Solve the polynomial equation give all solutions real and imaginary x^4+x^2-20=0

Question

asked Aug 20, 2023 3.5k views

1 Answer

Paneerakbari · Answer 1 · 2023-08-23T16:52:06+0000

Let:

Substitute into the equation:

The factors of -20 that sum to 1 are -4 and 5, so:

Split into 2 equations:

$\begin{gathered} y-4=0_{\text{ }}(1) \\ y+5=0_{\text{ }}(2) \end{gathered}$

Substitute back for:

For (1):

$\begin{gathered} x^2-4=0 \\ x^2=4 \\ x=\sqrt[]{4} \\ x=\pm2 \end{gathered}$

For (2):

$\begin{gathered} x^2+5=0 \\ x^2=-5 \\ x=\sqrt[]{-5} \\ x=\pm\sqrt[]{5}i \end{gathered}$

The solutions are:

$\begin{gathered} 2 \\ -2 \\ i\sqrt[]{5} \\ -i\sqrt[]{5} \end{gathered}$