Answer to Question #312872 in Mechanics | Relativity for Man

Question #312872

You are operating a remote-controlled model car on a vacant tennis court. Your position is the origin of

coordinates, and the surface of the court lies in the 𝑥𝑦-plane. The car, which we represent as a point,

has x- and y- coordinates that vary with time according to

a) Find the car’s coordinates and its distance from you at time t = 2.0 s.

b) Find the car’s displacement and average velocity vectors during the interval from

t = 0 s to t = 2.0 s.

c) Find the components of the average acceleration in the interval from t = 0 s to t =

2.0 s.

Expert's answer

Explanations & Calculations

The question is incomplete without the relation of how X and Y coordinates are connected.
But you may have it and it should look like "\\small X_{(t)}\\,\\,\\&\\,\\,Y_{(t)}"

Just substitute t = 2.0 into x in both "\\small X(t)\\,\\&\\quad Y(t)" to get the coordinates after time being 2.0s.
Then perform the usual Pythagorean distance calculation to find the distance "\\small L=\\sqrt{X_{(t)}^2+Y_{(t)}^2}"

Now write a vector relation with the unit vectors associated with the x and y axes for the 2 points it may be at t=0 and t=2 ; "\\small \\vec{r}=X_{(t=2)}\\hat i+Y_{(t=2)}\\hat j"
Get the first derivative of this vector function with respect to time, to find the average velocity vector.

Finally, differentiate the average velocity vector once again w.r.t time and get the acceleration vector.
Then to get the x and y components, just consider the coefficients of unit vectors i and j.

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