@flawr I was going to point that out too, but I think for a different reason: the curve reflects the distance between (1) the circle defined by the lever and (2) the fixed point in the bar to its left (where all the threads coincide). The sine would be the vertical (or horizontal) distance to the horizontal (vertical) axis
...assuming I correctly understood what the device is doing :-)
@LuisMendo I think we are talking about the same thing: It doesn't matter if we're talking about the distance from the lever to the big circle or from the lever to the horizontal bar. With an "infinitely big circle" the threads attached to the lever would ways have the exact same direction (no side-to-side offset), so the displacement of the string would really just measure the "amplitude" of the lever in exactly one direction
let's assume the lever moves in an unit circle, and the big circle has radius r. then the length of the string from the lever to the circle (lets pick (x,y)=(1,0) as the position on the circle) is sqrt(r^2 - 2*r*cos(phi)+1) -r, and this converges to cos(phi) for r to infinity
@flawr *sigh*. Let me show you how we do this. So you have r * sqrt(1 - cos(phi)/r + 1/r^2) -r \approx r * [1 - cos(phi)/2r + 1/2r^2] - r \approx r - cos(phi)/2 -r = -cos(phi)/2
oh, you had a 2 in there
so we come back to my point that you omitted the unit length of the circle which screws up the dimensions
sqrt(r^2 - 2 r R cos(phi) + R^2) - r, doesn't that look much better? And that converges to -R cos(phi) as it should.