Math, asked by deepika8632, 1 year ago

what is the angle between a tangent to a circle and the radius through the point of contact ? justify your answer

Answers

Answered by debtwenty12pe7hvl
20

Tangent at any point of a circle is perpendicular to the radius through the point of contact.


Given : A circle C (0, r) and a tangent l at point A.


To prove : OA ⊥ l


Construction : Take a point B, other than A, on the tangent l. Join OB. Suppose OB meets the circle in C.


Proof: We know that, among all line segment joining the point O to a point on l, the perpendicular is shortest to l.


OA = OC  (Radius of the same circle)


Now, OB = OC + BC.


∴ OB > OC


⇒ OB > OA


⇒ OA < OB


B is an arbitrary point on the tangent l. Thus, OA is shorter than any other line segment joining O to any point on l.


Here, OA ⊥ l

Attachments:
Answered by roshanzs202
6

Answer:

90°....IS ur answer..

Similar questions