Question

radius of circle is 10 cm there are two chords of length 16 cm each what will be the distance of the chord from the centre of the circle with diagram

Answer 1

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Answer 2

Given :

Radius of Circle = 10cm

Length of Chord = 16cm

To Find :

Find the distance of these chords from the centre of the circle ?

Solution :

OR = OP = 10cm [Radius]

PQ = RS = 16cm [Chord]

Perpendicular drawn from the centre of the circle to the chord bisects the chord,

➣ PU = ½ × PQ

➣ PU = ½ × 16

➣ PU = 8cm

Applying Pythagoras Theorem in ∆OUP :

➣ (OP)² = (OU)² + (PU)²

➣ (10)² = (OU)² + (8)²

➣ 100 = (OU)² + 64

➣ 100 - 64 = (OU)²

➣ 36 = (OU)²

➣ √36 = OU

➣ 6cm = OU

Therefore,

Congruent chords of the circle are equidistant from the circle are :

➣ OU = OT = 6cm

Hence,

The distance of the chord from the centre is 6cm.