400 lines
No EOL
20 KiB
Text
400 lines
No EOL
20 KiB
Text
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§37
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The asymmetrical top
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121
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and by formulae (37.14) tan of = M1/M2, cos 0) 2(1 (M3/M) 22
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substituting (2), we obtain
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tan 4 = V[I(I3-I2)/I2(I3-I1)] cot wt,
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(3)
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To find , we note that, by the third formula (35.1), we have, for 0 1,
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Hence
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= lot
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(4)
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omitting an arbitrary constant of integration.
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A clearer idea of the nature of the motion of the top is obtained if we consider the change
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in direction of the three axes of inertia. Let n1, n2, n3 be unit vectors along these axes. The
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vectors n1 and n2 rotate uniformly in the XY-plane with frequency So, and at the same time
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execute small transverse oscillations with frequency w. These oscillations are given by the
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Z-components of the vectors:
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22 M1/M = av(I3/I2-1) cos wt,
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N2Z 22 M2/M = av(I3/I1-1) sin wt.
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For the vector n3 we have, to the same accuracy, N3x 22 0 sin , N3y 22 -0 cos , n3z 1.
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(The polar angle and azimuth of n3 with respect to the axes X, Y, Z are 0 and -; see
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the footnote to 35.) We also write, using formulae (37.13),
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naz=0sin(Qot-4)
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= Asin Sot cos 4-0 cos lot sin 4
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= (M 2/M) sin Dot-(M1/M) cos Sot
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sin Sot sin N/1-1) cos Not cos wt
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cos(so
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Similarly
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From this we see that the motion of n3 is a superposition of two rotations about the Z-axis
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with frequencies So + w.
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PROBLEM 2. Determine the free rotation of a top for which M2 = 2EI2.
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SOLUTION. This case corresponds to the movement of the terminus of M along a curve
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through the pole on the x2-axis (Fig. 51). Equation (37.7) becomes ds/dr = 1-s2,
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= S = I2/20, where So = M/I2 = 2E|M. Integration of
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this equation and the use of formulae (37.6) gives
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sech T,
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}
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(1)
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sech T.
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To describe the absolute motion of the top, we use Eulerian angles, defining 0 as the angle
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between the Z-axis (direction of M) and the x2-axis (not the x3-axis as previously). In formulae
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(37.14) and (37.16), which relate the components of the vector CA to the Eulerian angles, we
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5
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122
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Motion of a Rigid Body
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§38
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must cyclically permute the suffixes 1, 2, 3 to 3, 1, 2. Substitution of (1) in these formulae
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then gives cos 0 = tanh T, = lot + constant, tan =
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It is seen from these formulae that, as t 8, the vector SC asymptotically approaches the
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x2-axis, which itself asymptotically approaches the Z-axis.
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$38. Rigid bodies in contact
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The equations of motion (34.1) and (34.3) show that the conditions of
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equilibrium for a rigid body can be written as the vanishing of the total force
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and total torque on the body:
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F = f = 0 ,
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K ==~rxf=0. =
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(38.1)
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Here the summation is over all the external forces acting on the body, and r
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is the radius vector of the "point of application"; the origin with respect to
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which the torque is defined may be chosen arbitrarily, since if F = 0 the
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value of K does not depend on this choice (see (34.5)).
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If we have a system of rigid bodies in contact, the conditions (38.1) for
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each body separately must hold in equilibrium. The forces considered must
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include those exerted on each body by those with which it is in contact. These
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forces at the points of contact are called reactions. It is obvious that the mutual
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reactions of any two bodies are equal in magnitude and opposite in direction.
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In general, both the magnitudes and the directions of the reactions are
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found by solving simultaneously the equations of equilibrium (38.1) for all the
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bodies. In some cases, however, their directions are given by the conditions
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of the problem. For example, if two bodies can slide freely on each other, the
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reaction between them is normal to the surface.
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If two bodies in contact are in relative motion, dissipative forces of friction
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arise, in addition to the reaction.
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There are two possible types of motion of bodies in contact-sliding and
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rolling. In sliding, the reaction is perpendicular to the surfaces in contact,
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and the friction is tangential. Pure rolling, on the other hand, is characterised
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by the fact that there is no relative motion of the bodies at the point of
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contact; that is, a rolling body is at every instant as it were fixed to the point
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of contact. The reaction may be in any direction, i.e. it need not be normal
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to the surfaces in contact. The friction in rolling appears as an additional
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torque which opposes rolling.
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If the friction in sliding is negligibly small, the surfaces concerned are
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said to be perfectly smooth. If, on the other hand, only pure rolling without
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sliding is possible, and the friction in rolling can be neglected, the surfaces
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are said to be perfectly rough.
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In both these cases the frictional forces do not appear explicitly in the pro-
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blem, which is therefore purely one of mechanics. If, on the other hand, the
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properties of the friction play an essential part in determining the motion,
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then the latter is not a purely mechanical process (cf. $25).
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Contact between two bodies reduces the number of their degrees of freedom
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as compared with the case of free motion. Hitherto, in discussing such
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§38
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Rigid bodies in contact
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123
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problems, we have taken this reduction into account by using co-ordinates
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which correspond directly to the actual number of degrees of freedom. In
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rolling, however, such a choice of co-ordinates may be impossible.
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The condition imposed on the motion of rolling bodies is that the velocities
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of the points in contact should be equal; for example, when a body rolls on a
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fixed surface, the velocity of the point of contact must be zero. In the general
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case, this condition is expressed by the equations of constraint, of the form
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E caide = 0,
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(38.2)
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where the Cai are functions of the co-ordinates only, and the suffix a denumer-
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ates the equations. If the left-hand sides of these equations are not the total
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time derivatives of some functions of the co-ordinates, the equations cannot
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be integrated. In other words, they cannot be reduced to relations between the
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co-ordinates only, which could be used to express the position of the bodies
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in terms of fewer co-ordinates, corresponding to the actual number of degrees
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of freedom. Such constraints are said to be non-holonomic, as opposed to
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holonomic constraints, which impose relations between the co-ordinates only.
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Let us consider, for example, the rolling of a sphere on a plane. As usual,
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we denote by V the translational velocity (the velocity of the centre of the
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sphere), and by Sa the angular velocity of rotation. The velocity of the point
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of contact with the plane is found by putting r = - an in the general formula
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V = +SXR; a is the radius of the sphere and n a unit vector along the
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normal to the plane. The required condition is that there should be no sliding
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at the point of contact, i.e.
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V-aSxxn = 0.
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(38.3)
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This cannot be integrated: although the velocity V is the total time derivative
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of the radius vector of the centre of the sphere, the angular velocity is not in
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general the total time derivative of any co-ordinate. The constraint (38.3) is
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therefore non-holonomic.t
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Since the equations of non-holonomic constraints cannot be used to reduce
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the number of co-ordinates, when such constraints are present it is necessary
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to use co-ordinates which are not all independent. To derive the correspond-
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ing Lagrange's equations, we return to the principle of least action.
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The existence of the constraints (38.2) places certain restrictions on the
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possible values of the variations of the co-ordinates: multiplying equations
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(38.2) by St, we find that the variations dqi are not independent, but are
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related by
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(38.4)
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t It may be noted that the similar constraint in the rolling of a cylinder is holonomic. In
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that case the axis of rotation has a fixed direction in space, and hence la = do/dt is the total
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derivative of the angle of rotation of the cylinder about its axis. The condition (38.3) can
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therefore be integrated, and gives a relation between the angle and the co-ordinate of the
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centre of mass.
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124
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Motion of a Rigid Body
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§38
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This must be taken into account in varying the action. According to
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Lagrange's method of finding conditional extrema, we must add to the inte-
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grand in the variation of the action
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=
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the left-hand sides of equations (38.4) multiplied by undetermined coeffici-
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ents da (functions of the co-ordinates), and then equate the integral to zero.
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In SO doing the variations dqi are regarded as entirely independent, and the
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result is
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(38.5)
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These equations, together with the constraint equations (38.2), form a com-
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plete set of equations for the unknowns qi and da.
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The reaction forces do not appear in this treatment, and the contact of
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the bodies is fully allowed for by means of the constraint equations. There
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is, however, another method of deriving the equations of motion for bodies in
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contact, in which the reactions are introduced explicitly. The essential feature
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of this method, which is sometimes called d'Alembert's principle, is to write
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for each of the bodies in contact the equations.
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dP/dt==f,
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(38.6)
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wherein the forces f acting on each body include the reactions. The latter
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are initially unknown and are determined, together with the motion of the
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body, by solving the equations. This method is equally applicable for both
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holonomic and non-holonomic constraints.
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PROBLEMS
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PROBLEM 1. Using d'Alembert's principle, find the equations of motion of a homogeneous
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sphere rolling on a plane under an external force F and torque K.
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SOLUTION. The constraint equation is (38.3). Denoting the reaction force at the point of
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contact between the sphere and the plane by R, we have equations (38.6) in the form
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u dV/dt = F+R,
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(1)
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dSu/dt = K-an xR,
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(2)
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where we have used the facts that P = V and, for a spherical top, M = ISE. Differentiating
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the constraint equation (38.3) with respect to time, we have V = aS2xn. Substituting in
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equation (1) and eliminating S by means of (2), we obtain (I/au)(F+R) = Kxn-aR+
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+an(n . R), which relates R, F and K. Writing this equation in components and substitut-
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ing I = zua2 (§32, Problem 2(b)), we have
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R2 = -F2,
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where the plane is taken as the xy-plane. Finally, substituting these expressions in (1), we
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§38
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Rigid bodies in contact
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125
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obtain the equations of motion involving only the given external force and torque:
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dVx dt 7u 5 Ky
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dt
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The components Ox, Q2 y of the angular velocity are given in terms of Vx, Vy by the constraint
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equation (38.3); for S2 we have the equation 2 dQ2/dt = K2, the z-component of equa-
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tion (2).
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PROBLEM 2. A uniform rod BD of weight P and length l rests against a wall as shown in
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Fig. 52 and its lower end B is held by a string AB. Find the reaction of the wall and the ten-
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sion in the string.
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Rc
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h
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P
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RB
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T
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A
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B
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FIG. 52
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SOLUTION. The weight of the rod can be represented by a force P vertically downwards,
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applied at its midpoint. The reactions RB and Rc are respectively vertically upwards and
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perpendicular to the rod; the tension T in the string is directed from B to A. The solution
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of the equations of equilibrium gives Rc = (Pl/4h) sin 2a, RB = P-Rcsin x, T = Rc cos a.
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PROBLEM 3. A rod of weight P has one end A on a vertical plane and the other end B on
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a horizontal plane (Fig. 53), and is held in position by two horizontal strings AD and BC,
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RB
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TA
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A
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RA
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C
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FIG. 53
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126
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Motion of a Rigid Body
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§39
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the latter being in the same vertical plane as AB. Determine the reactions of the planes and
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the tensions in the strings.
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SOLUTION. The tensions TA and TB are from A to D and from B to C respectively. The
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reactions RA and RB are perpendicular to the corresponding planes. The solution of the
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equations of equilibrium gives RB = P, TB = 1P cot a, RA = TB sin B, TA = TB cos B.
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PROBLEM 4. Two rods of length l and negligible weight are hinged together, and their ends
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are connected by a string AB (Fig. 54). They stand on a plane, and a force F is applied
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at the midpoint of one rod. Determine the reactions.
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RC
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C
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PA
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F
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1
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RB
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T
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T
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A
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B
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FIG. 54
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SOLUTION. The tension T acts at A from A to B, and at B from B to A. The reactions RA
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and RB at A and B are perpendicular to the plane. Let Rc be the reaction on the rod AC at
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the hinge; then a reaction - -Rc acts on the rod BC. The condition that the sum of the moments
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of the forces RB, T and - -Rc acting on the rod BC should be zero shows that Rc acts along
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BC. The remaining conditions of equilibrium (for the two rods separately) give RA = 1F,
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RB = 1F, Rc = 1F cosec a, T = 1F cot a, where a is the angle CAB.
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§39. Motion in a non-inertial frame of reference
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Up to this point we have always used inertial frames of reference in discuss-
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ing the motion of mechanical systems. For example, the Lagrangian
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L = 1mvo2- U,
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(39.1)
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and the corresponding equation of motion m dvo/dt = - au/dr, for a single
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particle in an external field are valid only in an inertial frame. (In this section
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the suffix 0 denotes quantities pertaining to an inertial frame.)
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Let us now consider what the equations of motion will be in a non-inertial
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frame of reference. The basis of the solution of this problem is again the
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principle of least action, whose validity does not depend on the frame of
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reference chosen. Lagrange's equations
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(39.2)
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are likewise valid, but the Lagrangian is no longer of the form (39.1), and to
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derive it we must carry out the necessary transformation of the function Lo.
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§39
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Motion in a non-inertial frame of reference
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127
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This transformation is done in two steps. Let us first consider a frame of
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reference K' which moves with a translational velocity V(t) relative to the
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inertial frame K0. The velocities V0 and v' of a particle in the frames Ko and
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K' respectively are related by
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vo = v'+ V(t).
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(39.3)
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Substitution of this in (39.1) gives the Lagrangian in K':
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L' = 1mv2+mv.+1mV2-U
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Now V2(t) is a given function of time, and can be written as the total deriva-
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tive with respect to t of some other function; the third term in L' can there-
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fore be omitted. Next, v' = dr'/dt, where r' is the radius vector of the par-
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ticle in the frame K'. Hence
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mV(t)+v'= mV.dr/'dt = d(mV.r')/dt-mr'.dV/dt.
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Substituting in the Lagrangian and again omitting the total time derivative,
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we have finally
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L' =
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(39.4)
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where W = dV/dt is the translational acceleration of the frame K'.
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The Lagrange's equation derived from (39.4) is
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(39.5)
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Thus an accelerated translational motion of a frame of reference is equivalent,
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as regards its effect on the equations of motion of a particle, to the application
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of a uniform field of force equal to the mass of the particle multiplied by the
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acceleration W, in the direction opposite to this acceleration.
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Let us now bring in a further frame of reference K, whose origin coincides
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with that of K', but which rotates relative to K' with angular velocity Su(t).
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Thus K executes both a translational and a rotational motion relative to the
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inertial frame Ko.
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The velocity v' of the particle relative to K' is composed of its velocity
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V
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relative to K and the velocity Sxr of its rotation with K: v' = Lxr
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(since the radius vectors r and r' in the frames K and K' coincide). Substitut-
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ing this in the Lagrangian (39.4), we obtain
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L = +mv.Sx+1m(xr)2-mW.r-
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(39.6)
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This is the general form of the Lagrangian of a particle in an arbitrary, not
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necessarily inertial, frame of reference. The rotation of the frame leads to the
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appearance in the Lagrangian of a term linear in the velocity of the particle.
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To calculate the derivatives appearing in Lagrange's equation, we write
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128
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Motion of a Rigid Body
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§39
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the total differential
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dL = mv.dv+mdv.Sxr+mv.Sxdr+
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=
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v.dv+mdv.xr+mdr.vxR+
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The terms in dv and dr give
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0L/dr X Q-mW-dU/0r. - -
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Substitution of these expressions in (39.2) gives the required equation of
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motion:
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mdv/dt = (39.7)
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We see that the "inertia forces" due to the rotation of the frame consist
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of three terms. The force mrxo is due to the non-uniformity of the rotation,
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but the other two terms appear even if the rotation is uniform. The force
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2mvxs is called the Coriolis force; unlike any other (non-dissipative) force
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hitherto considered, it depends on the velocity of the particle. The force
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mSX(rxS) is called the centrifugal force. It lies in the plane through r and
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S, is perpendicular to the axis of rotation (i.e. to S2), and is directed away
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from the axis. The magnitude of this force is mpO2, where P is the distance
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of the particle from the axis of rotation.
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Let us now consider the particular case of a uniformly rotating frame with
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no translational acceleration. Putting in (39.6) and (39.7) S = constant,
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W = 0, we obtain the Lagrangian
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L
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=
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(39.8)
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and the equation of motion
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mdv/dt = -
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(39.9)
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The energy of the particle in this case is obtained by substituting
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p =
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(39.10)
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in E = p.v-L, which gives
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E =
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(39.11)
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It should be noticed that the energy contains no term linear in the velocity.
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The rotation of the frame simply adds to the energy a term depending only
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on the co-ordinates of the particle and proportional to the square of the
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angular velocity. This additional term - 1m(Sxr)2 is called the centrifugal
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potential energy.
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The velocity V of the particle relative to the uniformly rotating frame of
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reference is related to its velocity V0 relative to the inertial frame Ko by
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(39.12)
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§39
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Motion in a non-inertial frame of reference
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129
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The momentum p (39.10) of the particle in the frame K is therefore the same
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as its momentum Po = MVO in the frame K0. The angular momenta
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M = rxpo and M = rxp are likewise equal. The energies of the particle
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in the two frames are not the same, however. Substituting V from (39.12) in
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(39.11), we obtain E = 1mv02-mvo Sxr+U = 1mvo2 + mrxvo S.
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The first two terms are the energy E0 in the frame K0. Using the angular
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momentum M, we have
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E = E0 n-M.S.
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(39.13)
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This formula gives the law of transformation of energy when we change to a
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uniformly rotating frame. Although it has been derived for a single particle,
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the derivation can evidently be generalised immediately to any system of
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particles, and the same formula (39.13) is obtained.
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PROBLEMS
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PROBLEM 1. Find the deflection of a freely falling body from the vertical caused by the
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Earth's rotation, assuming the angular velocity of this rotation to be small.
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SOLUTION. In a gravitational field U = -mg. r, where g is the gravity acceleration
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vector; neglecting the centrifugal force in equation (39.9) as containing the square of S, we
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have the equation of motion
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v = 2vxSu+g.
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(1)
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This equation may be solved by successive approximations. To do so, we put V = V1+V2,
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where V1 is the solution of the equation V1 = g, i.e. V1 = gt+ (Vo being the initial velocity).
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Substituting V = V1+v2in (1) and retaining only V1 on the right, we have for V2 the equation
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V2 = 2v1xSc = 2tgxSt+2voxS. Integration gives
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(2)
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where h is the initial radius vector of the particle.
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Let the z-axis be vertically upwards, and the x-axis towards the pole; then gx = gy = 0,
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n sin 1, where A is the latitude (which for definite-
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ness we take to be north). Putting V0 = 0 in (2), we find x = 0, =-1t300 cos A. Substitu-
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tion of the time of fall t 22 (2h/g) gives finally x = 0,3 = - 1(2h/g)3/2 cos A, the negative
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value indicating an eastward deflection.
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PROBLEM 2. Determine the deflection from coplanarity of the path of a particle thrown
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from the Earth's surface with velocity Vo.
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SOLUTION. Let the xx-plane be such as to contain the velocity Vo. The initial altitude
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h = 0. The lateral deviation is given by (2), Problem 1: y =
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or, substituting the time of flight t 22 2voz/g, y =
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PROBLEM 3. Determine the effect of the Earth's rotation on small oscillations of a pendulum
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(the problem of Foucault's pendulum).
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SOLUTION. Neglecting the vertical displacement of the pendulum, as being a quantity
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of the second order of smallness, we can regard the motion as taking place in the horizontal
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xy-plane. Omitting terms in N°, we have the equations of motion x+w2x = 20zy, j+w2y
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= -20zx, where w is the frequency of oscillation of the pendulum if the Earth's rotation is
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neglected. Multiplying the second equation by i and adding, we obtain a single equation
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130
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Motion of a Rigid Body
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§39
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+2i02s+w28 = 0 for the complex quantity $ = xtiy. For I2<<, the solution of this
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equation is
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$ = exp(-is2t) [A1 exp(iwt) +A2 exp(-iwt)]
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or
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xtiy = (xo+iyo) exp(-is2zt),
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where the functions xo(t), yo(t) give the path of the pendulum when the Earth's rotation is
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neglected. The effect of this rotation is therefore to turn the path about the vertical with
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angular velocity Qz. |