Find the circumference of the inner circle. (2 marks The entrance to St John's Lodge lies on a bearing of \( 024^{\circ} \) from the centre of the Inner Circle. The junction of the Inner Circle and Chester Road lies on a bearing of \( 075^{\circ} \) from the centre of the inner circle. Find the distance between them (along the circumference of the Inner Circle). (2 marks Determine how far north and how far east it is from the centre of the Inner Circle to the junction of Chester Road. (5 marks The Regent's Park lce Cream Kiosk lies on the circumference of the Inner Circle, the western side of the circle. It is \( 84 \mathrm{~m} \) further south than the centre of the circle.
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We need to find the circumference of the inner circle. Let's denote the radius of the inner circle as \(r\). The circumference of a circle is given by the formula \(C = 2\pi r\). So, we need to find the value of \(r\). Show more…
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