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प्रश्न
In Figure, D is the mid-point of side BC and AE ⊥ BC. If BC = a, AC = b, AB = c, ED
= x, AD = p and AE = h, prove that:
(i) `b^2 = p^2 + ax + a^2/4`
(ii) `c^2 = p^2 - ax + a^2/4`
(iii) `b^2 + c^2 = 2p^2 + a^2/2`
उत्तर
We have, D as the mid-point of BC
(i) AC2 = AE2 + EC2
b2 = AE2 + (ED + DC)2 [By pythagoras theorem]
b2 = AD2 + DC2 + 2DC × ED
`b^2=p^2+(a/2)^2+2(a/2)xxx` [BC = 2CD given]
`rArrb^2=p^2+a^2/4+ax` .........(i)
(ii) In ΔAEB, by pythagoras theorem
AB2 = AE2 + BE2
⇒ c2 = AD2 − ED2 + (BD − ED)2 [By pythagoras theorem]
⇒ c2 = p2 − ED2 + BD2 + ED2 − 2BD × ED
`rArrc^2=p^2+(a/2)^2-2(a/2)xx x`
`rArrc^2=p^2+a^2/4-ax` .........(ii)
(iii) Add equations (i) and (ii)
`b^2+c^2=p^2+a^2/4+ax + p^2+a^2/4-ax`
`b^2+c^2=2p^2+(2a^2)/4`
`b^2+c^2=2p^2+a^2/2`
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