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Question 3
ABC is an isosceles triangle with AB = AC and D is a point on BC such that AD⊥BC (see figure). To prove that ∠BAD=∠CAD, a student proceeded as follows.
In ΔABD and ΔACD, we have AB= AC [given]
∠B=∠C [because AB=AC]
And ∠ADB=∠ADC
Therefore,ΔABD≅ΔACD [by AAS congruence rule]
So,∠BAD=∠CAD [by CPCT]
What is the defect in the above arguments?
ABC is an isosceles triangle with AB = AC and D is a point on BC such that AD⊥BC (see figure). To prove that ∠BAD=∠CAD, a student proceeded as follows.
In ΔABD and ΔACD, we have AB= AC [given]
∠B=∠C [because AB=AC]
And ∠ADB=∠ADC
Therefore,ΔABD≅ΔACD [by AAS congruence rule]
So,∠BAD=∠CAD [by CPCT]
What is the defect in the above arguments?
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Solution
In ΔABC,AB=AC
⇒∠ACB=∠ABC [angle oppsoite to the equal sides are equal]
In ΔABD and ΔACD,
AB=AC [given]
∠ABD=∠ACD [proved above]
∠ADB=∠ADC [each 90∘]
∴ΔABD≅ΔACD [by AAS]
So, ∠BAD=∠CAD [by CPCT]
So, the defect in the given argument is that firstly prove ∠ABD=∠ACD
Hence, ∠ABD=∠ACD is defect.
⇒∠ACB=∠ABC [angle oppsoite to the equal sides are equal]
In ΔABD and ΔACD,
AB=AC [given]
∠ABD=∠ACD [proved above]
∠ADB=∠ADC [each 90∘]
∴ΔABD≅ΔACD [by AAS]
So, ∠BAD=∠CAD [by CPCT]
So, the defect in the given argument is that firstly prove ∠ABD=∠ACD
Hence, ∠ABD=∠ACD is defect.
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