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Question
Find the roots of the following quadratic equations (if they exist) by the method of completing the square.
`sqrt3x^2+10x+7sqrt3=0`
Solution
We have been given that,
`sqrt3x^2+10x+7sqrt3=0`
Now divide throughout by `sqrt3`. We get,
`x^2+10/sqrt3x+7=0`
Now take the constant term to the RHS and we get
`x^2+10/sqrtx=-7`
Now add square of half of co-efficient of ‘x’ on both the sides. We have,
`x^2+10/sqrt3x+(10/(2sqrt3))^2=(10/(2sqrt3))^2-7`
`x^2+(10/(2sqrt3))^2+2(10/(2sqrt3))x=16/12`
`(x+10/(2sqrt3))^2=16/12`
Since RHS is a positive number, therefore the roots of the equation exist.
So, now take the square root on both the sides and we get
`x+10/(2sqrt3)=+-4/(2sqrt3)`
`x=-10/(2sqrt3)+-4/(2sqrt3)`
Now, we have the values of ‘x’ as
`x=-10/(2sqrt3)+4/(2sqrt3)=-sqrt3`
Also we have,
`x=-10/(2sqrt3)-4/(2sqrt3)=-7/sqrt3`
Therefore the roots of the equation are `-sqrt3` and `-7/sqrt3`.
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