Asked by Ashley

Suppose that a particle with mass m moving on a plane having position vector
r(t)=a cos(t/4)i + a sin(t/4)j ,
where t>0 is the time and a>0 is any constant.
Find the equation of the path that the particle is moving.

My question: what are required to find here?

Can we substitute t=0 to the above position vector( say r(0) ), find another position of the particle and subtract r(0) from r(t) and simply get the path?
Answered by oobleck
They ask you to
"Find the equation of the path that the particle is moving."
??? They just gave you the equation of the path, right?

recall that the equation of a circle is
x = r cosθ
y = r sinθ
your function r(t) is just a circle of radius a with center at (0,0)
where θ = t/4
Answered by Ashley
So as for the question(the path which the particle is moving), can I simply write the answer as it is a circle with radius a with center at (0,0) where theta=t/4 ?
Answered by oobleck
good question. They asked for the equation.
I suspect that maybe they did just want a description of the path.
¿Quien sabe?
Answered by Ashley
Or can we substitute t=0 to the position vector(say r0) and find another position of the particle and substrct r0 from r(t) and obtain the path?
(As we do when finding a equation of a line)
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