in the adjoining figure abcd is a square and triangle edc is a equilateral triangle proove that ae =be and triangle dae=15
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Answer:
Step-by-step explanation:
Given : ABCD is a square and EDC is an equilateral triangle. AD = BC, DE = CE
To Prove : i) AE = BE
ii) ∠DAE = 15°
Construction : Join A to E and B to E.
Proof :
i) In ΔADE and ΔBCE,
AD = BC (given)
∠ADE = ∠BCE (90° + 60°)
DE = CE (given)
Therefore, ΔADE is congruent to ΔBCE ( SAS rule)
AE = BE (CPCTC)
ii) ∠DAE + ∠ADE + ∠DEA = 180°
150° + ∠DAE + ∠DEA = 180°
∠DAE + ∠DEA = 180° -150°
2 ∠DAE = 30°
∠DAE = 15°
Hence Proved.
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