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Torque and Equilibrium

Torque and Equilibrium. Physics 12. Torque. In the past we have looked at forces that have acted through the centre of mass of an object These leads to forces that will act against each other but not result in a net torque on an object

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Torque and Equilibrium

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  1. Torque and Equilibrium Physics 12

  2. Torque • In the past we have looked at forces that have acted through the centre of mass of an object • These leads to forces that will act against each other but not result in a net torque on an object • This leads to an object that is either at equilibrium or accelerating but everything is linear FN Ff Fa Fg

  3. Torque • We will now decouple forces so that forces may act at a distance from the centre of mass • This can result in a net torque which will result in the object twisting due to the applied forces FN Fa Ff Fg

  4. Torque • Torque is calculated as the cross product of the applied force and the distance away from a pivot point that the force is applied • The pivot point is often the centre of mass but may be chosen to be another point based upon the question • If a system is at equilibrium, the net torque and net force must be equal to zero

  5. Torque m1 m1 m1 m2 m2 m2 r1 r1 r2 r2 r2 Fg2 Fg2 Fg1 Fg1

  6. Torque • As torque is a vector, it must have direction • When a cross product is used, the direction must be perpendicular to both vectors used in the product • The direction will be determined using the right hand thumb rule • Thumb out of the board is positive, thumb into the board is negative

  7. Torque m1 m2 r1 r2 Fg2 Fg1 At equilibrium, the net torque would be equal to zero This will result in positive torque This will result in negative torque

  8. Torque Example 1 • Copy this down!! • Two masses are placed on a seesaw of length 2.0m with the fulcrum in the middle. The first mass is 10.kg and the second mass is 15.kg. If the first mass is placed so that its mass acts through the end of the seesaw, where must the second mass be placed so that the net torque is zero?

  9. Torque Example m2 m1 r1 r2 Fg1 Fg2

  10. Torque Example 2 • 2 people are carrying a uniform wooden board that is 3.00 m long and weighs 160 N. if one person applies an upward force of 60. N at one end of the board, where must the other person be standing in order for the board to be in static equilibrium and with what force must they apply?

  11. Step 1 – Sum of the Forces F2=? F1=60.N Fg=160N

  12. Step 2 - Torque F2=100N F1=60.N r2=? r1=1.50m Fg=160N

  13. Example 3 … Ladder Question • A painter (mass = 75kg) stands 2.0m up a 3.0m ladder with a mass of 15kg. The ladder makes an angle of 60.° with the ground and there is no friction between the ladder and the wall. • What force does the wall apply to the ladder? • What is the minimum coefficient of friction that must exist between the ladder and the ground?

  14. Ladder Problem FNw Fw Fgp FN Fgl Ff

  15. Ladder Problem

  16. Ladder Problem

  17. Practice Problems • Page 495 • 29-30 • Page 501 • 31-34

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