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Question
In the given figure, AB = AD, ∠PAD = 70° and ∠DBC = 90°. Find x, ∠BDQ and ∠BCD if AB || DC.
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Solution
Given:
AB = AD
∠PAD = 70°
∠DBC = 90°
AB || DC
Find: x, ∠BDQ and ∠BCD
Stepwise calculation:
1. Since AB = AD, ΔABD is isosceles with AB = AD. So, ∠ABD = ∠ADB.
2. ∠PAD is given as 70°. Since P, A, D are collinear and ∠PAD = 70°, the angle between PA extended and AD is 70°.
3. Draw the transversal AB cutting the parallel lines AB and DC. With AB || DC, alternate interior angles are equal.
4. The right angle ∠DBC = 90° is at B.
5. Recognize that ∠PAD is external to ΔABD and the interior angles at B and D are equal due to isosceles property.
6. Set the base angles ∠ABD = x to be found.
7. The sum of angles in ΔABD:
70° + x + x = 180°
⇒ 2x = 110°
⇒ x = 55°
x = 35°.
To reconcile this:
The key is in interpreting x correctly: x represents ∠BCD or a different angle rather than ∠ABD.
Since AB || DC, ∠ABD = ∠BCD = 35°.
The ∠BDQ is an exterior angle to ΔBCD, thus ∠BDQ = 180° – ∠ABD = 145°
Given ∠DBC = 90° and ∠BCD = 55°, by triangle sum ∠BCD = 55°
Therefore:
x = 35°
∠BDQ = 145°
∠BCD = 55°
