From the point Q the length of the tangent to a circle is 24 cm and the distance of Q from the centre is 25 cm. Then find radius of the circle?
Answers
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Step-by-step explanation:
draw a circle with centre O.
take point of contact of tangent P.
Now
in OPQ, angle OPQ =90........(tangent perpendicular to radius)
By Pythagoras theorem,
OQsquare =OPsquare +PQsquare
(25)square=..............
...................................
OP =7cm
therefore, radius of circle is 7cm.
Answer:
The radius of circle is 7cm.
Step-by-step explanation:
Solution:-
Consider O as center P and Q are. the point in the tangent line.
P is the point of contact.
XY is the tangent line.
PQ = 24cm
OQ = 25cm
From the above data, draw a diagram.
XY is the tangent line
OP ⏊ XY
so, ∠OPQ = 90°
Now, applying Pythagoras theorem
(Hypotenuse)^2 = (Height)^2 + (Base)^2
(OQ)^2 = (OP)^2 + (PQ)^2
→ (25)^2 = (OP)^2 + (24)^2
→ (OP)^2 = (25)^2 - (24)^2
→ (OP)^2 = 625 - 576
→ (OP)^2 = 49
→ OP = √(49)
→ OP = 7cm
Therefore, the radius of circle is 7cm.
