2014 AMC 10A Problems/Problem 13
Problem
Equilateral has side length , and squares , , lie outside the triangle. What is the area of hexagon ?
Solution 1
The area of the equilateral triangle is . The area of the three squares is .
Since , .
Dropping an altitude from to allows to create a triangle since is isosceles. This means that the height of is and half the length of is . Therefore, the area of each isosceles triangle is . Multiplying by yields for all three isosceles triangles.
Therefore, the total area is .
Solution 2
As seen in the previous solution, segment is . Think of the picture as one large equilateral triangle, with the sides of , by extending , , and to points , , and , respectively. This makes the area of .
Triangles , , and have sides of , so their total area is .
Now, you subtract their total area from the area of :
Solution 3
We will use, to find the area of the following triangles. Since , .
The Area of is . Noting, ,
Area of ,
Area of ,
Area of square ABDE = 1,
Therefore the composite area of the entire figure is,
Solution 4
We know that the area is equal to 3*EAF+3*ACGF+ABC. We also know that ACGF and the rest of the squares' area is equal to 1. Therefore the answer is 3*EAF+ABC+3. The only one with "+3" or "3+" is C, our answer. Very unreliable. -Reality Writes
Solution 5
The area of the obtuse triangle is
The total area is
~mathboy282
See Also
2014 AMC 10A (Problems • Answer Key • Resources) | ||
Preceded by Problem 12 |
Followed by Problem 14 | |
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