How do you factor completely $t^{3} + t^{2} - 22 t - 40$ $t^3+t^2-22t-40$ ?

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How do you factor completely $t^{3} + t^{2} - 22 t - 40$ $t^3+t^2-22t-40$ ?

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Answer 1 · 2017-03-02T12:38:38

$t^{3} + t^{2} - 22 t - 40 = (t + 2) (t + 4) (t - 5)$ $t^3+t^2-22t-40=color(green)((t+2)(t+4)(t-5))$

Explanation:

Using the Rational Root Theorem, the possible roots of the given polynomial are contained in the set:
$XXX {\pm 1, \pm 2, \pm 4, \pm 8, \pm 10, \pm 20}$ $color(white)("XXX"){+-1,+-2,+-4,+-8,+-10,+-20}$

Evaluating the given polynomial for each possible root (I chose to use a spread sheet to do this; see below)
we can determine the roots: $- 2, - 4, and + 5$ $-2, -4, and +5$
$XXX$ $color(white)("XXX")$ note that since the polynomial is of degree 3
$XXXXX$ $color(white)("XXXXX")$ there can be a maximum of 3 unique roots.

which implies the factors:
$XXX (t + 2) (t + 4) (t - 5)$ $color(white)("XXX")(t+2)(t+4)(t-5)$

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How do you factor completely $t^{3} + t^{2} - 22 t - 40$ $t^3+t^2-22t-40$ ?

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How do you factor completely t^3+t^2-22t-40t3+t2−22t−40t^3+t^2-22t-40?

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How do you factor completely $t^{3} + t^{2} - 22 t - 40$ $t^3+t^2-22t-40$ ?