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Precalculus Mathematics Homework Help
Specifying vertical asymptotes in periodic functions in set notation
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[QUOTE="SammyS, post: 6169187, member: 295898"] Let's check it out. If n=0, then you are excluding π/4 from the domain. That's good. If n=1, then you are excluding 3π/4 from the domain. That's good. If n = −1, then you are excluding −π/4 from the domain. That's good. Etc. I'm curious about the inequality, −2pi < x < 2pi , that you have in the [B]Relevant Equations[/B] . Also, you can find many symbols by clicking on the icon 3rd from the right in the light blue banner at the top of the "Reply/Post thread" box. [ATTACH type="full" alt="242415"]242415[/ATTACH] Using that, your result of { x: x ∈ R, x ≠ n⋅(pi/2)+(pi/4) } becomes: { x: x ∈ ℝ, x ≠ n⋅(π/2)+(π/4) } Even better, use LaTeX. [/QUOTE]
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Precalculus Mathematics Homework Help
Specifying vertical asymptotes in periodic functions in set notation
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