## Levers and UTS

Hi everyone,

Im designing a new device for openeing bottle caps. But Im stuck,

basically I have a second class lever (pivot at one end, effort at the other and weight in the middle). The weight is 72.21N the overall length from the effort to the fulcrum is 64mm and the length from the weight to the fulcrum is 15mm.

I need to find out how I can convert the effort that needs to be exerted into units suitable for choosing materials (ie. ultimate tensile strength). How do I convert the (effort) force from Newtons to UTS or yeild strength. I have tried and tried to get my head around this one but i just cant figure it out.

Do I need to find the beding moment within the lever? or can i convert the effort force? This has never been covered in my course, but I need to find out how I can get a value that relates to a UTS so I can choose appropriate materials.

I can imagine that this is really pretty simple, but I cant get my brain into gear. If anyone can help it would be greatly appreciated.

Thanks guys, have fun

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 Admin Given the reactions (forces) on the lever, one must determine the stress distribution in the lever, looking at both shear and normal stresses. Normally, one would pick yield strength, and perhaps some margin, as the limiting stress (von Mises). The stress is related to the force applied to the cross-sectional area, and bending moments are involved. This is a basically a loaded beam problem.
 Recognitions: Science Advisor I would do a quick and dirty look at it by taking the load point as the fixed end of a cantilever beam and the force applied at the free end. That will give you the max bending moment and the resultant max bending stress. With only 72 N as your force, you will have plenty of saftey factor if you go with aluminum or steel with a decent cross sectional area. It shouldn't have to be very big. I would assume that dynamic forces will not be an issue here, i.e the speeds are low and the impact forces are negligible...

## Levers and UTS

Thanks Astronuc,

Ive got the equations for calculating the sheer stress etc in a cantilever beam or a simply supported beam, but this being a lever is confusing me.

Can I convert each side of the lever into one cantilever beam to work out the maths that way, or is this totally the wrong idea.

Thanks Tom

 Thanks Garvin, your post pretty much answered my last question (should refresh my browser more often). Like with the last question, should I combine the forces etc on both sides of the lever to create on simple cantilever beam? Thanks for your help, Tom
 OK, I think ive got it. I simply convert the lever into a cantilever beam and then calculate the sheer and bendiong forces on that beam, the only load being on the end. Have I got the right idea, or am I way off target here? Thanks a lot guys. Tom
 Recognitions: Science Advisor That's what I would do as a first pass. Then I would model it and put it into our highly sophisticated FEA analysis package and create 3D rendition and animations showing the flexures and stresses. No. Not really.
 Get the section modulus (S) of the lever then solve for the bending stress, fb=M/S, this is the stress to compare to the yield stress of the material (for practical purposes). Most likely, yielding of a metal bottle opening lever from bending would be the failure mode and not shear. You would want the lever to return to its original undeformed shape after every use, so look at yield strength with a safety factor and not plastic (ultimate) strength. Max moment is (effort*distance to resisting force).
 Thanks haynewp, ive tried to figure out the section modulus. The equation for it is (moment of inertia)/(distance to neutral axis). The 'bar' in question of rectangular uniform cross-section. I have found hundreds of solutions for moments of inertia, but none that I can make sense of. Is there a simple equation for moment of inertia for a rectangular section?
 Thanks haynewp, ive tried to figure out the section modulus. The equation for it is (moment of inertia)/(distance to neutral axis). The 'bar' in question of rectangular uniform cross-section. I have found hundreds of solutions for moments of inertia, but none that I can make sense of. Is there a simple equation for moment of inertia for a rectangular section?
 Ok sussed it, almost. Ive calculated the moment of imertia as 142.92mm^2. The cross section is 5mm wide, 7mm thick, I used the equation frm here http://darkwing.uoregon.edu/~struct/...ample28-2.html to find the moment across the x axis. Im assuming the neutral axis runs through the centre of the bar intersecting the centroid perpendicular to the x and y axis. This gives the distance from the neutral axis as 3.5mm, when dividing the moment of inertia by this i get a section modulus of 4.08333E-8m^3. Putting this into the equation given by haynewp (fb=M/S) I am stuck, I just want to make sure that I am correct in thinking that 'M' is the max moment of the lever. Thankyou guys
 THE LEVER Effort= 85N Length to fulcrum from effort = 26mm Resitant force = 310N length to fulcrum from resistance = 7mm Converted to a beam I get: Length = 0.02m Force = 433.706N Giving a moment of 8.674Nm Dividing this by the section modulus I get 212424490Nm^2 (i think thats the correct units) This looks ridiculously too big, any advice?
 The required applied force is about 83.46N. The max moment is this force times the distance to the resisting force.
 Sorry to keep bothering you guys, but Ive calculated the max moment. To be 2.752 (by doing - 83.405N * 0.033m). Ive calculated the section modulus to be 0.00007m^3 (thats - 7E-5m^3). Dividing the moment by the section modulus I get 39314.29, This seems far to big to be the bending force. am I missing something really obvious here?
 Ive tried it keeping the units as millimetres, which gives fb = 67.4104 which appears a lot better (although I doubt it is), but I still dont know what the units are for this, am I right in assuming its Nmm? Its been a few years since I have had to any of this, and my brain is totally fried on it. Thanks for all the help so far
 Sorry haynewp, its my silly fault, for not explaining things better. I was working with a second class lever on one part of the opener, but now im looking at another part which is a first class lever. I thought I had mentioned it before, but I havnt, so I am terribly sorry for making this very confusing (havnt had a lot sleep lately - 8 days till final handin). The lever that I am looking at is: 26mm to the fulcrum from the effort 7mm from the fulcrum to the load load is 83.4N Sorry for the confusion
 I understood your opener to be a total of 26mm long. I don't understand how you are adding the 26 and 7 to get 33. What you should have is this: http://en.wikipedia.org/wiki/Image:C...ualization.png Where the distance from the force to the first support (or resistance in your case) is 26-7=19mm. So the max moment is 83.4*19. Am I misunderstanding the set up? Bending stress is in units of force/area.