Construct the circumcentre of the triangle XYZ shown below, using only a compass and straight edge - Leaving Cert Mathematics - Question 6 - 2022

Given that AB is a diameter and ∠LADBI = 90° (Inscribed angle theorem), we conclude:

1. Since ∠LADBI is 90°, we know that triangle ADB is isosceles:
   • Hence, ∠ABD = ∠ADB.
2. The interior angles of triangle ABD sum to 180°:

egin{align*} ∠A + ∠B + ∠D & = 180°

ightarrow 40° + ∠ABD + ∠ADB = 180°

ightarrow 40° + 2∠ABD = 180°

ightarrow 2∠ABD = 140°

ightarrow ∠ABD = 70°

ightarrow ∠ADC = 90° - ∠LAC = 90° - 40° = 50°
ext{Thus, } ∠ADC = 50° \end{align*}

Assume that O is inside the triangle PQR.

1. The angle at O must be such that it creates subtended angles, thus: ∠PQR must be less than 180°.
2. Given that ∠R is greater than 90°, we state that ∠PQR + ∠R > ∠OQR, which leads to a contradiction as the angles in triangle PQR cannot sum to more than 180° considering that ∠R itself exceeds 90°.
3. Therefore, our initial assumption that O is inside the triangle PQR must be incorrect.