Draw a sufficiently large circle with centre C as shown in the figure. Draw any diameter PQ. Now take points R,S,T on both the semicircles. Measure `angle PRQ=angle PSQ`. What do you observe?

Draw a circle of any radius. Draw diameter PQ. Take 3 points S, T and U any where on the circle. Measure angle PSQ, angle PTQ and angle PUQ . What do you observe?

In the given figure, PQ is a tangent at a point R of the circle with centre O. If angle TRQ = 30^(@) , then angle PRS is equal to

Suppose Q is a point on the circle with centre P and radius 1, as shown in the figure: R is a point outside the circle such that QR=1 and /_QRP=2^(@) .Let S be the point where the segment RP intersects the given circle.Then measurement of /_RQS equals

P and Q are the middle points of two chords (not diameters) AB and AC respectively of a circle with centre at a point O. The lines OP and OQ are produced to meet the circle respectively at the points R and S. T is any point on the major arc between the points R and S of the circle. If angle BAC = 32^(@), angle RTS = ?

Two tangents TP and TQ are drawn from an external point T to a circle with centre O as shown in figure. If they are inclined to each other at an angle of 100^(@) , then what is the value of anglePOQ?

PQ is tangent at a point R of the circle with centre O. If ST is a diameter of the circle and angle TRQ = 30^(@) find angle PRS

In figure, seg RS is a diameter of the circle with centre O. Point T lines in the exterior of the circle. Prove that /_RTS is an acute angle.

In the given figure, PT is the tangent of a circle with centre O at point R. If diameter SQ is increased, it meets with PT at point P. If angle SPR = x^(@) and angle QSR = y^(@) . What is the value of x^(@) + 2y^(@) ?