The correct option is B x=70∘,y=55∘,z=55∘
Given: AB || BC and AB = AC
△ABC is an isosceles triangle as its two sides are equal in length.
∴ y = z {Base angles of an isosceles triangle are equal}
In △ABC,
x + y + z = 180∘
x + 2y = 180∘ ...(i)
∠EAD + ∠DAB + ∠BAC = 180∘
{Angles on a straight line}
55∘ + x + ∠DAB = 180∘
∵ AD || BC, ∠DAB = y
∴ 55∘ + x + y = 180∘
x +y =125 ...(ii)
Solving (i) and (ii)
x + 2y = 180∘
2x + 2y = 250
- - -
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-x = -70
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⇒x=70∘
⇒y=125−x=55∘
⇒z=y=55∘
∴ x, y and z are 70∘, 55∘ and 55∘ respectively.