In the given ligure AB is a diameter of the semicircle APQB with center 0. POQ = 48° cuts BP at X calculate AXP
(1) 50
(2) 66
(3) 55
(4)40
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Answer:
answer is 66 ....
180 - 48 = 132
132 ÷2 = 66
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Given : AB is a diameter of the semicircle APQB with center O
POQ = 48° AQ cuts BP at X
To Find : ∠AXP
Solution :
AB is Diameter
Hence ∠APB = 90° ( Angle subtended by diameter at circle = 90°)
∠PAQ = (1/2)∠POQ ( Angle subtended by Chord/arc at remaining circle = (1/2) angle subtended at center of circle )
∠POQ = 48°
=> ∠PAQ = (1/2)48°
=> ∠PAQ = 24°
in Δ APX
∠APX = ∠APB = 90° ( As X lies on PB)
∠PAX = ∠PAQ = 24° ( As X lies on AQ)
Sum of Angles of triangle = 180°
=> ∠APX + ∠PAX + ∠AXP = 180°
=> 90° + 24° + ∠AXP = 180°
=> ∠AXP = 66°
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