PHYS 1443 – Section 001 Lecture #16 Monday, April 11, 2011 Dr. Jaehoon Yu • • • • • Collisions – Elastic and Inelastic Collisions Collisions in two dimension Center of Mass Center of mass of a rigid body Motion of a Group of Objects Today’s homework is homework #9, due 10pm, Tuesday, Apr. 19!! Announcements • Second non-comprehensive term exam results – Class average: 64/97 • Equivalent to 66/100 • Previous exams: 70/100 and 72/100 – Top score: 93/97 – Will take the better of the two non-comprehensive exam after normalizing to the class average between the two exams • Quiz next Wednesday, Apr. 20 – Beginning of the class – Covers from CH9.5 to what we finish Monday, Apr. 18 • Colloquium Wednesday at 4pm in SH101 Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 2 Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 3 Reminder: Extra-Credit Special Project • Derive the formula for the final velocity of two objects which underwent an elastic collision as a function of known quantities m1, m2, v01 and v02 in page 7 of this lecture note in a far greater detail than the note. – 20 points extra credit • Show mathematically what happens to the final velocities if m1=m2 and describe in words the resulting motion. – 5 point extra credit • Due: Start of the class this Wednesday, Apr. 13 Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 4 Extra Credit: Two Dimensional Collisions •Proton #1 with a speed 3.50x105 m/s collides elastically with proton #2 initially at rest. After the collision, proton #1 moves at an angle of 37o to the horizontal axis and proton #2 deflects at an angle f to the same axis. Find the final speeds of the two protons and the scattering angle of proton #2, Φ. This must be done in much more detail than the book or on page 13 of this lecture note. •10 points •Due beginning of the class Monday, Apr. 18. Collisions Generalized collisions must cover not only the physical contact but also the collisions without physical contact such as that of electromagnetic ones on a microscopic scale. Consider a case of a collision between a proton on a helium ion. F F12 t F21 Using Newton’s 3rd The collisions of these ions never involve physical contact because the electromagnetic repulsive force between these two become great as they get closer causing a collision. Assuming no external forces, the force exerted on particle 1 by particle 2, F21, changes the momentum of particle 1 by r r dp1 F21dt Likewise for particle 2 by particle 1 r r dp2 F12dt law we obtain ur ur r r d p 2 F12dt F21dt d p1 So the momentum change of the system in a collision is 0, and the momentum is conserved Monday, April 11, 2011 ur ur ur d p d p1 d p 2 0 ur ur ur p system p1 p 2 constant PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 6 Elastic and Inelastic Collisions Momentum is conserved in any collisions as long as external forces are negligible. Collisions are classified as elastic or inelastic based on whether the kinetic energy is conserved, meaning whether it is the same before and after the collision. Elastic Collision A collision in which the total kinetic energy and momentum are the same before and after the collision. Inelastic Collision A collision in which the momentum is the same before and after the collision but not the total kinetic energy . Two types of inelastic collisions:Perfectly inelastic and inelastic Perfectly Inelastic: Two objects stick together after the collision, moving together with the same velocity. Inelastic: Colliding objects do not stick together after the collision but some kinetic energy is lost. Note: Momentum is constant in all collisions but kinetic energy is only in elastic collisions. Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 7 Elastic and Perfectly Inelastic Collisions r r r In perfectly inelastic collisions, the objects stick m1 v1i m2 v 2i (m1 m2 )v f together after the collision, moving together. r r r m1 v1i m2 v 2i Momentum is conserved in this collision, so the vf final velocity of the stuck system is (m1 m2 ) r r r r How about elastic collisions? m1 v1i m2 v 2i m1 v1 f m2 v 2 f 1 1 1 1 In elastic collisions, both the m1v12i m2 v22i m1v12f m2 v22 f 2 2 2 2 momentum and the kinetic energy m1 v12i v12f m2 v22i v22 f are conserved. Therefore, the final speeds in an elastic collision m1 v1i v1 f v1i v1 f m2 v2i v2 f v2i v2 f can be obtained in terms of initial From momentum m1 v1i v1 f m2 v2i v2 f speeds as conservation above m m2 2m2 v1i v2i v1 f 1 m1 m2 m1 m2 What Monday, April 11, 2011 2m1 m m2 v1i 1 v2i v2 f m1 m2 m1 m2 happens when the two masses are the same? PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 8 Example for Collisions A car of mass 1800kg stopped at a traffic light is rear-ended by a 900kg car, and the two become entangled. If the lighter car was moving at 20.0m/s before the collision what is the velocity of the entangled cars after the collision? The momenta before and after the collision are Before collision pi m1v1i m2v2i 0 m2v2i m2 20.0m/s m1 p f m1v1 f m2v2 f m1 m2 v f After collision Since momentum of the system must be conserved m2 vf m m v pi p f m1 vf 1 m2 v2i m 1 What can we learn from these equations on the direction and magnitude of the velocity before and after the collision? Monday, April 11, 2011 m2 2 f m2v2i 900 20.0 6.67m / s 900 1800 The cars are moving in the same direction as the lighter car’s original direction to conserve momentum. The magnitude is inversely proportional to its own mass. PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 9 Ex.9 – 11: A Ballistic Pendulum The mass of a block of wood is 2.50-kg and the mass of the bullet is 0.0100-kg. The block swings to a maximum height of 0.650 m above the initial position. Find the initial speed of the bullet. What kind of collision? Perfectly inelastic collision No net external force momentum conserved m1v f 1 m2v f 2 m1v01 m2v02 m1 m2 v f m1v01 Solve for V01 v01 m1 m2 v f m1 What do we not know? The final speed!! How can we get it? Using the mechanical energy conservation! Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 10 Ex. A Ballistic Pendulum, cnt’d Now using the mechanical energy conservation mv 2 mgh 2 1 m m gh m m v 1 2 f 2 1 2 f 1 2 gh f 1 2 Solve for Vf v 2f v f 2gh f 2 9.80 m s2 0.650 m Using the solution obtained previously, we obtain v01 m m v m m 1 2 f m1 1 2 m1 2gh f 0.0100 kg 2.50 kg 2 2 9.80m s 0.650 m 0.0100 kg 896m s Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 11 Two dimensional Collisions In two dimension, one needs to use components of momentum and apply momentum conservation to solve physical problems. m1 r r r r m1 v1i m2 v 2i m1 v1 f m2 v 2 f v1i m2 x-comp. m1v1ix m2v2ix m1v1 fx m2v2 fx y-comp. m1v1iy m2v2iy m1v1 fy m2v2 fy Consider a system of two particle collisions and scatters in two dimension as shown in the picture. (This is the case at fixed target accelerator experiments.) The momentum conservation tells us: r r r m1 v1i m2 v 2i m1 v1i m1v1ix m1v1 fx m2v2 fx m1v1 f cos m2v2 f cosf m1v1iy 0 m1v1 fy m2v2 fy m1v1 f sin m2v2 f sin f And for the elastic collisions, the kinetic energy is conserved: Monday, April 11, 2011 1 1 1 m1v 12i m1v12f m2 v22 f 2 2 2 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu What do you think we can learn from these relationships? 12 Ex. 9 – 13: Two Dimensional Collisions Proton #1 with a speed 3.50x105 m/s collides elastically with proton #2 initially at rest. After the collision, proton #1 moves at an angle of 37o to the horizontal axis and proton #2 deflects at an angle f to the same axis. Find the final speeds of the two protons and the scattering angle of proton #2, Φ. m1 v1i m2 Since both the particles are protons m1=m2=mp. Using momentum conservation, one obtains x-comp. m p v1i mp v1 f cos mp v2 f cosf y-comp. mp v1 f sin mp v2 f sin f 0 Canceling mp and putting in all known quantities, one obtains v1 f cos37 v2 f cosf 3.50105 (1) v1 f sin 37 v2 f sin f (2) From kinetic energy conservation: 3.50 10 v 5 2 2 1f v1 f 2.80105 m / s v 2 2f Monday, April 11, 2011 Solving Eqs. 1-3 5 (3) equations, one gets v2 f 2.1110 m / s PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu f 53.0 Do this at home 13 Center of Mass We’ve been solving physical problems treating objects as sizeless points with masses, but in realistic situations objects have shapes with masses distributed throughout the body. Center of mass of a system is the average position of the system’s mass and represents the motion of the system as if all the mass is on the point. What does above statement tell you concerning the forces being exerted on the system? m2 m1 x1 x2 xCM Monday, April 11, 2011 The total external force exerted on the system of total mass M causes the center ofumass to move at r r an acceleration given by a F / Mas if all the mass of the system is concentrated on the center of mass. Consider a massless rod with two balls attached at either end. The position of the center of mass of this system is the mass averaged position of the system m1x1 m2 x2 CM is closer to the xCM heavier object m1 m2 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 14 Motion of a Diver and the Center of Mass Diver performs a simple dive. The motion of the center of mass follows a parabola since it is a projectile motion. Diver performs a complicated dive. The motion of the center of mass still follows the same parabola since it still is a projectile motion. Monday, April 11, 2011 The motion of the center of mass of the diver is always the same. PHYS 1443-001, Spring 2011 15 Dr. Jaehoon Yu Example 9 – 14 Thee people of roughly equivalent mass M on a lightweight (air-filled) banana boat sit along the x axis at positions x1=1.0m, x2=5.0m, and x3=6.0m. Find the position of CM. Using the formula for CM m x m i xCM i i i i 12.0M M 1.0 M 5.0 M 6.0 4.0(m) 3M M M M Monday, April 11, 2011 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu 16 Ex9 – 15: Center of Mass in 2-D A system consists of three particles as shown in the figure. Find the position of the center of mass of this system. Using the formula for CM for each position vector component y=2 m (0,2) 1 m x m i (0.75,1) xCM rCM i r One obtains r CM x CM m x m x m x m x xCM m m m m i i 1 1 i 2 2 1 i i i (2,0) m3 x=2 (1,0) m2 x=1 2 3 3 3 m2 2m3 m1 m2 m3 i yCM mi yi i m i m1 y1 m2 y2 m3 y3 2m1 m1 m2 m3 m1 m2 m3 Monday, April 11, 2011 i i PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu m y m i yCM i i i i r r r r m2 2m3 i 2m1 j i yCM j m1 m2 m3 If m1 2kg; m2 m3 1kg r r r r r 3i 4 j r CM 0.75i j 4 17 Center of Mass of a Rigid Object The formula for CM can be extended to a system of many particles or a Rigid Object xCM m1x1 m2 x2 mn xn m1 m2 mn m x m m y m i i i i yCM Δmi ri rCM zCM i i i r r r r r CM xCM i yCM j zCM k r r r m x i m y j m z k ii i i ii i i r mi r i m i i i i M A rigid body – an object with shape and size with mass spread throughout the body, ordinary objects – can be considered as a group of particles with mass mi densely spread throughout the given shape of the object Monday, April 11, 2011 i i i r r CM i i i i The position vector of the center of mass of a many particle system is m z m i xCM m x i M xCM lim m 0 PHYS 1443-001, Spring 2011 Dr. Jaehoon Yu i i i m x i i M i r 1 r r CM rdm M 1 M xdm 18 Ex 9 – 16: CM of a thin rod Show that the center of mass of a rod of mass M and length L lies in midway between its ends, assuming the rod has a uniform mass per unit length. The formula for CM of a continuous object is L xCM x dx Therefore xCM Δm=λdx 1 M xL x 0 1 M xL x 0 xdm Since the density of the rod (λ) is constant; M / L The mass of a small segment dm dx xL 1 1 2 1 1 L 1 1 2 xdx x L ML M 2 x 0 M 2 M 2 2 Find the CM when the density of the rod non-uniform but varies linearly as a function of x, λ x M xL x 0 dx xL x 0 xL xdx 1 1 x 2 L2 2 x 0 2 Monday, April 11, 2011 xCM 1 M xL x 0 1 xdx M xL x 0 1 1 3 L 32011 M PHYS 1443-001, Spring xCM 1 M Dr. Jaehoon Yu 1 x dx M 2 xL 1 3 3 x x 0 2 2L ML 3 3 19