Mathematics
At one end A of a diameter AB of a circle of radius 5 cm, tangent XAY is drawn to the circle. The length of the chord CD parallel to XY and at a distance 8 cm from A is
4 cm
5 cm
6 cm
8 cm
Answer
The figure is shown below:
Since tangent and radius at point of contact of a circle are perpendicular to each other. Hence,
XAY ⊥ AO
Given XAY || to CD hence,
CD ⊥ AB.
In right angled triangle OEC,
OE = AE - AO = 8 - 5 = 3 cm.
⇒ OC2 = OE2 + CE2 (By pythagoras theorem)
⇒ 52 = 32 + CE2
⇒ CE2 = 25 - 9
⇒ CE2 = 16
⇒ CE = 4 cm.
Similarly in right angled triangle OED,
⇒ OD2 = OE2 + ED2 (By pythagoras theorem)
⇒ 52 = 32 + ED2
⇒ ED2 = 25 - 9
⇒ ED2 = 16
⇒ ED = 4 cm.
⇒ CD = CE + ED = 4 + 4 = 8 cm.
Hence, Option 4 is the correct option.
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