While laying on the South Oval grass on a beautiful spring day, you notice two African...
Please answer all in steps! while laying on the South Oval grass on a beautiful spring day, you notice two African swallows flying toward each other, both of them carrying coconuts. The first swallow is flying north horizontally with a speed of 20 m/s and the other swallow is flying south horizontally at the same height with a speed of 15 m/s. The mass of the first swallow is 0.27 kg and the mass of his coconut is 0.80 kg....
Object A is moving due east, while object B is moving due north. They collide and stick together in a completely inelastic collision. Momentum is conserved. Object A has a mass of mA = 16.5 kg and an initial velocity of v0A = 8.20 m/s, due east. Object B, however, has a mass of mB = 27.5 kg and an initial velocity of v0B = 5.00 m/s, due north. Find the direction of the final velocity of the two-object system...
Object A is moving due east, while object B is moving due north. They collide and stick together in a completely inelastic collision. Momentum is conserved. Object A has a mass of mA = 16.8 kg and an initial velocity of = 7.37 m/s, due east. Object B, however, has a mass of mB = 29.0 kg and an initial velocity of = 5.03 m/s, due north. Find the (a) magnitude and (b) direction of the total momentum of the...
An object (A) of mass mAA = 27.5 kg is moving in a direction that makes angle of 56° south of east with a speed vAA = 5.00 m/s, while object (B) of mass mBB = 17.5 kg is moving due north with a speed vBB = 8.00 m/s. The two objects collide and stick together in a completely inelastic collision. Find the magnitude of the final velocity of the two-object system after the collision.
A car with a mass of 980 kg is initially traveling east toward an intersection with a speed of vc = 20.9 m/s and a 1500 kg pickup is traveling north toward the same intersection. The car and truck collide at the intersection and stick together. After the collision, the wreckage (car and truck) moves off in a direction of 44.0° above the x-axis. Determine the initial speed of the truck and the final speed of the wreckage in meters...
Object A is moving due east, while object B is moving due north. They collide and stick together in a completely inelastic collision. Momentum is conserved. Object A has a mass of mA = 18.0 kg and an initial velocity of v0A = 8.00 m/s, due east. Object B, however, has a mass of mB = 30.0 kg and an initial velocity of v0B = 5.00 m/s, due north. Find the magnitude of the final velocity of the two-object system...
(3) Two cars collide and stay stuck together. Determine the final velocity. The first vehicle has a mass of M1 = 2Kg and moves with a speed of 30 m/s traveling in a direction 30 degrees south of east. The other vehicle has a mass of M2 = 3Kg and moves with a speed of 50 m/s in a direction 45 degrees west of north. Express the velocities as vectors and use the relevant physical principle to solve the problem....
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...
Two cars collide at an icy intersection and stick together afterward. The first car has a mass of 1200 kg and was approaching at 6.00 m/s due south. The second car has a mass of 800 kg and was approaching at 21.0 m/s due west. (a) Calculate the final velocity of the cars. (Note that since both cars have an initial velocity, you cannot use the equations for conservation of momentum along the x-axis and y-axis; instead, you must look...
Two cars collide at an icy intersection and stick together afterward. The first car has a mass of 1250 kg and was approaching at 6.00 m/s due south. The second car has a mass of 900 kg and was approaching at 17.0 m/s due west. (a) Calculate the final velocity of the cars. (Note that since both cars have an initial velocity, you cannot use the equations for conservation of momentum along the x-axis and y-axis; instead, you must look...