What is the maximum and minimum velocity for a ball to land in a moving truck?

Calculating Maximum and Minimum Ball Velocity

To find the maximum and minimum velocities that the ball can have to land in the trunk of the moving truck, we need to utilize the equations of motion for both horizontal and vertical positions of the ball as a function of time.

The horizontal position of the ball can be expressed as:

x(t) = x0 + Vt - v0cos(θ)*t

Where:

  • x0 is the initial horizontal distance from the back of the truck to the ball
  • V is the velocity of the truck
  • t is the time
  • v0 is the initial velocity of the ball

Similarly, the vertical position of the ball can be represented as:

y(t) = y0 + v0*sin(θ)*t - (1/2)gt^2

Where:

  • y0 is the initial height of the ball
  • g is the acceleration due to gravity

We can determine the time of flight when the ball lands by setting y = 0, yielding:

t = (2v0sin(θ))/g

Substituting the time value and y0 = 0 into the equation of x(t) and equating it with the length of the trunk (L), we can solve for the initial velocity of the ball:

v0 = (L + x0cos(θ) - Vt)/(cos(θ) - t*sin(θ))

For this specific scenario with x0 = 5m, L = 2.5m, θ = 45°, V = 9m/s, and using the given equation for time, we can calculate the maximum and minimum initial velocities:

v0_max = (L + x0cos(45) - Vt)/(cos(45) - tsin(45))

v0_min = (L + x0cos(45) - Vt)/(cos(45) + tsin(45))

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