2009 AMC 10B Problems/Problem 18
Problem
Rectangle has and . Point is the midpoint of diagonal , and is on with . What is the area of ?
Solution
Solution 3 (Coordinate Geometry)
Set A to (0,0). Since M is the midpoint of the diagonal, it would be (4,-3). The Diagonal AC would be the line y= -(3/4)x. Since ME is perpendicular to AC, its line would be in the form y=((4/3)x)+b. Plugging in 4 and -3 for x and y would give b=25/3. To find the x intercept of y=((4/3)x)+25/3 we plug in 0 for y and get x=25/4. Then using the Shoelace Formula for (0,0) , (4,-3), and (25/4,0), we find the area is 75/8.
Solution 1
By the Pythagorean theorem we have , hence .
The triangles and have the same angle at and a right angle, thus all their angles are equal, and therefore these two triangles are similar.
The ratio of their sides is , hence the ratio of their areas is .
And as the area of triangle is , the area of triangle is .
Solution 2 (Only Pythagorean Theorem)
Draw as shown from the diagram. Since is of length , we have that is of length , because of the midpoint . Through the Pythagorean theorem, we know that , which means . Define to be for the sake of clarity. We know that . From here, we know that . From here, we can write the expression . Now, remember . , since we set in the start of the solution. Now to find the area
See Also
2009 AMC 10B (Problems • Answer Key • Resources) | ||
Preceded by Problem 17 |
Followed by Problem 19 | |
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