Thus the parametric equations areBC ONLY
EXAMPLE 6
The particle in Example 5 is in motion for 1 second, 0 ≤ t ≤ 1. Find its position, velocity, speed,
and acceleration at t = 1 and the distance it traveled.
SOLUTION: In Example 5 we derived the result the parametric representation
of the particle’s position. Hence its position at t = 1 is
From P(t) we write the velocity vector:Hence, at t = 1 the particle’s velocity is
Speed is the magnitude of the velocity vector, so after 1 second the particle’s speed isThe particle’s acceleration vector at t = 1 isOn the interval 0 ≤ t ≤ 1 the distance traveled by the particle isBC ONLY
EXAMPLE 7
A particle P(x, y) moves along a curve so that its acceleration is given by