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प्रश्न
In ΔABC, AD is perpendicular to BC and BD : DC = 3 : 1. Prove that `AB^2 = AC^2 + 1/2 BC^2`.
सिद्धांत
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उत्तर
Using Pythagoras theorem,
In ΔADB,
AD2 + DB2 = AB2 ...(1)
In ΔADC,
AD2 + DC2 = AC2 ...(2)
Subtracting the equations we have,
⇒ AD2 + DB2 – AD2 – DC2 = AB2 – AC2
⇒ (3CD)2 – DC2 = AB2 – AC2
⇒ 9CD2 – DC2 = AB2 – AC2
⇒ 8CD2 = AB2 – AC2
But BC = BD + CD
⇒ 3CD + CD = 4CD
⇒ CD = `(BC)/4`
⇒ `8 xx (1/4 BC)^2 + AC^2 = AB^2`
⇒ `8 xx 1/16 BC^2 + AC^2 = AB^2`
⇒ `1/2 BC^2 + AC^2 = AB^2`
Hence, proved.
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