Pre-Calc/Trig Unit 1: Trig Functions/1.3 Trig Functions Sketch an angle θ in standard position such that θ has the smallest positive ... Sketch an angle θ in standard position such that θ has the smallest positive measure and the given point is on the terminal side of θ.

(-5, -3)
 ]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect