Consider a spinning disk with radius 10 cm. A quarter is rolled along a diameter at a rate of 10cm/sec. If the disk is spinning clockwise at the rate of w = p radians per second, find the path the quarter takes relative to the disk. Assume the quarter moves along the disk along a diameter, and is not affected by the spin of the disk.

Also find the path for w = 2p, 3p, 4p, p/2, 1 and 4 (radians per second).

Now suppose 1 < t < 2. The quarter will be at the point (x, y) = (10-10t, 0), which is 10t-10 units from the origin, (0,0). Unwinding the disk where this point came from, we see it would be on the circle with radius 10-10t, center (0,0), and an angle of q = wt = pt (counter-clockwise) from the negative x-axis, which will be at an angle of q = wt + p = pt + p (counter-clockwise) from the positive x-axis. This is the point (x, y) where
x(t) = (10*t-10)*cos(p*t + p), y(t) = (10*t-10)*sin(p*t + p); and this will be good for all points such that 1 < t < 2.

Since cos(q + p) = -cos(q) and sin(q + p) = -sin(q), this will simplify to x(t) = (10-10*t)*cos(p*t), y(t) = (10-10*t)*sin(p*t); and so this will be good for all points such that 0 < t < 2.

Similarly for other values of w:
x(t) = (10-10*t)*cos(w*t),
y(t) = (10-10*t)*sin(w*t);
0 < t < 2.

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