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Question
In the adjoining figure, ABC is an isosceles triangle in which AB = AC and PQ is parallel to BC. If ∠A = 40°, find ∠PQC.
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Solution
Given:
AB = AC,
PQ || BC,
∠A = 40°.
Find ∠PQC.
Step-wise calculation:
1. Since AB = AC, the base angles are equal:
∠B = ∠C
= `(180^circ - 40^circ)/2`
= 70°
2. Q lies on AC and P lies on AB; PQ || BC.
The ray QP is parallel to BC and the ray QC points from Q toward C (i.e. along AC but toward C).
3. ∠PQC is the angle between the rays QP and QC.
Compare this with ∠C = ∠ACB, which is the angle between CA (from C to A) and CB (from C to B).
The ray QC is the opposite direction to CA (QC points toward C while CA at C points toward A).
So, the angle between QP || BC and QC is the supplement of ∠C.
Therefore, ∠PQC
= 180° – ∠C
= 180° – 70°
= 110°
