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Solve the following quadratic equation: sqrt(3)x^2 – 2sqrt(2)x – 2sqrt(3) = 0

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Question

Solve the following quadratic equation:

`sqrt(3)x^2 - 2sqrt(2)x - 2sqrt(3) = 0`

Sum
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Solution

We write, `-2sqrt(2)x = -3sqrt(2)x + sqrt(2)x` as `sqrt(3)x^2 xx (-2sqrt(3)) = -6x^2 = (-3sqrt(2)x) xx (sqrt(2)x)`

∴ `sqrt(3)x^2 - 2sqrt(2)x - 2sqrt(3) = 0` 

⇒ `sqrt(3)x^2 - 3sqrt(2)x + sqrt(2)x - 2sqrt(3) = 0` 

⇒ `sqrt(3)x(x - sqrt(6)) + sqrt(2)(x - sqrt(6)) = 0` 

⇒ `(x - sqrt(6))(sqrt(3)x + sqrt(2)) = 0` 

⇒ `x - sqrt(6) = 0` or `sqrt(3)x + sqrt(2) = 0`

⇒ `x - sqrt(6) = 0` or `x = -sqrt(2)/sqrt(3) = -sqrt(6)/3` 

Hence, the roots of the given equation are `sqrt(6)` and `-sqrt(6)/3`.

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Chapter 4: Quadratic Equations - EXERCISE 4A [Page 183]

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R.S. Aggarwal Mathematics [English] Class 10
Chapter 4 Quadratic Equations
EXERCISE 4A | Q 27. | Page 183
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