Question 2
If two equal chords of a circle intersect within the circle, prove that the segments of one chord are equal to corresponding segments of the other chord.
Question 2
If two equal chords of a circle intersect within the circle, prove that the segments of one chord are equal to corresponding segments of the other chord.
Let PQ and RS be two equal chords of a given circle and they are intersecting each other at point T.
Draw perpendiculars OV and OU on these chords.
In ΔOVT and ΔOUT,
OV = OU (Equal chords of a circle are equidistant from the centre)
∠OVT=∠OUT(Each 90∘)
OT = OT (Common)
∴ΔOVT≅ΔOUT (RHS congruence rule)
∴VT=UT(ByCPCT)...(1)
It is given that,
PQ = RS ... (2)
⇒12PQ=12RS
⇒PV=RU...(3)
On adding equations (1) and (3), we obtain
PV + VT = RU + UT
⇒PT=RT...(4)
On subtracting equation (4) from equation (2), we obtain
PQ - PT = RS - RT
⇒QT=ST...(5)
Equations (4) and (5) indicate that the corresponding segments of chords PQ and RS are congruent to each other.
Let PQ and RS be two equal chords of a given circle and they are intersecting each other at point T.
Draw perpendiculars OV and OU on these chords.
In ΔOVT and ΔOUT,
OV = OU (Equal chords of a circle are equidistant from the centre)
∠OVT=∠OUT(Each 90∘)
OT = OT (Common)
∴ΔOVT≅ΔOUT (RHS congruence rule)
∴VT=UT(ByCPCT)...(1)
It is given that,
PQ = RS ... (2)
⇒12PQ=12RS
⇒PV=RU...(3)
On adding equations (1) and (3), we obtain
PV + VT = RU + UT
⇒PT=RT...(4)
On subtracting equation (4) from equation (2), we obtain
PQ - PT = RS - RT
⇒QT=ST...(5)
Equations (4) and (5) indicate that the corresponding segments of chords PQ and RS are congruent to each other.
