Asked by Jeremy
Young acrobats are standing still on a circular horizontal platform suspended at the center. The origin of the two-dimensional Cartesian coordinate system is assumed to be at the center of the platform. A 30-kg acrobat is located at (4 m, 9 m), and a 36-kg acrobat is located at (−2 m, −2 m). Assuming that the acrobats stand still in their positions, where must a 20-kg acrobat be located so that the center of mass of the system consisting of the three acrobats is at the origin and the platform is balanced?
Answers
Answered by
Elena
x(c.m.) =0,
y(c.m.) =0,
x(c.m.) = m1•x1+m2•x2+m3•x3/(m1+m2+m3) =0,
y(c.m.) = m1•y1+m2•y2+m3•y3/(m1+m2+m3) =0,
30•4-36•2+20•x3 =0,
30•9+36•2+20•y3 = 0 ,
x3 = - 48/20 = - 2.4 m,
y3 = -198/20 = - 9.9 m.
y(c.m.) =0,
x(c.m.) = m1•x1+m2•x2+m3•x3/(m1+m2+m3) =0,
y(c.m.) = m1•y1+m2•y2+m3•y3/(m1+m2+m3) =0,
30•4-36•2+20•x3 =0,
30•9+36•2+20•y3 = 0 ,
x3 = - 48/20 = - 2.4 m,
y3 = -198/20 = - 9.9 m.
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