TA is the tangent to a circle from a point T and TBC is a secant to a circle if th AB is the bisector of angle ACB then show that triangle ADT is an isosceles triangle.
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Given : TA is tangent to the circle, TBC is the secant AD is the bisector of ∠CAB
To prove : ΔADT is an isosceles triangle
Proof : In order to prove this, we will use alternate segment theorem
⇒ ∠TAB = ∠BCA ...(1)
AD is bisector of ∠BAC ⇒ ∠BAD = ∠DAC ...(2)
Now, ∠TAD = ∠TAB + ∠BAD
= ∠BCA + ∠DAC (using (1) and (2))
= ∠DCA + ∠DAC
= 180° – ∠CDA [in ΔCAD, ∠CAD + ∠DCA + ∠CDA = 180°]
⇒ ∠TAD = ∠TDA [As ∠CDA + ∠TDA = 180° (linear pair)]
⇒ TD = TA (sides opposite to equal angles are equal)
Hence, ΔADT is an isosceles Δ
To prove : ΔADT is an isosceles triangle
Proof : In order to prove this, we will use alternate segment theorem
⇒ ∠TAB = ∠BCA ...(1)
AD is bisector of ∠BAC ⇒ ∠BAD = ∠DAC ...(2)
Now, ∠TAD = ∠TAB + ∠BAD
= ∠BCA + ∠DAC (using (1) and (2))
= ∠DCA + ∠DAC
= 180° – ∠CDA [in ΔCAD, ∠CAD + ∠DCA + ∠CDA = 180°]
⇒ ∠TAD = ∠TDA [As ∠CDA + ∠TDA = 180° (linear pair)]
⇒ TD = TA (sides opposite to equal angles are equal)
Hence, ΔADT is an isosceles Δ
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