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Question
ABC is an isosceles triangle with AB = AC and BD, CE are its two medians. Show that BD = CE.
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Solution
ΔABC is an isosceles triangle in which AB=AC and BD,CE are its two medians.
In ΔABC and ΔACE,
AB = AC [given]
∠A=∠A [common angle]
And AD = AE
[∵AB=AC⇒12AB=12AC⇒AE=AD]
As D is the mid-point of AC and E is the mid-point of AB,
∴ΔABC≅ΔACE [by SAS congruence rule]
⇒BD=CE [by CPCT]
In ΔABC and ΔACE,
AB = AC [given]
∠A=∠A [common angle]
And AD = AE
[∵AB=AC⇒12AB=12AC⇒AE=AD]
As D is the mid-point of AC and E is the mid-point of AB,
∴ΔABC≅ΔACE [by SAS congruence rule]
⇒BD=CE [by CPCT]
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