please use matlab numerical methods

Question 2: 120 points] Assuming the drag is proportional to the square of velocity, we can model the velocity of a falling object like a parachutist at a specified time t with the following differential equations: dt 1m where v() is velocity (m/s), t is time (s), g is the acceleration due to gravity (9.81 m/s?), e is the drag coefficient (kg/m), and m denotes the mass of the object (kg). If the object is initially at rest v(0)-0 (i.e., v : 0 at t 0), calculus can be employed to solve the above differential equation, viz., where tanh(.) denotes the hyperbolic tangent function. Similarly, calculus can be employed to compute the distance (position) of the object as a function of (1) ), viz, time by integrating v() (since v() xO), viz