Collisions and Conservation of Momentum

In collisions, momentum of SYSTEM is conserved. • What does conservation look like? • How do we make conservation calculations? • Are all collisions the same? How do we classify them? Collisions and Conservationof Momentum

Conservation of Momentum Animation

Conservation Example 1 Classic two-car collision. One is moving and one is stationary. System is BOTH cars. What is the velocity of car 2 after collision? Conservation says: p car 1 + pcar 2 before collision = p car 1 + pcar 2 after collision One way to write this: p1i + p2i = p1f + p2f Because only the velocities change, not masses, this is m1v1i + m2v2i = m1v1f + m2v2f Givens: m1 = 2 kg v1i = +5 m/s v1f = +1 m/s m2 = 2 kg v2i = 0 m/s v2f = ? Substitute: 2·5 + 2·0 = 2·1 + 2· v2f Solve: 10 = 2 + 2 v2f v2f = +4 m/s

Types of Collisions What happens to momentum during collisions? To Kinetic Energy? To the objects themselves?

Perfectly Elastic

Perfectly Inelastic

Inelastic

Recoil For the system, pibefore explosion = pfafter explosion pi = 0 pf = 100 kg · -vcannon+ 5kg · +vcannonball Is KE conserved? KEinitial = 0 KEfinal= very not zero!

Example 2 A 1000 kg car going north at 30 m/s collided head-on with a 5000 kg truck going south at 5 m/s. The two vehicles stuck together forming one tangled mass of metal and moved off together, but at what speed and direction? a) What velocity did the tangled mass have? c for car t for truck mc = 1000 kg mt = 5000 kg vci = +30 m/s vti = -5m/s vcf=? vtf = ? Since car and truck stuck together, there is only 1 vf mcvci + mtvti = mcvcf + mtvtf Since they form one object, this simplifies to: mcvci + mtvti = (mc + mt)vf (1000)(30) + (5000)(-5) = (1000 + 5000)(vf) (30000 – 25000)/6000 = vfvf = + .83 m/s, or .83 m/s north

Example 2, part B A 1000 kg car going north at 30 m/s collided head-on with a 5000 kg truck going south at 5 m/s. The two vehicles stuck together forming one tangled mass of metal and moved off together, but at what speed and direction? b) What percentage of the initial KE was conserved? c for car t for truck mc = 1000 kg mt = 5000 kg vci = +30 m/s vti = -5m/s vcf= .83 m/s vtf= .83 m/s Since car and truck stuck together, there is only 1 vf ΣKEi = KEci + KEti ΣKEi= ½(1000)(302) + ½(5000)(52) = 512,500 J KEf = ½(1000 + 5000)(.832) = 2067 J % conserved = 2067/512,500 x 100 = .40 % of initial KE.What kind of collision? Perfectly Inelastic

Example 3 A 0.005 kg bullet moving 670 m/s strikes a 0.7 kg wooden block at rest on a frictionless surface. The bullet passes clear through the block and emerges with a speed of 430 m/s in the same direction. Of course, the block begins to move, but with what velocity? The system is bullet and block. Before collision: Bullet approaches block. After collision: Bullet has left block & both bullet & block are moving. b for bullet w for wooden block mb = 0.005 kg mw = 0.7 kg vbi = +670 m/s vwi = 0 vbf = +430 m/s vwf = ? Momentum is conserved: mbvbi + mwvwi = mbvbf + mwvwf (0.005)(670) + (0.7)(0) = (0.005)(430) + (0.7)( vwf) Vwf = +1.7 m/s

Example 3 continued Characterize the collision. The objects don’t stick together, so it’s not perfectly inelastic. But is it inelastic or perfectly elastic? That depends. Is the KE conserved? KEi = ½ (0.005)(6702) = 1122 J KEf = ½ (0.005)(4302) + ½(0.7)(1.72) = 463 J So about 60% of the KE was lost, making this an inelastic collision.

Tips & Tricks Draw a sketch and label the pieces. Decide when the collision occurs. What is before and what is after? Write a list of givens. Watch the vector signs. Organize! Write the equations. Don’t shortcut! Do a reality check. Is this reasonable?

Collisions and Conservation of Momentum