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प्रश्न
In the given figure AB || DC, AD || BC ∠D = 52° and ∠BCE = 28°. ∴ ∠E is ______.
पर्याय
30°
28°
24°
38°
MCQ
रिकाम्या जागा भरा
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उत्तर
In the given figure AB || DC, AD || BC ∠D = 52° and ∠BCE = 28°. ∴ ∠E is 24°.
Explanation:
We are given a parallelogram ABCD with an extended line CE
- AB || DC, AD || BC
- ∠D = 52°
- ∠BCE = 28°
We are to find:
∠E (i.e. ∠CBE)
Step-by-step:
1. Since ABCD is a parallelogram, opposite angles are equal:
∠D = ∠B = 52°
2. In triangle ΔCBE:
- ∠BCE = 28° ...(Given)
- ∠CBE = ∠E ...(What we want)
- ∠B = 52°, which is the interior angle adjacent to ∠CBE
3. Use angle on a straight line:
∠E = 180° – ∠B – ∠BCE
∠E = 180° – 52° – 28° = 100° ...(This is incorrect logic!)
In triangle ΔCBE:
- ∠BCE = 28°
- ∠B = 52° ⇒ So, ∠CBE = 180° – 52° = 128° ...(Linear pair)
- Now, triangle angles sum to 180°:
∠CBE = 128°
∠BCE = 28°
⇒ ∠E = 180° – 128° – 28° = 24°
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