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c If cos θ < 0 and sin θ > 0, then the terminal side of the angle lie in
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c Use a trigonometric function, to find the height h of the parallelogram shown in the figure in cm, where b = 8 cm.
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| c If 0° ≤ θ ≤ 360°, then find one possible value of θ for which tan θ = - 3. c |
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c If cos θ < 0 and sin θ < 0, then the terminal side of the angle lie in
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c If sin θ = 12, 0 ≤ θ ≤ 360°, then the possible value of θ is
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| c If 0° ≤ θ ≤ 360°, then find one possible value of θ for which cos θ = - 12. c |
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| c If 0° < θ < 720°, then find all possible values of θ for which csc θ = 2 and sin θ > 0. c |
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c If 0° < θ < 720°, then find all possible values of θ for which tan θ = - 3 and cos θ < 0.
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| c If 0° < θ < 360°, then find one possible value of θ for which sin θ = - 12 and tan θ = 33. c |
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| c If 0° < θ < 360°, then find one possible value of θ for which cot θ = - 3 and csc θ = 2. c |
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| c Evaluate: sin 30° + cos 30° + sin 150° + cos 150° c |
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c Use a trigonometric function, to find the height h of the parallelogram shown in the figure in cm, where b = 16 cm.
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c Evaluate: (cot 300°)(cos 300°) + (tan 300°)(sin 300°).
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