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On Foucault's Pendulum Author(s): William Duncan MacMillan Source: American Journal of Mathematics , Jan., 1915, Vol. 37, No. 1 (Jan., 1915), pp. 95-106 Published by: The Johns Hopkins University Press Stable URL: https://www.jstor.org/stable/2370259
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On Foucault's Pendulum.
BY WILLIAM DUNCAN MACMILLAN.
? 1. Introduction.
A number of papers have appeared during the past sixty years on the .theory of the motion of the Foucault pendulum,* but the theory is still far from being in a satisfactory state. The theory given in the various treatises on mechanics includes only the case of infinitesimal oscillations. For oscillations of this type the equations of motion are completely integrable, and it is found that, if the motion is referred to a horizontal plane rotating in clockwise direc-
tion with uniform angular speed of period si 2 hours, where d is the latitu
of the place, the pendulum describes a relatively long, narrow ellipse in which the ratio of the minor to the major axis is the same as the ratio of the period of a single oscillation of the pendulum to the period of the rotating plane. This result is independent of the azimuth of the initial vertical plane of the pendulum, so that the theory for this case is complete.
For finite oscillations, however, only approximate solutions have been given. If (a represents the angular rate of the earth's rotation, and if terms of the order (02 and higher are neglected in convenient places, the equations of motion can be integrated by means of elliptic functions.t Since the quantity Ca2 is very small, the results obtained by this process doubtless represent the motion very accurately for a considerable interval of time; but as the results obtained do not satisfy the equations of motion, no inferences can be drawn from them with safety over extended intervals of time.
It is the purpose of the present paper to set forth explicitly two rigorous particular sol-utions of the equations of motion as they are usually given.t In these equations the oblateness of the earth and the terms in 02 are neglected. It will be shown that if the pendulum is started from rest in the plane of the meridian, if certain conditions of commensurability are satisfied, and if the
* References to the literature of this subject are given in the " Encyklopadie der Mathematischen
Wissenschaften," IV, 7, S. 6.
f Chessin, AMERICAN JOURNAL OF MATHEMATICS, VOI. XVII, 1895. 4 Poisson, Journal Polytechnique, 1838. Routh, "Advanced Rigid Dynamics," p. 27. Appel, " Traite
de Me'canique Rationelle," II, p. 310, edition of 1896.
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96 MACMiILLAN: On Foucault's Pendulum.
oscillations of the pendulum are not too large, then the motion of the pendulum is always periodic. Furthermore, it will be shown that the period of the rotating plane, which is 24 hours divided by the sine of latitude for infinitesimal oscillations, increases as the amplitude of the oscillations of the pendulum increases. Similar results are obtained when the pendulum is started into motion with an initial impulse.
? 2. The Differential Equations. It is assumed that the earth is a sphere and that the xy-plane is tangent to the sphere at the place of observation. The positive end of the x-axis is towards the south, the positive end of the y-axis is towards the east, and the positive end of the z-axis is directed downward. The origin is taken at the point of suspension of the pendulum. We will let (a denote the rate of the earth's rotatlon, 6B the latitude, I the length and mT the tension of the suspending wire, and g the acceleration of gravity. The equations of motion are
d2x T dy
dt2 1 x+2ca sin: (c
d y _ T dx ~ dz
dt2 -- y-2ca sinf3l dt ?+ 26 cos d dt (1)
d2z T7 dy
z +g-2 cos3 2 cos
Since the pendulum is of ilnvariable length 1, the following relations are always satisfied:
2+y2+z2-l2 x
cvd dxtdy + dzY t i+ dt } (2
d 2 d2y d2z [(d)2 (dY2 (dZ)2]
and the energy integral is dx\2(dy)2+(dz 2 1z (
+ - t)2g1K -C) (3)
where c is the constant of integration. Combining (1), (2) and (3), it is found without difficulty that
T _ _ N26F(dy dx\ .z dy l
3 2 c+ Y t) sin +(Yd-z )cos . (4)
It will be supposed that the pendulum is initially displaced towards the south through an angle whose sine is ,u. Then the initial values are
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MACMILLAN: On Foucault's Pendulum. 97
x2tL, zy ~lV01~~Z2,dt--ad-tV-dt--(52 d = dy
from which it follows that c =/I y2.
Let us now make a change of variables by the transformation x l[i cos nt+?' sin nt], 1 y 1[- sinnt+ncosnt], t (6)
so that i2+n2+ (1-<)9-1 and for brevity let us take (a-sin /3=a, X cos /ac1.
Then the motion of the pendulum is referred to a system of rectangular axes rotating with the angular velocity n, where i is an arbitrary at our disposal, and the differential equations are
d2~ FT 2dvid
dt2 + n 2n (n +21 sin ntd
d2n +?T n2t-2 2+n~(~n~-~a~) ~+~2~(~n~-~) ~<t?--2ao1cosntd, (7) d2-+ T T-g 2<1(ni-dv)cos nt-2a(d +nn)sinnt.
From the relation <= I1-Vi- (g2+2) it is seen that, if g and v are small quantities of the first order, # is a small quantity of the second order. Neglecting terms of the second and higher orders and choosing n=r, the differen-
tial equations become simply
2 +d [gt+ f1 2]01 =ol8 8 Ad 2 +t+2CY+ 2 ] =L o.JI n 8
In order to satisfy the initial conditions in the xy-plane we must have at t=O,
0 n=07 -d' _dta, and therefore the solution is
f=ytLcosXJg? +a2t7 \/+ a +sinXl2 +a2t, (9)
which is an ellipse of which the semi-major axis is p and
is < Hence the theorem of Chevilliet for infinitesimal oscillations,
13
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98 MACMIILLAN: On Foucault's Pendulum.
"The r-atto of the major to the minor axis is equal to the ratio of the period of the rotating plane to the period of oscillation in the ellipse."
There is no difficulty in introducing an azimuth constant into this solution if it is so desired.
? 3. Development of a Periodic Solution.. The choice n=oa certainly simplifies the differential equations. Nevertheless it does not seem to be convenient to develop a periodic solution in this manner. For finite oscillations we will take n= 1 where x is an arbitrary constant, the form and value of which will be determined by the initial and peri-
odicity conditions. It will be convenient also to take l= 1+ 0 where lo i
fixed constant and X is a constant of the same type as, x. We will transform the independent variable by taking t= (1+x)er so that nt=cer, and, finally,
we will write g +a2=p2. Since the length of the pendulum is invariable
throughout the motion, we can discard the differential equation in ;, and there remains
ie"t + [ (1 +x)2 4- + (1 + 2x)c2 ]= +2x7'+2 (1+x)a'l' sin ar,]
f +[(1+X)2 1 +(1+2x)a2 n=-2x(1'-2(1+x)0)C'co
where accents denote derivatives with respect to r, and
(+ x)2 l + x)2(l+X) 0 [3 V/1- (2+2) - 2 V1 - 2] +2 (1+ x) (22i'-) 272(1+ c) (02+n2)
+ 2 (1 + x) a+(c -) c _ os + ) ) COS a Vi- (~~~~~~~2)2 - 172
+-(an + V1_(i2+n2) + v1 0+2 ) sin (11)
and ; 1 -V/1 (62+n2). The integral becomes
i2+ 2g + (02+_2 _ (or1'- ') _2(122+)2
J_~~~~+-1 > (1+2)22) (0+2 g2U.(2
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MACMILLAN: On Foucault's Pendulumn. 99
We propose to integrate these equations as power series in p, and we
therefore assume
t- nl[A+ ntty+n3,U3+ ..
X- =X6L+X2P2+X3t3+ .. X= *-1 1+ 2Y 2+ X31ta+.* In these series the constants xi and Xi will be chosen so that the coefficients ,. tj shall be periodic functions of r. As is seen from equations (8), the free
period of the differential equations is 2 and the forced period , It is nec
sary to assume, therefore, that the constant 1o has such a value that p -4 % + a2
is commensurable with a. This assumption is of importance in the theory of convergence of the series, but, obviously, is of little importance physicallv. It is found readily.by a few preliminary computations that xl= 1-/ 1 a1 2-O ? and - Utilizing these facts to simplify the expansions, the differ-
ential equations become
00
11 [X+ p2Ej]_
j=l
[-2a(cynj+li)0j sin atr+aj(02?+2)' sin rr 2 + p2_) +2X2 + p( + a2) +Vp2 + I 2) (02 + V12) $
+2a-1-,n' cOs er?+ (2aY(n1n2)'-2aani1n2) sin lr'V]pu + [ - ( (p2-a2) 23+2p2X3) 41 + 2x3an'+ (3p2 +cr2) 037pl2-22a$1 ( 1l2- 2ni') +2X2 f?
+ ~2 ~~-~2 ~+fa1 i(0 jn1 qi? (( )3+- n) O) +
+ 2a, ({163 +(njn3+)++ .2+jP2n + 7:r (02+n
Goo
[? -[2-aXj+(Ca+2nOj++'V21r7)(j0]n7j(3osi2no+eaa''2r2-)r2al(-+022la)+'12o($'tO.)2tce1oas1e~rn]
sin yS
aeKI4
LU...............,(3)
(p2_a2)2 2 (p2- +pa2?_ (p2 + a2) tl+ 1 ( 2) (02+n2)Vj +2ajnj(n2 COS aer)'-2aj(n1V>72)' COS ar 2aj(an1+gl')n2 sin ae] t]3
_(p _a2)A %,)j2x,(p'nj+agl) + (3 p2 + 2) 2 - 2a nj.( 0ln2' C 2
(p_2) 2 +2p2 2 + p 2+ a2 } n2+ (3p2+G2) (02+n2l)w2 aW t O
+ J-2a1n1(aY3 n3) I 1 ) 2a, (0103 + nj3) -2al2n2
_Jajq(a2+ 2) } 2sin 2t]_u4+ . ..2(14)
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100 MACMILLAN: Ont Foucault's Pendulum.
From the initial conditions (5) and the equations of transformation (6),
it is found that the initial values of $ and -q are
Consequently,
i(O)_Y7 n(0)=0; ('(0)_O, n'(0)=ay.
t1(?)=1, n1(?)=?i 01(?)=?s n,(?)=a; _ (15) Ej(O)=02 nj(O) Q; &,(0)=0, n'(0)=02 j-22....oo.J
Equating the coefficients of the first powers of u in the left and right mem-
bers of (13) and (14) , we find
{'1 +P2$i=O,} (16)
and the solutions of these equations which satisfy the initial conditions are
{1= Cos per, n71= sin pe.} (17)
p -
From these expressions it results that
1~2+2P+?2 =n+ a-c2 os p2p2 p r,2- y2 12 +..-p - 2 s-inapT er,.Iay1 - =O. (18)
From the coefficients of the second power of , in (13) and (14), and from the values given in (17) and (18), it is found that
i"2 +P2'02=0?
'2 +P2(p)72_2a2=) apai (2p +sCi)n2(apr-_ra)+cri-l 2P2 sin (2p-c) Lr
+ (p ) (p2+ sin 2 + aer
2p 2 si 2p+)r
On integrating these equations and imposing the initial conditions, we find
2 - 6 (p2-ap2)(ag1pa_l,s,a)Sinln?p.tp_ 2(p2p+2sp(3inp-?(+2ap))+ia(P)2a|~0(20)
2(pp+2(a3y)p2-aai)n2s-()2rjp-a
Similarly, the differential equations obtained fron the coefficients of the third power of jy in (13) and (14) are
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MACMILLAN: On Foucault's Pendulum. 101
0"3 + P%_3
(2U2+2X2) + - (3p2 ).I ] _(_a2) COS pr + [3~2+a2 (3P2a)] (p2-ag2) CT 62p2a2 cs p
+ 2+ -p2 (9p2 (p2_a2 C2 82p (9 2-a2) ap(9p2-a2) + I( )(P 2 'cos(2p_a)?r co? 3(pr p+) al(2p--a)
( 2p4?P3o?9PhC2?5pa3 3U4)a21 S (p+2o}zt
4 4(p3p(33p-+'a)(3p-2_a)
+ (-2p4-p2+ 9 + -5p a) 3 cs2cos (p-2a)-)
(- )2 ( 5c(4pp+3423,3 cpao)) (P +a) 2a(p-)+ COS ( 3p-2a)r, (21)
54_pp32(3+pa2-+a2()P2 4 3a2)f (p2 -a2)sinp
+p2
3 (p42p-pa32(p9)3(a(23p)y(+pI2p_p'2p+)_32(p)(Y-5) sin(2p+cs)p
3(p2-_2) (2p 2a) ( 3p + 2 p) 2 c 3 2 ( 2 p- ) 2
(p4+3p3fa+ gp2a2-+7p23 6a4)a1 . 2
+ 4p3(3p-F2) smn(p 2_)'2 3 (pGa) (p 2)a+ sin (3p ?2) - 4p(3p-a)
In order that the solution of tpese equations may be periodic, it is neces-
sary and sufficient that the coefficient of cos pxr in (21) and thle coefficient of
sin pt in (22) should vanish. Both of these coefficients carry (p-a2)2 as a
factor, but this factor cannot vanish, since a is very small as compared w-ith p.
The coefficient of sin p~t in (22) carries a/p as a factor, and this can vanish
only at the earth's equator. F5or other places on the earth's surface we must
have
p2+2X2 + 8p2 fp_a2
5p2+3pp2 (7p2-3a2) a-6
2 -3p3a 9pa 7 - 6+sin(p -92-cr
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102 MACMILLAN: On Foucault's Pend tlum.
From these equations it results that
A +5p2+38a2p(2 7p2p321(29 )ap 2 2 1 _-a2) ' 23
+ 3p2 +a2 (5p2a2)a2 1(2)
2- 8p2 p2 (gp2_a2)
Since a and a, are very small as compared with p, it is seen that a2 is approxi-
mately equal to -8, and X2 is approximately equal to +j. Using the values of a2 and x2 given in (23), the solutions of (21) and
(22) which satisfy the initial conditions are
[(3p2+a2) (p_-a2) _2 (243p8-256p6a2 + 208p4f4-4p2a6+ I-8)2 af
3L 64p4 8p4(p2- a2) (9p2 2)2 c
r (3p2+-a2) (p2_-&) (3p2_a2) (p2_-as)ai2 ? 6a(2 L 64p4 8p4(9p2-2) j P p+p2_2cosa
3(p2-a2) (p-a)ay 2) cos (2p +a)'r
p(p3a) (3p- a) (9p2- 2) 3 (p2-a2) (p?a)a2
p (p -a3f) (3p p-a) (9p2-a() cos (P21-r) ](
+ (2-p136pp 3aaC (p+pa)aO (3-p5-Hpp aa) 31a)cos (p si2cr) er
(2p4H+9 p1a+65ppa8(-(3pa4+)aCC rcos)((p3-2pa)eta )coS c3p s (2p---a 16p3a (p -a) (3p -a)
? 1(p6-pa) (apI+cao) s(3(3pp++-2a2) a1)e6rp+3((pp--Ha))(a3I pc-oas)i(3p-2a),r, (24)
[3 (3 p2 -Ha2) (2-ar2 ) a _ (27p8 -1 900 p6a2-
'n3 6~4p5 8p2a (9p2_-a2) 2
p2a)(p2-a2) a (p2-H a2) (p2-_a2) aa2 (2-2a2)a si2 c -[ (p2-6a2) 8p 5(9p2_a2) snpc?p2 (9p2-a2)
++3((pp4-_a)3(p3 +-9ap)2 (+pa-)7H362fa4)a3aI2is( in (2p + a),r ? ~2(p+) (3p-Ha) (9p2-a 2)
p_2_(3p(pp-2p2-)ap(2_3) pa(p-(-3aH-)aa))s(9(ippn22)-2(a22p) -a) er 16p' 33a(pa-7a)(3p-6a sina(p + 2a)'zr
16p a (p-+a) (3p p-a) sn(-a'
(p-a3)paa sin(7p p?2a6si (p- 2a) er
16p(p3a) (3p?-a) 16((3)p3p-)si-3oa)r)(5
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MACMILLAN: On Foucault's Pendulurn. 103
? 4. Properties of the Solution. It is not necessary to carry the computation any further, though by induction it will be shown that it is possible to carry it as far as is desired, and that
the constants Xi-1 and zi-, can always be determined in the coefficient of LU'
to keep the solution periodic. So far as it has been computed, g is a cosine series and V7 is a sine series. Let us suppose that, this property holds up to and
including the coefficients of yt-1. Then from (11) and from the properties of evenness and oddness it is seen that T/l is a cosine series up to and including the
coefficient of yt-1. Then it follows from (10) that the differential equations for
i and w, have the form +P2= [-(At- + 2x,i_1) (p2-a2) -+ Ai] cos per + other cosine terms,
n'i +p2nji[-2i-l ( (pp2_a-) + Bi sin pt'+ other sine terms, 1(26)
where Ai and Bi are known constants. In order that the solution may be peri-
odic, we m-ust have
Xi- 1+2xc1 - p2a'
X Bip a (p2 -_2)
and these equations uniquely determine 2i-2 and xi-,. The solution of (26)
which satisfies the initial conditiorns is then
ti= sum of cosine terms, ni sum of sine terms. Thus $i and vi have the properties which were assumed for gi_l and - The
property holds, therefore, for every i, and consequently 0 is a periodic cosine seriLes and v is a periodic sine series.
We have therefore formally determined a periodic solution of the equations of motion, and we are assured of its convergence by the general existence theorem of periodic solutions.*
A second property of the solution which has just been obtained is as fol-
sin
lows: If cos (ip ?ja)tr is a term in the solution, then i+j is a This is certainly true up to and including the coefficients of It
eral is readily seen by induction. Bearing in mind the properties of even and odd mnultiples, it is readily seen from (11) that if i+j is an odd integer in all coeffi-
* MacMillan, "An Existence Theorem for Periodic Solutions," Transactions of the American Mathe-
maticat Society, Vol. XIII (1912), p. 146.
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104 MACMILLAN: On Foucault's Penduluim.
cients of $ and V7 up to and including ',u then the expansion of T1' contains
only terms in which i+j is an even integer; and consequentlv from (10) it is
seen that $,, and n,, contain only terms in which i+j is odd. The property
is therefore general.
We have already supposed that p and c are commensurable numbers. Let us
take, then, p = mcp and - ncp, where m and n are integers relatively prime.
Cos
Cos
Any
term
If m and n are both odd, then (im?+ jn) is necessarily odd and the solution contains only odd multiples of cpr. The projection of the path described by the
pendulum upon the rotating ?n-plane is therefore symmetrical with respect to both the 4-axis and the n-axis. In the fixed xy-plane, however, since
in
x -[$ cos ar+ i sin or],
y =lI[- sin a'r?,7 cos ar],
the expressions for x and y will contain only even multiples of qt. Therefore nt 2nt
the xy-curve described in the interval <- _t < is identical with that described
in the interval 0 <_ er < 7, though in the rotating plane they are distinct.
x is a cosine series and y is a sine series, the orbit is symmetrical with respect to the x-axis, and it has a cusp at the point for which t=0. The pendulum is again at this cusp when 1=-_. Since the orbit is symmetrical with respect to
the x-axis, it. follows that at et the orbit again crosses the x-axis perpendic-
2qp
ularly or at a cusp. If nm and n are not both odd (thley cannot both be even since they are rela-
tively prime), then the expressions for g and n in the rotating plane contain
both even, and odd multiples of qbr, and the orbit, while symmetrical with respect to the a-axis, is not symmetrical with respect to the n-axis.
The period of the rotating plane is- - - (1+x). It is seen from (23)
that, for small values of It, x is approximately +?,82. Coonsequ
of the rotating plane increases as the amplitude of the pendulum increases.
The mean period of oscillation of the pendulum is n. In order to find th
p
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MACMILLAN: On Foucault's Pendulum. 105
dr2 impose the condition that r2=2+r2 is a maximum, i. e., d =0. This condition
gives the equation
O =-F[-(p()2-sCina2)*spinen1]2 +l([p-2)2-a2) )?Csa,icn1s2ips. 8 (3 pp2 +pE2)nfa~1 p a23 2 22a_ f2aaf . f 92--2 cos 2nn -+ 9 2 2s'2nn - 3 +
from whichi is obtained
[F 16a2aoU ,,7c
En = (p22) (9p2 2) sin 2n+
Substitutingr - +E in the expressions for $ and n, we have the coordi-
nates of the apse. or the end of the oscillation. The expression for the n-coor-
dinate of the apse is
(az[ sin 32a2alp sn2n~>1z
7a- =[-sin (p2-_2) (9p2_-a) sin 2n7+*
Since cy and cr each carry X as a factor, this quantity is of the order c(). Thus the line of apsides does not rotate with uniform angular motion, but its departure from uniformity is exceedingly small.
At first thought, it might seem that this solution should reduce at the north pole to that of the simple pendulum referred to rotating axes, and consequently the rotating axes should hlave the period of 24 hours exactly. On second thought, however, it is seen that at the poles the Foucault pendulum becomes a spherical pendulum referred to rotating axes, for initially the pendulum is at rest with respect to the earth and therefore in motion with respect to fixed axes. Since this motion is counter-clockwise when tlle pendulum is released, and since in the motion of the spherical pendulum the line of apsides rotates in the same direction as the motion of the pendulum itself, it follows that the line of apsides rotates in the same direction as the earth itself. Therefore it takes the earth more than 24 hours to come back to the same position with respect to the pendulum. The expression for the period of the rotating axes is P- (1+X2 8t2+ ... .) 24', and the value of x2 at the pole is positive.
? 5. Foucault's Pendulum with Initial Impulse.
If, however, the pendulum is started from relative rest, in which it hangs freely from its point of suspension, with an initial impulse, the solution so derived should reduce to the simple pendulumn at the poles. By exactly the
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106 MACMILLAN: On Foucautlt's Pendqilum. same method as has been used above, a periodic solution can. be obtained, provided the initial impulse be directed towards the east or towards the west.
With the same notation as before, let us suppose that the initial condi-
tions are
which implies an initial impulse towards the east. The solution is found to be
F 4p2raa1 C5pl pG1co(p+l
y +[ (p2_-2) (9p2-a2) 2(p? a) (3? 2 (p -a) (3p-) -J)
[sin per]It4p+ (p28_G2) (gp2__2) s2( 2
2(p+a) a(31p +s) asin2(2pa[u))r+[ s2(ipn-a) ((23pp-a-) a)}zi}t2 +..
_2_+_ 2 (1jp2-3a2)u C
- L 2) -- -(p2-a2) (9p2-a2 +
[ r.. .4p2a2 12+ (p2_a2) (9p2 2) 2 .
The period of the rotating axes is P= (1 +X2y2.... )24h; and since =,-C cos 3, it is seen that this is 24 hours exactly, at the poles, as it sho
UNIVERSITY OF CHICAGO, February 20, 1914.
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