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Moments LO: be able to calculate moments 07/03/2016 Write down everything you can remember about moments from Yr 9.
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Which tool would you use? 07/03/2016
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Levers A lever can be used to raise the edge of heavy objects 07/03/2016 Label the diagram with the following: effort, pivot, load
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Turning forces A turning force is called a moment. What 2 things can increase the turning force? –Increasing the size of the force –Increasing the length the force is applied over 07/03/2016
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Turning Moments The size of the moment is given by: Moment (in Nm) = force (in N) x PERPENDICULAR distance from pivot (in m) Calculate the following turning moments: 100 Newtons 5 metres 200 Newtons 2 metres
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Moment Questions: 07/03/2016
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Kerboodle clip 07/03/2016 Engineers
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07/03/2016 Turning Moments 100 Newtons200 Newtons 2 metres Total ANTI-CLOCKWISE turning moment = 200x2 = 400Nm Total CLOCKWISE turning moment = 100x2 = 200Nm The anti-clockwise moment is bigger so the seesaw will turn anti-clockwise
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07/03/2016 An example question 5 metres 2000 Newtons 800 Newtons ? metres
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07/03/2016 Calculate the missing quantity The following are all balanced: 2N 4m2m ??N 5N3N 2m??m 4m ??m 2m 5N 15N
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07/03/2016 Balanced or unbalanced?
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Challenge Use the newton meter rulers and 10g masses to challenge each other to balance the rulers. Who can come up with the most difficult challenge? 07/03/2016
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A recap question Calculate the mass of man in the example given below: 30kg 1.2m0.4m
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07/03/2016 1m A hard question… Consider a man walking along a plank of wood on a cliff. 3m Man’s weight = 800N Plank’s weight = 200N How far can he walk over the cliff before the plank tips over? Aaarrgghh Hint: you need to think about where the centre of mass acts for the plank.
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Answer: Consider just the plank first but you must remember that it’s force will be applied over it’s centre of mass on each side. 200N ÷ 3 = 66.6N Clockwise moment = 66.6N x 0.5m (this is the centre on the right hand side and where the centre of mass can be considered to be concentrated) = 33.3Nm Anticlockwise moment = 133.3 N x 1m (where the centre of mass acts) = 133.3Nm Therefore the difference in moments is 100Nm. The equation can be re-arranged to find the distance the man can move: Distance = moment = 100 = 0.125m force 800 07/03/2016
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Plenary Typical exam style moment question 07/03/2016
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