Which statement characterizes the tangent function?

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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 statement characterizes the tangent function?

Explanation:
Tangent repeats every 180 degrees and has vertical asymptotes where cosine is zero. Since tan x = sin x / cos x, the period comes from tan(x + π) = tan x, so the period is π radians (180 degrees). The function is undefined at x = π/2 + kπ, which are 90°, 270°, 450°, etc.—points where cosine is zero. Those asymptotes are 180 degrees apart, aligning with the idea of a 180-degree period and regularly spaced vertical asymptotes. This is why the described statement captures the essence of the tangent function. It isn’t correct to say the period is 360 degrees, it isn’t always negative, and there are indeed asymptotes.

Tangent repeats every 180 degrees and has vertical asymptotes where cosine is zero. Since tan x = sin x / cos x, the period comes from tan(x + π) = tan x, so the period is π radians (180 degrees). The function is undefined at x = π/2 + kπ, which are 90°, 270°, 450°, etc.—points where cosine is zero. Those asymptotes are 180 degrees apart, aligning with the idea of a 180-degree period and regularly spaced vertical asymptotes. This is why the described statement captures the essence of the tangent function. It isn’t correct to say the period is 360 degrees, it isn’t always negative, and there are indeed asymptotes.

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