In the figure, two circles intersect each other at points A and B. AP and AQ are the diameters of these circels. Prove that PBQ is a straight line.

Two circles intersect at two points A and B . AD and AC are diameters to the two circles .Prove that B lies on the line segment DC.

Two circles intersect each other at point P an Q. If PA and PB are two diameter then find angleAQB .

Two circles intersect at two points A and B. AD and AC are diameters to the two circles ( see Fig.10.34 ).Prove that B lies on the line segment DC.

Two circle intersect in A and B and AC and AD are respectively the diameters of the circles.Prove that C,B,D are collinear.

In the figure, two circles intersect each other at points A and B . C is a point on the smaller circle. Secant CA and secant CB of the smaller circle intersect the bigger circle at points D and E respectively then prove : seg DE || line CF

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

In the fig. two circles intersect each other in point A and B. Secants through the point A intersect the circles in point P,Q and R,S. Line PR and SQ intersect in T. (i) PTQ and PBQ are supplementary. (ii) square BSTR is cyclic quadrilateral.

In the figure, two circles intersect each other in points P and Q. If tangent from point R touch the circles at S and T, then prove that RS=RT.

In the figure, two circles with centers O and P intersect each other at points D and C. Line AB intersects the circle with centre O at points A and B and touches the circle with centre P at point E. Prove /_ADE+/_BCE=180^(@) .