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Question
In the following, determine whether the given quadratic equation have real roots and if so, find the roots:
`sqrt2x^2+7x+5sqrt2=0`
Solution
We have been given, `sqrt2x^2+7x+5sqrt2=0`
Now we also know that for an equation ax2 + bx + c = 0, the discriminant is given by the following equation:
D = b2 - 4ac
Now, according to the equation given to us, we have,`a=sqrt2`, b = 7 and `c=5sqrt2`.
Therefore, the discriminant is given as,
`D=(7)^2-4(sqrt2)(5sqrt2)`
= 49 - 40
= 9
Since, in order for a quadratic equation to have real roots, D ≥ 0.Here we find that the equation satisfies this condition, hence it has real roots.
Now, the roots of an equation is given by the following equation,
`x=(-b+-sqrtD)/(2a)`
Therefore, the roots of the equation are given as follows,
`x=(-(7)+-sqrt9)/(2(sqrt2))`
`=(-7+-3)/(2sqrt2)`
Now we solve both cases for the two values of x. So, we have,
`x=(-7+3)/(2sqrt2)`
`=-sqrt2`
Also,
`x=(-7-3)/(2sqrt2)`
`=-5/sqrt2`
Therefore, the roots of the equation are `-5/sqrt2` and `-sqrt2`
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