1.3 Determine, without using a calculator, the value of the following in terms of \( p \), if \( \sin 43^{\circ}=p \) \( 1.3 .1 \cos 133^{\circ} \) \( 1.3 .2 \tan \left(-43^{\circ}\right) \)

To find \(\cos 133^{\circ}\) in terms of \(p\), we can use the identity: \(\cos(180^{\circ} - \theta) = -\cos(\theta)\). Here, \(133^{\circ} = 180^{\circ} - 47^{\circ}\), which implies \(\cos(133^{\circ}) = -\cos(47^{\circ})\). We know that \(\cos(47^{\circ}) = \sin(43^{\circ})\) due to the complementary angle theorem (\(\sin(90^{\circ} - \theta) = \cos(\theta)\)). Thus, \(\cos(133^{\circ}) = -p\). Next, to find \(\tan(-43^{\circ})\), we use the fact that \(\tan(-\theta) = -\tan(\theta)\). Therefore, \(\tan(-43^{\circ}) = -\tan(43^{\circ})\). Since \(\tan(43^{\circ}) = \frac{\sin(43^{\circ})}{\cos(43^{\circ})}\), and we already have \(\sin(43^{\circ} )= p\), we can express it as \(-\frac{p}{\cos(43^{\circ})}\). However, without a calculator, we leave the answer in terms of \(\cos(43^{\circ})\). So the answers are: 1.3.1 \( -p \) 1.3.2 \( -\frac{p}{\cos(43^{\circ})} \)