in this figure, BC is a tangent to the circle with centre O. OE bisects AP. Prove that
triangle AEO ~ triangle ABC.

Question

in this figure, BC is a tangent to the circle with centre O OE
bisects AP Prove that
triangle AEO ~ triangle ABC

Sunil Sharma · Accepted Answer

The figure given in the question is below

Let us first take up

We have, OA = OP (Since they are the radii of the same circle) Therefore,

is an isosceles triangle From the property of isosceles triangle, we know that, when a median drawn to the unequal side of the triangle will be perpendicular to the unequal side Therefore,

Now let us take up

and

We know that the radius of the circle will always be perpendicular to the tangent at the point of contact In this problem, OB is the radius and BC is the tangent and B is the point of contact Therefore,

Also, from the property of isosceles triangle we have found that

Therefore,

=

is the common angle to both the triangles Therefore, from AA postulate of similar triangles,

~

Thus we have proved

in this figure, BC is a tangent to the circle with centre O. OE bisects AP. Prove that triangle AEO ~ triangle ABC.

in this figure, BC is a tangent to the circle with centre O. OE bisects AP. Prove that
triangle AEO ~ triangle ABC.