Let `S=` set of point inside the sqare, `T=` set of points inside the triangles and `C=` the set of point inside the circle, if the triangle and circle intersect each other are contained in the square, then `SnnTnnC=varphi` b. `SnnTnnC=C` c. `SuuTuuC=S` d. `SuuTnnC=C`

Let S=set of points inside the square , T=the set of points inside the triangle and C = the set of points inside the circle. If the triangle and circle intersect each other and are contained in a square , then :

Let S= set of points inside the square, T= set of points inside the triangle and C= set of points inside the circle. If the triangle and circle intersect each other and are contained in a square. Then,

Let, S = set of points inside the square T = set of points inside the triangle C= set of points inside the circle, If the triangle and circle intersect each other and are contained in a square, then

Let S= set of point inside the sqare,T= set of points inside the triangles and C= the set of point inside the circle,if the triangle and circle intersect each other are contained in the square,then S nn T nn C=phi b.S nn T nn C=C c.S uu T uu C=SdS uu T nn C=C

Let S= set of point inside the sqare, T= set of points inside the triangles and C= the set of point inside the circle, if the triangle and circle intersect each other are contained in the square, then (a) S nn T nn C = phi (b) S uu T uu C = C (c) S uu T uu C = S (d) S uu T = S nn C

Let S=Set of points inside the square, T=set of points inside the triangle and C=the set of points inside the circle. If the triangle and circle intersect each other and are contained in a square. Then (i) SnnTnnC=phi (ii) SuuTuuC=C (iii) SuuTuuC=S (iv) SuuT=SnnC

…………number of tangent/s can be drawn from a point inside the circle. a) 0 b) 1 c) 2 d) Infinite

A point is randomly chosen inside the circumcircle of an equilateral triangle. Find the probability that it lies inside the inscribed circle of that triangle.

Two equal chord AB and CD of a circle with centre O, intersect each other at point P inside the circle. Prove that: BP = DP

Tangents drawn at point A and C of a circle intersect each other in point P. If /_APC=50^@ , then find /_ABC