what is the measure of each interior angle of a regular octagon?\n45°\n60°\n120°\n135°

what is the measure of each interior angle of a regular octagon?\n45°\n60°\n120°\n135°
Answer
Answer:
D. 135°
Explanation:
Step1: Recall the formula for interior angle
The formula for the measure of each interior angle $\theta$ of a regular $n$-sided polygon is $\theta=\frac{(n - 2)\times180^{\circ}}{n}$.
Step2: Identify the number of sides
For an octagon, $n = 8$.
Step3: Substitute $n$ into the formula
$\theta=\frac{(8 - 2)\times180^{\circ}}{8}=\frac{6\times180^{\circ}}{8}=135^{\circ}$.