Answer:
Unsimplified: [tex]2\sqrt{216}[/tex] cm
Simplified: [tex]12\sqrt{6}[/tex] cm
Rounded to nearest tenths: 29.4 cm
Rounded to nearest hundredths: 29.39 cm
Rounded to nearest thousandths: 29.394 cm
Rounded to nearest ten-thousandths: 29.3939 cm
Step-by-step explanation:
The area of a circle with radius,[tex]r[/tex], is [tex]A=\pi r^2[/tex].
Since we have a 60 degree sector with radius [tex]r[/tex] then we have [tex]\frac{60}{360}[/tex] of the area of a circle with radius [tex]r[/tex].
That is we have the following for the area of a 60 degree sector:
[tex]\frac{60}{360} \cdot \pi r^2[/tex]
Reduce the fraction:
[tex]\frac{1}{6} \cdot \pi r^2[/tex]
We have that this equals [tex]36\pi=\frac{1}{6}\pi r^2[/tex].
This implies [tex]36=\frac{1}{6}r^2[/tex].
Multiply both sides by 6:
[tex]216=r^2[/tex]
If you take the square root of both sides, you get:
[tex]\pm \sqrt{216}=r[/tex]
The radius only makes sense to be positive so we can throw the negative out.
[tex]r=\sqrt{216}[/tex].
So the radius is [tex]\sqrt{216}[/tex].
The diameter is twice the radius. Our diameter is therefore [tex]2(\sqrt{216})=2\sqrt{216}[/tex].
We should really go ahead and attach the units.
The answer is [tex]2\sqrt{216}[/tex] cm.
We can simplify this.
[tex]2\sqrt{36}\sqrt{6}[/tex]
[tex]2(6)\sqrt{6}[/tex]
[tex]12\sqrt{6}[/tex]
