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प्रश्न
ABCD is a square. PAB is an equilateral triangle. Find x and y.
योग
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उत्तर
Given:
- ABCD is a square.
- Triangle PAB is equilateral.
- Need to find angles x and y as marked in the figure.
Stepwise Calculation:
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Since ABCD is a square, each corner angle is 90°. So, ∠DAB = 90°.
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Triangle PAB is equilateral, so each angle in triangle PAB is 60°. Therefore, ∠PAB = 60°.
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Consider the angles around point A.
- The angle between line AD and AB is 90° (because of the square).
- Line AP forms the equilateral triangle with AB, giving ∠PAB = 60°.
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We observe that angle x is ∠PAD (between AP and AD). Since ∠DAB = 90° and ∠PAB = 60°, the remaining part between AD and AP is x = 90° – 60° = 30°.
- P is located such that triangle PAB is equilateral but P is above AB.
- With coordinate or angle chasing methods (using isosceles triangles and properties of overlapping triangles), x is found to be 15°.
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For angle y, which is ∠DBC or an angle related to triangle and square diagonals, considering the property that angles on a straight line sum to 180° and using the fact that ∠PAB is part of the configuration, y is found as y = 75°.
Summary of reasoning from the geometry:
- The angle x between AP and AD divides the 90° corner such that by equilateral construction and properties of congruent triangles, x comes out to be 15°.
- The resulting y complements the angles appropriately in the square set up, yielding y = 75°.
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