The gravitational force between two objects: •The “r-hat” is a unit vector pointing directly away from the source of gravity Gravitational Potential Energy •The potential energy is the (negative of the) integral of the force EP Fdr GMmdr r2 GMm EP r M F r m GMmrˆ F r2 F GMm r rM r rM 3 Simple Orbits Circular orbits: •If the velocity is exactly right, you get a circular orbit •Gravitational force must match GM centripetal force 2 v R GMm mv 2 F 2 R R Other orbits: •If the velocity is smaller, or a bit bigger, you get an elliptical orbit •If the velocity is a lot greater, the object leaves •Depends only on speed, not direction •Kinetic energy must be sufficient to overcome potential energy •Minimum speed is escape velocity M R m GMm EK mv R 2GM 2 vesc R 1 2 2 Gravitational Field •In PHY 114, you learned a lot about electric forces and fields •We introduced the Electric Field as the force per unit charge keQrˆ E r 2 r keQqrˆ EF q F 2 r •Compare this with gravity: •By analogy, introduce the gravitational field GMmrˆ F r2 gF m GMrˆ GMr g r 2 3 r r F gm ma •If there are many sources of gravity, their effects must be added up g r i Gmi r ri r ri 3 ag Gauss’s Law for Gravity: •In 114, you learned the total electric flux out of a region was related to the total charge in that region: E E nˆ dA E nˆ dA 4 ke q g g nˆ dA 4 GM What’s the gravitational flux from the region in this case? E b z r a r m4 m1 m2 E b q b a m3 g 4 G m1 m2 m3 s n̂ •There is an exactly analogous formula for the gravitational field: n̂ Applying Gauss’s Law: Spherical Symmetry •Gauss’s Law can be used to find the gravitational field when there is a lot of symmetry r r •Example: Spherical symmetry •Mass density depends only on distance from center •Draw a spherical Gaussian surface •Logically, the gravitational field will be radial everywhere •Gauss’s Law tells you the flux is proportional to the contained mass g R 4 GM R g R g R 4 R2 GM R rˆ •The mass contained inside the sphere is just the sum of the g R 2 R masses on each spherical shell inside it •The volume of a thin spherical shell is the area of a sphere of radius r times the thickness dr. R R R R ˆ G r 2 2 g R 4 r r dr M R dM r dV 4 r r dr 2 R 0 0 0 0 Sample Problem: A gravitational source takes the form of a uniform sphere of density0 and radius a (a) What is the gravitational field everywhere? (b) What is the corresponding orbital velocity for circular orbits? 0 r 0 if r a, if r a. Grˆ g R 2 4 r 2 r dr R 0 R Grˆ g R 2 R min a , R 0 4 Grˆ 0 4 3 min a , R ˆ 3 G 0rR r 4 r 0 dr g 4 0 3 2 R2 3 ˆ G r a R 0 3 2 rˆv 2 2 v Rg ag R 4 if R a, 3 G 0 R v 3 1/ 2 4 G a R if R a. 0 3 if R a, if R a. Applying Gauss’s Law: A Slab •Consider a slab source, spread out uniformly in two r z dimensions •Density depends only on z. •Assume the top half has same mass distribution as the bottom half •No gravity at z = 0. •Draw Gaussian surface •Box from z = 0 to z = Z, of area A. •Use Gauss’s Law: 4 GM Z zˆ gZ A g Z 4 GM Z g Z g Z A Z Z Z 0 0 0 z M Z dM z dV A z dz •For uniform density, we find: g Z 4 Gzˆ z dz g Z 4 G0 Zzˆ 0 Gravitational Potential •For electric fields, it is often more useful to work with the electrostatic potential ke qi VE VE VE VE r E VE r xˆ yˆ zˆ VE r E ds x y z i r ri •Exactly the same thing can be done for the gravitational field r g ds g r xˆ yˆ zˆ x y z r i •The potential energy for one particle, then, is EPi mi ri Gmi r ri Sample Problem (1) What is the gravitational potential everywhere for a uniform sphere of density 0 and radius a? What is escape velocity from the center of the sphere? •Because the gravitational field is only in the if r a, 43 G 0rˆr r-direction, the potential should depend only on r. g r 4 3 2 ˆ G r a r if r a. 0 3 •Therefore the relationship between and g is: d g r rˆ r g r dr dr Must do inside and outside separately! r 4 G rdr in 0 3 in 23 G 0 r 2 Cin •Don’t forget the constant of integration! out r 43 G 0 a 3r 2 dr out 43 G 0 a 3 r 1 Cout Cout 0 How can we find the constants of integration? 0 out 0 Cout •Potential at infinity is zero in a out a •Potential at the boundary must be continuous 2 3 1 2 2 4 G a C G a a C 2 G a 0 in 0 3 3 in 0 Sample Problem (2) What is the gravitational potential everywhere for a uniform sphere of density 0 and radius a? What is escape velocity from the center of the sphere? 2 2 2 G r 3 a 0 r 3 3 1 4 G a r 0 3 if r a, if r a. •To find escape velocity, match potential and kinetic energy at the origin EP mi 0 2 G0a 2m EK 12 mv 2 2 vesc 4 G 0 a 2 3GM a Global Conservation Laws: •Consider a galaxy/structure which is not interacting with other galaxies/structures: •Often a good approximation •The following must be conserved: •Total energy, Total momentum, Total angular momentum P mi v i Total momentum describes overall motion i •We can eliminate it by working in the “center of mass frame” Energy is more complicated E EP EK Eother •Potential and kinetic •But there can be other contributions E Gmi m j 2 1 E m v K i i 2 •If gravity is the only force involved, P r r i j i i j then global Ep + EK energy is conserved •Stars, for example, rarely collide •If there are other effects, like collisions, energy can be transferred and lost •Gas clouds, in contrast, commonly collide L mi ri vi •Finally, the total angular momentum of the galaxy is conserved i Potential from a distribution Gmi •Suppose mass is distributed in a continuous manner r •How do we calculate potential and potential energy? i r ri •Divide into many small regions of size dV G i ri dVi r •These will each have mass dV r ri i •Convert to an integral: r r 3 r d r r r •Potential energy for the whole system is: EP i j Gmi m j ri r j 1 G ri dVi r j dV j 1 Gmi m j 2 i j 2 i j ri r j ri r j •Can be rewritten in terms of potential: EP 1 2 3 d r r r G r r 1 3 3 EP d r d r 2 r r Sample Problem EP What is the total gravitational binding energy for a uniform sphere of mass M and radius a? 2 2 2 3 G 0 r 3a r 3 1 4 G a r 0 3 EP G d r0 0 r 3a 1 2 3 2 3 2 1 2 if r a, if r a. 2 G 4 1 3 a 2 0 0 r 2 dr r 2 3a 2 a 2 2 5 G r a r 16 G 0a 15 0 4 3 2 2 0 1 5 5 2 3 M 43 a 3 0 0 16 Ga 3M EP 15 4 a 3 2 5 3M 4 a 3 2 3GM 2 EP 5a 3 d r r r Virial Theorem (1) •For circular orbits, there is a simple relationship between the potential energy and the kinetic energy: •For non-circular orbits, this is not true, because energy keeps changing between the two components. •However, if you average over time, this will still be true GMm r GM 2 1 1 EK 2 mv 2 m r 2 EK EP 0 EP •If you have many objects, some of them will be at their 2 EK EP 0 maximum, and others at their minimum •Could this expression be true if you add everything up? •Consider a complicated combination of many masses acting gravitationally •Galaxy or Globular cluster, for example, consists of 104 to 1014 stars •First, find the total kinetic and potential energy •And the force on any one object Gmi m j ri r j Gm m i j Fi 3 EK 12 mvi2 EP j i ri r j i j ri r j i EK 12 mvi2 Virial Theorem (2) i EP i j Gmi m j ri r j •We will assume that the system isn’t changing much; i.e., though the individual stars are moving, there will be as many moving one way as another •Galaxy has no net motion Gmi m j ri r j Fi •Any quantity that “adds up” effects of all components 3 j i ri r j will be constant i miri vi constant •Consider the following quantity: •Time derivative should vanish: d dr dv 0 mi ri vi mi i v i mi ri i mi v i2 ri Fi dt dt i dt i i r r r r r r ri ri r j i i j j j i 2 EK Gmi m j 2 EK Gmi m j 3 3 3 r r i j i i j ri r j r r i j j i 2 EK Gmi m j i j r r i 2 j ri r j 3 2 EK EP 2 EK EP 0