O is the centre of the circle and two tangents are drawn from a point P to this circle at points A and B. If `angleAOP=50^(@)`, then what is the value (in degrees) of `angleAPB`?

Two tangents are drawn from a point P on the circle at point A and B. O is the centre of the circle. If angleAOP=60^(@) then find angleAPB .

Two tangents are drawn from a point P to a circle at A and B. O is the centre of the circle. If angleAOP = 60^(@) , then angleAPB is

If angle between two tangents drawn from a point P to a circle of radius a and centre 0 is 60^(@) then OP=asqrt3 .

O is the centre of the circle. A tangent is drawn which touches the cirlce at C. If /_AOC=80^(@) , then what is the value (in degrees) of /_BCX ?

In figure,PT and PS are tangents drawn from a point P to a circle with centre at 0. If /_OPT=35^(@), find a and b

The centre of the circle is O. Two tangents are drawn from the point of the circle A & B, which meets at the point P. Accordingly if angleAOB=120^(@) , then find out the ratio of angleAPB:angleAOP ?

XR is a tangent to the circle. O is the centre of the circle. If /_XRP=120^(@) , then what is the value (in degrees) of /_QOR ?

If angle between two tangents drawn from a point P to a circle of radius 'a' and the centre O is 90^(@) then prove that OP=sqrt(a)