Consider the general quadratic equation:
[tex]ax^2+bx+c=0[/tex]
The discriminant of this equation is defined as:
[tex]d=b^2-4ac[/tex]
(a) Calculate the discriminant. Before we can use the formula, we need to transform the equation into the required form.
We are given:
[tex]3x^2-6=2x[/tex]
Subtracting 2x and rearranging:
[tex]3x^2-2x-6=0[/tex]
We can now identify the coefficients: a = 3, b = -2, c = -6, and compute the discriminant as follows:
[tex]\begin{gathered} d=(-2)^2-4*3*(-6) \\ d=4+72 \\ \boxed{d=76} \end{gathered}[/tex]
(b) The discriminant gives important information about the solutions of the equation:
* If d is zero, there is only one real solution.
* If d is positive, there are two real solutions.
* If d is negative, there are two complex solutions.
In our equation, d is positive and the equation has two real solutions
