The Conservation of Momentum in Collisions

How is the conservation of momentum demonstrated in a collision between two billiard balls?

The Momentum of Billiard Balls A and B

Billiard Ball A: Mass = 3.3 kg, Velocity = 28.0 m/s

Billiard Ball B: Mass = 2.8 kg, Velocity = -7.8 m/s

Before the Collision

The momentum of an object is the product of its mass and velocity.

Initial Momentum of A: 3.3 kg * 28.0 m/s = 92.4 kg*m/s

Initial Momentum of B: 2.8 kg * (-7.8 m/s) = -21.8 kg*m/s

After the Collision

The total momentum before and after the collision should be equal.

Final Momentum of A: 92.4 kg*m/s (still moving to the right)

Final Momentum of B: 70.6 kg*m/s (moving to the left)

Conservation of Momentum Equation

P1 (A initial) + P1 (B initial) = P1 (A final) + P2 (B final)

92.4 kg*m/s + (-21.8 kg*m/s) = 92.4 kg*m/s + P2

70.6 kg*m/s = P2

Understanding the Momentum Conservation in Collisions

When two objects collide, their total momentum before the collision is equal to the total momentum after the collision, according to the principle of the conservation of momentum.

In the case of the billiard balls A and B, we observe that even though A is still moving after the collision, its momentum remains constant at 92.4 kg*m/s to the right. On the other hand, ball B, which was initially moving to the left with a negative momentum of -21.8 kg*m/s, changes its direction and gains a positive momentum of 70.6 kg*m/s to the left after the collision.

The equation for the conservation of momentum allows us to calculate the final momentum of an object after a collision by taking into account the initial momenta of the colliding objects. By applying this principle, we can understand how the momentum of billiard ball B changes from -21.8 kg*m/s before the collision to 70.6 kg*m/s after the collision, while the momentum of ball A remains constant at 92.4 kg*m/s.

This conservation law in physics demonstrates the fundamental principle that in an isolated system, the total momentum remains constant before and after a collision, providing a valuable tool for analyzing and predicting the behavior of objects in motion.

← Interesting facts about projectile motion Fluid mechanics calculating maximum flow rate and pressure difference →