SOLUTION: An equilateral triangle is inscribed in a circle with a radius of 6". Find the area of the segment cut off by one side of the triangle

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Question 254908: An equilateral triangle is inscribed in a circle with a radius of 6". Find the area of the segment cut off by one side of the triangle
Answer by edjones(8007) (Show Source):
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Solved by pluggable solver: Calculate side length of equilateral triangle inscribed in the circle

The circle of radius 6 with center O with an equilateral triangle ABC inscribed in it.

Join edges A,B and C with center O as shown in figure.

Consider Triangle AOB and AOC,

1.> .............(Sides of Equilateral triangle are equal)

2.> .............(These are radius of a circle)

3.>OA is common side to both Triangles.

From conditions 1,2 and 3

Triangle AOB and AOC are congruent to each other. (SSS congruency condition)

Now since triangles are congruent,

Therefore, ...............(4)

Similarly, ...............(5)

As, Angle CAB is an angle in a equilateral triangle

Hence, degrees ...............(6)

Now,

..........(From (4))

degrees

degrees ...........(6)

Similarly,

and from condition 5, degrees ...........(7)

Now consider Triangle AOB,

Sum of angles in a Triangle is 180 degrees.

Hence,

........(From 6 and 7)

...........(8)

In Triangle AOB using sine rule,

Hence the side of an equilateral triangle inscribed in a circle of radius 6 is 10.3923048.

.
A(equilateral triangle)=s^2sqrt(3)/4
(10.39^2*sqrt(3))/4
=46.74 sq in
.
A(circle)=pi*r^2
=pi*6^2
=113.1 sq in
.
113.1-46.74=66.35 area of all 3 segments cut off by a side of the triangle.
66.35/3
=22.12 sq in, area of the segment cut off by one side of the triangle.
.
Ed