Question

The figure given below shows a circle with centre O in which diameter AB bisects the chord CD at point E . If CD =16 cm and EB = 4 cm, then find the radius of the circle.

• A. 6 cm
• B. 8 cm
• C. 10 cm
• D. 11 cm

Answer 1

The correct option is C

10 cm

Let $OE=x$ cm.
Given, $EB=4$ cm.
Then, the radius of the circle will be $OB=OE+EB=(x+4)$ cm
$⟹OD=(x+4)$ cm
Also, it is given that diameter AB bisects the chord CD at point E. Hence, $CE=ED=\frac{16}{2}=8cm.$
We know that if a line drawn from the centre of a circle bisects the chord, then the line is perpendicular to that chord.
i.e., $OE\perp ED$
Then, by using Pythagoras' theorem in $\Delta OED$, we get
$(4+x{)}^2=x^2+8^2$
$⟹16+x^2+8x=x^2+64$
$⟹x=6$
$\therefore \text{Radius of circle}=x+4=6+4=10cm$