Theorem of Internal Division of Chords | Intersecting Chords Theorem Explained

Theorem of internal division of chords: Suppose two chords of a circle intersect each other in the interior of the circle, then the product of the lengths of the two segments of one chord is equal to the product of the lengths of the two segments of the other chord. In this video, we explain the theorem of internal division of chords, also known as the intersecting chords theorem. The theorem states that when two chords of a circle intersect each other inside the circle, the product of the lengths of the two segments of one chord is equal to the product of the lengths of the two segments of the other chord. 🔹 Topics Covered: ✔ Understanding chords and their intersection ✔ Statement and explanation of the theorem ✔ Proof with step-by-step explanation ✔ Example problem solving 📌 Don't forget to Like, Share & Subscribe for more geometry lessons! internal division of chords theorem, intersecting chords theorem, chord segment theorem, circle theorem, chords in a circle, geometry theorem, class 10 maths, geometry proofs, intersecting chords formula, circle properties #Geometry #Maths #CircleTheorem #IntersectingChords #MathTutorial #GeometryProof #LearnMath #ChordsInCircle