Applications of the Initial Value Problem y' = f(x, y); y(c) = d 143
If we let m denote the mass of a body and v denote its velocity, then the
momentum of the body is mv. Hence, Newton's second law of motion may
be expressed mathematically as(1) d(mv) = kF
dt
where k is a constant of proportionality and F is the magnitude of the force
acting on the body. If we make the assumption that the mass of the body is
a constant and that the units of mass, velocity, and force are chosen so thatk = 1, then Newton's second law becomes
(2) m dv = F.
dt
Consider an origin located somewhere above the earth's surface. Let the
positive axis of a one-dimensional coordinate system extend from the originthrough the gravitational center of the earth. Suppose that at time t = 0 a
body with mass mis initially located at Yo and is traveling with a velocity Vo.
See Figure 3.12. Assuming that the body is falling freely in a vacuum and that
it is close enough to the earth's surface so that the only significant force acting
on the body is the earth's gravitational attraction, then F = mg, where g is
the gravitational attraction- approximately 32 ft/sec^2 in the English system
of measurement and 9.8 m/sec^2 in the metric system. Substituting F =mg
in equation (2) and then dividing by m "I-0, we find the velo city of the bodysatisfies the initial value problem dv/dt = g; v(O) = v 0. Integrating and
satisfying the initial condition, we easily find the solution of this initial value
problem to be v(t) = gt+vo. Notice that the velocity increases with time and
as t --) oo, v(t) --) oo.0
At t= 0y=yo
v=vo t
ymGravitational center
of the earthFigure 3.12 A Falling Body