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Transcript
11/6/2014 Newton’s Law of Universal Gravitation and Circular Motion Newton’s Law of Universal Gravitation • Newton noted the planets from Kepler’s work followed a nearly circular orbit. • He theorized that there must be a force to keep the planets from going off in a straight line. • Gravitational force is a field force that always exists between two masses, regardless of the separation medium or distance. • Remember all forces add like vectors. 1 11/6/2014 Newton's Law of Universal Gravitation Equation FG G m1 m2 r12 2 Where FG is the Gravitatio nal Force G is the Gravitatio nal Constant G 6.67 x 10 -11 Nm2 kg 2 m1 one of the two masses m2 the other of the two masses r 12 the radial distance between the center of the two masses Earth moon sun mass distance chart Earth Moon Sun Mass 5.97 x1024 kg Radius (mean) 6.38 x 106 m Mass 7.35 x1022 kg Radius (mean) 1.74 x 106 m Mass 1.99 x1030 kg Radius (mean) 6.96 x 108 m Earth-Sun distance (mean) 1.496 x 1011 m Earth-Moon distance (mean) 3.84 x 108 m 2 11/6/2014 Newton's Law of Universal Gravitation Equation You should be able to solve Newton’s Universal Law of Gravitation for the following variables: r= m1 = m2 = Newton's Law of Universal Gravitation Equation You should be able to discuss what happens to the gravitational force when changing the following variables in Newton’s Universal Law of Gravitation: • Increasing one or both masses • Decreasing one or both masses • Increasing the radial distance • Decreasing the radial distance 3 11/6/2014 Newton's Law of Universal Gravitation Equation for Multiple Masses All forces add like vectors. How do vectors add? Consider three spherical masses in a row as m m m shown to the right. r r All forces are linear so r to find the gravitational force on m1 you add the forces. FBD on m F F Lets look at the FBD on m1 1 2 3 12 23 13 1 12 13 Newton's Law of Universal Gravitation Equation for Multiple Masses Using the diagram below, now draw the FBD on m2. FBD on m Using the FBD, calculate the F F gravitational force if 2 21 m1 = 2kg, m2 = 4kg, m3 = 6kg and r12 = 4m , r23 = 2m , r13 = 6m 23 m1 m2 r12 m3 r23 r13 4 11/6/2014 Newton's Law of Universal Gravitation Equation for Multiple Masses All forces add like vectors. So draw the FBD on m1 considering three spherical masses as shown below. FBD on m1 m1 r12 m2 r13 m3 Find the gravitational force on m1. Newton's Law of Universal Gravitation Equation for Multiple Masses m1 = 2kg, m2 = 4kg, m3 = 6kg r12 = 4m, r13 = 6m Find the gravitational force on m1. m1 r12 FBD on m1 m2 r13 m3 5
