How do you graph, identify the domain, range, and asymptotes for $y = cot (x - \frac{π}{2})$ $y=cot(x-pi/2)$ ?

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How do you graph, identify the domain, range, and asymptotes for $y = cot (x - \frac{π}{2})$ $y=cot(x-pi/2)$ ?

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Answer 1 · 2016-11-30T10:49:38

They are the same as the ones for $y = tan x$ $y=tan x$

Explanation:

Note that:

$cot (x - \frac{π}{2}) = \frac{cos (x - \frac{π}{2})}{sin (x - \frac{π}{2})} = - \frac{cos (\frac{π}{2} - x)}{sin (\frac{π}{2} - x)} = - \frac{sin x}{cos x} = - tan x$ $cot(x-pi/2) = frac cos (x-pi/2) sin (x-pi/2) = - frac cos( pi/2-x) sin(pi/2-x) = - frac sinx cosx = -tan x$

The range of $tan x$ $tan x$ is $(- \infty, + \infty)$ $(-oo,+oo)$ so it is not affected by the change in sign.

Same for the domain of $tan x$ $tan x$ that is symmetrical with respect to $x = 0$ $x=0$

Also the asymptotes do not change, only the approach to the asymptotes is reversed.

graph{cot(x-pi/2) [-10, 10, -5, 5]}

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How do you graph, identify the domain, range, and asymptotes for $y = cot (x - \frac{π}{2})$ $y=cot(x-pi/2)$ ?

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Explanation:

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How do you graph, identify the domain, range, and asymptotes for $y = cot (x - \frac{π}{2})$ $y=cot(x-pi/2)$ ?