A thin sheet of metal of uniform thickness is cut into the shape bounded by the line x=a, y=kx^2 and y=-kx^2 . Find coordinates of center of mass.
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see diagram. We use integration to solve
this.
Obviously from the symmetry, the y - coordinate of the center of mass lies on
the x - axis . Hence it is 0.
We take a thin vertical strip at x = x and of width dx. Its area dA
= (y₁- y₂) * dx.
X_com = [tex]\frac{1}{a} \int \limits_0^a {x\ (y_1 -
y_2)} \, dx\\\\=\frac{1}{a} \int \limits_0^a {x\ (k x^2-(-kx^2))} \,
dx\\\\=\frac{2k}{a} \int \limits_0^a {x^3} \,
dx\\\\=\frac{2k}{a}*\frac{a^4}{4}\\\\=\frac{k\ a^3}{2}[/tex]
so answer is ( k a³/2, 0) is the center of mas of the area enclosed
by the two parabolas and the straight line x = a.
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kvnmurty:
clik on thanks.. select best ans.
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