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The discriminant

Watch this video to learn about the nature of roots using the discriminant.

If \(kx^{2}+5x-\frac{5}{4}=0\) has equal roots, then \(b^2-4ac=0\).

\(a=k\), \(b=5\) and \(c= - \frac{5}{4}\).

\(b^2-4ac=0\)

\(5^2 -4\times k \times - \frac{5}{4}=0\)

\(25+5k=0\)

Rearrange to make \(k\) the subject.

\(5k=-25\)

\(k=-5\)

The discriminant is \({b^2} - 4ac\), which comes from the quadratic formula and we can use this to find the nature of the roots. Roots can occur in a parabola in 3 different ways as shown in the diagram below:

Discriminant rule diagram

In the first diagram, we can see that this parabola has two roots. The second diagram has one root and the third diagram has no roots.

The discriminant can be used in the following way:

\({b^2} - 4ac\textless0\) - there are no real roots (diagram 1)

\({b^2} - 4ac = 0\) - the roots are real and equal ie one real root (diagram 2)

\({b^2} - 4ac\textgreater0\) - the roots are real and unequal ie two distinct real roots (diagram 3)