Factorise : 7a^5 - 567a

7a 5 \- 567a = 7a(a 4 \- 81) = 7a((a 2 ) 4 \- (9) 4 ) Using the formula [∵ (x 2 \- y 2 ) = (x \+ y)(x \- y)] = 7a(a 2 \- 9)(a 2 \+ 9) = 7a((a) 2 \- (3) 2 )(a 2 \+ 9) = 7a(a \- 3)(a \+ 3)(a 2 \+ 9) Hence, 7a 5 \- 567a = 7a(a \- 3)(a \+ 3)(a 2 \+ 9)

Mathematics

Factorise :
7a⁵ - 567a

Factorisation

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Answer

7a⁵ - 567a

= 7a(a⁴ - 81)

= 7a((a²)⁴ - (9)⁴)

Using the formula

[∵ (x² - y²) = (x + y)(x - y)]

= 7a(a² - 9)(a² + 9)

= 7a((a)² - (3)²)(a² + 9)

= 7a(a - 3)(a + 3)(a² + 9)

Hence, 7a⁵ - 567a = 7a(a - 3)(a + 3)(a² + 9)

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Mathematics

Factorise :
7a⁵ - 567a

Factorisation

Answer

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Factorise xy² - xz², Hence, find the value of :
(i) 9 x 8² - 9 x 2²
(ii) 40 x 5.5² - 40 x 4.5²

Mathematics

Factorise :7a5 - 567a

Factorisation

Answer

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Factorise :x2 - 2xy + y2 - z2

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Factorise xy2 - xz2, Hence, find the value of :(i) 9 x 82 - 9 x 22(ii) 40 x 5.52 - 40 x 4.52

Factorise :
7a⁵ - 567a

Factorise :
x² - 2xy + y² - z²

Factorise :
x² - y² - 2yz - z²

Factorise :
$5x^2 - \dfrac{20x^4}{9}$

Factorise xy² - xz², Hence, find the value of :
(i) 9 x 8² - 9 x 2²
(ii) 40 x 5.5² - 40 x 4.5²