Two concentric circles are of radii 13 cm and 5 cm. Find the length of the chord of the outer circle which touches the inner circle.

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Solution

Let O be the center of the concentric circles and let AB be a chord of the outer circle, touching the inner circle at P. Join OA and OP.

Now, the radius through the point of contact is perpendicular to the tangent.

OP $⊥$ AB.

Since, the perpendicular from the center to a chord, bisects the chord, AP = PB. Now, in right $△$ OPA, we have OA = 13 cm and OP = 5 cm.

${O P}^{2}$ + ${A P}^{2}$ = ${O A}^{2}$ $\Rightarrow$ ${A P}^{2}$ = ${O A}^{2}$ – ${O P}^{2}$ = ( $13^{2}$ – $5^{2}$ ) = (169 – 25) = 144.

$\Rightarrow$ AP = $\sqrt{144}$ = 12 cm.

AB = 2AP = (2 $\times$ 12) cm = 24 cm.

Hence, the length of chord AB = 24 cm.

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