C6rossluiliv
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Solve the following inequality. Express the exact answer in interval notation, restricting your attention to 0 ≤ x ≤ 2π
tan(x) ≥ 1.

Respuesta :

Panoyin
         tan(x) ≥ 1
tan⁻¹(tan(x)) ≥ tan⁻¹(1)
                 x ≥ 45°
                 x ≥ ¹/₄π
Ver imagen Panoyin
Since tan is a strictly increasing function you just need to solve the equation tan x = 1 for 0<=x<=2pi. X is pi/4 this resulting into the final answer:
x E [pi/4, 2pi]

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