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COM of Other Bodies

Surface mass ...

Question

Surface mass density of a semicircular disk varies with position as $σ = σ_{0} \frac{r}{R}$ where $σ_{0}$ is constant, $R$ is the radius of the disc and $r$ is measured from the centre of the disc. Find the COM of the disc.

(0, \frac{R}{2})

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(0, \frac{2 R}{π})

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(0, \frac{3 R}{2 π})

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(0, \frac{4 R}{3 π})

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Solution

The correct option is C $(0, \frac{3 R}{2 π})$
Cut a elementary ring of radius $^{'} r^{'}$ and thickness $^{'} d r^{'}$ .

Mass of elementary ring
$d m = σ (π r d r)$
$= σ_{0} \frac{r}{R} π r d r$
$= \frac{σ_{0} π}{R} r^{2} d r$
Centre of mass of elementary ring $= (0, \frac{2 r}{π})$
So, x coordinate of COM of elementary ring, $¯ x = 0$
& $¯ y = \frac{\int y d m}{\int d m} = \frac{\int_{0}^{R} \frac{2 r}{π} \frac{σ_{0} π}{R} r^{2} d r}{\int_{0}^{R} \frac{σ_{0} π}{R} r^{2} d r}$
$= \frac{\frac{2 σ_{0}}{R} \int_{0}^{R} r^{3} d r}{\frac{σ_{0} π}{R} \int_{0}^{R} r^{2} d r} = \frac{2}{π} \frac{\frac{R^{4}}{4}}{\frac{R^{3}}{3}} = \frac{3 R}{2 π}$
So, coordinates of COM of semicircular disc
$(x_{c o m}, y_{c o m}) = (0, \frac{3 R}{2 π})$

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