D is the midpoint of any side BC of triangle ABC such that AD=AC show that AB > AD
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In ∆ABC D is a point on BC such that
AD=AC
Now in ∆ADC, AD=AC
Hence ∠ADC = ∠ACD
Again ∠ADB(ext. angle)=∠DAC+∠ACD(int. opp. angles)
Therefore ∠ADB > ∠ACD…(1)
In ∆ABD ∠ADC(ext.angle)= ∠ABD+∠BAD(int. opp angles)
⇒∠ADC >∠ABD
Or, ∠ACD>∠ABD….(2) (since ∠ADC=∠ACD)
From (1) and (2) We have ∠ADB>∠ABD
Now in ∆ABD, ∠ADB>∠ABD
Hene AB>AD(since greater angle has greater side opposite to it)
AD=AC
Now in ∆ADC, AD=AC
Hence ∠ADC = ∠ACD
Again ∠ADB(ext. angle)=∠DAC+∠ACD(int. opp. angles)
Therefore ∠ADB > ∠ACD…(1)
In ∆ABD ∠ADC(ext.angle)= ∠ABD+∠BAD(int. opp angles)
⇒∠ADC >∠ABD
Or, ∠ACD>∠ABD….(2) (since ∠ADC=∠ACD)
From (1) and (2) We have ∠ADB>∠ABD
Now in ∆ABD, ∠ADB>∠ABD
Hene AB>AD(since greater angle has greater side opposite to it)
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