Selina Ex 18B Q 11 | ICSE Class 10 Maths | Circle Geometry |

ICSE SELINA EX 18B Q 11 CONTACT FOR ANY PROBLEM 8092107110

11. Two circles intersect each ther at points A and B. A straight line PAQ cuts the circles at P and Q. If the tangents at P and Q intersect

at point T; show that the points P, B, Q and T are concyclic.

Title: Prove That Points P, B, Q, and T Are Concyclic | ICSE Selina Ex 18B Q11 | Circle Geometry Explained

Description:

In this video, we dive into an interesting geometry problem from ICSE Selina Ex 18B Q11. The problem involves two intersecting circles at points A and B. A straight line PAQ cuts the circles at points P and Q, and the tangents drawn at P and Q intersect at a point T. We are asked to prove that the points P, B, Q, and T are concyclic, which means they all lie on the same circle.

We'll explore step-by-step how to approach and solve this geometry problem using the properties of circles and tangents. This is a crucial concept for students studying for the ICSE exams and is a great way to strengthen your understanding of circle geometry.

If you have any questions or need help with this topic, feel free to reach out!

Contact for any doubts: 8092107110

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