Polynomial equation solver

Solve equation$$x^4-8x^3+19x^2-24x+48 = 0$$

solution

$$ \begin{matrix}x_1 = 4 & x_2 = \sqrt{ 3 } i & x_3 = -\sqrt{ 3 } i \end{matrix} $$

explanation

$ \color{blue}{ x^{4}-8x^{3}+19x^{2}-24x+48 } $ is a polynomial of degree 4. To find zeros for polynomials of degree 3 or higher we use Rational Root Test.

The Rational Root Theorem tells you that if the polynomial has a rational zero then it must be a fraction $ \dfrac{p}{q} $, where p is a factor of the trailing constant and q is a factor of the leading coefficient.

The factor of the leading coefficient ( 1 ) is 1 .The factors of the constant term (48) are 1 2 3 4 6 8 12 16 24 48 . Then the Rational Roots Tests yields the following possible solutions:

$$ \pm \frac{ 1 }{ 1 } , ~ \pm \frac{ 2 }{ 1 } , ~ \pm \frac{ 3 }{ 1 } , ~ \pm \frac{ 4 }{ 1 } , ~ \pm \frac{ 6 }{ 1 } , ~ \pm \frac{ 8 }{ 1 } , ~ \pm \frac{ 12 }{ 1 } , ~ \pm \frac{ 16 }{ 1 } , ~ \pm \frac{ 24 }{ 1 } , ~ \pm \frac{ 48 }{ 1 } ~ $$

Substitute the POSSIBLE roots one by one into the polynomial to find the actual roots. Start first with the whole numbers.

If we plug these values into the polynomial $ P(x) $, we obtain $ P(4) = 0 $.

To find remaining zeros we use Factor Theorem. This theorem states that if $\frac{p}{q}$ is root of the polynomial then this polynomial can be divided with $ \color{blue}{q x - p} $. In this example:

Divide $ P(x) $ with $ \color{blue}{x - 4} $

$$ \frac{ x^{4}-8x^{3}+19x^{2}-24x+48 }{ \color{blue}{ x - 4 } } = x^{3}-4x^{2}+3x-12 $$

Polynomial $ x^{3}-4x^{2}+3x-12 $ can be used to find the remaining roots.

Use the same procedure to find roots of $ x^{3}-4x^{2}+3x-12 $

When you get second degree polynomial use step-by-step quadratic equation solver to find two remaining roots.