Neil claims to have drawn a regular polygon with each interior angle equal to $130^\circ$130°.
Find $n$n, the number of sides of such a polygon.
What is the shape of this polygon?
This shape cannot exist
Heptagon
Pentagon
Hexagon
Nonagon
Octagon
Dave claims to have drawn a regular polygon with each interior angle equal to $100^\circ$100°.
James claims to have drawn a regular polygon each interior angle equal to $150^\circ$150°.
Yvonne claims to have drawn a regular polygon each interior angle equal to $140^\circ$140°.