AD and BE are perpendiculars of Isosceles triangle ABC if a C equals BC then prove that a equals BD.
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Answers
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Q. AD and BE are perpendiculars of Isosceles triangle ABC ifAC=BC then prove that AE=BD.
Ans. Given AD and BE are altitude and AC = BC
Here
∠ BEA = ∠ BEC = 90° -------1
∠ ADB = ∠ ADC = 90° --------2
So from equation 1 and 2 , we can say
∠ BEA = ∠ ADB = 90° ------3
And As given ABC is a isosceles triangles so , from base angle theorem ,we can say that
∠ CAB = ∠ CBA ----------4
Now In ∆ BAE and ∆ ABD
∠ BEA=∠ ADB ( From equation 3)
∠ EAB = ∠ DBA ( same angles )
∠ CBA = ∠ DBA ( same angles ) And from equation 4 we know ∠CAB = ∠ CBA )
And
AB = AB ( Common side )
Hence
∆ BAE ≅∆ ABD ( By AAS rule )
So,
AE = BD ( By CPCT rule )
Hence proved
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