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Under what circumstance can the quadratic function not be written in factored form
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Under what circumstance can the quadratic function not be written in factored form

User Imposter
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1 Answer

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Answer:

When the discriminant of a quadratic function is negative than it is not be written in factored form.

Explanation:

If a quadratic function is
f(x)=ax^2+bx+c, then

1. It is factorable if
D=b^2-4ac\geq 0, i.e., graph of function intersect the x-axis, roots of the function are real.

2. It is not factorable if
D=b^2-4ac< 0, i.e., graph of function does not intersect the x-axis, roots of the function are imaginary or complex.

It means, the quadratic function not be written in factored form when the discriminant of a quadratic function is negative.

User EpicOfChaos
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