QUESTION IMAGE
Question
find the measure of one interior angle in each regular polygon. round your answer to the nearest tenth if necessary.
- regular decagon
- regular 22 - gon
- regular 16 - gon
- regular 15 - gon
find the measure of one exterior angle in each regular polygon. round your answer to the nearest tenth if necessary.
- regular heptagon
- regular 13 - gon
- regular quadrilateral
- regular hexagon
14) Regular Decagon (Interior Angle)
Step1: Recall the formula for the sum of interior angles of a polygon.
The sum of interior angles of a polygon with \( n \) sides is \( S=(n - 2)\times180^{\circ} \). For a decagon, \( n = 10 \).
Step2: Calculate the sum of interior angles.
Substitute \( n = 10 \) into the formula: \( S=(10 - 2)\times180^{\circ}=8\times180^{\circ}=1440^{\circ} \).
Step3: Find the measure of one interior angle.
In a regular polygon, all interior angles are equal. So, one interior angle \( I=\frac{S}{n} \). Substitute \( S = 1440^{\circ} \) and \( n = 10 \): \( I=\frac{1440^{\circ}}{10}=144^{\circ} \).
Step1: Use the sum of interior angles formula.
For a polygon with \( n = 22 \) sides, the sum of interior angles \( S=(n - 2)\times180^{\circ} \).
Step2: Calculate the sum.
Substitute \( n = 22 \): \( S=(22 - 2)\times180^{\circ}=20\times180^{\circ}=3600^{\circ} \).
Step3: Find one interior angle.
One interior angle \( I=\frac{S}{n}=\frac{3600^{\circ}}{22}\approx163.6^{\circ} \) (rounded to the nearest tenth).
Step1: Apply the sum formula.
For \( n = 16 \), sum of interior angles \( S=(16 - 2)\times180^{\circ} \).
Step2: Compute the sum.
\( S = 14\times180^{\circ}=2520^{\circ} \).
Step3: Calculate one interior angle.
One interior angle \( I=\frac{2520^{\circ}}{16}=157.5^{\circ} \).
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\( 144^{\circ} \)