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Question

The figure below shows a circle centered at O and of radius 5 cm. AB and AC are two chords such that AB = AC = 6 cm. AP is perpendicular to BC. Find the length of the chord BC.



A

5.6 cm

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B

9.6 cm

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C

10.6 cm

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D

11.6 cm

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Solution

The correct option is B

9.6 cm




In ΔAPC,
AP is perpendicular to BC

AC2=PC2+AP2PC2=AC2AP2
=(6)2AP2 =36AP2(1)

In ΔPOC,

PC2=OC2OP2
=25(5AP)2
[ PO = AO - AP = 5 - AP]

PC2=25(25+AP210AP)

PC2=10APAP2 ------- (2)

Substitute (1) in (2)

36AP2=10APAP2

AP=3.6 cm

PC2=36AP2 =3612.96 =4.8 cm

Since a perpendicular from the centre of a circle to a chord bisects the chord,
BC=2×PC=2×4.8=9.6 cm.


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