Sriman Dutta Posted August 13, 2016 Posted August 13, 2016 Hello, I'm new here. Can anyone check these equations if they are correct. Rolling velocity Without friction - v=gt sin x With friction - v=gt(sin x- ucos x) x is angle of inclination and u is frictional coefficient and t is time taken and g is acceleration due to gravity.
studiot Posted August 13, 2016 Posted August 13, 2016 Is this homework? You really need to explain the problem more completely otherwise people are left guessing what you mean. I am guessing that you are talking about a ball rolling down a slope from a standing start so the equation of constant acceleration applies with the downslope acceleration = gsin(x) so we have using vt = u + ft = 0 + gsin(x) * t Which is your first equation. But will the ball roll or slide down the slope?
Sriman Dutta Posted August 15, 2016 Author Posted August 15, 2016 Hello, studiot, the ball is rolling down the slope. They aren't any homework, I did try to find rolling equations myself and put them here for check.
studiot Posted August 15, 2016 Posted August 15, 2016 You gave two situations I started with the first and simplest. What causes the ball to roll if there is no friction? In the real world, air friction would be enough to turn it, but in our idealisation there are no such forces acting. Note that a vehicle or railway engine wheels will spin under the vehicle when driven from the centre axle without moving the vehicle if there is not enough friction.
imatfaal Posted August 20, 2016 Posted August 20, 2016 Is this homework? You really need to explain the problem more completely otherwise people are left guessing what you mean. I am guessing that you are talking about a ball rolling down a slope from a standing start so the equation of constant acceleration applies with the downslope acceleration = gsin(x) so we have using vt = u + ft = 0 + gsin(x) * t Which is your first equation. But will the ball roll or slide down the slope? " vt = u + ft = 0 + gsin(x) * t " Surely that would be the equation of a block/ball sliding down a frictionless slope. A ball rolling down a slope has a complete other factor to be considered - which your other points show you are keeping in mind - and which I will not spoil the fun by mentioning. To give a hint: create your model based on conservation of energy, consider at start of experiment a still ball at height h1 and at the end a rolling ball at h2. Hint 2 - it is not the same as the frictionless slope equation given above
studiot Posted August 20, 2016 Posted August 20, 2016 Surely that would be the equation of a block/ball sliding down a frictionless slope. Yes that is what I said. I also asked what causes the ball to roll if there is no friction?
Sriman Dutta Posted August 22, 2016 Author Posted August 22, 2016 Well, friends, I think I should show the derivation of these equations here. Check this: https://en.wikipedia.org/wiki/Rolling Check whether the last section of the article (created by me) is right. Thanks in advance....and Sorry for replying after so long.
imatfaal Posted August 27, 2016 Posted August 27, 2016 You're editing wikipedia without the first idea of the topic? Think of a frictionless slope and a natural frictional slope. In one case the ball will slide down - in the second it will roll down. They are NOT the same situation. I suggested an energy audit - did you give it a go? Did you answer Studiot's question of why the ball rolls?
Sriman Dutta Posted August 30, 2016 Author Posted August 30, 2016 Certainly, the body will slide if there is no friction. But, we think that some imaginary force F acts on the body thereby creating a couple, causing rotation, we can surely accept it as rolling without friction. I agree that situation is only imaginable and not practical. For the real world, the second equation should be apt.
imatfaal Posted August 31, 2016 Posted August 31, 2016 Certainly, the body will slide if there is no friction. But, we think that some imaginary force F acts on the body thereby creating a couple, causing rotation, we can surely accept it as rolling without friction. I agree that situation is only imaginable and not practical. For the real world, the second equation should be apt. Nah. A body that goes from stationary to rotating (whether or not there is additional linear motion as well) has changed measurably - imaginary forces do not cut it; you need to have force applied over a distance and thus work to do an energy audit. If it is sliding with no friction, or sliding with some friction then you have one simple case - but rolling brings a completely new element to the model which must be accounted for properly; you have not done this
studiot Posted August 31, 2016 Posted August 31, 2016 The following 4 slides from the Cambridge University Physics teaching site may help you think about Imatfaal's comments as well as mine. 1
imatfaal Posted September 1, 2016 Posted September 1, 2016 Great Find. I always like explanations that use two different ways to get to the same answer. Out of curiosity - I would use the second method; am I right in presuming you would have used the first?
Sriman Dutta Posted September 1, 2016 Author Posted September 1, 2016 I seeeeeeeeeeeeeeeeeeeeeee.................... So, are my equations wrong ?
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