Determining Speeds, Height, and Magnitude in Elastic Collision Problems

How do we determine the values of the speeds, height, and magnitude?

Let's break down the data and solve each aspect step by step:

  1. The speed of the ball immediately before it hits the ground
  2. The time after the release of the clay blob at which the collision takes place
  3. The height above the ground at which the collision takes place
  4. The speeds of the ball and the clay blob immediately before the collision
  5. The magnitude and direction of their velocity immediately after the collision

Answer:

Let's go through each question one by one:

  1. The speed of the ball immediately before it hits the ground:
    Calculated speed is 10 m/s.
  2. The time after the release of the clay blob at which the collision takes place:
    Calculated time is 1 second.
  3. The height above the ground at which the collision takes place:
    The collision height is the same as the initial height, which is 5.0 meters.
  4. The speeds of the ball and the clay blob immediately before the collision:
    Ball speed: 10 m/s (at 1 second), Clay blob speed: 20 m/s (at 2 seconds).
  5. The magnitude and direction of their velocity immediately after the collision:
    The magnitude is (910 + m20)/(9+m), directed upwards.

When faced with elastic collision problems, it is essential to use the principles of conservation of momentum and kinetic energy to determine various parameters involved.

To find the speed of the ball immediately before it hits the ground, we utilized the kinematic equation:

v^2 = u^2 + 2as

After substituting the values, we calculated the speed to be 10 m/s.

The time after the release of the clay blob at which the collision takes place can be found using the equation s = ut + (1/2)at^2.

Substituting the known values led to a time value of 1 second.

The height above the ground at which the collision occurs remains constant at the initial height of 5.0 meters.

Calculating the speeds of the ball and clay blob at the instant before the collision involved utilizing the equations v = u + at.

Taking into account the respective times of 1 second for the ball and 2 seconds for the clay blob, we determined their speeds to be 10 m/s and 20 m/s, respectively.

In the case of a perfectly elastic collision, the magnitude and direction of velocities immediately after the collision are given by the formula: vcm = (m1v1 + m2v2)/(m1 + m2).

Therefore, the magnitude and direction of their velocity after the collision were calculated to be (910 + m20)/(9 + m), directed upwards.

← A bungee jumper s work calculation How many water molecules are in a runner s body →