Difference between revisions of "Gems of Geometry"
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[https://youtu.be/9M1hBbAhOdo/ Session # 13] : The Steiner-Lehmus Theorem : Any triangle that has two equal angle bisectors (each measured from a vertex to the opposite side) is isosceles. | [https://youtu.be/9M1hBbAhOdo/ Session # 13] : The Steiner-Lehmus Theorem : Any triangle that has two equal angle bisectors (each measured from a vertex to the opposite side) is isosceles. | ||
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+ | [https://youtu.be/6FE0Bkhmsg8/ Session # 14] : The orthocenter of an acute-angled triangle is the in-center of its orthic triangle. |
Revision as of 18:54, 7 January 2020
Concept Lecture
Session # 01 : The Laws of Sine
Session # 02 : Ceva's Theorem
Worksheet # 01 : Worksheet on Sine Law and Ceva's Law
Session # 03 : Stewart's Theorem
Session # 04 : Medians of a triangle divide it into six parts of equal areas.
Session # 05 : Medians of a triangle trisect each other
Session # 06 : Each angle bisector of a triangle divides the opposite side into segments proportional in length to the adjacent sides. Proof using Sine Rule
Worksheet # 02 : Worksheet on Stewart's Theorem and properties of medians of a triangle
Session # 07 : The area of a triangle is equal to the product of the semi-perimeter and the in-radius
Session # 08 : The locus of a point equidistant from two intersecting lines is the angle bisector of the angle between the intersecting lines.
Session # 09 : Theorem: The external bisectors of any two angles of a triangle are concurrent with the internal bisector of the third angle
Session # 10 : Some properties of ex-circles and in-circle of a triangle
Session # 11 : If two chords of a circle subtend different acute angles at points on the circle, the smaller angle belongs to the shorter chord.
Session # 12 : In a triangle, the angle bisector of the smaller angle is greater than the angle bisector of the greater angle
Session # 13 : The Steiner-Lehmus Theorem : Any triangle that has two equal angle bisectors (each measured from a vertex to the opposite side) is isosceles.
Session # 14 : The orthocenter of an acute-angled triangle is the in-center of its orthic triangle.