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Factorise: 36a2 – b2 + 20bc – 100c2 - Mathematics

Factorise:

36a² – b² + 20bc – 100c²

बेरीज

Given, 36a² – b² + 20bc – 100c²

36a² – b² + 20bc – 100c²can be written as (6a)² – (b² – 20bc + 100c²)

⇒ (6a)² – {(b)² – 2 × b × 10c + (10c)²}

⇒ (6a)² – (b – 10c)²

Now, applying the identity,

a² – b² = (a + b) (a – b)

⇒ (6a – b + 10c) (6a + b – 10c)

Hence, the required is (6a – b + 10c) (6a + b – 10c).

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पाठ 4: Factorisation - MISCELLANEOUS EXERCISE [पृष्ठ ४८]

पाठ 4 Factorisation
MISCELLANEOUS EXERCISE | Q VI. 3. | पृष्ठ ४८

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