Answer:
It is true that the x-intercepts of y=tanx are the same as the x-coordinates of the center points of y=tanx
Step-by-step explanation:
Given function is a trignometric one
y = tanx
we have tanx has values 0 for all multiples of pi.
i.e. tan x =0 whenever [tex]x = 2n\pi[/tex] for all integers n.
Also tanx has a period of pi.
It is a discontinuous graph extending in one period from -pi/2 to pi/2.
Hence the mid point of each period is the x intercept.
It is true that the x-intercepts of y=tanx are the same as the x-coordinates of the center points of y=tanx
