Answer:
0.5m/s both moving in the negative x direction.
Step-by-step explanation:
Using the law of conservation of momentum which states that the sum of momentum of bodies before collision is equal to the sum of momentum of bodies after collision. The two bodies moves with a common velocity after collision.
Momentum = mass × velocity
Given two billiard balls of equal mass
For the ball of mass M1 moving with velocity of 2.00m/s, its momentum before collision is expressed as:
Momentum = M1 × 2
= 2M1
For the ball of mass M2 moving with velocity of -3m/s, its momentum before collision is expressed as:
Momentum = M2×(-3)
= -3M2
Momentum of the bodies after collision is expressed as:
Momentum = (M1+M2)V where v is the common velocity.
Using the principle above:
2M1-3M2 = (M1+M2)V
Since the two balls have equal masses, M1 = M2 = M the equation becomes;
2M-3M = (M+M)V
-M = 2MV
-1 = 2V
V = -1/2
V = -0.5im/s
The velocities of the balls after collision is the same and is equal to 0.5m/s both moving in the negative x direction.