Two line segments AB and CD are taken. Initially, the points A & C and B & D are coincident. The line segment CD is rotated about point D such that CD coincides with AB again, when it covers a distance of $x$ . If the distance covered by C is $y$ , the angle subtended by CD with respect to starting point is $θ$ , then find the relation among $x$ , $y$ and $θ$ . Assume that $θ$ is in degrees.

x = (y × θ)/360

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x = (y × θ)/180

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y = (x × θ)/360

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y = (x × θ)/260

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Solution

The correct option is C
y = (x × θ)/360

We can see that if CD traverses the circumference of the circle, when it covers a distance $x$ and the angular displacement will be $360^{\circ}$

(One full revolution is $360^{\circ}$ ) For an angular displacement of $θ$ ¸ the distance covered by CD is $y$ .

Hence, $x$ is proportional to $360^{\circ}$ and $y$ to $θ$ degrees. Thus $\frac{x}{360}$ = $\frac{y}{θ}$ ¸

So, $y$ = $\frac{(x \times θ)}{360}$

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