Question

If arc AXB and arc AYB are the corresponding arcs and m (arc AXB) = 700 , then find m (arc AYB)​

Answer 1

Here it is given that arc AXB and arc AYB are corresponding arcs

∴ AXBY is a cyclic quadrilateral

We know that in a cyclic quadrilateral , the sum of the opposite angles is 180°

∴ m(arc AXB) + m(arc AYB) = 180°

⇒ 150° + m(arc AYB) = 180°

⇒ m(arc AYB) = 180° - 150°

⇒ m(arc AYB) = 30°

FINAL ANSWER

m(arc AYB) = 30°

Answer 2

Answer:

30° is answer please make me brainslit