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Equilibrium position. x displacement Equilibrium position x F displacement.

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Presentation on theme: "Equilibrium position. x displacement Equilibrium position x F displacement."— Presentation transcript:

1 Equilibrium position

2 x displacement

3 Equilibrium position x F displacement

4 Equilibrium position x F Resultant force or Restoring force displacement

5 Equilibrium position x F Resultant force or Restoring force displacement If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

6 If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

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10 Effect on the time period of : 1. increasing the mass 2. using stiffer springs ?

11 Mass on a spring Equilibrium position Downward displacement x x m

12 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F m

13 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL m

14 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM m

15 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x m

16 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x m If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

17 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x m If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

18 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x ma = - k x m If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

19 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x ma = - k x a = - k x m m If the resultant force is directed towards and proportional to the displacement from equilibrium, then so is the acceleration, and the object executes SHM.

20 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x a = - k x m m

21 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x Compare this with the SHM equation; a = - k x m m

22 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x a = - k x m m

23 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x -k = - (2πf) 2 m a = - k x m m

24 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x -k = - (2πf) 2 m k = 4 π 2 f 2 m a = - k x m m

25 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x - ve sign shows that for a downward displacement there is an upward restoring force! ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x -k = - (2πf) 2 m k = 4 π 2 f 2 m f = 1 k 2π m a = - k x m m

26 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x -k = - (2πf) 2 m k = 4 π 2 f 2 m f = 1 k 2π m a = - k x m m T = 2π m k or :

27 Mass on a spring Equilibrium position Downward displacement x x Restoring force F F Laws used: Hooke’s law F = k ΔL Newton’s 2 nd F = ma SHM a = -(2πf) 2 x When the mass is displaced a small distance x the resultant upwards restoring force F: F = - k x ma = - k x Compare this with the SHM equation; a = - k x m a = - (2πf) 2 x -k = - (2πf) 2 m k = 4 π 2 f 2 m f = 1 k 2π m a = - k x m m T = 2π m k or :

28 Mass on a spring T = 2π m k

29 Mass on a spring T = 2π m k Put in the form: y = m x + c

30 Mass on a spring T = 2π m k Put in the form: y = m x + c T 2 = 4 π 2 m + 0 k

31 Mass on a spring T = 2π m k Put in the form: y = m x + c T 2 = 4 π 2 m + 0 k T 2 /s 2 m / kg

32 Mass on a spring T = 2π m k Put in the form: y = m x + c T 2 = 4 π 2 m + 0 k T 2 /s 2 m / kg Max spring tension = mg + kx

33 Mass on a spring T = 2π m k Put in the form: y = m x + c T 2 = 4 π 2 m + 0 k T 2 /s 2 m / kg Max spring tension = mg + kx x = A ( amplitude )

34 Mass on a spring T = 2π m k Put in the form: y = m x + c T 2 = 4 π 2 m + 0 k T 2 /s 2 m / kg Max spring tension = mg + kx Min spring tension = mg - kx x = A ( amplitude )

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