In this video, Deepan, a faculty member at Cheenta, walks through an exciting problem from the Junior Section of the Australian Math Competition2013. The problem involves angle chasing in various geometric shapes, such as equilateral triangles, squares, and an isosceles trapezium.
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Here are the key points covered:
Congruent Squares and Equilateral Triangle: Three congruent squares are given, and the problem reveals that the triangle formed between them is an equilateral triangle. This leads to the conclusion that all the angles in this triangle are $60^{\circ}$.
Quadrilateral Analysis: A special quadrilateral, $A D N M$, is identified. By observing the angles, it is shown that two of the angles measure $150^{\circ}$ each. Further exploration reveals that this quadrilateral is an isosceles trapezium.
Angle Chasing in the Isosceles Trapezium: Using the properties of parallel lines and co-interior angles, the sum of certain angles is shown to be $180^{\circ}$, helping to determine one angle as $30^{\circ}$. This angle chasing continues with a focus on a smaller isosceles triangle within the figure.
Isosceles Triangle: The sides of the triangle are derived from the equal-sized squares, and the properties of the isosceles triangle help calculate unknown angles. Through careful calculation, angles of $30^{\circ}$ and $120^{\circ}$ are found, leading to a final solution.
Final Angle: After finding various angles using symmetry, congruence, and triangle properties, the $\angle A M T$ is determined to be $60^{\circ}$.
This video beautifully ties together concepts of equilateral triangles, squares, isosceles trapeziums, and angle chasing, offering an engaging exploration of geometry.