Answer:
see explanation
Explanation:
Net force along x axis is
[tex]\sum F_x = F \sin \theta= \frac{v^2}{R} ----(1)[/tex]
Net force along y axis is
[tex]\sum F_y = F \cos \theta= mg ----(2)[/tex]
The object can along accelerate down the stamp.
Thus F(net) is at the angle down the stamp
[tex]F_{net}=F_c\\\\F_{net}= \sin \theta mg\\\\F_c = \frac{mv^2}{r} \\[/tex]
where r = L in the direction of acceleration
[tex]\sin \theta mg = \frac{mv^2}{L}[/tex]
[tex]v^2 = gL \sin \theta[/tex]
[tex]v = \sqrt{gL \sin \theta}[/tex]
[tex]v = (gL \sin \theta )^{1/2}[/tex]
The relationship between the distance of the object and speed of the object is [tex]v = \sqrt{gL sin(\theta)}[/tex].
The given parameters:
The relationship between the distance of the object, speed of the object can be determined by the net force on the toy is calculated follows;
[tex]Fsin(\theta) = \frac{mv^2}{L} \\\\mgsin(\theta) = \frac{mv^2}{L} \\\\gsin(\theta) = \frac{v^2}{L} \\\\v^2 = gL sin(\theta)\\\\v = \sqrt{gL sin(\theta)}[/tex]
Thus, the relationship between the distance of the object and speed of the object is [tex]v = \sqrt{gL sin(\theta)}[/tex].
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