How integration may be used to solve problems of curvilinear motion is illustrated in the
following examples.
BC ONLY
EXAMPLE 4
Suppose a projectile is launched from the origin at an angle of elevation α and initial velocity v 0.
Find the parametric equations for its flight path.
SOLUTION: We have the following initial conditions:
Position: x(0) = 0; y(0) = 0.
Velocity:
We start with equations representing acceleration due to gravity and integrate each twice,
determining the constants as shown:
If desired, t can be eliminated from this pair of equations to yield a parabola in rectangular
coordinates.
EXAMPLE 5
A particle P(x, y) moves along a curve so that
at any time t 0.
At t = 0, x = 1 and y = 0. Find the parametric equations of motion.
SOLUTION: Since we integrate to get and use
x(0) = 1 to find that C = 2. Therefore, and
Since y(0) = 0, this yields C ′ = 1, and so (2) becomes