In the diagram, TR is a diameter of the circle - NSC Mathematics - Question 10 - 2023 - Paper 2

In the cyclic quadrilateral PRKT, the angles R1 and R2 are opposite angles. Therefore, due to the property of cyclic quadrilaterals:

R_i = P_{Tk} \\ \hat{S} = P_1 + P_2\ 2. The angle ( \hat{S} ) is equal to ( \hat{P}_2 ) since opposite angles of a cyclic quadrilateral sum up to 180 degrees.

To prove that ( \Delta SPK \parallel \Delta PRK ), we note:

Since ( \hat{S} = \hat{P}_2 ) and the two triangles share the angle K, we can use the corresponding angles' criterion for parallel lines. 2. Thus, ( SPK \parallel PRK ).

Given that SR = RK, let's denote it as RK. By the Pythagorean theorem in the triangles formed:

Consider triangle SRK, we have: $ST^2 = SK^2 + RK^2 \\ ST^2 = SR^2 + RK^2 \\ ST^2 = 2RK^2 + 2RK^2 = 6RK^2$ 2. Thus, we conclude: $ST = \sqrt{6}RK$.