Mathematics
PAB is a secant and PT is tangent to a circle. If
(i) PT = 8 cm and PA = 5 cm, find the length of AB.
(ii) PA = 4.5 cm and AB = 13.5 cm, find the length of PT.
Circles
22 Likes
Answer
We know that,
If a chord and a tangent intersect externally, then the product of lengths of the segments of the chord is equal to the square of the length of the tangent from the point of contact to the point of intersection.
∴ PT2 = PA × PB
(i) Putting values in above equation:
⇒ 82 = 5 × PB
⇒ 82 = 5PB
⇒ PB =
⇒ PB = 12.8 cm.
AB = PB - PA = 12.8 - 5 = 7.8 cm.
Hence, the length of AB = 7.8 cm.
(ii) We know,
PB = AB + PA = 13.5 + 4.5 = 18 cm.
PT2 = PA × PB
⇒ PT2 = 4.5 × 18
⇒ PT2 = 81
⇒ PT =
⇒ PT = 9 cm.
Hence, the length of PT = 9 cm.
Answered By
14 Likes
Related Questions
In the figure (i) given below, PT is a tangent to the circle. Find TP if AT = 16 cm and AB = 12 cm.
In the figure (ii) given below, diameter AB and chord CD of a circle meet at P. PT is a tangent to the circle at T. CD = 7.8 cm, PD = 5 cm, PB = 4 cm. Find :
(i) AB
(ii) the length of tangent PT.
In the figure (i) given below, PAB is a secant and PT is tangent to a circle. If PA : AB = 1 : 3 and PT = 6 cm, find the length of PB.
In the adjoining figure, CBA is a secant and CD is tangent to the circle. If AB = 7 cm and BC = 9 cm, then
(i) Prove that △ACD ~ △DCB
(ii) find the length of CD.