Two circles with centres $\text{P}$ and $\text{Q}$ cut each other at two distinct points $\text{A}$ and $\text{B}.$ The circles have the same radii and neither $\text{P}$ nor $\text{Q}$ falls within the intersection of the circles. What is the smallest range that includes all possible values of the angle $\text{AQP}$ in degrees?
- Between $0$ and $90$
- Between $0$ and $30$
- Between $0$ and $60$
- Between $0$ and $75$
- Between $0$ and $45$