In the figure shown below, a quarter ring of radius $r$ is placed in the first quadrant of a cartesian co-ordinate system, with centre at origin. Find the co-ordinates of $C O M$ of the quarter ring.

(\frac{2 R}{π}, \frac{2 R}{π})

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(\frac{2 R}{π}, 0)

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(0, \frac{2 R}{π})

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(0, 0)

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Solution

The correct option is A $(\frac{2 R}{π}, \frac{2 R}{π})$
Let us consider a small mass $^{'} d m^{'}$ of elemental length $^{'} d s^{'}$ which is at $^{'} x^{'} m$ from $y -$ axis and $^{'} y^{'} m$ from $x -$ axis.

Mass per unit length $λ = \frac{d m}{d s}$
$\Rightarrow d m = λ d s$
$\Rightarrow d m = λ r d θ$ $(∵ d s = r d θ)$

To find $C O M$ :
$x_{c m} = \frac{\int x d m}{\int d m} = \frac{π / 2 \int 0 (r cos θ) (λ r d θ)}{π / 2 \int 0 λ r d θ}$
$= \frac{r π / 2 \int 0 cos θ d θ}{π / 2 \int 0 d θ} = \frac{2 R}{π}$
and $y_{c m} = \frac{\int y d m}{\int d m} = \frac{π / 2 \int 0 (r sin θ) (λ r d θ)}{π / 2 \int 0 λ r d θ}$
$= \frac{r π / 2 \int 0 sin θ d θ}{π / 2 \int 0 d θ} = \frac{2 R}{π}$
$\Rightarrow (x_{c m}, y_{c m}) = (\frac{2 R}{π}, \frac{2 R}{π})$

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In the figure shown below, a quarter ring of radius r is placed in the first quadrant of a cartesian co-ordinate system, with centre at origin. Find the co-ordinates of COM of the quarter ring.

In the figure shown below, a quarter ring of radius $r$ is placed in the first quadrant of a cartesian co-ordinate system, with centre at origin. Find the co-ordinates of $C O M$ of the quarter ring.