Question 19 4 pts A 2.3-kg object traveling at 6.1 m/s collides head-on with a 3.5-kg...
A 2.3-kg object traveling at 6.1 m/s collides head-on with a 3.5-kg object traveling in the opposite direction at 4.8 m/s. If the collision is perfectly elastic, what are the final speeds of the 2.3 kg and 3.5 kg respectively? Please write clearly!
35. A 2.3 kg ball traveling at 6.1 m/s to the left collides head-on with a 3.5 kg ball traveling in the opposite direction at 4.8 m/s. If the collision is perfectly elastic and the final speed of the 2.3 kg ball is 7.1 m/s to the right, what is the final velocity of the 3.5 kg ball? 3.9 m/s to the left 0.8 m/s to the left 0.4 m/s to the left 4.3 m/s to the left 4.8 m/s...
A 2.3-kg object traveling at 6.1 m/s collides head-on with a 3.5-kg object traveling in the opposite direction at 4.8 m/s. If the collision is perfectly elastic, what is the final speed of the objects?
A 4.00 kg object traveling at 3.00 m/s collides with a 3.00 kg object moving in the opposite direction. After the collision both objects are at rest. How much kinetic energy was lost in the collision?
A(n) 5 kg object moving with a speed of 6.8 m/s collides with a(n) 19 kg object moving with a velocity of 9.1 m/s in a direction 18 degree from the initial direction of motion of the 5 kg object. What is the speed of the two objects after the collision if they remain stuck together? Answer in units of m/s. What is the change in direction experienced by the lighter of the two objects? Answer in units of degree.
A moving object A of mass 8.7 kg and speed 2.2 m/s collides with a stationary object B of mass 9.4 kg. The collision is totally inelastic. Calculate the speed of the combined object after collision.
A 3 kg toy car with a speed of 5 m/s collides head-on with a 2 kg car traveling in the opposite direction with a speed of 3 m/s. If the cars are locked together after the collision with a speed of 1.80 m/s, how much kinetic energy is lost?
A 3 kg toy car with a speed of 8 m/s collides head-on with a 2 kg car traveling in the opposite direction with a speed of 5 m/s. If the cars are locked together after the collision with a speed of 2.80 m/s, how much kinetic energy is lost?
A 3-kg toy car with a speed of 6 m/s collides head-on with a 2-kg car traveling in the opposite direction with a speed of 4 m/s. If the cars are locked together after the collision with a speed of 3.435 m/s, how much kinetic energy is lost?
A 5.0 kg object with a speed of 4.0 m/s collides head-on with a 10 kg object moving toward it with a speed of 5.0 m/s. The 10 kg object stops after the collision. a) What is the post collision speed of the 5.0 kg object? b) Is the collision elastic? c) What is conserved?