CHAPTER VI. COMPOSITION OF TWO S.H. MOTIONS OF DIFFERENT PERIODS. 68. THUS far we have confined our attention to the composition of motions of the same or nearly the same period. We now proceed to some cases not thus limited. First, let the two S.H. motions to be compounded be at right angles to each other, and have periods in the ratio of 1 to 2. Let T be the period for the x component, and T the period for the y component; let 9 stand for x=α cos (4-8), y=b cos ('-'). ; hence if r is double of T', ' is double of 0. T Also, by reckoning time from an instant when x has its maximum value, we make =0, and, putting for the difference of epoch '-e, we shall have x= a cos y=b cos (20-6). (12) If we eliminate from these equations we obtain an equation of the fourth degree, which is not of much interest; but in two particular cases the second half of the curve coincides with the first-the moving point retracing its course—and the equation reduces to the second degree. One of these is the case of do, which gives the equation of a parabola, whose vertex is at a distance b from the central point of the vibrations, and focus at the = The other is the case of dπ, which gives denoting the same parabola inverted, its concavity being now turned towards the negative instead of the positive axis of y. Of the other curves, the most interesting is the sym metrical figure of 8 which corresponds to d = and d= π 2 2 , the path being the same for both these cases, but traced in opposite directions. The first line of Plate II. shows these and some of the intermediate forms. 69. Whenever the two periods are commensurable, the curve described returns into itself, and the period of its description is their least common multiple. Let the ratio of T to T (reduced to its lowest terms) be that of m: n. Then the equations will be x=a cos n y=b cos (m 0—6). (13) The curve will be inscribable in a rectangle whose sides are 2a and 2b, since the extreme values of x area, and the extreme values of y are ±6. Each of the two extreme values of x is attained ʼn times, and of y, m times, in the complete period. When dis o or, the tracing point will go twice over its path-once forward and once backward; for in the former case we have and gives the same values both of x and y as ÷ 6; that is to say, the tracing point will be in the same spot at equal distances of time before and after the beginning of each complete period; this beginning being fixed by the equations at a time when both x and y have their maximum positive values. show that the tracer will be in the same place at equal intervals of time before and after the moment when x and y have their extreme values, one positive and the other negative. By giving the value or we obtain a curve π 3п 2 2 possessing special features of symmetry. In the former case we have Every point on the locus of 1y is also on the locus of X2 Y2, and corresponds to a value of the same in magnitude but opposite in sign. Hence the two curves are the same, but are traced in opposite directions. 71. The curves obtained by compounding two simple harmonic motions are often exceedingly beautiful. and the movements of the pen in tracing them, when it travels at a convenient speed for the eye to follow, are graceful in the extreme. Several examples are represented in Plate II., the specimens selected being for the most part either the symmetrical curve just described, or the curve which terminates abruptly at the ends, the tracer returning upon itself, as described in § 69. The ratio of the two periods is indicated in each case. (See also § 94.) 72. The following is the geometrical construction for tracing these curves by points. Describe two concentric circles of radii equal to the Vo amplitudes of the two components. Let H be the point which by its motion round one circle gives the horizontal displacement, and v the point which by its motion round the other gives the vertical displacement. Then, having selected the starting points H, and v. so that v is 90°-ò in advance of H., find the intersection of a vertical through Ho with a horizontal through V. This will be one point on the curve. Set off in the forward direction a succes sion of equal arcs H H1, H1 H2, &c., of any convenient magnitude on the one circle, and on the other equal arcs Vo V1, V1 V2, &c., such that the latter are to the former (when expressed in degrees) as the period of the horizontal to the period of the vertical vibrations (or as m to n in equation 13, if x is horizontal and y vertical). Find the intersections of a vertical through H, with a horizontal through V1, a vertical through H, with a horizontal through V2, and so on, until the curve obtained begins to return |