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Question
In ΔАВC, AB = AC and ∠BAC = 30°. Find the value of x.
Sum
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Solution
Given: In triangle ABC, AB = AC isosceles and ∠BAC = 30°.
BC is produced to D and x is the angle between AC and CD the exterior angle at C.
Step-wise calculation:
1. In an isosceles triangle, the base angles are equal.
So ∠ABC = ∠ACB
= `(180^circ - ∠BAC)/2`
2. Compute the base angles:
`∠ACB = (180^circ - 30^circ)/2`
= `150^circ/2`
= 75°
3. Angle x is the angle between AC and the extension CD of BC.
So x and the interior angle ∠ACB are supplementary:
x = 180° – ∠ACB
= 180° – 75°
⇒ x = 105°
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