Let the distance between the parallel sides be h cm. ΔABE is an equilateral triangle. ∠A = ∠B = ∠E = 60° Also, ∠EDC = ∠A=60° and ∠ECD = ∠B=60° (Corresponding pair of angles) Therefore,ΔEDC is an equilateral triangle AE = BE DE = CE ∴ AE- DE = BE - CE ⇒AD = BC ...(1) Therefore, trapezium ABCD is an isosceles trapezium. ⇒BD = AC (Diagonals of isosceles trapezium are equal) Now ΔAPD ≅ ΔBQC (RHS congruence rule) ∴ AP = BQ = b(say) Let CD = PQ = a Area of trapezium =