8 R 2
8 with remainder 2.
20 times with a remainder of 2
Exactly 20 times
8.1
20
Interior angle 162 Exterior angle 18 It will have 20 sides
To find the measure of an interior angle in a regular 20-gon, you can use the formula ((n-2) \times \frac{180}{n}), where (n) is the number of sides. For a 20-gon, this becomes ((20-2) \times \frac{180}{20} = 18 \times 9 = 162) degrees. Therefore, each interior angle of a regular 20-gon measures 162 degrees.
162 by each team.
The internal angle of a regular polygon can be calculated using the formula ((n - 2) \times 180^\circ / n), where (n) is the number of sides. For a 20-sided polygon, this becomes ((20 - 2) \times 180^\circ / 20), which simplifies to (18 \times 180^\circ / 20). This results in an internal angle of (162^\circ). Thus, each internal angle of a regular 20-sided polygon is (162^\circ).
It will have 20 sides
3
162 MILES across I-20.