Advertisements
Advertisements
Question
In the given figure, MN is the common chord of two intersecting circles and AB is their common tangent.
Prove that the line NM produced bisects AB at P.
Solution
From P, AP is the tangent and PMN is the secant for first circle.
∴ AP2 = PM × PN ...(i)
Again from P, PB is the tangent and PMN is the secant for second circle.
∴ PB2 = PM × PN ...(ii)
From (i) and (ii)
AP2 = PB2
`=>` AP = PB
Therefore, P is the midpoint of AB.
APPEARS IN
RELATED QUESTIONS
P is the mid-point of an arc APB of a circle. Prove that the tangent drawn at P will be parallel to the chord AB.
Chords AB and CD of a circle when extended meet at point X. Given AB = 4 cm, BX = 6 cm and XD = 5 cm, calculate the length of CD.
In the figure, given below, O is the centre of the circumcircle of triangle XYZ.
Tangents at X and Y intersect at point T. Given ∠XTY = 80° and ∠XOZ = 140°, calculate the value of ∠ZXY.
