Question

20. In Fig. 12.143, ABC is a triangle in which angle B = angle 2C. D is a point on side BC such that AD bisects angle BAC and AB = CD. BE is the bisector of angle B. The measure of angle BAC is​

Answer 1

Answer:

In ΔABC, we have

∠B=2∠C or, ∠B=2y, where ∠C=y

AD is the bisector of ∠BAC. So, let ∠BAD=∠CAD=x

Let BP be the bisector of ∠ABC. Join PD.

In ΔBPC, we have

∠CBP=∠BCP=y⇒BP=PC

In Δ

′

s ABP and DCP, we have

∠ABP=∠DCP, we have

∠ABP=∠DCP=y

AB=DC [Given]

and, BP=PC [As proved above]

So, by SAS congruence criterion, we obtain

ΔABP≅ΔDCP

⇒∠BAP=∠CDP and AP=DP

⇒∠CDP=2x and ∠ADP=DAP=x [∴∠A=2x]

In ΔABD, we have

∠ADC=∠ABD+∠BAD⇒x+2x=2y+x⇒x=y

In ΔABC, we have

∠A+∠B+∠C=180

∘

⇒2x+2y+y=180

∘

⇒5x=180

∘

[∵x=y]

⇒x=36

∘

Hence, ∠BAC=2x=72

∘