Ray BA is tangent at point A . Ray BD is secant intersecting the circle at points C and D then
`BA^(2) = square xx square `

Given : Line ET is tangent to the circle at point E. Line EAB is secant intersecting at point A and B. To Prove : ET^(2) = EA xx EB Construction : Draw seg BT and Seg AT Complete the proof by filling the boxes.

In the figure, ray PT touches the circle at point T and line PAB is secent intersecting the circle at points A and B, then

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 figure, a tangent segment PA touches the circle at point A and secant PBC intersects the circle at points B and C. If AP=15 cm and BP=10, then find BC.

In the figure, ray BC is tangent at point B and ray BA is secant. /_ABC intercepts are AXB if m(arc AXB ) = 130^(@) then find the measure of /_ABC .

Tangent Secant Theorem Point E is in the exterior of a circle. A secant through E intersects the circle at points A and B, and a tangent through E touches the circle at point T, then EA xx EB = ET^(2) . Given : (1) A circle with centre O (2) Tangent ET touches the circle at pointT (3) Secant EAB intersects the circle at points A and B . To prove : EA xx EB = ET^(2)

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

Two circles intersect each other at point P and Q. Secants drawn through p and Q intersect the circles at points A,B and D,C Prove that : /_ ADC + /_ BCD = 180^(@)

P is a point outside a circle and is 13 cm away from its centre. A secant drawn from the point P intersects the circle at points A and B in such a way that PA=9 cm and AB=7 cm. The radius of the circle is

Chords AB and CD intersect at point M inside the circle then theorem of internal division of chords. AM xx BM = square xx square