How do you solve $- s^{2} + 4 s - 6 > 0$ $-s^2+4s-6>0$ ?

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How do you solve $- s^{2} + 4 s - 6 > 0$ $-s^2+4s-6>0$ ?

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Answer 1 · 2017-04-10T17:15:43

Never

Explanation:

Using the discriminant to determine how many zeros the function has.

$D = \sqrt{b^{2} - 4 a c}$ $D=sqrt(b^2-4ac)$

where $b = 4$ $b=4$ , $a = - 1$ $a=-1$ and $c = - 6$ $c=-6$

$D = \sqrt{{(4)}^{2} - 4 (- 1) (- 6)}$ $D=sqrt((4)^2-4(-1)(-6))$

$D = \sqrt{16 + (- 24)}$ $D=sqrt(16+(-24)$

$D = \sqrt{-} 8$ $D=sqrt-8$

Since the discriminant is negative, there are no real roots for this function (the quadratic will never cross the x-axis). Therefore the function will NEVER be greater than $0$ $0$

Here is a graphical look,

graph{-x^2+4x-6 [-10, 10, -5, 5]}

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How do you solve $- s^{2} + 4 s - 6 > 0$ $-s^2+4s-6>0$ ?

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How do you solve $- s^{2} + 4 s - 6 > 0$ $-s^2+4s-6>0$ ?