Directed infinity

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A directed infinity is a type of infinity in the complex plane which has a defined angle θ but an infinite absolute value r.^[1] For example, the limit of 1/x where x is a positive number approaching zero is a directed infinity with angle 0; however, 1/0 is not a directed infinity, but a complex infinity. Some rules for manipulation of directed infinities are:

$w\infty + z\infty = (w+z)\infty$
$z\infty = \frac{z}{\left | z \right |}\infty$ .
$0\infty$ is undefined, as is $\frac{z\infty}{w\infty}$
$a z\infty = z\infty$ if a > 0, $-z\infty$ if a < 0.
$w\infty z\infty = (w z)\infty$

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