Evaluate the limit $lim_(x rarr -1) (x^3-x)/(x-1)$ ?

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Evaluate the limit $lim_(x rarr -1) (x^3-x)/(x-1)$ ?

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Answer 1 · 2017-11-15T01:34:58

$lim_(x rarr -1) (x^3-x)/(x-1) = 0$

Explanation:

$lim_(x rarr -1) (x^3-x)/(x-1) = lim_(x rarr -1) (x(x^2-1))/(x-1)$
$" " = lim_(x rarr -1) (x(x+1)(x-1))/(x-1)$
$" " = lim_(x rarr -1) (x(x+1)$
$" " = (-1)(0)$
$" " = 0$

And we can verify this graphically:
graph{(x^3-x)/(x-1) [-2.579, 1.302, -0.636, 1.304]}

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Evaluate the limit $lim_(x rarr -1) (x^3-x)/(x-1)$ ?

1 Answer

Explanation:

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Evaluate the limit $lim_(x rarr -1) (x^3-x)/(x-1)$ ?