Factorise : x^2 + 1/4x^2 + 1 - 7x - 7/2x

Mathematics

Factorise :
$x^2 + \dfrac{1}{4x^2} + 1 - 7x - \dfrac{7}{2x}$

Factorisation

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Answer

Given,

$\phantom{=} x^2 + \dfrac{1}{4x^2} + 1 - 7x - \dfrac{7}{2x} \\[1em] = x^2 + \Big(\dfrac{1}{2x}\Big)^2 + 1 - 7\Big(x + \dfrac{1}{2x}\Big) \\[1em] = x^2 + \Big(\dfrac{1}{2x}\Big)^2 + 2 \times x \times \dfrac{1}{2x} - 7\Big(x + \dfrac{1}{2x}\Big) \\[1em] = \Big(x + \dfrac{1}{2x}\Big)^2 - 7\Big(x + \dfrac{1}{2x}\Big) \\[1em] = \Big(x + \dfrac{1}{2x}\Big)\Big(x + \dfrac{1}{2x} - 7\Big).$

Hence, $x^2 + \dfrac{1}{4x^2} + 1 - 7x - \dfrac{7}{2x} = \Big(x + \dfrac{1}{2x}\Big)\Big(x + \dfrac{1}{2x} - 7\Big).$

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