AP Unit I F 4,5

1. AP Unit I F 4,5 Newton’s Law of Gravity and Orbits

2. 4. Newton’s Law of Gravity • Students should know Newton’s Law of Universal Gravitation, so they can • a) Determine the force that one spherically symmetrical mass exerts on another. • b) Determine the strength of the gravitational filed at a specified point outside a spherically symmetrical mass.

3. 5. Orbits of planets and satellites • Students should understand the motion of an object in orbit under the influence of gravitational force, so they can: • a) For a circular orbit: • (1) Recognize that the motion does not depend on the object’s mass; describe qualitatively how the velocity, period of revolution, and centripetal acceleration depend on the radius of the orbit; and derive expressions for the velocity and period of revolution in such an orbit.

4. Newton’s Law of Universal Gravitation Ref. 7.7 • F = G (m 1 m2)/ r2 • G = 6.673 x 10 –11 N m2/kg2 m1 m2 r

5. Strength of Gravitational Field (g) • g = F/m = (GMpm /R2)/m = G Mp/R2 Calculate gravitational field for Earth. Mp = 5.979 x 1024 kg Rp = 6.3713 x 106 m R m Mp

6. Circular Orbits • Fg = Fc • G m1 m2/r2 = m2 v2/r • G m1/r = v2 • v = (G m1/r) v r m2 m1

7. Period (T) of the satellite orbit Since v = 2πr/ T T = 2πr/v = 2πr/(G m1/r) = 2πrr/(G m1) T =2π (r3 /Gm1)

8. Kepler’s Third Law for Circular orbits Ref. 7.9 • For planet mass Mp orbiting sun mass Ms at a distance R with speed v • Fgravitational = F centripetal • G Ms Mp/ r2 = Mp v2/r • Since v = 2πr/T • G Ms Mp/ r2 = Mp (2πr/T)2/r • T2 = (4π2/G Ms) r3 = Ks r3 • Therefore the ratio of the square of the periods of any two planets is proportional to ratio of their mean distances from the sun. • (T 1/ T2 )2 = ( r1/r2)3