Two cars are latched together with a speed of 3 m/s traveling to the east when they catch up and collide with another car moving at a speed of 0.6m/s east. If the three-car latches to the other two. How fast will the three cars joint together after the collision happens? Same Mass for all vehicles.
Two cars are latched together with a speed of 3 m/s traveling to the east when...
Two cars, both of mass m, collide and stick together. Prior to the collision, one car had been traveling north at speed 2v, while the second was traveling at speed v at an angle phi south of east
(asindicated in the figure). After the collision, the two-car system travels at speed v_final at an angle theta east of
north.Part AFind the speed v_final of the joined cars after the
collision.Express your answer in terms of v and phi.Part BWhat is...
Two cars, both of mass m, collide and stick together.
Prior to the collision, one car had been traveling north at speed
2v, while the second was traveling at speed v at
an angle ϕ south of east (as indicated in the figure).
After the collision, the two-car system travels at speed
vfinal at an angle θ east of north. (Figure
1)
Find the speed vfinal of the joined cars after the
collision.
Express your answer in terms of v...
two identical cars approach an intersection, one is traveling east at 18n/s. the second is traveling north at 24m/s. they collide and stick together. what is the momentum immediately after thr crash? assume mass of one car is 2000 kg. sketch the situation.
Two cars, both of mass m, collide and stick togetber. Prior to the collision, one car had been traveling north at speed 2v, while the second was traveling at speed u at an angle φ south of east (as indicated in the figure). After the collision, the two-car system travels at speed vfinal at an angle θ east of north.
Two cars approach an ice-covered intersection. One car, of mass 1.15*10^3 kg, is initially traveling north at 11.1 m/s. The other car, of mass 1.65*10^3 kg, is initially traveling east at 11.1 m/s. The cars reach the intersection at the same instant, collide, and move off coupled together. Find the velocity of the center of mass of the two-car system just after the collision.
Two cars approach an ice-covered intersection. One car, of mass 1.11*103 kg, is initially traveling north at 12.1 m/s. The other car, of mass 1.70*103 kg, is initially traveling east at 12.1 m/s. The cars reach the intersection at the same instant, collide, and move off coupled together. Find the velocity of the center of mass of the two-car system just after the collision. Magnitude= Directions = North of East
12. A 1500-kg car traveling at 30 m/s east collides with a 3000-kg car traveling at 20 m/s south. The two cars stick together after the collision. What is the speed of the cars after collision?
Three identical train cars, coupled together are rolling east at 2.0 m/s. A fourth car traveling east at 4.0 m/s catches up with the three and couples to make a fourcar train. A moment later the train cars hit a fifth car that was at rest on the tracks, and it couples to make a five car train. What is the speed of the five car train? Answer in m/s.
A railroad car (car-A) of mass 3.5X105 kg is traveling at a speed of 0.46 m/s and strikes another car (car-B) of mass 8.9X104 kg, which is moving towards car-A with speed 0.25 m/s. If these cars lock together as a result of the collision, what is the common speed (in m/s) after the collision? (a) Before collision (b) After collision 0.2023 1.56 0.316 0.017
Puck A of mass 240-g is traveling due east with a speed, v_Ai=10
m/s, on a level, frictionless air table when it collides with puck
B of mass 160 g traveling at 40° south of west with a speed,
v_Bi=15 m/s, on the same table. (See the diagram below.) When the
pucks collide, they stick together via Velcro surfaces that line
the circular boundaries of both pucks. Find the magnitude and
direction of the momentum of the tandem of pucks...