Question

To a circle of radius 4cm draw two tangents which are inclined to each other at an angle of 60 degrees

Answer 1

Answer & Step-by-step explanation:

Step1: Draw a circle with O as centre and radius = 4cm.

Step2:Take a point A on circumference of the circle and join OA.Then OA = 4cm (radius).

Step3:Construct angle AOB=120° such that B is on circumference of the circle (radius).

Step4:Draw OA perpendicular to RS and OB perpendicular to XY.

Step5:let XY and RS intersect at P.Jjoin AP and BP.

Hence AP and BP are the tangents inclined at 60°.

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Answer 2

Given,

Radius of the circle = 4cm

number of tangents = 2

Inclination angle of the tangents = 60 degrees

To make,

the 2 tangents inclined to each at 60 degree

Solution,

Step1: Draw a circle with O as centre and radius = 4cm.

Step2: Take a point A on the circumference of the circle and join OA.Then OA = 4cm (radius).

Step3: Construct angle AOB=120° such that B is on the circumference of the circle (radius).

Step4: Draw OA perpendicular to RS and OB perpendicular to XY.

Step5: let XY and RS intersect at P.Jjoin AP and BP.

Hence AP and BP are the tangents inclined at 60°