PQ is a chord of length 8cm of a circle of radius 5cm. The tangents at P and Q intersect at a point T. Find the length TP?
plz answer it.
Dear Student!
Given, PQ is the chord of the circle and PT and QT are the tangents drawn at the end points of the chord PQ. PQ = 8cm and OP = 5cm.
OT ⊥ PQ,
∴ PR = RQ = 
(Perpendicular from the centre of the circle to a chord bisect the chord)
In right ΔOPR,
OP2 = PR2 + OR2
⇒ OR2 = OP2 – PR2
⇒ OR2 = (5cm)2 – (4cm2) = (25 – 16)cm2
⇒ OR2 = 9cm2
⇒ OR = 3cm
In right ΔPTR,
PT2 = TR2 + PR2 ...(1)
We know that, the tangent to a circle is perpendicular to the radius through the point of contact.
∴ ∠OPT = 90º
In right ΔOPT,
OT2 = PT2 + OP2 ...(2)
From (1) and (2), we get
OT2 = (TR2 + PR2) + OP2
⇒ (TR + OR)2 = (TR2 + PR2) + OP2
⇒ TR2 + OR2 + 2 × TR × OR = TR2 + PR2 + OP2
⇒ 9 + 6 TR = 16 + 25
⇒ 6TR = 25 + 16 – 9 = 32
⇒ TR = 
∴ PT2 = TR2 + PR2 (Using (1))
⇒ PT2 = 
+ (4cm)2
⇒ PT2 = 
⇒ PT 
Thus, the length of tangent PT is 
.
Cheers!