AR and BS are tangents to the circle, with centre O, touching at P and Q respectively, and PQ is the chord. If `|__OQP = 25^(@), |__RPQ = ` _______

In the figure, PQL and PRM are tangents to the circle with centre O at the points Q and R respectively and S is a point on the circle such that |__SQL=50^(@) and |__SRM=60^(@) . Find |__QSR .

In the figure, PA and PB are tangents to the circle with centre O such that |__APB=50^(@) . Find |__OAB .

In the figure ,AB tangent to the circle with centre O.If angleAOB=30^(@) ,then angleA and angleB respectively are:

APB is tangent at P to the circle with centres O.If angleQPB=60^(@) ,then anglePOQ is :

In the given TP and TQ are tangents drawn to the circle with centre O.If anglePTQ=40^(@) ,then angleOPQ is:

PA and PB are the two tangents drawn to a circle centered at o. from an external point P . If |__AOB = 150^(@) then |__APB is

In the given figure, AP and BP are tangents to a circle with centre O such that AP=5 cm and |__APB=60^(@) . Find the length of chord AB.

In the Fig, if TP and TQ are the two tangents to a circle with centre O so that angle POQ =110^@ , then angle PTQ is equal to

In the figure, AB is the diameter of a circle with centre O and AT is a tangent. If |__AOQ=58^(@) , find |__ATQ .

Let A be one point of intersection of two intersecting circles with centres O and Qd . The tangents at A to the two circles meet the circles again at B and C respectively. Let the point P be located so that AOPQ is a parallelogram. Prove that P is the circumcentre of the triangle ABC.