Math, asked by vaibhav6422, 8 months ago


6. PQ is the tangent to the circle of length 32cm. O is the centre of the circle. OP
intersect circle at point R. If PR=16cm, find the radius of the circle. ​

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Answered by amitkumar12021987
1

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Maths

Circles

Tangent to a Circle

In the figure, point P is t...

MATHS

In the figure, point P is the center of the circle and line AB is the tangent to the circle at T. The radius of the circle is 6cm. Find PB, if ∠TPB=60

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ANSWER

Given-

AB is a tangent to a circle with centre as P and radius PT=6cm.

AB touches the circle at T.

PB intersects the circumference at Q and AB at B such that ∠TPB=60

o

.

To find out- PB

Solution-

PT=PQ=6cm ...(given)

TQ is joined.

Then, ΔPQT is isosceles.

∴∠PTQ=∠PQT

i.e ∠PTQ+∠PQT=2(∠PTQor∠PQT)

So, by the angle sum property of triangles, we have

∠TPQ+2∠PTQ=180

o

⟹60

o

+2∠PTQ=180

o

⟹∠PTQ=60

o

=∠PQT

So, ΔPQT is equilateral.

∴TP=PQ=TQ=6cm. .......(i)

Now, ∠QTB=∠PTB−∠PTQ.

But ∠PTB=90

o

, since the tangent at a point of a circle is perpendicular to its radius which meets the tangent at the point of contact.

∴∠QTB=90

o

−60

o

=30

o

Now, in ΔTQB we have,

∠TQB=180

o

−60

o

=120

o

...linear pair

∴ By the angle sum property of triangles, we have

∠QTB+∠TQB+∠QBT=180

o

⟹∠QBT+120

o

+30

o

=180

o

∴∠QBT=30

o

.

So, ΔTQB is isosceles with QT=QB=6cm. ....(by i).

∴PB=PQ+QB=(6+6)cm=12cm

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