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

In the figure , chords PQ and RS intersect at point T outside the circle then by theorem of external division of chords, PT xx square = ST xx square

In a circle,chords AB and CD intersect at a point R inside the circle.If AR: RB=1:4 and CR:RD=4:9, then the ratio AB:CD is

In the figure, chord AB and chord CD intersect at point M inside the circle such that AM=4, BM=3, CM=2, then CD="………"

Chords AB and CD of a circle intersect at a point P inside the circle. If AB = 10 cm, AP = 4 cm and PC = 5 cm, then CD is equal to:

Chord AB and CD intersect each other at point E in the initerior of the circle. In order to prove /_CEB = (1)/(2) [m (arc AD ) + m (arc CB) ]

Theorem of external division of chords. If secants containing chords AB and CD of a circle intersect outside the circle in point E, then AE xx EB = CE xx ED Given : (1) A circle with centre O (2) Secants AB and CD intersect at point E outside the circle. To prove : AE xx EB = CE xx DE Construction : Draw seg AD and seg BC

Theorem of internal division of chords. Suppose two chords of a circle intersect each other in the interior of the circle, then the product of the lengths of the two segments of one chord is equal to the product of the lengths of the two segments of the other chord. Given : (1) A circle with centre O . (2) chords PR and QS intersect at point E inside the circle. To prove : PE xx ER = QE xx ES Construction : Draw seg PQ and seg RS

In a cricle, two chords AB and CD intersect at a point P inside the circle. Prove that (a) Delta PAC~ Delta PDB" " (b) PA*PB=PC*PD .