TA and TB are tangents to a circle with centre O from an external point T. OT intersects the circle at point P. Then, AP bisects the ∠TAB.
TA and TB are tangents to a circle with centre O from an external point T. OT intersects the circle at point P. Then, AP bisects the ∠TAB.
The correct option is A True
Given - A circle with centre C. From a point T outside the circle, TA and TB are two tangent to the circle OT intersects the circle at P, AP and AB are joined.
To Prove AP is the bisector of ∠TAB
Construction - Join PB.
Proof - In Δ OAT and Δ OBT,
AT = BT (Tangents from T to the circle)
OA=OB (Raddii of the same circle)
OT= OT (Common)
∴ΔOAT=ΔOBT (SSS postulate)
∠ATO=∠BTO (C.P.C.T.)
Or ∠ATP=∠BTP
Now, in ΔAPT and ΔBPT,
AT = BT (Tangents from T)
PT = PT (Common)
∠ATP=∠BTP (Proved)
∴ΔAPT≅ΔBTP (S.A.S. postulate)
∴∠PAT=∠PBT (C.P.C.T.)
and AP = BP (C.P.C.T)
∴∠PAB=∠PBA
(Angles opposite to equal sides)
But ∠PAT=∠PBA (Angles in alt. segment)
∴∠PAB=∠PAT
∴ AP is the bisector of ∠TAB.
Q.E.D
True
Given - A circle with centre C. From a point T outside the circle, TA and TB are two tangent to the circle OT intersects the circle at P, AP and AB are joined.
To Prove AP is the bisector of ∠TAB
Construction - Join PB.
Proof - In Δ OAT and Δ OBT,
AT = BT (Tangents from T to the circle)
OA=OB (Raddii of the same circle)
OT= OT (Common)
∴ΔOAT=ΔOBT (SSS postulate)
∠ATO=∠BTO (C.P.C.T.)
Or ∠ATP=∠BTP
Now, in ΔAPT and ΔBPT,
AT = BT (Tangents from T)
PT = PT (Common)
∠ATP=∠BTP (Proved)
∴ΔAPT≅ΔBTP (S.A.S. postulate)
∴∠PAT=∠PBT (C.P.C.T.)
and AP = BP (C.P.C.T)
∴∠PAB=∠PBA
(Angles opposite to equal sides)
But ∠PAT=∠PBA (Angles in alt. segment)
∴∠PAB=∠PAT
∴ AP is the bisector of ∠TAB.
Q.E.D
