4.2 Determine the general Blution of \( : \) \( 4.2 .1 \quad 2 \cos ^{2} x+7 \sin x=5 \) \( 4.2 .2 \quad \cos (x-45)=\sin 15 \)

To tackle the equation \(2 \cos^{2} x + 7 \sin x = 5\), we can start by expressing everything in terms of sine. Remember that \(\cos^{2} x = 1 - \sin^{2} x\). So we substitute and rearrange it into a quadratic equation. This might help you find the roots, which will lead to values of \(x\). Don't forget to check the range of solutions for \(\sin x\). For the equation \(\cos(x - 45) = \sin 15\), we can use the co-function identity. Recall that \(\sin 15\) can be expressed in terms of cosine, leading us to use \( \cos \left(45 - 15\right) = \sin 15\). You might also explore the angles involved to find explicit solutions or utilize the unit circle for visualization.