The arc length of the semicircle is 15.7
<h3>Calculating Arc length </h3>
From the question, we are to determine the arc length of the semicircle
Arc length can be determined by using the formula,
Arc length = θ/360° × 2πr
Where θ is the angle subtended by the arc
and r is the radius of the circle
In the given diagram,
θ = 180°
and r = 10/2
r = 5
Thus,
The arc length of the semicircle = 180°/360° ×2×3.14×5
The arc length of the semicircle = 1/2×2×3.14×5
The arc length of the semicircle = 15.7
Hence, the arc length of the semicircle is 15.7
Learn more on Calculating Arc length here: brainly.com/question/16552139
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Let h be the height. Then:
1/2 (22h)=7500
22h=15000
h=15000/22=681.8181 yds
No, the answer is not 2. The measure of angle 2 is 128°. You can find this by 26×4=104 -> 360-104=256 ->256÷2=128
Let's see -
Follow the directions below to get your answer -
0.75 × 68 = 51
51 + 68 = 119
So, 119 is your answer
68 increased by 75% is 119.
↑ ↑ ↑ Hope this helps! :D
Circumference = 2 x radius x PI
Circumference = 2 x 3.8 x 3.14
Circumference = 23.86
answer: the closest one is A. 23.8 FT.
