Chords AB and CD of a circle intersect inside the circle at point E. If AE=5.6, EB=10, CE=8, find ED. a)7 b)8 c)11.2 d)9

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

Seg AB and seg AD are the chords of the circle. C is a point on tangent of the circle at point A. If m(arc APB)=80^@ and /_BAD=30^@ . Then find m/_BAC

Segments AB and CD bisects each other at point M. If A(4,3), B(-2,5), C(-3,5), then find coordinates of D.

Seg AB and seg AD are the chords of the circle. C is a point on tangent of the circle at point A. If m(arc APB)=80^@ and /_BAD=30^@ , then find m(arc BQD).

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 square ABCD is cyclic.

In an A.P, a=8 , t_n=62 , S_n=210 , then find n . a) 5 b) 6 c) 7 d) 8

In the adjoining figure, chords CB and ED intersect each other in point A in the exterior of the circle. IF CB=5,AB=7,EA=20 and IF ED exceeds AD, determine ED-AD.

A circle with centre C touches the circle with centre D internally in the point E. Point D lies on the smaller circle. Chord EB of the external circle intersects internal circle at point A. Prove that seg EA~=seg AB

Secant AC and secant 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.

Two circles intersect each other at the points P and Q. Two straight lines through P and Q intersect one circle at the points A and C and the other circle at B and D. Prove the AC|| BD