What is the domain and range of $y=csc x$ ?

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Answer 1 · 2017-08-30T12:56:00

Domain: all $x in RR: x != n pi forall n inZZ$
Range: $(-oo, -1] uu [+1, +oo)$

$y = cscx$

$y = 1/sinx$

$sin x$ is defined $forall x in RR$

$csc x$ is defined wherever $sinx != 0 -> x != npi forall n in ZZ$

Hence, the domain of $y$ is all $x in RR: x != n pi forall n inZZ$

Consider: $-1<=sinx<=+1 forall x in RR$

Hence, the local maxima of $y$ are $1/-1 = -1$

and the local minima of $y$ are $1/1 = 1$

Then, since $y$ has no upper or lower bounds its range is:
$(-oo, -1] uu [+1, +oo)$

This maybe more easily visualised by the graph of $cscx$ below.

graph{cscx [-8.89, 8.885, -4.444, 4.44]}

What is the domain and range of y=csc xy=csc x?