2 Answers

SilverNak · Answer 1 · 2021-07-02T23:41:05+0000

Answer:

Option D is correct.

Explanation:

We have to simplify the following product as given in the question :

$(\sqrt{10x^(4)} - x\sqrt{5x^(2)})(2\sqrt{15x^(4)} + \sqrt{3x^(3) } )$

=
$(\sqrt{10x^(4)} - \sqrt{5x^(4)})(\sqrt{60x^(4)} + \sqrt{3x^(3)})$

{Keeping all the terms within square roots}

=
$(\sqrt{10x^(4)})(\sqrt{60x^(4)}) + (\sqrt{10x^(4)})(\sqrt{3x^(3)}) - (\sqrt{5x^(4)})(\sqrt{60x^(4)}) - (\sqrt{5x^(4)})(\sqrt{3x^(3)})$

{By distributive property of multiplication}

=
$\sqrt{600x^(8)} + \sqrt{30x^(7)} - \sqrt{300x^(8)} - \sqrt{15x^(7)}$

=
10x^(4)√(6) + x^(3)√(30x) - 10x^(4)√(3) - x^(3)√(15x)

Therefore, option D is correct. (Answer)

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