$\begin{aligned}
& \omega_1=(8 \sin \theta+7 \cos \theta)+i(\sin \theta+4 \cos \theta) \
& \omega_2=(\sin \theta+4 \cos \theta)+i(8 \sin \theta+7 \cos \theta) \
& \omega_1 \omega_2=8 \sin ^2 \theta+7 \sin \theta \cos \theta+32 \sin \theta \cos \theta+ \
& 28 \cos ^2 \theta-8 \sin ^2 \theta-32 \sin \theta \cos \theta-7 \sin \theta \cos \theta \
& -28 \cos ^2 \theta+i\left(\sin ^2 \theta+4 \sin \theta \cos \theta+4 \sin \theta \cos \theta\right. \
& +16 \cos ^2 \theta+64 \sin ^2 \theta+56 \sin \theta \cos \theta+56 \sin \theta \
& \left.\cos \theta+49 \cos ^2 \theta\right) \
& \omega_1 \omega_2=0+i\left(65 \sin ^2 \theta+120 \sin \theta \cos \theta+65 \cos ^2 \theta\right) \
& \alpha+\beta=65+60 \sin 2 q \
& \alpha+\left.\beta\right|{\max }=125 \
& \alpha+\left.\beta\right|{\min }=5
\end{aligned}$
Ans. =125+5=130
option (2)