The equation of motion of a point along a straight line has the form: x = 4 2t t^2 0.2t^3. Find: a) the position of the point at the moment of time: t1=2s and t2=5s; b) the average speed for the time elapsed between these moments; c) instantaneous speeds in a specified period of time; d) instantaneous accelerations in a specified period of time.
A detailed solution with a brief note of the conditions, formulas and laws used in the solution, the derivation of the calculation formula and the answer.
If you have any questions about the solution, write. I try to help.
No feedback yet