For this case we have the following function:
[tex]f (x) = x ^ 4-24x ^ 2-25[/tex]
We make a change of variable:
[tex]u = x ^ 2[/tex]
So, we have:
[tex]u ^ 2-24u-25[/tex]
We apply the resolver:
[tex]a = 1\\b = -24\\c = -25\\[/tex]
[tex]u = \frac {-b \pm \sqrt {b ^ 2-4 (a) (c)}} {2 (a)}\\u = \frac {- (- 24) \pm \sqrt {(- 24) ^ 2-4 (1) (- 25)}} {2 (1)}\\u = \frac {24 \pm \sqrt {576 + 100}} {2}\\u = \frac {24 \pm \sqrt {676}} {2}\\u = \frac {24\pm26} {2}[/tex]
We have two roots:
[tex]u_ {1} = \frac {24 + 26} {2} = 25\\u_ {2} = \frac {24-26} {2} = - 1[/tex]
Returning the change:
[tex]x ^ 2 = 25\\x = \pm \sqrt {25} = \pm5[/tex]
[tex]x ^ 2 = -1[/tex] Give the imaginary roots.
Answer:
Real roots [tex]\pm5[/tex]
