250 likes | 262 Views
CHAPTER 6 CIRCULAR MOTION AND GRAVITATION. Goals for Chapter 6. To understand the dynamics of circular motion. To study the unique application of circular motion as it applies to Newton’s Law of Gravitation.
E N D
CHAPTER 6 CIRCULAR MOTION AND GRAVITATION
Goals for Chapter 6 • To understand the dynamics of circular motion. • To study the unique application of circular motion as it applies to Newton’s Law of Gravitation. • To study the motion of objects in orbit as a special application of Newton’s Law of Gravitation.
Uniform circular motion is due to a centripetal acceleration This aceleration is alwayspointing to the center This aceleration is due to a net force
Period = the time for one revolution • Circular motion in horizontal plane: - flat curve - banked curve - rotating object 2) Circular motion in vertical plane
Rounding a flat curve • The centripetal force coming only from tire friction.
Rounding a banked curve • The centripetal force comes from friction and a component of force from the car’s mass
The "Giant Swing" at a county fair consists of a vertical central shaft with a number of horizontal arms attached at its upper end. Each arm supports a seat suspended from a 5 m long cable, the upper end of which is fastened to the arm at a point 3m from the central shaft. Find the time of one revolution of the swing if the cable supporting the seat makes an angle of 300 with the vertical.
Spherically symmetric objects interact gravitationally as though all the mass of each were concentrated at its center
Cavendish Balance • The slight attraction of the masses causes a nearly imperceptible rotation of the string supporting the masses connected to the mirror. • Use of the laser allows a point many meters away to move through measurable distances as the angle allows the initial and final positions to diverge.
Newton’s Law of Gravitation • Always attractive. • Directly proportional to the masses involved. • Inversely proportional to the square of the separation between the masses. • Masses must be large to bring Fg to a size even close to humanly perceptible forces.
A diagram of gravitational force G = 6.674x10-11 N.m2/kg2
Each mass is 2 kgFind the magnitude of the net gravitational force on each mass and its direction
Each mass in the figure below is 3 kg. Find the force (magnitude and direction) on each mass in the figure .
Gravitational force falls off quickly • If either m1 or m2 are small, the force decreases quickly enough for humans to notice.
In January 2005 the Huygens probe landed on Saturn's moon Titan, the only satellite in the solar system having a thick atmosphere. Titan's diameter is 5150 km, and its mass is 1.35×1023 kg, The probe weighed 3120 N on earth. What did it weigh on the surface of Titan?
What happens when velocity rises? • When v is large enough, you achieve escape velocity.
The principle governing the motion of the satellite is Newton’s second law; the force is F, and the acceleration is v2/r, so the equation Fnet = ma becomes GmmE/r 2 = mv 2/r v = GmE/r T= 2πr/v = (2πr3/2)/ Larger orbits correspond to slower speeds and longer periods.
A 320 kg satellite experiences a gravitational force of 800 N. What is the radius of the of the satellite’s orbit? What is its altitude? F = GmEmS/r 2 r 2 = GmEmS/ F r 2 = (6.67 x 10 -11 N.m2/kg2) (5.98 x 10 24 kg) (320 kg ) / 800 N r 2= 1.595 x 1014m2 r = 1.26 x 107m Altitude = 1.26 x 107m – radius of the Earth Altitude = 1.26 x 107m – 0.637 x 107 = 0.623 x 107 m
We want to place a satellite into circular orbit 300km above the earth surface. What speed, period and radial acceleration it must have?