How do you draw the graph of $y=-tanx$ for $0<=x<2pi$ ?

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Answer 1 · 2018-07-16T12:34:49

See the required graph, in-between $x = 0 and x = 2pi$ .

For x in $( 0, 2pi )$ , y= 0, at $x = 0, pi, 2pi$
,
There are two asymptotes $x = pi/2 and x = (3/2)pi$ , within the

interval.

The graph is not on uniform scale, for better visual effect.

graph{ (y+tan x)(x+0y)(x-2pi+0y) = 0[-0.1 6.3 -16 16]}

How do you draw the graph of y=-tanxy=-tanx for 0<=x<2pi0<=x<2pi?