Simplify: (x + 6) (x − 4) (x − 2) - Mathematics

Simplify: (x + 6) (x − 4) (x − 2)

बेरीज

Using identity:
(x + a)(x + b)(x + c) = x³ + (a + b + c)x² + (ab + bc + ca)x + abc

(x + 6)(x − 4)(x − 2)
= x³ + (6 − 4 − 2)x² + [6 × (−4) + (−4) × (−2) + (−2) × 6]x + 6 × (−4) × (−2)
= x³ − 0x² + (−24 + 8 − 12)x + 48
= x³ − 28x + 48

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Special Product

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पाठ 4: Expansions (Including Substitution) - Exercise 4 (E) [पृष्ठ ६६]

पाठ 4 Expansions (Including Substitution)
Exercise 4 (E) | Q 1.4 | पृष्ठ ६६

Simplify using following identity : `( a +- b )(a^2 +- ab + b^2) = a^3 +- b^3`
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`( 3x - 5/x )( 9x^2 + 15 + 25/x^2)`

Simplify using following identity : `( a +- b )(a^2 +- ab + b^2) = a^3 +- b^3`
`(a/3 - 3b)(a^2/9 + ab + 9b^2)`

Find : (a + b)(a + b)(a + b)

If a + b = 11 and a² + b² = 65; find a³ + b³.

If x = 3 + 2√2, find :
(i) `1/x`

(ii) `x - 1/x`

(iii) `( x - 1/x )^3`

(iv) `x^3 - 1/x^3`

Using suitable identity, evaluate (104)³

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`[(x^2 - y^2)^3 + (y^2 - z^2)^3 + (z^2 - x^2)^3]/[(x - y)^3 + (y - z)^3 + (z - x)^3]`

Evaluate :
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Evaluate :
`[1.2 xx 1.2 + 1.2 xx 0.3 + 0.3 xx 0.3 ]/[ 1.2 xx 1.2 xx 1.2 - 0.3 xx 0.3 xx 0.3]`