Secant AC and secnat AE intersects in point A . Points of intersections of the circle and secants are B and D respectively . If CB = 5, AB = 7, EA = 20 . Determine ED - AD

Chords AB and CD of a circle intersect inside the circle at point E . If AE = 5.6, EB = 10, CE = 8,find ED.

Line AB passes through point (2,3) and intersects the positive x and y-axes at A(a,0) and B(0,b) respectively. If the area of DeltaAOB is 11. then the value of 4b^2+9a^2 is

If a straight line intersects the sides AB and AC of a triangle ABC at D and E respectively and is parallel to BC , then (AE)/(AC) = . ………..

chords AB and CD of a circle intersect in point Q in the interior of a circle of a shown in the figure. If m(arc AD) =20^(@) , and m(ARC BC) =36^(@) then find angleBQC

In the adjoining figure, two circles intersect each other at points A and E . Their common secant through E intersects the circle at points B and D . The tangents of the circles at point B and D intersect each other at point C . Prove that squareABCD is cyclic .

A secant is a line which intersects the circle at two distinct points and the line segment between the points is a chord.

The maximum number of points of intersection of five lines and four circles is (A) 60 (B) 72 (C) 62 (D) none of these

In the adjacent figure, we have AC = XD, C and D are mid points of AB and XY respectively. Show that AB = XY.

In the figure, ABC is a triangle in which AB= AC. Points D and E are points on the side AB and AC respectively such that AD=AE. Show that points B, C, E and D lie on a same circle.