuc p. 215).
sudden rise of the impressed E. M. F., already a small rise of
theprimarycurrentand,therefore, of themagnetism, will
induce sufficient counter E. M. F. to make a rapid increase of
the primary current impossible.
Hence, in the open circuited transformer, the waveof the
magnetism will resemble the sine wave more thanthe wave of
impressed E. M. F. But, nevertheless, it must differ from the
sine wave if theimpressed E. M. F. differsfromsineshape.
For, as before said, the resulting or current producingE. M. F.
and, therefore, the current, is rigidly determined by the small
difference of impressed and induced E. M. F., and the induced
E. M. F. must therefore have a shape very similar to the im-
pressed E. M. F., hence differing from sine shape the more the
impressed E. M. F. differs therefrom.
Now, the induced E. M. F. is the diffexential quotient of the
magnetism.Hence, if themagnetism is asinewave its dif-
ferential quotient, the induced E. M. F., has to be a sine wave
alsoand, on theother hand, themoretheinduced E. M. F.
differs fromsine shape, the more its integralfunction,the
magnetism, is forcedtodiffer.Indeed,themagnetismmay
apparently differ, in its absolute value,lessfromsinusoidal
form than the impressedE. M.F., for it is not the instantaneous
values of the magnetism which are directly influenced by the
shape of impressed E. M. F., but thegreatersteepness or
flatness of the curve of magnetism which is directly caused by
theimpressed E. M. F. But it is just this difference in the
velocity of change, that is, in the quickness of rise or decrease
of the magnetism, and not the magnetism itself which would
have to account for an increased loss by hysteresis. Heintcies,
really not the difference of the curve of magnetism, from sine
shape, but that of thecurve of inducedand,therefore of
impressed E. M.F.,which may possibly cause an increase in the
loss by hysteresis.
Qute different in the transformer at full load. Indeed, its
apparent self-inductionis essentially decreased and the primary
current will thereforeresemble the shape of theimpressed
E. M. F., and differ from the sinusoidal form, much morethan
for open circuit.
But at fullloadthe waveofmagnetism and of resulting
M. MF..is much more independent of that of primary current
and primary E. M. F. It is caused by the combined action of
the instautanmusvalues of primary andof secondary current,
and thesecondarycurrent, again, is inducedbythemag-
netism.Hencetheresult
will be, if asudden changeof
impressed E. M. F. occurs and produces a sudden change of
primary current,just as suddenly as the opposite changeof the
secondary currents will take place,so that the resultanMt. FM..
of both combined currents will not change perceptibly, but
practically independent of tither current, will alternate freely
in sinusoidal waves, in spite of anydifference in the wave
shape of primary and secondary current from the sine law.
And, indeed, a glance over the curves of instantaneous
values of theelectricquantities in the transformer, as they
have been determined, for instance+by ProfessorRyan, at
Cornell University, and communicated to this Institute some
time ago:' shows a considerable discrepancy at open circuit
betweentheprimarycurrentandthesinewave,whileinthe
loaded tranSfOlTtler the secondary E. M. P. and, therefore, the
magnetism,almost universally resemblessine shape.
With regard to Ewing's theory of the molecular magnets, I
do not say that I disbelieve in it, wither that I believe in it. At
thefirst view, this theory did not seem to agree with the
21 8
P R O C E E D I N G S O F T H EIEEE, VOL. 72, NO. 2, FEBRUARY 1'3%
results ofmy tests, as I said in my paper, but I did not take
the time to think it over more completely whether this theory
could be made to agree with the tests; my aim was to gather
facts, being convincedthatbased upon alargenumber of
facts, a theorywill be found in duetime to explain them. [ S e e
appendix, p. 221.1
DR hrpIN:-hbgnetiC force is certainly a resultant of the
primary and secondary currents. As long as the sewndary is
open, the primary current wiU be a sine wave, practically. It
does not make any difference what the impressed electromo-
tive force is otfhe alternator,and therefore the magneto-motive
force will be a sine wave and the magnetic inductionwill vary
liksaeine
wave. If you dose thseecondarcyircuit,
the self-inductionin the primaryis reduced, and therefore the
backelectromotiveforce in theprimary is smallerandthe
impressed electromotive forcebegins to assert itself more and
moreandgives to theprimarycurrent its ownshape.The
shape of thesecondarycurrent, as long as thesecondarys
resistance is very large and stheecondary current is small-that
too is practically a sine wave, the primary current being also
practically a sine wave, the resultant of the two-that is, the
magneto-motive force-must also be a sine wave. But now, if
you diminish the resistance in the secondary circuit, that is,
increase the load, then thsehape of the primary currenbt egm
to correspondtothe shape of theimpressedelectromotive
force,and also theshape of secondarycurrentbeginsto
correspond to theimpressedelectromotiveforce, and the
resultant of the two, the magnetizing current, must also begin
tocorrespondmoreandmore
in shape to theimpressed
electromotive force-that is, the magnetemotive force begins
tocorrespondtothe shape of\,the impressedelectromotive
force. The same is trueof the magnetic induction.We are not
to forget that the secondary current does not depend on the
rate of change of the primary current only. The relation is a
little more complicated. Thereis a differencein phase between
theprimaryand secondary, varyinganywhere between 90
degreesand180degrees.Whenthedifference
in phase is
nearly180degrees, that is, at full load,thentheprimary
current and the secondary current correspond to each other
almostexactlyinshape,andhavethesame
shape as the
impressed electromotive force.
MR. STEINMETZ:-I can not yet quite agree with Dr. Pupin.
Iheresultant Of two M. M.F.S Of
s h a p e , but different
phase, need not have the same shape, but can have an entirely
differentform. So forinstancetheresultant otfwovery
ragged-looking waves can be acompletesinewave.Let us
come down to numerical values. Take for instance a loo0 volt
alternator, feeding into the primarycoil of a transformer. The
internal resistance of the primary coil is 20 o. The current
flowing through theprimary, at open secondary circuit,a
small fraction of an ampere. Hence, what I call the “resulting
E. M. F.,” that is the E. M. F. which sends the current through
the resistance, is only a few volts.
But this “resulting E. M. F.,” is the difference of this instan-
taneous values of primaryimpressed, and primaryinduced
E. M. F. Thedifference is only a fewvolts,the primary im-
pressed E. M. F. = loo0 volts,hencetheprimaryinduced
E. M. F. must be almost like the impressed E. M. F., and must
differ fromsine-shape,therefore, if theimpressed E. M. F.
differs;and if thedifferentialquotient of magnetism,the
induced E. M. F., is non-sinusoidal, the curve of magnetism is
non-sinusoidal also.
In the transformerat full load the current and therefore the
differencebetweeninducedandimpressed E. M. F. is much
greater, the induced E. M. F. is therefore much more indepen-
dent of the impressed E. M. F., the more, the greater the load
is, hence the curve of magnetism alternating freerthan at open
circuit, and thereforemore approximating the harmonic vibra-
tion of the sine-wave.
DR.PUPIN:-It does not by anymeans follow that at every
moment the difference between theimpressed E. M. F. and the
back E. M. F. is smallwhenaveragevalueof thecurrent is
small, and that is the pointin your argument. And evenif it is
I do not see how that can prove that the shape of the current
and the impressed E. M. F. are the same.
MR. S ~ ~ : - Whavee seen that the effective value of
the current, and therefore the effectivoer average value of the
difference of primary impressed and primary induced E. M. F.
must be small. This indeed does not prove that some of the
instantaneous values of this difference may not be consider-
able. But first, this couldbeonlythe case withveryfew
values,because, if for anygreatlength of time thecurrent
were considerable, this would show in the average or effective
value,themore, as this is the averageof thesquares of
instantaneous values.
On the other hand, to make the current considerable only
for a moment, while immediately before and after it is small,
eithertheinduced E. M. F. mustsuddenlydecreaseenor-
mously, and the next moment increjauset as suddenly-which
is impossible, because it is the differential quotient ofmag-
netism-or the primaryE. M. F. had to rise and decrease again
verysuddenlya, ndsuchasudden
rise, andimmediately
afterwards decreaseof primary impressed E. M. F., not only is
an electredynamic alternator unable to produce, but no elec-
tric circuit would permit a current ofsuch enormously large
value andshort duration topass. Hencewe canfrom thesmall
value of effectiveprimarycurrent,conclude that also its
instantaneous values without exception must be small.
DR. F”IN:-I do not suppose that a wave which is not a
sine, must neceSSarily be a wave that goes up and down with
suddenvariations. I think that everygoodcommercialma-
chine is constructedin such a way that the electromotive force
is a perfectly smooth curve. There may be small comers, but
even those comers are very nicely rounded. Generally speak-
ing it is a sign of good construction of the machine when the
impressedelectromotiveforce is asmoothcurve-certainly
not a curve that haskinks in it. Kinks in the currentcurve are
producedbyaharmonicallyvaryingresistance. It would be
almost impossible to construct a machine so badly as to give
kinks in the electromotive force curve. Ihe current may run
smoothly,but still be veryfar from a sine waveA. sine wave is
not theonlysmoothlyrunningwave.Therearemanyother
waves that arenice and smooth. The only possibilitoyf having
such a currentas Mr. Steinmetz described, would be simply to
introduce into the circuit a harmonically variable resistance.
An arc light circuit represents a harmonically variable resis-
tance, and introduces those complications, the kinks. An arc
lightmachineviolatesmost of the well establishedrules in
dynamoconstruction,but it does the workof the arc light
circuit admirably, and it does it because it encourages kinks
and other irregularities in the currenwt ave.
I v l ~STEINMETZ-Ientirely agree withProfessorPupin,
that there is really nowadays almost no possibility of getting
suchsharppointed wavesof alternating E. M. F. that a dif-
ference of the hysteretic loss between open circuit and closed
circuit couldbe expected. And I did not believe myselfin this
cause of the discrepancyof former testson transformers under
full load and with open secondary circuit.I made this remark
STEINMETZ: ON THE LAW OF HYSTERESIS
21 9
only to be absolutely just, and not entirely to reject as err* circuitanE.M.~.,E~isconsumed,whi~lagsonoquartcrofa
neous, determinations made by others buatt least to point out phase, or 90 degrees, behind the current, and is proportional
a cause which might produce, though not at all likely, a slight to the currentC , with a coefficient ofproportionality I , which
difference between the values found under full load and with I callthe Inductance of the circuit:
open circuit. Indeed, all our modern alternatorsproduce wavesvery
E2 s= IC
much resembhg sine curves, andtheonlyway to getfrom
This inductance, I , is of equal dimension with the resistance
them such rapidly changing E. M. F.s is, as Dr. pupin pointed R,hencemeasuredinohmsalso.
out, the introductionof variable resistances, as arc lamps, into
This inductance, I , is proportional also to the frequency of
the circuit.
the alternatingcurrent. Hence, if I call the inductance for 100
But some of the older types of alternators, as, for instance, complete periods per second the N d inductunceI,, for any
the Klimenko alternator at the Vienna exhibition,1882,2 gave other frequencyN the inductance is simply
evidently sharp pointed E. M. F.S, as 1 found by drawing the
curve of instantaneous values of E. M. F. of an alternator of a
similar type, where induction was produced by making and
breaking the magnetic circuitA.s you see,this is a verysimilar case to that referred to by Dr. Pupin, only that in this case a
variablemagneticreluctanceandnotavariableelectrical
Now, the “normal inductance”is a constant of the circuit just as well as the“resistance” or the “coefficient of selfinduction,” and only dependsupon the latter by the equation,
resistance was introduced into the circuit. MR. KENNEuY:-It is unfair, perhaps, when we have such
z, = 200rrL
a good paper, to offercriticisms upon it, but when it is as likely as this is to become classical Ithink that in self defense
resistance. onlythat“inductance” is measuredin ohms also, therefore
most easily combined with the
we ought to try to keep it as freefromallimperfections as
Thecombination of theresistance-which determine the
possible. I am taking the liberty of makmg a criticism on one E. M. F. of equal phase with the current-with the inductance,
term Mr. Steinmetz has used. He has spoken of the normal which determines the E. M. F. lagging onequarter phase be-
inductance of the coil of his ammeter as so many ohms, and I hind the current,is the “impedance,”or “apparentresistance.”
would suggest that it would be preferable to employ the word
Hence,
impedance, instead of inductance, because an inductance is a henryandanimpedanceisanohm,andIthinkitisapityto
+ Impedance = {(Resistan~e)~ (Inductance)2
confuse the two ideas. MR. STEINMETZ:-I didnot use theterminductance as
synonymous with coefficient of self-induction, where it would be expressed in henrys,but I used inductance in the verysense that Mr. Kennelly means with impehnce.
Thequotient of inductance and resistance is theangleof difference of phase between current and impressed E. M. F.
tancp
=
Inductance Resistance
I intentionally used the term inductance, following a pro-
You see, it is easyto make a person understand that he has
position which I read once, I do not remember where,
but in an alternatingcurrentcircuit two kinds of resistancesa
which seemed to meso highly commendable, that I should like “resistance” which consumes energyand an “inductance”
to see it introduced in practical engineering.
which does not consume energy, and make him calculate the
Indeed,the“coefficient of self-induction”givesallthe
apparent resistance or “impedance” as the hypothenuse of a
information needed for determining the electric phenomena in right-angled triangle, with resistance and inductanascecatheti;
inductivecircuits.Buteverybcdy will concedethat it is a while the coefficientof self-induction will frighten the “practi-
tedious, cumbersomeworkf,romthe“coefficientof
self- calman” still for quite awhile.
induction” to- calculate, for instance, the instrument correc-
On the other hand, “inductance” is more convenient than
tions for a whole set of tests made with somewhat differing “coefficient of self-induction,” because expressed in the same
frequencies. Besides, I think it will be some time before the
dimensions as resistance, in ohms.
“practical electrician” will handle the “coefficient of self-in-
I used the term “normal inductance,” because in reducing
duction” just as easily as he now does ohms and amperes.
the rea- I found it much more convenient than the use of
Let us considersomewhatcloserthephenomena
in an the “coefficient of self-induction,” and therefore recommend
inductive circuit. If a sine waveof alternating current flows its use.
through an inductive circuit, a certain E. kf. F. is consumed by
Opposing E. M. F.S.
MR. WETzLER:-Before moving to adjourn, I would like to
move a vote of thanks to Mr. Steinmetz for his admirable and
First, by the electric resistance of the circuit, an E. M. F. E, interesting paper this evening.
is consumed, which is proportional to the current C, with a
THE Chmww:--Gentlemen, it is with fee@ of peculiar
coefficientof proportionality, R , which is called the true or gratification that I put this motion. I was very glad indeed to
ohmic resistance,or, in short,the Resirtance of the circuit.
hear Mr. Bradley,in his initiatory remarks speak of the
This E. M. F. is of equal (but opposite) phase with the cur- markedexcellences of the paper wehave heard read, and I
rent C:
was pleased also to hear him remark upon the rarity of such
E1 = RC
papers in America Mr. Bradley, I think,did our sister societies of Europe more thanjustice, becauseit is in but few of the
Then by the action of the changing magnetic field of the
societiesoverthere, and I am speaking of Englishspeaking
countries of course, that we find such papers as this-leaving
2Aremarkabkfeaturewasthatitconsumcd4w.~.whcnmnning~~ outthePhysicalSociety and thatotherin which the most
M load, but almost 6 R P. when runningM y excited but without taking m t off, that is, without load.
distinguished member of our own profession now presides so
220
PROCEEDINGS OF THE IEEE, VOL. 72, NO. 2, FEBRUARY 1 9 6 4
ably (I mean the Royal Society), thereis none in which papers of this character are of high frequency.
[A vote of thanks was carried and the meeting adjourned.]
-
APPENDIX
[COMMUNICATED BY MR SEXNMXZ AFTER ADJOURNMENT.]
Having had time in thelast fewdays to considermore
deeply the relation of this law of hysteresis to Ewing's theory
of magnetism, I found that this law of hysteresis agrees very
nicelywith Ewing's theory, giving just thephenomena this
theory leadsus to expect.
According to Ewing's 'Iheory, for very low M. M. F.'s, forces
too small to affecthechains of molecularmagnets,the
magnetic cycle should be almost reversible, that is, the hys-
teresis very small or almost nil.
For medium M. M. F.'s, that is M. M. F.'S largeenough to
break up the chainsof molecular magnets, the magnetic cycles
mustbecomemarkedlyirreversiblea, ndthehysteresis
as
function of the M. M. F., must rapidly increase.
For high M. M. F.'s, where the chains of molecular magnets
are mostly broken by the superior outsidMe. M. F., the hyster-
eticloss, as function of the M. M. F., should be expected to
increase slower again and always slower.
This is exactly thecase,when the hysteretic lossf,ollows the law of the 1.6th of the magnetizm'on B, as shown best by the
affixed m e Fig. 16.13 In Fig.16the dorred m e gives themagnetization B, in
lines of magnetic forceper cm.*,as function of theM. FM..F, in ampere turnsper cm.
?he drawn m e gives the hysteretic loss, in ergs per and cycle, calculated by the equation:
H = .003507B1.6")
but not plotted, as in the former curves, with the magnetiza-
tions B as abscisste,but with theM. M. F.'s:F as ab&, that
is in the form:
H = f( F).
- As seen,the hysteresis H for low M. M. F.'s,F = 0 1, is - verylow andalmost nil, increasesveryrapidly for medium
M. M. F., F = 2 5, andthenincreasesslower again and always slower, just as Ewing's theory leads us to expect.
Yonkers, N.Y.,February 7th,1892.
curve corresponds to a set of tests n o t contained in the paper, being made after its completion. I chose this particular set of tests, because it covers a larger range of magnetization than any set of tests given in the
Paper.
STEINMETZ: ON THE LAW OF HYSTERESIS
221