In ΔABC, &ang;B = 90° and D is the mid-point of BC. Prove that AC2 = AD2 + 3CD2.

Given, In ∆ABD, By Pythagoras theorem AD2 = AB2 + BD2 AB2 = AD2 – BD2 ...(i) In △ABC, AC2 = AB2 + BC2 AB2 = AC2 – BC2 ...(ii) Equate equation (i) and (ii) ⇒ AD2 – BD2 = AC2 – BC2 ⇒ AD2 – BD2 = AC2 – (BD + CD)2 ⇒ AD2 – BD2 = AC2 – [BD2 + CD2 + 2(BD)(CD)] ⇒ AD2 – BD2 = AC2 – BD2 – CD2 – 2(BD)(CD) Since D is the midpoint, then, BD = CD. ⇒ AD2 – BD2 = AC2 – BD2 – CD2 – 2(CD)(CD) ⇒ AD2 = AC2 – `\cancel("BD"^2)` + `\cancel("BD"^2)` – CD2 – 2CD2 ⇒ AD2 = AC2 – 3CD2 ⇒ AC2 = AD2 + 3CD2 Hence, proved.

In ΔABC, ∠B = 90° and D is the mid-point of BC. Prove that AC2 = AD2 + 3CD2. - Mathematics

प्रश्न

In ΔABC, ∠B = 90° and D is the mid-point of BC. Prove that AC² = AD² + 3CD².

प्रमेय

उत्तर

Given,

In ∆ABD,

By Pythagoras theorem

AD² = AB² + BD²

AB² = AD² – BD² ...(i)

In △ABC,

AC² = AB² + BC²

AB² = AC² – BC² ...(ii)

Equate equation (i) and (ii)

⇒ AD² – BD² = AC² – BC²

⇒ AD² – BD² = AC² – (BD + CD)²

⇒ AD² – BD² = AC² – [BD² + CD² + 2(BD)(CD)]

⇒ AD² – BD² = AC² – BD² – CD² – 2(BD)(CD)

Since D is the midpoint, then, BD = CD.

⇒ AD² – BD² = AC² – BD² – CD² – 2(CD)(CD)

⇒ AD² = AC² – `\cancel("BD"^2)` + `\cancel("BD"^2)` – CD² – 2CD²

⇒ AD² = AC² – 3CD²

⇒ AC² = AD² + 3CD²

Hence, proved.

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Q 12.Q 11.Q 13.

अध्याय 11: Pythagoras Theorem - EXERCISE 11 [पृष्ठ १२५]

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बी निर्मला शास्त्री Mathematics [English] Class 9 ICSE

अध्याय 11 Pythagoras Theorem
EXERCISE 11 | Q 12. | पृष्ठ १२५

In ΔABC, ∠B = 90° and D is the mid-point of BC. Prove that AC2 = AD2 + 3CD2. - Mathematics

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In ΔABC, ∠B = 90° and D is the mid-point of BC. Prove that AC2 = AD2 + 3CD2. - Mathematics

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