Frictionless Bead Sliding Down A Parabola

AI Thread Summary
The problem involves a bead sliding down the parabola defined by y=(1/2)(x-1)² under the influence of gravity, starting from the point (0,1/2). The objective is to express the bead's position relative to the origin as a function of time, r = [x(t),y(t)]. The discussion includes the relationship between the angle of descent and the tangential velocity and acceleration, with the equation a = -g sin A being central to the analysis. Participants are exploring the conservation of energy and other relevant quantities to solve the problem. The conversation focuses on deriving the necessary equations to describe the bead's motion accurately.
devon cook
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Homework Statement


It seems simple, doesn't it? A bead starts from (0,1/2) and simply slides down the parabola y=(1/2)(x-1)2 under gravity. The problem is to get its position rel. to origin in terms of time, ie.
r = [x(t),y(t)]. Anyone into this?


Homework Equations


y' = x-1 = tan A where A is angle tangential veloc. (v) (and tang. accel.(a)) makes with x axis.
a = -g sin A .


The Attempt at a Solution


For starters, can I say that sin A = -(x-1)/sqr(1+(x-1)^2) ?
 
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