Solve the following equations. \( 3.1 \quad \sin \left(\theta+20^{\circ}\right)=0,577 \) and \( 0^{\circ} \leq x \leq 360^{\circ} \)

To solve the equation \( \sin \left(\theta + 20^{\circ}\right) = 0.577 \), we start by taking the inverse sine (arcsin) of both sides: \[ \theta + 20^{\circ} = \arcsin(0.577) \] Calculating this gives: \[ \arcsin(0.577) \approx 35.26^{\circ} \] Now, recalling that the sine function is positive in the first and second quadrants, we can find the two angles: 1. First solution: \[ \theta + 20^{\circ} = 35.26^{\circ} \] \[ \theta = 35.26^{\circ} - 20^{\circ} \approx 15.26^{\circ} \] 2. Second solution (using \(180^{\circ} - \arcsin(0.577)\)): \[ \theta + 20^{\circ} = 180^{\circ} - 35.26^{\circ} \approx 144.74^{\circ} \] \[ \theta = 144.74^{\circ} - 20^{\circ} \approx 124.74^{\circ} \] Now, we have two potential solutions for \(\theta\): \[ \theta \approx 15.26^{\circ} \quad \text{and} \quad \theta \approx 124.74^{\circ} \] To summarize, the solutions in the specified range \(0^{\circ} \leq \theta \leq 360^{\circ}\) are: \[ \theta \approx 15.26^{\circ}, \quad 124.74^{\circ} \]