Which function has a period of pi and is known for vertical asymptotes at multiples of pi/2?

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Study for the Praxis 5165 Mathematics Test. Review with flashcards and multiple-choice questions, each with hints and explanations. Prepare effectively for success!

Multiple Choice

Which function has a period of pi and is known for vertical asymptotes at multiples of pi/2?

Recognizing a function by its period and where it has vertical asymptotes helps pinpoint the right choice. The tangent function repeats every pi, since tan(x+pi) = tan x. It also has vertical asymptotes where cosine is zero, because tan x = sin x / cos x, so as cos x crosses zero at x = pi/2 + k pi, tan x blows up to infinity. Those x-values are the odd multiples of pi/2, exactly where the asymptotes occur.

The sine and cosine functions repeat every 2pi and stay finite everywhere, so they don’t have vertical asymptotes. A quadratic is a simple polynomial with no vertical asymptotes and no fixed period. So the described behavior—period pi and vertical asymptotes at odd multiples of pi/2—fits tangent perfectly.

Which function has a period of pi and is known for vertical asymptotes at multiples of pi/2?

Study for the Praxis 5165 Mathematics Test. Review with flashcards and multiple-choice questions, each with hints and explanations. Prepare effectively for success!

Which function has a period of pi and is known for vertical asymptotes at multiples of pi/2?

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