Calculation of Final Velocity in an Elastic Collision

Problem Statement:

A 0.149 kg glider is moving to the right on a frictionless, horizontal air track with a speed of 0.710 m/s. It has a head-on collision with a 0.308 kg glider that is moving to the left with a speed of 2.27 m/s. Suppose the collision is elastic.

Questions:

  1. Find the magnitude of the final velocity of the 0.149 kg glider.
  2. Find the magnitude of the final velocity of the 0.308 kg glider.

Answer:

v1 = −2.201946 m/s (to the left)

v2 = 0.7780534 m/s (to the right)

Explanation:

Given the following :

Mass of first glider (m1) = 0.149 kg

Initial Speed of first glider (u1) = 0.710 m/s

Mass of second glider (m2) = 0.308 kg

Initial Speed of second glider (u2) = 2.27 m/s

For elastic collision:

m1u1 + mu2u2 = m1v1 + m2v2

Where V1 and v2 are the final velocities of the bodies after the collision.

Taking right as positive and left as negative.

u1 = 0.710 m/s ; u2 = -2.27 m/s

From the equation u1 - u2 = - (v1 - v2)

0.710 - (-2.27) = - v1 + v2

v2 - v1 = 2.98

From the equation (0.149 * 0.710) + (0.308 * -2.27) = (0.149 * v1) + (0.308 * v2)

0.10579 + (-0.69916) = 0.149 v1 + 0.308 v2

−0.59337 = 0.149 v1 + 0.308 v2

Dividing both sides by 0.149

v1 + 2.067 v2 = −0.59337

After solving the equations, we get:

v1 = −2.201946 m/s (to the left)

v2 = 0.7780534 m/s (to the right)

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