2002 AMC 8 Problems/Problem 20
Problem
The area of triangle is 8 square inches. Points and are midpoints of congruent segments and . Altitude bisects . The area (in square inches) of the shaded region is
Solution 3
We know the area of triangle is square inches. The area of a triangle can also be represented as or in this problem . By solving, we have
With SAS congruence, triangles and are congruent. Hence, triangle . (Let's say point is the intersection between line segments and .) We can find the area of the trapezoid by subtracting the area of triangle from .
We find the area of triangle by the formula- . is of from solution 1. The area of is .
Therefore, the area of the shaded area- trapezoid has area .
- sarah07
Solution 4 (Dummed down)
The area of triangle is square inches. You can turn the triangle into a rectangle by drawing a triangle on the left side with the hypotenuse of it being and another triangle on the right side, with its hypotenuse being . After drawing the square, you can cut it into squares. The area of the rectangle is square inches because the triangle on the left is half of and there's another triangle on the other side, equaling them to square inches. We will be focusing on the left side of the rectangle of because it includes the shaded region. It's split into equal squares. The area of this triangle is square inches because the total area of the rectangle is square inches and divided by is . There are sections, so you would do divided by in order to find the area of one square. That means that the area of the top right square is inches and because it's not needed, we will subtract from to get rid of it. If you turn around the paper, you notice that the square with half of the shaded region, and the square above it is the shaded region, except flipped and turned. Therefore, the remaining of the area of it which is should then be divided by in order to find the shaded region since the shaded region is equal to the other square and half a square. divided by is , so the answer is .
Video Solution
https://www.youtube.com/watch?v=zwy5U5IQi88 ~David
See Also
2002 AMC 8 (Problems • Answer Key • Resources) | ||
Preceded by Problem 19 |
Followed by Problem 21 | |
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