Q2. (30 points) The position d as a function of time (t) of a body that moves along a straight line is given by:
d(t)= ‒ 0.2t4+0.5t3+15t-80 meters
The velocity v(t) of the particle is determined by the derivative of d(t) with respect to t, and the acceleration a(t) is determined by the derivative of v(t) with respect to t. Derive the expressions for the velocity and acceleration of the particle by using your existing math knowledge, and make plots of the position, velocity, and the acceleration as a function of time for 0 ≤ t ≤ 10 s with 0.1 s increments similar to following screenshot. Use the subplot command to make the three plots on the same page with the plot of position on the top, the velocity in the middle, and the acceleration at the bottom. Label the axes appropriately with the correct units.
Could you help me for this question?
but i says:
Subscript indices must either be real positive integers or logicals.
what does it mean?