If the discriminant of a quadratic equation is 4, which statement describes the roots?

There are two complex roots.
There are two real roots.
There is one real root.
There is one complex root.

Step-by-step explanation: Terms in this set (6) If the discriminant of a quadratic equation is 4, which statement describes the roots? B. There are two real roots.

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xero099 xero099 · Answer 2 · 2021-10-19T11:44:49+02:00

As of discriminant of the quadratic equation is 4, then we find that there two real and distinct roots.

In a quadratic equation, the discriminant of the quadratic formula indicates the nature of the two roots of the polynomial. Main characteristics are described below:

If discriminant is greater than zero, then roots are real and distinct.
If discriminant is zero, then roots are real and equal.
If discriminant is less than zero, then roots are complex.

According to the statement, the discriminant of the quadratic equation is 4, then we find that there two real and distinct roots.

We kindly invite to check this question on discriminants: https://brainly.com/question/15884086

If the discriminant of a quadratic equation is 4, which statement describes the roots? There are two complex roots. There are two real roots. There is one real root. There is one complex root.

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If the discriminant of a quadratic equation is 4, which statement describes the roots?

There are two complex roots.
There are two real roots.
There is one real root.
There is one complex root.