Given:
TR = 11 Ft
∠RTS = 16°
Let's determine the length of Arc PS,
Step 1: Let's first determine the angle of Arc PS.
∠RTS = 16°
∠PTQ = 16° ; Vertical angle pair of ∠RTS
Since ∠QTR = ∠PTS under the rule of vertical angles, we can now determine the measure of ∠PTS or Arc PS.
We get,
[tex]\angle RTS\text{ + }\angle PTQ\text{ + }\angle QTR\text{ + }\angle PTS=360[/tex][tex]16\text{ + }16\text{ + }\angle PTS\text{ + }\angle PTS=360[/tex][tex]32\text{ + }2\angle PTS=360^{}[/tex][tex]\angle PTS=\frac{360^{}\text{ - 32}}{2}[/tex][tex]\angle PTS=\frac{328}{2}[/tex][tex]\angle PTS=164^{\circ}[/tex]
Step 2: Let's determine the perimeter of the circle.
[tex]\text{ Perimeter = }2\pi r[/tex][tex]\text{ = 2}\pi(11)[/tex][tex]\text{ Perimeter = 22}\pi[/tex]
Step 3: Let's determine the length of Arc PS.
[tex]\text{ Arc Length = (}\frac{\theta}{360})(\text{Perimeter of the Circle)}[/tex][tex]\text{ = (}\frac{164}{360})(22)(3.14)[/tex][tex]\text{ Arc Length = }31.469777\ldots\text{ }\approx\text{ 31.47 ft.}[/tex]
Therefore, the length of Arc PS is 31.47 ft.
