Question 13 Marks
C is the centre of the circle whose radius is 10 cm. Find the distance of the chord from the centre if the length of the chord is 12 cm.
Answer
View full question & answer→Let seg AB be the chord of the circle with centre C.
Draw seg CD ⊥ chord AB.
$\therefore I(A D)=\frac{1}{2} I(A B) \ldots$. Perpendicular drawn from the centre of a circle to its chord bisects the chord]
$
\begin{aligned}
& =\frac{1}{2} \times 12 \ldots[\because I(A B)=12 cm ] \\
& \therefore I(A D)=6 cm \ldots( i ) \\
& \therefore \ln \triangle A C D, m \angle A D C=90^{\circ} \\
& \therefore[I(A C)]^2=[I(A D)]^2+[I(C D)]^2 \ldots[\text { Pythagoras theorem] } \\
& \therefore(10)^2=(6)^2+[I(C D)]^2 \ldots[\text { From (i) and } I(A C)=10 cm ] \\
& \therefore(10)^2-(6)^2=[I(C D)]^2 \\
& \therefore 100-36=[I(C D)]^2 \\
& \therefore 64=[I(C D)]^2 \\
& \text { i. e. }[I(C D)]^2=64 \\
& \therefore I(C D)=\sqrt{64} \ldots[\text { Taking square root of both sides }] \\
& \therefore I(C D)=8 cm
\end{aligned}
$
$\therefore$ The distance of the chord from the centre of the circle is $8 cm$.
Draw seg CD ⊥ chord AB.
$\therefore I(A D)=\frac{1}{2} I(A B) \ldots$. Perpendicular drawn from the centre of a circle to its chord bisects the chord]
$
\begin{aligned}
& =\frac{1}{2} \times 12 \ldots[\because I(A B)=12 cm ] \\
& \therefore I(A D)=6 cm \ldots( i ) \\
& \therefore \ln \triangle A C D, m \angle A D C=90^{\circ} \\
& \therefore[I(A C)]^2=[I(A D)]^2+[I(C D)]^2 \ldots[\text { Pythagoras theorem] } \\
& \therefore(10)^2=(6)^2+[I(C D)]^2 \ldots[\text { From (i) and } I(A C)=10 cm ] \\
& \therefore(10)^2-(6)^2=[I(C D)]^2 \\
& \therefore 100-36=[I(C D)]^2 \\
& \therefore 64=[I(C D)]^2 \\
& \text { i. e. }[I(C D)]^2=64 \\
& \therefore I(C D)=\sqrt{64} \ldots[\text { Taking square root of both sides }] \\
& \therefore I(C D)=8 cm
\end{aligned}
$
$\therefore$ The distance of the chord from the centre of the circle is $8 cm$.
