Classwork Solving trigonome for \( \theta \) where \( \theta \in \) 1. \( \cos \left(\theta-30^{\circ}\right)=-0,5 \) 2. \( 2 \sin \theta \cdot \cos \theta-\cos \theta= \) 3. \( 2 \cos ^{2} \theta-7 \cos \theta-4 \)

To solve \( \cos \left(\theta-30^{\circ}\right)=-0.5 \), you would first recognize that this corresponds to angles where the cosine value is negative. This means \( \theta - 30^{\circ} = 120^{\circ} + 360^{\circ}n \) or \( \theta - 30^{\circ} = 240^{\circ} + 360^{\circ}n \). Solving these, you would add \( 30^{\circ} \) to both sides, leading to \( \theta = 150^{\circ} + 360^{\circ}n \) or \( \theta = 270^{\circ} + 360^{\circ}n \). Next, looking at the equation \( 2 \sin \theta \cdot \cos \theta - \cos \theta = 0 \), you can factor it as \( \cos \theta (2 \sin \theta - 1) = 0 \). This gives two cases: \( \cos \theta = 0 \) which leads to \( \theta = 90^{\circ} + 180^{\circ}n \) and \( 2 \sin \theta - 1 = 0 \) leading to \( \sin \theta = \frac{1}{2} \), which gives \( \theta = 30^{\circ} + 360^{\circ}n \) or \( \theta = 150^{\circ} + 360^{\circ}n \). For the equation \( 2 \cos^{2} \theta - 7 \cos \theta - 4 = 0 \), you can treat it as a quadratic in terms of \( x = \cos \theta \). Rewriting gives \( 2x^{2} - 7x - 4 = 0 \). Applying the quadratic formula \( x = \frac{-b \pm \sqrt{b^{2} - 4ac}}{2a} \) yields possible values for \( \cos \theta \), which you can then convert back to find \( \theta \). Now you’re well on your way to mastering the trigonometric waves! 🌊✨