3.8 Related rates 191
to the spool atthe point T. Find the rate of increase of the distance from the
axis of the spool to the end E of the thread. Hint: It is not necessary to make an
extensive study of the path traversed by the end E; it is sufficient to construct
and use an appropriate right triangle .4ns.: .4s//R2 + s2 centimeters per
second.
7 A particle is moving with constant speed k along the graph of y = sin x
in such a way that its x coordinate is always increasing. Derive the formulas
dy dx dx k dy k cos x
dt =COS xdt' dt - 1 + cos2 dt - 1 + os xco
involving the scalar components of the velocity. Show also that
d2x k2 sin x cos x
dt2 (1 + cost x)2
8 A particle of mass m starts from rest (that is, starts with speed 0) at the
point (xo,yo) of Figure 3.892 and, with the earth's gravitational field pulling it
downward, slides without friction on the graph of the equation y = x2. We
grasp an opportunity to see how basic scientific concepts can be employed to
obtain information about the motion of the particle.
When 0 S y < yo and the particle is at the point (x,y),
the loss in potential energy is mg(yo - y) and the gain
in kinetic energy isIv12, so
Iv12 = 2g(yo - y).
With the aid of this information, derive the formulas
0X2 Yo - Y (dy)2 x2(yo - y)
F) = 2g 1 + 4x2' dt / = 8g 1 + 4x2
Figure 3.892
which determine (except for algebraic sign) the horizontal and vertical scalar
components of the velocity of the particle when it is at the point (x,y).
Remark: There is a reason why the formulas refuse to tell the signs of dx/dt and
dy/dt. As time passes, the particle oscillates to and fro over an arc of the
parabola in such a way that the scalar components of the velocity are sometimes
positive and sometimes negative.
9 Figure 3.893 shows a connecting rod of length b which earns its name by
connecting a piston (which is free to
move to and fro in a cylinder) to a P b
point P on a crankshaft which is free a Piston
to rotate in a circle of radius a having^0 x
its center at 0. We should not be too
busy to observe that b exceeds 2a in Figure 3.893
ordinary engines and pumps. Obtain
a formula relating dx/dt, the scalar velocity of the piston, to dB/dt, the angular
speed of the crankshaft. Hint: Use the law of cosines in the form
b2=a2 + x2- tax cos 8.
dx ax sin 0 dO
flns.:dt x - -ac 0 s 0 dt