1 Answer

Jinnlao · Answer 1 · 2020-07-21T15:32:15+0000

Notice you can factorize

x^5+5x^4-5x^3-25x^2+4x+20

by grouping the terms as

(x^5-5x^3+4x)+(5x^4-25x^2+20)=x(x^4-5x^2+4)+5(x^4-5x^2+4)

$\implies f(x)=(x+5)(x^4-5x^2+4)$

Then you know right away that
x=-5 is a (real) root, so we eliminate C and D.

The remaining quartic can be factored easily:

x^4-5x^2+4=(x^2)^2-5x^2+4=(x^2-4)(x^2-1)=(x-2)(x+2)(x-1)(x+1)

which admits four more (also real) roots,
$x=\pm2$ and
$x=\pm1$ , so the answer is B.

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