In a circle, O is the center. Tangent TPT' touches the point P and AP is the chord , if ∠POA =130∘ then the value of ∠APT will be [Take T and A on same side of OP]

In a circle O is the centre.Tangent TPT' touches the point P and AP is the chord if /_POA=130^(@) then the value of /_APT will be (Take T and A on the same side of OP )

In a circle 0 is the centre.Tangent TPT' touches the point P and AP is the chord if /_POA=130^(@) then the value of /_APT will be (Take T and A on the same side of OP)

In a circle 0 is the centre.Tangent TPT' touches the point P and AP is the chord if /_POA=130^(@) then the value of /_APT will be (Take T and A on the same side of OP )

In a circle 0 is the centre.Tangent TPT touches the point P and AP is the chord if /_POA=130^(@) then the value of /_APT will be (Take T and A on the same side of OP )

A cyclic quadrilateral KPRQ is inscribed a circle with centre 0. A tangent ST touches the point P. If /_PRQ =130^(@) then /_QPT= ? (Take S and K on the same side of PQ )

A cyclic quadrilateral KPRQ is inscribed a circle with centre 0. A tangent ST touches the point P. If /_PRQ =130^(@) then /_QPT= ? (Take S and K on the same side of PQ )

AP is tangent to circle O at point P, What is the length of OP?

In the figure, chord AB || tangent DE. Tangent DE touches the circle at point C then prove AC = BC.

In a circle of radius 7cm, tangent PT is drawn from a point P such that PT=24cm. If O is the center of circle then length OP=?

Suppose a circle passes through (2,2) and (9,9) and touches the X-axis at P. if O is the origin, then OP is