In quadrilateral ABCD, B = D = 90, C = 120◦ . If AB = 4, AD = 3 find BC and CD.
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Given : In Quadrilateral ABCD, ∠B = ∠D = 90°, ∠C = 120° .
If AB = 4, AD = 3
To find : BC and CD.
Solution:
In Quadrilateral ABCD, ∠B = ∠D = 90°,
∠B + ∠D = 180°
∠C = 120°.
=> ∠A = 60°
Extend DC to cut Extended AB at E
in ΔADE , ∠D = 90°
AD = 3 ∠A = 60°
=> AE = 6 AE = AB + BE = 4 + BE => BE = 2
DE = 3√3
Now in Δ CBE ∠B = 90°
BE = 2 ∠E = 30°
BC = 2/√3 = 2√3/3 = 1.155
CE = 4/√3 = 4√3/3
CD = DE - CE
=> CD = 3√3 - 4√3/3 = 5√3/3 = 2.887
BC = 2√3/3 = 1.155
CD = 5√3/3 = 2.887
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